PK"nX fileversion1651:COMSOL 6.0.0.405PKҠPK"nXusedlicenses.txtCOMSOL RAYOPTICS PKFQPK"nXsavepoint1/model.zipeTPK{nX fileversion3435r Q03BSPKҠPK{nX dmodel.xml}{sIrw#nf(ERzѮ-)@l @c k2fHc/GVUVVVVfV_s/hta4 gO~=?? ^E`%>R`it_,흅~|GSl՞7? Fhר;vqyS45MFw=yzKrE8\xugp2z띟55Yx"7$jQڙH:;Lpġ?ffKM"5$St&'И 2{KdF Z{?'2@}j<'"atf! hot;@<0Y+c*h|N?yszY:n@"X乴)KPh5ud+!\`Ak[an:} X{(X ]0a~p6 hQAZoB3gA$>?lAj4Vc!9ֿTu4JQ?̦B_ή/S"`Lp^mi ׆l_r2\$~/:JeLUhXˣb"BfES#c.;F3>L6*+5VHdi-k'ͻWoޟ|/L!:5cn%J52H͢S$%)|i; gqŠuG{5ĒCHJ]c.V\:0yv VlNE¨_GBu9<2Xz-dh/ACf9eUSerf7jhJP`枧3U`R7sO޼:>}eIO!Q8}W%tF^͢KݴImDZ+/v 9eZc8V2!a5j@Iy!|RdҿCrWpJp8ބCcZʌLp'"JrH6u;\`r(`2Σ:fv*wSl~ПࣉȂgZaF<KPDFIA͞&;NGb8|h M'O;OНY3q>96Ζ'|(̾= ']Vl?8 2k^$3^) 1]M{7|c pGƏUL;8 gp5qkx3{-Il)2hҿ z-?$AIpfݶ*IR? 6]NGlm4w8n' Gς+sŇpy~& FQ-Iy,7ِܾKl_]09~/PJK Q2ne]zcYU%WA)8( IòZ] UqQ~([9ndQQrg_IrN5h85J…)њIuuU@3Ƈ_k׬3PG-jd,Dˀ/H:+3@6Q=;|䘯{e.V5x­dkT6I0 )y&nH[X\ AP)K25MVIn4| 'ݜE#RckzX+0O/gQP*)%+!oc96[)㔳Bqi4J{6'tu[i4;z9 d0l(V2֠zD_%kQr#:91e'*"!.=<}ҕ=mIn:" {º \ivz% }6+OFyFwn51B9/"B_u*Bl ǝvhJJDwamĕjC!j5ke6XΕ=^ҫVk6@yrWm~Thb#e7d !8]K0wJ;dVrmw";ܡ RBFwPB% |Ew"aUc˓r"/ ${ra_aWЗp8.y`3AdֽtoG/?k=/y"!yf𼐎Oh[?퀋ϑD{nHAOghѫjE'2\a̞mgD+q.^p,I~KɻzY@d?i;їyj}ؕTpØUV dAnÚRf_ , KbO*Yڳ&Qea\!n'"Ei FtQY!Lm*zFOtx{?}faDaa3 bn ,VyY A? nNʎmgUlRT?KDNCH(>_?XBj"eYF;{b47+ͱY MܵS a]=.#M 9p'G*G[:<ioa.p)D{dbhy*ֽߚ9Z b^PG8g'Md<AngNa+SZ!2apK%1nI\)(+8=z{?C 53\"~gBވV"R"+(`*ΥLrPVK<@Z%#9=Lt"z/;l_'9nEf`z} {QI-@M0qsHDEM-ʑLEXxG8cf# O ./L 7 !E0MnВS̭MtEBo|FʙAm:c==8q0'a<) Հ!ϖp}5:P6gZ߲j:͔ØO.fՆ5;&ҩ65Σé`p!SJu䚚b. +pP3i gS#T3_*Fwv~1 +R$+ %5;'zyev Aa5M Lfgs2eb?T {zDS;fӰoB x֠f+ @l'+yE ۢ:$>Gdi9zBR!RyRtzdAX!ZT߃fRȇXͅMO"md FOX;ayD|'Uw?7_% ~#!/ XLxB("ޡ `*+qV4qNͩ8OE0 5w.O տ3psKrz  P Lٯ/D@_) Ȅ#黙N++̑RBe*xO -s|^juΟ+H#,0 &~t70ؼ!~8*Ln;Tz>=W>{:WO@%zо&7w5 7;4A|"Tִ'iP8da ?o??66qL?ϵȧ4:JJRaݤ,@{cKCxUlZVmtAb}wpRUUx H'D[0؇fk@T`o2&Q,~-o9S}0_K Lj3x)Xpz?|<IvFoM^8Kp:1sNF #,d.)8G<4?6~Rt&6Z'A5Fϴ&v1%2Ke` ;9?|$BHU u J^$K\_EUHB-,UT|6:$ux!iy7[fi?jMop &*}o:]K!gf @. Х kU8YY"խv+ 4*]-[*ՁIM"U!Jk@5WPR5NCvFQc9* d9UBYrХr](TRk\Ł.Ee)@qfP@а "Sh3h[s36-ض*! vCBך2R!m!C,9yv8Ve?PlBsQ>zN/Y9Bom}̖/_Obj fnͼUZ/Un4'x@srvA#*EIK 15a q(D-` D,NS6NS^@j] XV(>79;Nu g0w$Of3QeLϖrN"ab>yi!.S˿X @vyyWS;tl:'Mn0-s4ZDzVzD [ب̆̍Ҏ 5jHY٧lp!Ç2]3^vw,SGt;2{qN8҇MY$U*Gw"gpRy>wpm,Dm@R̋8ZZ3g*I)'b+v,RV8 }AӣhQ*th;ŃhXK^4&I>'Ea>Uؐ{ Ydyu_NO^+%~D~(d򄝇NF5]|q3k\2`a"[΃#b~Qt-)lY˓/TrX"@IvQ#W9`!W 6 FЬ$,)T4/&q8H={(Oޝ?u5i= i/iʪНЋz h D ^`(Xb+6"@ifx"\yY>q%,-}UsÜ9ϴFi5A?Uw Nng'e{rnj^FjOvux||z~+gIBvD28bfpv%8R͘S@~R)E0leG%pgseG8,k8f; GLl #ATznƯ(L g7UG'v9JJuk[b]JTrQlZ~g'5(PeS_߼8y}B*cDx*Znr٤Gr`ݣ+zu=e=h;_ Y{h [R9/)*la]EtitQǂX;b;X (Juc3wzOfhu|I4Z«ET]T RUuiVdե+V~[ާ[#4^1V"!g8<&2?)ܮta^+':ZԼhH Wr:*C$8cUJ֕Ayz;,amy~ҤdD RW5g^C+p\Y1G`Hy0tK~fP^4_q*S!3` RVtoL@n%(oV,2p MC,Q@ɮ3Xx%\,w7faΣI6- Y9׳Cb7fаНxpoш~3sՒypo$g?߽1Ctwrډ{cH'u g/eY?o1oY12U|siCnj8/pMͣ m8;4.cIؘ>χ tqB ?%oZQn20GYyי/yaa3W)Q$b&lXOpQC/4IEUȸ'v|/P>f WZ~넫jծ Z\$ Co_+Q| jDt'^ep1ŕ?wهU *O ,J"88FI]$櫅H:hf; .L6I8K(m zS. 3b!gPG;9yƝK\B)ckƙbU/Ȑv%y&[)3dA{C=Dr޺xӕn ?C8DQxRyl|ȋ=:?(tOo]jT;}ԭo-tx>O"4?焒Ý dnHq3pP?f7Ҏmt?)>o'sF*~Rpkiϓ:| $4iL.{N3RzDDY^U5 x U8E .qiw[ f|,Pq"nBkxW)WX^q\2Йaf }+_N_'l ,[A$4A^VP<_UֹBa;oPLJMNŗ"J'QrI1M$~ slCuFp6SkhJZ+<>.p1 Ļx6U( %?q$Ryy^ 2}|(J̔b geljͲ\'P/w'=ZVR4_5ƊbjHU֫>Nqz˵0X#mջzU<r 池eFՖNǃ^AQuvS׎g2ۍzow:j0awZm[p'x3 N2 3Z\\m1&^=`fdʹ`šXxx0쵋WߤV`ZXm=g-^z!^uߤ+(E~5M:qhw{]_ L f{\{9WC_omAݓG]fkp pS |LJޞ8?kw~>|ǵ#WVV5{٬쒐J㊼Y,b+%_J~Y"ۢA 0,OҟhaبCgQNWr Ȯ^UX`qndDB])!WhĨu>Q0L13sh 3tM:YMvG9qѸYh;[9G٭5:jgIDy ݲZ32}ܒmVq@#֝Ftgxط4QdTDBw jTcHpB-)VEv j.(FJQJ|(PC(?O3G bbrsr- `ۢ׶HDn,BTXq|5pMTRj ъȆUCC+BR?n̬To B*7 I!}/B/}hC IgiwK7S5 D/XdK:Zr.TxҬdKsXUX $jEC %<[}2Z@Xo͘a԰[IJ%^9Fk[Wܷw6BwfrJʻǧӃ*=>]?w=6@{o7˄ځ ,ܲ,xֶNRǣ&|+"p9coMVT 8dOEC̚֎xl AY"lPִuIu~kvltذ&YR˯x бx(ĴQ̆Nj%X \޾)UxMG[Q77ōjwKgKRvĚ^JfӅ9;t@BS-o9[CX/RYcp0E*qHLə[ո NBLGX V\Vh8ZrSth&LC_ATO:ROȪPB*ٚu * _R%Aݣ6 V'; LTnhh"y-qrBPH4. ’ᑜϹ-'UBSFMN@-SN6 @[3O;8DILx.)2_X^IH ۀٞP}bkŠ_KO1SɆDl!Bx96K(xx葅sd<2?e^k㏧{Dzӽc;xIw=\.)y MK)h,x! A"Z&eQ'%5) &WJC,]P!X}E`cmi1C5Jm"KHiK.9;OZ}"^VlJɒU 3%~!a\F69 YaE4 bz9 p#IuB7sRKHK[Lld;qe,|p5u@銋r%V)Ytӽ?v`9}^S}'~5СrSiO,RFwB~9>o9iOhQ`ઠz5 :jnV,Fv僚:d柂*a$=x1SfJÃ@/lSÔ.id_NRYT&"uVX܉LKb~Xr*p7;L _ --w;90dok9EfåMT";e`* lSLm%4Z/SreMr9RZΪC` u\Ac0%RM!RL*_b+]T+wmUP K `JQȆ8w2¯JL)pZh=_K*|YG8xK Z B7홲,aWem=\g}B{05`]lq~Muև=Oz0ʊYu֎,X$,% '`D'=񮍲GX0re9<:?}x~OT[HRis.ÐҋVMQkc<[;<<[ U U E2Ia@o[` G]@DWCW':Ѩa(D/&r3Z/x|jpͺD7NgyF^7m4rs-#{y'7赘Ow{0 .KSn 4CWSi8k=B-#Q SUbvYv1U1 Vnš^J4%+0 BZ'\Ӹ\zO[ְR.A[A Ò܏ds{^sH]U%~D[*i[%[_]gõNWBTHI綝뫍+Xɳӭ*S= Pd Jv;FmvNiA#Y:̙:S<( d&vo:ZE#JrկߊI6LH}:qx KhȀ+{|D ؏af+XՊXr9Q8V;OmY3`,[8]:aW>Aɔ4 #v0" kH.C>d}rփe}%oR\ba[[@>G%]Vi9zB$UE(\0+= P{X9J*#[+ZUbҽ" ;åVz³sj^zRp'$\7 #iNY@hRII̓3eKUgyQvDT|#(Ϸַ[:뚐H,ܜ* |tdԀJͳ;9VC+[S1mBVj2Aş#6b&?/IN7%3WE p%Ff% cBnTˌ=Mt+J.&$EdM<0YOp )S:ŭ v PÙ?-\wN14کDt=h H",sᢢa2xln= >BydRe%\ y{xߜdN1.P ^;ơy+/`EnEǙ+Zv81.n\QUUq{]oKk8 ΂$-x@_$$U#R':>>3 ~/'`쀀|őנ?MӢ?mӡ?]ӣ?}C_ X?8R;q(C"Egh6NnP07? X>:} jQsӯLEBUt=D C8"?"! A`FW+x"7L$}&x PhZB 7ķB\EJ΢p ]O4yGfr{W%XR}h):E#9LJM6cT8 1tG`>Ҕ|\C7q&8ݳL霕eƇO[`]&8u= L me͙~,l P p(_+~iy4үWZc~Pjei^|,CG#U4ӿcE+4C.d40>`%;BsB ^Ng'o| 퀙]<4"0\?5r~|ꉯ$:TD?mOG?}#j7?HCi !4@DҔ_HSi M)4"ʷҒHf̖0[ه^[4MeQ϶ٓEED[4!*tD;fGYDL #@vHQ+@vȮ dWC H"Q-D =BO-D =BOtS| @i`'Kh/KWT;<L\zh@\/!@:5-_j*8 R\+8Y̓9kX׃Kv+UV;90 fC9?HW^@58 F$$׺RR|P0ơ3IΑW ϯz›*\Mr]cH Σ87U"٠_%|,}#x焻+yOu\-<@-Ks5p$jV8w#?JpI!iQ\c=Cv9Q$Gf6o\"ЂoLNSKQDlFG!ϟ8.cP$'H=E:mj>~H6(sV^ 'g,A* plG5Bl9!j(rDU0NUq8SrN;N'Isx#&,^7;XuNWHQxY)dtNrˣςuFȆi蕖Dyq^Po!_<.aO2o!̇R)^D<8YXUIR:s,f{9e_(}TnZ̍?-H#\Q57u]2“fL$㪎r'bcrQ"#|7? N{'af?EEarX\{䡂G-))8Qq.qk^]rpFI $(e RFymZ~mr yhy%W{y|m6J/#FbJpf^+>Jgv[s&]d#RGJj)EӘ$(2@i]Țjwy% 1{za$|* 9QPơ2)@)I q9D"U\v91)ţG\Xe{r(ϥ"ivӕPkԚ8UNeȥ͐sp''J:әtfjZ]0D Sn9XžG"ta| K_3WɰSv1w37ߔ~-g#?oo/3\ J1t8 X;'LcUBĿNuM,=ݳgb>5ߐdu5+Z2x9i@2%M$B?«aMt Q% [l$a[3MpqҸFhbEGdX~zL Oj@ǣB%!))ǗUρdgXDT\V}VjE⭄VN-x Tc=QnJJApׅܞ-Rh*g O ՐZ'XQ<>Cxj"eaVr(V٩%nL̳eWPG0Qzwd4Wqs1iܾ|@n%sih ^Ӷ(b*rVL *x2T=AC(AtZX*K%q4[xA7 }qQ< x_qt#DP!ֿP9R|Qأ41?89 S 5tǣwia5*'ox6n,˒?\ؠ0*DY _߈]qYr)(k -1 automatic COMSOL Multiphysics 6.0 (Build: 405) SI 1009819 savepoint1 1651 savepoint1 savepoint1 savepoint1 geom1 pgeom_gop mesh1 false false false 1394 true NOREMOVE|NORETAG|NODEACTIVATE /geom/geom1 gop NOREMOVE|NORETAG|NODEACTIVATE position 3,'qx','qy','qz' q NOREMOVE|NORETAG|NODEACTIVATE wavenumber 3,'kx','ky','kz' k NOREMOVE|NODEACTIVATE /StudyList/std1/StudyFeatureList/rtrac NOREMOVE|NODEACTIVATE 2 true NOREMOVE|NODEACTIVATE /StudyList/std1/StudyFeatureList/rtrac 2,'VOID','GEOMETRY' NOREMOVE|NODEACTIVATE 1 true NOREMOVE|NODEACTIVATE /StudyList/std1/StudyFeatureList/rtrac 2,'EXTGEOM','INTERIOR' DISABLED|NOREMOVE|NODEACTIVATE 1 true NOREMOVE|NODEACTIVATE 1,'PAIR' NOREMOVE|NODEACTIVATE -1 NOREMOVE|NODEACTIVATE /StudyList/std1/StudyFeatureList/rtrac 1,'DEFAULT' -1 NOREMOVE|NODEACTIVATE /StudyList/std1/StudyFeatureList/rtrac 1,'ACTIVE' NODEACTIVATE /modelNode/comp1 1,0,567219160,637933734 deg {0,1,0,2,3,4,0,5,6},{0,1,2,1,0,3,4,5,6,6,7},{0,1,1,2} {0,1,3,4,5,7,8},{0,1,2,5,6,7,8,10},{0,1,3} /geom/geom1/feature/sq1 false /frame/geometry1 /geom/geom1/geomnative comsol /geom/geom1/feature/fin m /frame/material1 /frame/mesh1 2 /frame/spatial1 1 STANDARD true 2 8,10,3 8,10,3 0 true true 1.0 1.0E-10 0.0,1.0,0.0,1.0 solid true[deg]geomattrgeomattrlevelposconstroff|off|pos0.0|0.0|x0.0y0.0rotconstroffrot0.0typesolidbasecornerlayer0.005|0.005|layerleftofflayerrightofflayerbottomonlayertopoffl1.0sizeconstroffsize1.0 3 BUILT BUILT [({0,1,2,3}),({4,5,6,7}),({0,4},{1,5},{2,6}),({3,7})],[({0,2,4}),({7,8,9}),({1},{3},{5}),({6})],[],[(),(),({1},{2}),(),({3})] 3536152459568703485 true 23,'p:selresult','p:selresultshow','p:color','p:customcolor','p:geomattr','p:geomattrlevel','p:posconstr','p:x','p:y','p:rotconstr','p:rot','p:type','p:base','p:layerleft','p:layerright','p:layerbottom','p:layertop','p:l','p:sizeconstr','p:size','p:arrowdispl','p:labelpos','p:arrowint' NORETAG 3,0,823324653,-1402540170 2 8,10,3 8,10,3 0 true true 1.0 1.0E-10 solid NOREMOVE|NORETAG|NODEACTIVATE true[deg]actionuniondesignbooloffrepairtoltypeautogeomrepcomsol 1 BUILT BUILT 2436187744848220461 true 10,'p:action','p:designbool','p:imprint','p:createpairs','p:splitpairs','p:pairtype','p:repairtoltype','p:repairtol','p:absrepairtol','p:geomrep' NORETAG 1,0,567219160,637933734 2 8,10,3 8,10,3 0 true true 1.0 1.0E-10 solid NOREMOVE|NORETAG|NODEACTIVATE|HIDDEN operationid featureLabel linexprerror Square Square 1 featureid parentid 3 -1 featureactive inbuildstate dead true true true NODEACTIVATE|AUTOGENERATED /modelNode/comp1 2,0 deg /geom/pgeom_gop/feature/pt1 false /frame/material2 /geom/pgeom_gop/geomnative comsol false /geom/pgeom_gop/feature/pt1 m /frame/material2 /frame/material2 1 /frame/material2 2 RAY 1 1,0 1,0 0 true true 1.0 1.0E-10 point true[deg]geomattrgeomattrlevelp0.0|pid0|pvalid0.0| 2 BUILT BUILT -383618719006494054 true 7,'p:selresult','p:selresultshow','p:geomattr','p:geomattrlevel','p:p','p:pid','p:pvalid' NORETAG 2,0 1 1,0 1,0 0 true true 1.0 1.0E-10 point /geom/geom1 NOREMOVE|NODEACTIVATE /StudyList/std1/StudyFeatureList/rtrac FIXED_REF /frame/geometry1 /geom/geom1 false NOREMOVE|NODEACTIVATE /StudyList/std1/StudyFeatureList/rtrac  FIXED_REF /frame/material1 /geom/geom1 false NOREMOVE|NODEACTIVATE /StudyList/std1/StudyFeatureList/rtrac FIXED_REF /frame/mesh1 /geom/geom1 false NOREMOVE|NODEACTIVATE /StudyList/std1/StudyFeatureList/rtrac /geom/pgeom_gop 3,'particleindex','particleindex2','particleindex3' NOREMOVE|NODEACTIVATE /StudyList/std1/StudyFeatureList/rtrac NODEACTIVATE /geom/geom1 2 true true 14,'p:showlabels','p:showDirections','p:showgrid','p:rendermesh','p:showunits','p:plotgroupunits','p:locked','p:istemporary','p:showselection','p:showmaterial','p:hidestatus','p:isnew','p:postviewkey','p:workplaneclip' NOREMOVE|NODEACTIVATE 26,'p:viewscaletype','p:autocontext','p:xweight','p:yweight','p:xscale','p:yscale','p:abstractviewsetting','p:manualgrid','p:xspacing','p:yspacing','p:xextra_vector_method','p:xextra_vector_start','p:xextra_vector_stop','p:xextra_vector_step','p:xextra_vector_numvalues','p:xextra_vector_function','p:xextra_vector_interval','p:xextra_vector_freqperdec','p:yextra_vector_method','p:yextra_vector_start','p:yextra_vector_stop','p:yextra_vector_step','p:yextra_vector_numvalues','p:yextra_vector_function','p:yextra_vector_interval','p:yextra_vector_freqperdec' NOREMOVE|NORETAG 4,'p:quantity','p:showOnlyNeeded','p:minpVisibility','p:modified' /modelNode/comp1 mat1 37,'p:bndType','p:thickness','p:middlePlane','p:offset','p:hiddenCardSwitcher','p:stack','p:stackAlign','p:orientLine','p:orientDist','p:widthRatio','p:showLabels','p:family','p:customize','p:color','p:customcolor','p:customspecular','p:customdiffuse','p:basis','p:origin','p:basisx','p:specifybasisy','p:basisy','p:noise','p:normalnoisetype','p:noisescale','p:normalnoisebrush','p:colornoise','p:colornoisetype','p:colornoisescale','p:colornoisebrush','p:customnoisecolor','p:colornoisenormalscale','p:alpha','p:shininess','p:phase','p:orientation','p:info' NOREMOVE|NORETAG def NORETAG rfi n ki NOREMOVE|NODEACTIVATE Electromagnetic_models
Baidu
 /modelNode/comp1 mat2 37,'p:bndType','p:thickness','p:middlePlane','p:offset','p:hiddenCardSwitcher','p:stack','p:stackAlign','p:orientLine','p:orientDist','p:widthRatio','p:showLabels','p:family','p:customize','p:color','p:customcolor','p:customspecular','p:customdiffuse','p:basis','p:origin','p:basisx','p:specifybasisy','p:basisy','p:noise','p:normalnoisetype','p:noisescale','p:normalnoisebrush','p:colornoise','p:colornoisetype','p:colornoisescale','p:colornoisebrush','p:customnoisecolor','p:colornoisenormalscale','p:alpha','p:shininess','p:phase','p:orientation','p:info' NOREMOVE|NORETAG def NORETAG rfi n ki NOREMOVE|NODEACTIVATE Electromagnetic_models
Baidu
 /modelNode/comp1 mat3 37,'p:bndType','p:thickness','p:middlePlane','p:offset','p:hiddenCardSwitcher','p:stack','p:stackAlign','p:orientLine','p:orientDist','p:widthRatio','p:showLabels','p:family','p:customize','p:color','p:customcolor','p:customspecular','p:customdiffuse','p:basis','p:origin','p:basisx','p:specifybasisy','p:basisy','p:noise','p:normalnoisetype','p:noisescale','p:normalnoisebrush','p:colornoise','p:colornoisetype','p:colornoisescale','p:colornoisebrush','p:customnoisecolor','p:colornoisenormalscale','p:alpha','p:shininess','p:phase','p:orientation','p:info' NOREMOVE|NORETAG def NORETAG rfi n ki NOREMOVE|NODEACTIVATE Electromagnetic_models
Baidu
 comp1 true true 3,'x','y','z' 3,'X','Y','Z' 3,'Xg','Yg','Zg' 3,'Xm','Ym','Zm' /expr /geom /mesh /multiphysics /pair /physics /common /coordsys /cpl /extraDim /func /material /probe /massProp /selection /view NODEACTIVATE /mesh/mesh1/feature/ftri1 /mesh/mesh1/feature/ftri1 /geom/geom1 AUTOMATIC {},{},{} 651691005985578834 2822020826895048642 /physics/gop true /mesh/mesh1 NOREMOVE|NORETAG|NODEACTIVATE true[deg]tabledefaulthmax0.067hmin3.0E-4hcurve0.3hnarrow1.0hgrad1.3extrHsh=0 BUILT BUILT /mesh/mesh1 4559089576703119969 4,'p:table','p:hnarrow','p:hauto','p:custom' {1,2,3,4,5,6,7,8},{1,2,3,4,5,6,7,8,9,10},{1,2,3} true[deg]xscale1.0yscale1.0smoothcontrolonsmoothmaxiter4smoothmaxdepth4methodautoMESHREMAININGextrHsh=0 BUILT BUILT null null null /mesh/mesh1 5485774561106252495 9,'p:xscale','p:yscale','p:smoothcontrol','p:method','p:buildnotex','p:buildnote','p:builddetails','p:buildoutputx','p:buildoutput' 2 8,10,3 8,10,3 0 true 1.0 1.0E-10 solid /batch OBJECTIVE /optsequence NODEACTIVATE 1394 1,'std1' true[]updateOptimizationSettingsoffftplistmethodmanualtimestepspecspecifytimetunitnstlist0.0|0.01|0.02|0.03|0.04|0.05|0.06|0.07|0.08|0.09|0.1|0.11|0.12|0.13|0.14|0.15|0.16|0.17|0.18|0.19|0.2|0.21|0.22|0.23|0.24|0.25|0.26|0.27|0.28|0.29|0.3|0.31|0.32|0.33|0.34|0.35000000000000003|0.36|0.37|0.38|0.39|0.4|0.41000000000000003|0.42|0.43|0.44|0.45|0.46|0.47000000000000003|0.48|0.49|0.5|0.51|0.52|0.53|0.54|0.55|0.56|0.5700000000000001|0.58|0.59|0.6|0.61|0.62|0.63|0.64|0.65|0.66|0.67|0.68|0.6900000000000001|0.7000000000000001|0.71|0.72|0.73|0.74|0.75|0.76|0.77|0.78|0.79|0.8|0.81|0.8200000000000001|0.8300000000000001|0.84|0.85|0.86|0.87|0.88|0.89|0.9|0.91|0.92|0.93|0.9400000000000001|0.9500000000000001|0.96|0.97|0.98|0.99|1.0|1.01|1.02|1.03|1.04|1.05|1.06|1.07|1.08|1.09|1.1|usertolofftime_discreteoffraystopcondnostopgeometricNonlinearityoffgeometricNonlinearityActiveoffmethodfixed_number_of_iterationsiter5currentiter1outputhideoffplotoffprobeselallprobefreqtstepsactivateimageenable.png|activategop|on|frame:spatial1|on|frame:material1|on|useadvanceddisableoffdisabledvariables[]disabledcoordinatesystems[]disabledcommondisabledpair[]disabledphysicsdisableFrameControldisabledcouplingdisabledreduceddiscretizationgop|physics|frame:spatial1|physics|frame:material1|physics|equationformgop|physics|frame:spatial1|physics|frame:material1|physics|equationform_freq_srcgop|fromSolver|frame:spatial1|fromSolver|frame:material1|fromSolver|equationform_freqgop|1[kHz]|frame:spatial1|0|frame:material1|0|activatecouplingimageactivateCouplingactivateimageromactivateromactivateimagereconstructreconstructorsuseinitsoloffusesoloffusestoreselallmeshgeom1|mesh1|timeadaptionoffadaptselectionGEOMgeom1auxsweepmethodmanualshowuseparamonuseparamoffoptimizationoffpdistriboffautoremeshofftreeSelectionKeyequationFormCouplingColumn null null null null null null null null null null null null null null null null null null 137,'p:updateOptimizationSettings','p:ftplistmethod','p:timestepspec','p:tdescr','p:usetunit','p:tunit','p:tlist_vector_method','p:tlist_vector_start','p:tlist_vector_stop','p:tlist_vector_step','p:tlist_vector_numvalues','p:tlist_vector_function','p:tlist_vector_interval','p:tlist_vector_freqperdec','p:ldescr','p:uselunit','p:lunit','p:llist_vector_method','p:llist_vector_start','p:llist_vector_stop','p:llist_vector_step','p:llist_vector_numvalues','p:llist_vector_function','p:llist_vector_interval','p:llist_vector_freqperdec','p:charvel','p:usertol','p:time_discrete','p:raystopcond','p:thresholdintensity','p:numberofreflections','p:geometricNonlinearity','p:method','p:expr','p:rtolterm','p:rtolthresh','p:maxiter','p:miniter','p:atolterm','p:iter','p:currentiter','p:outputhide','p:plot','p:plotfreq','p:probesel','p:probefreq','p:activateimage','p:physselection','p:useadvanceddisable','p:disabledcommon','p:disabledphysics','p:disableFrameControl','p:disabledcoupling','p:disabledreduced','p:discretization_proxy','p:equationform_proxy','p:equationform_freq_src_proxy','p:equationform_freq_proxy','p:reconstructors_proxy','p:activatecouplingimage','p:multiphysicsSelection','p:activateCoupling','p:activateimagerom','p:romselection','p:activaterom','p:activateimagereconstruct','p:reconstructables','p:reconstructors','p:useinitsol','p:initmethod','p:initstudyhide','p:initsolhide','p:initsolusesolnumhide','p:initsolusesolnum','p:oldinitsoluse','p:initstudystep','p:solnumhide','p:solvertype','p:timeinterp','p:t','p:manualsol','p:manualsolnum','p:manualsolnum_vector_method','p:manualsolnum_vector_start','p:manualsolnum_vector_stop','p:manualsolnum_vector_step','p:manualsolnum_vector_numvalues','p:manualsolnum_vector_function','p:manualsolnum_vector_interval','p:manualsolnum_vector_freqperdec','p:listsol','p:listsolnum','p:usesol','p:notsolmethod','p:notstudyhide','p:notsolhide','p:notsolusesolnumhide','p:notsolusesolnum','p:oldnotsoluse','p:notstudystep','p:notsolnumhide','p:notsolvertype','p:nottimeinterp','p:nott','p:notmanualsol','p:notmanualsolnum','p:notmanualsolnum_vector_method','p:notmanualsolnum_vector_start','p:notmanualsolnum_vector_stop','p:notmanualsolnum_vector_step','p:notmanualsolnum_vector_numvalues','p:notmanualsolnum_vector_function','p:notmanualsolnum_vector_interval','p:notmanualsolnum_vector_freqperdec','p:notlistsol','p:notlistsolnum','p:usestoresel','p:geomselection','p:timeadaption','p:auxsweepmethod','p:showuseparam','p:useparam','p:sweeptype','p:pname','p:plistarr','p:plistarr_vector_method','p:plistarr_vector_start','p:plistarr_vector_stop','p:plistarr_vector_step','p:plistarr_vector_numvalues','p:plistarr_vector_function','p:plistarr_vector_interval','p:plistarr_vector_freqperdec','p:punit','p:optimization','p:pdistrib','p:autoremesh' 1,'std1/rtrac' Last_computation_time 1 s
Baidu
 NODEACTIVATE /soldata/sol5 /sol/sol1/feature/t1 /soldata/savepoint1 /study/std1 0 SEQUENCE true 0 3 1,'t' 1,'ns' 0 0.0,1.0000000000000001E-11,2.0000000000000002E-11,3.0E-11,4.0000000000000004E-11,5.000000000000001E-11,6.0E-11,7.000000000000002E-11,8.000000000000001E-11,9.0E-11,1.0000000000000002E-10,1.1000000000000001E-10,1.2E-10,1.3000000000000002E-10,1.4000000000000003E-10,1.5E-10,1.6000000000000002E-10,1.7000000000000003E-10,1.8E-10,1.9000000000000002E-10,2.0000000000000003E-10,2.1E-10,2.2000000000000002E-10,2.3000000000000003E-10,2.4E-10,2.5E-10,2.6000000000000003E-10,2.7000000000000005E-10,2.8000000000000007E-10,2.9E-10,3.0E-10,3.1E-10,3.2000000000000003E-10,3.3000000000000005E-10,3.4000000000000007E-10,3.5000000000000003E-10,3.6E-10,3.7E-10,3.8000000000000003E-10,3.9000000000000005E-10,4.0000000000000007E-10,4.1000000000000003E-10,4.2E-10,4.3E-10,4.4000000000000003E-10,4.5000000000000005E-10,4.6000000000000007E-10,4.7E-10,4.8E-10,4.900000000000001E-10,5.0E-10,5.1E-10,5.200000000000001E-10,5.3E-10,5.400000000000001E-10,5.500000000000001E-10,5.600000000000001E-10,5.700000000000001E-10,5.8E-10,5.9E-10,6.0E-10,6.100000000000001E-10,6.2E-10,6.3E-10,6.400000000000001E-10,6.5E-10,6.600000000000001E-10,6.700000000000001E-10,6.800000000000001E-10,6.900000000000001E-10,7.000000000000001E-10,7.1E-10,7.2E-10,7.300000000000001E-10,7.4E-10,7.500000000000001E-10,7.600000000000001E-10,7.7E-10,7.800000000000001E-10,7.900000000000001E-10,8.000000000000001E-10,8.100000000000001E-10,8.200000000000001E-10,8.300000000000001E-10,8.4E-10,8.500000000000001E-10,8.6E-10,8.700000000000001E-10,8.800000000000001E-10,8.9E-10,9.000000000000001E-10,9.100000000000001E-10,9.200000000000001E-10,9.300000000000001E-10,9.4E-10,9.5E-10,9.6E-10,9.7E-10,9.800000000000001E-10,9.9E-10,1.0E-9,1.01E-9,1.02E-9,1.0300000000000002E-9,1.0400000000000001E-9,1.05E-9,1.06E-9,1.07E-9,1.0800000000000002E-9,1.0900000000000002E-9,1.1000000000000001E-9 0 0 1|0 NONE SI 0 0 0 0 0 NONE <StudyStep><StudyStep_VALID><![CDATA[true]]></StudyStep_VALID><StudyStep_UNIT><![CDATA[[]]]></StudyStep_UNIT><StudyStep_study><![CDATA[studystd1]]></StudyStep_study><StudyStep_studystep><![CDATA[studysteprtrac]]></StudyStep_studystep><StudyStep_useForModelReduction><![CDATA[useForModelReductionon]]></StudyStep_useForModelReduction><StudyStep_splitcomplex><![CDATA[splitcomplexoff]]></StudyStep_splitcomplex><StudyStep_partmethod><![CDATA[partmethodparent]]></StudyStep_partmethod><StudyStep_assempara><![CDATA[assemparaon]]></StudyStep_assempara><StudyStep_useent><![CDATA[useentall]]></StudyStep_useent><StudyStep_keeplog><![CDATA[keeplogoff]]></StudyStep_keeplog><StudyStep_const><![CDATA[const]]></StudyStep_const><StudyStep_SUBFEATURES></StudyStep_SUBFEATURES><StudyStep_EDITED>false</StudyStep_EDITED></StudyStep> BUILT true 0 0 11,'p:unredstudy','p:unredstep','p:useForModelReduction','p:splitcomplex','p:partmethod','p:assempara','p:useent','p:keeplog','p:const','p:changedproperties','p:lastchangedproperty' <Variables><Variables_VALID><![CDATA[true]]></Variables_VALID><Variables_UNIT><![CDATA[[]]]></Variables_UNIT><Variables_initmethod><![CDATA[initmethodinit]]></Variables_initmethod><Variables_initsol><![CDATA[initsolzerozero]]></Variables_initsol><Variables_solvertype><![CDATA[solvertypenone]]></Variables_solvertype><Variables_timeinterp><![CDATA[timeinterpoff]]></Variables_timeinterp><Variables_manualsol><![CDATA[manualsoloff]]></Variables_manualsol><Variables_listsol><![CDATA[listsoloff]]></Variables_listsol><Variables_scalemethod><![CDATA[scalemethodauto]]></Variables_scalemethod><Variables_resscalemethod><![CDATA[resscalemethodmanual]]></Variables_resscalemethod><Variables_resscaleval><![CDATA[resscaleval1.0]]></Variables_resscaleval><Variables_notsolmethod><![CDATA[notsolmethodinit]]></Variables_notsolmethod><Variables_notsol><![CDATA[notsolzerozero]]></Variables_notsol><Variables_notsolvertype><![CDATA[notsolvertypenone]]></Variables_notsolvertype><Variables_nottimeinterp><![CDATA[nottimeinterpoff]]></Variables_nottimeinterp><Variables_notmanualsol><![CDATA[notmanualsoloff]]></Variables_notmanualsol><Variables_notlistsol><![CDATA[notlistsoloff]]></Variables_notlistsol><Variables_initparametersmethod><![CDATA[initparametersmethodauto]]></Variables_initparametersmethod><Variables_keeplog><![CDATA[keeplogoff]]></Variables_keeplog><Variables_const><![CDATA[const]]></Variables_const><Variables_storesol><![CDATA[storesolinit]]></Variables_storesol><Variables_SUBFEATURES><Field><Field_VALID><![CDATA[true]]></Field_VALID><Field_UNIT><![CDATA[[]]]></Field_UNIT><Field_comp><![CDATA[compcomp1.gop.atten|]]></Field_comp><Field_compintuse><![CDATA[compintuseoff]]></Field_compintuse><Field_compintstatuse><![CDATA[compintstatuseoff]]></Field_compintstatuse><Field_solvefor><![CDATA[solveforon]]></Field_solvefor><Field_reconstruct><![CDATA[reconstructnonenone]]></Field_reconstruct><Field_out><![CDATA[outon]]></Field_out><Field_usestoresel><![CDATA[usestoreselall]]></Field_usestoresel><Field_variables><![CDATA[variablescomp1_gop_atten]]></Field_variables><Field_scalemethod><![CDATA[scalemethodparent]]></Field_scalemethod><Field_resscalemethod><![CDATA[resscalemethodparent]]></Field_resscalemethod><Field_SUBFEATURES></Field_SUBFEATURES><Field_EDITED>false</Field_EDITED></Field><Field><Field_VALID><![CDATA[true]]></Field_VALID><Field_UNIT><![CDATA[[]]]></Field_UNIT><Field_comp><![CDATA[compcomp1.gop.I0|]]></Field_comp><Field_compintuse><![CDATA[compintuseoff]]></Field_compintuse><Field_compintstatuse><![CDATA[compintstatuseoff]]></Field_compintstatuse><Field_solvefor><![CDATA[solveforon]]></Field_solvefor><Field_reconstruct><![CDATA[reconstructnonenone]]></Field_reconstruct><Field_out><![CDATA[outon]]></Field_out><Field_usestoresel><![CDATA[usestoreselall]]></Field_usestoresel><Field_variables><![CDATA[variablescomp1_gop_I0]]></Field_variables><Field_scalemethod><![CDATA[scalemethodparent]]></Field_scalemethod><Field_resscalemethod><![CDATA[resscalemethodparent]]></Field_resscalemethod><Field_SUBFEATURES></Field_SUBFEATURES><Field_EDITED>false</Field_EDITED></Field><Field><Field_VALID><![CDATA[true]]></Field_VALID><Field_UNIT><![CDATA[[]]]></Field_UNIT><Field_comp><![CDATA[compcomp1.gop.lambda0|]]></Field_comp><Field_compintuse><![CDATA[compintuseoff]]></Field_compintuse><Field_compintstatuse><![CDATA[compintstatuseoff]]></Field_compintstatuse><Field_solvefor><![CDATA[solveforon]]></Field_solvefor><Field_reconstruct><![CDATA[reconstructnonenone]]></Field_reconstruct><Field_out><![CDATA[outon]]></Field_out><Field_usestoresel><![CDATA[usestoreselall]]></Field_usestoresel><Field_variables><![CDATA[variablescomp1_gop_lambda0]]></Field_variables><Field_scalemethod><![CDATA[scalemethodparent]]></Field_scalemethod><Field_resscalemethod><![CDATA[resscalemethodparent]]></Field_resscalemethod><Field_SUBFEATURES></Field_SUBFEATURES><Field_EDITED>false</Field_EDITED></Field><Field><Field_VALID><![CDATA[true]]></Field_VALID><Field_UNIT><![CDATA[[]]]></Field_UNIT><Field_comp><![CDATA[compcomp1.gop.Q0|]]></Field_comp><Field_compintuse><![CDATA[compintuseoff]]></Field_compintuse><Field_compintstatuse><![CDATA[compintstatuseoff]]></Field_compintstatuse><Field_solvefor><![CDATA[solveforon]]></Field_solvefor><Field_reconstruct><![CDATA[reconstructnonenone]]></Field_reconstruct><Field_out><![CDATA[outon]]></Field_out><Field_usestoresel><![CDATA[usestoreselall]]></Field_usestoresel><Field_variables><![CDATA[variablescomp1_gop_Q0]]></Field_variables><Field_scalemethod><![CDATA[scalemethodparent]]></Field_scalemethod><Field_resscalemethod><![CDATA[resscalemethodparent]]></Field_resscalemethod><Field_SUBFEATURES></Field_SUBFEATURES><Field_EDITED>false</Field_EDITED></Field><Field><Field_VALID><![CDATA[true]]></Field_VALID><Field_UNIT><![CDATA[[]]]></Field_UNIT><Field_comp><![CDATA[compcomp1.gop.r1|comp1.gop.r1_init|]]></Field_comp><Field_compintuse><![CDATA[compintuseoff]]></Field_compintuse><Field_compintstatuse><![CDATA[compintstatuseoff]]></Field_compintstatuse><Field_solvefor><![CDATA[solveforon]]></Field_solvefor><Field_reconstruct><![CDATA[reconstructnonenone]]></Field_reconstruct><Field_out><![CDATA[outon]]></Field_out><Field_usestoresel><![CDATA[usestoreselall]]></Field_usestoresel><Field_variables><![CDATA[variablescomp1_gop_r]]></Field_variables><Field_scalemethod><![CDATA[scalemethodparent]]></Field_scalemethod><Field_resscalemethod><![CDATA[resscalemethodparent]]></Field_resscalemethod><Field_SUBFEATURES></Field_SUBFEATURES><Field_EDITED>false</Field_EDITED></Field><Field><Field_VALID><![CDATA[true]]></Field_VALID><Field_UNIT><![CDATA[[]]]></Field_UNIT><Field_comp><![CDATA[compcomp1.gop.sn1|comp1.gop.sn2|comp1.gop.sn3|]]></Field_comp><Field_compintuse><![CDATA[compintuseoff]]></Field_compintuse><Field_compintstatuse><![CDATA[compintstatuseoff]]></Field_compintstatuse><Field_solvefor><![CDATA[solveforon]]></Field_solvefor><Field_reconstruct><![CDATA[reconstructnonenone]]></Field_reconstruct><Field_out><![CDATA[outon]]></Field_out><Field_usestoresel><![CDATA[usestoreselall]]></Field_usestoresel><Field_variables><![CDATA[variablescomp1_gop_s]]></Field_variables><Field_scalemethod><![CDATA[scalemethodparent]]></Field_scalemethod><Field_resscalemethod><![CDATA[resscalemethodparent]]></Field_resscalemethod><Field_SUBFEATURES></Field_SUBFEATURES><Field_EDITED>false</Field_EDITED></Field><Field><Field_VALID><![CDATA[true]]></Field_VALID><Field_UNIT><![CDATA[[]]]></Field_UNIT><Field_comp><![CDATA[compcomp1.kx|comp1.ky|]]></Field_comp><Field_compintuse><![CDATA[compintuseoff]]></Field_compintuse><Field_compintstatuse><![CDATA[compintstatuseoff]]></Field_compintstatuse><Field_solvefor><![CDATA[solveforon]]></Field_solvefor><Field_reconstruct><![CDATA[reconstructnonenone]]></Field_reconstruct><Field_out><![CDATA[outon]]></Field_out><Field_usestoresel><![CDATA[usestoreselall]]></Field_usestoresel><Field_variables><![CDATA[variablescomp1_kgop]]></Field_variables><Field_scalemethod><![CDATA[scalemethodparent]]></Field_scalemethod><Field_resscalemethod><![CDATA[resscalemethodparent]]></Field_resscalemethod><Field_SUBFEATURES></Field_SUBFEATURES><Field_EDITED>false</Field_EDITED></Field><Field><Field_VALID><![CDATA[true]]></Field_VALID><Field_UNIT><![CDATA[[]]]></Field_UNIT><Field_comp><![CDATA[compcomp1.qx|comp1.qy|]]></Field_comp><Field_compintuse><![CDATA[compintuseoff]]></Field_compintuse><Field_compintstatuse><![CDATA[compintstatuseoff]]></Field_compintstatuse><Field_solvefor><![CDATA[solveforon]]></Field_solvefor><Field_reconstruct><![CDATA[reconstructnonenone]]></Field_reconstruct><Field_out><![CDATA[outon]]></Field_out><Field_usestoresel><![CDATA[usestoreselall]]></Field_usestoresel><Field_variables><![CDATA[variablescomp1_qgop]]></Field_variables><Field_scalemethod><![CDATA[scalemethodparent]]></Field_scalemethod><Field_resscalemethod><![CDATA[resscalemethodparent]]></Field_resscalemethod><Field_SUBFEATURES></Field_SUBFEATURES><Field_EDITED>false</Field_EDITED></Field></Variables_SUBFEATURES><Variables_EDITED>false</Variables_EDITED></Variables> BUILT true 1 8 47,'p:initmethod','p:initsolhide','p:oldinitsoluse','p:initsolusesolnumhide','p:initsolusesolnum','p:solvertype','p:timeinterp','p:t','p:manualsol','p:manualsolnum_vector_method','p:manualsolnum_vector_start','p:manualsolnum_vector_stop','p:manualsolnum_vector_step','p:manualsolnum_vector_numvalues','p:manualsolnum_vector_function','p:manualsolnum_vector_interval','p:manualsolnum_vector_freqperdec','p:listsol','p:listsolnum','p:scalemethod','p:scaleval','p:resscaleval','p:resscalethresh','p:notsolmethod','p:notsolhide','p:oldnotsoluse','p:notsolusesolnumhide','p:notsolusesolnum','p:notsolvertype','p:nottimeinterp','p:nott','p:notmanualsol','p:notmanualsolnum_vector_method','p:notmanualsolnum_vector_start','p:notmanualsolnum_vector_stop','p:notmanualsolnum_vector_step','p:notmanualsolnum_vector_numvalues','p:notmanualsolnum_vector_function','p:notmanualsolnum_vector_interval','p:notmanualsolnum_vector_freqperdec','p:notlistsol','p:notlistsolnum','p:initparametersmethod','p:keeplog','p:const','p:storesol','p:changedproperties' NOREMOVE|NORETAG|NODEACTIVATE BUILT 0 0 14,'p:compintuse','p:compint','p:compintstatuse','p:compintstat','p:solvefor','p:out','p:usestoresel','p:scalemethod','p:scaleval','p:resscalemethod','p:resscaleval','p:resscalethresh','p:changedproperties','p:lastchangedproperty' NOREMOVE|NORETAG|NODEACTIVATE BUILT 1 0 14,'p:compintuse','p:compint','p:compintstatuse','p:compintstat','p:solvefor','p:out','p:usestoresel','p:scalemethod','p:scaleval','p:resscalemethod','p:resscaleval','p:resscalethresh','p:changedproperties','p:lastchangedproperty' NOREMOVE|NORETAG|NODEACTIVATE BUILT 2 0 14,'p:compintuse','p:compint','p:compintstatuse','p:compintstat','p:solvefor','p:out','p:usestoresel','p:scalemethod','p:scaleval','p:resscalemethod','p:resscaleval','p:resscalethresh','p:changedproperties','p:lastchangedproperty' NOREMOVE|NORETAG|NODEACTIVATE BUILT 3 0 14,'p:compintuse','p:compint','p:compintstatuse','p:compintstat','p:solvefor','p:out','p:usestoresel','p:scalemethod','p:scaleval','p:resscalemethod','p:resscaleval','p:resscalethresh','p:changedproperties','p:lastchangedproperty' NOREMOVE|NORETAG|NODEACTIVATE BUILT 4 0 14,'p:compintuse','p:compint','p:compintstatuse','p:compintstat','p:solvefor','p:out','p:usestoresel','p:scalemethod','p:scaleval','p:resscalemethod','p:resscaleval','p:resscalethresh','p:changedproperties','p:lastchangedproperty' NOREMOVE|NORETAG|NODEACTIVATE BUILT 5 0 14,'p:compintuse','p:compint','p:compintstatuse','p:compintstat','p:solvefor','p:out','p:usestoresel','p:scalemethod','p:scaleval','p:resscalemethod','p:resscaleval','p:resscalethresh','p:changedproperties','p:lastchangedproperty' NOREMOVE|NORETAG|NODEACTIVATE BUILT 6 0 14,'p:compintuse','p:compint','p:compintstatuse','p:compintstat','p:solvefor','p:out','p:usestoresel','p:scalemethod','p:scaleval','p:resscalemethod','p:resscaleval','p:resscalethresh','p:changedproperties','p:lastchangedproperty' NOREMOVE|NORETAG|NODEACTIVATE BUILT 7 0 14,'p:compintuse','p:compint','p:compintstatuse','p:compintstat','p:solvefor','p:out','p:usestoresel','p:scalemethod','p:scaleval','p:resscalemethod','p:resscaleval','p:resscalethresh','p:changedproperties','p:lastchangedproperty' <Time><Time_VALID><![CDATA[true]]></Time_VALID><Time_UNIT><![CDATA[[]]]></Time_UNIT><Time_usetunit><![CDATA[usetuniton]]></Time_usetunit><Time_tunit><![CDATA[tunitns]]></Time_tunit><Time_tlist><![CDATA[tlistrange(0,0.01,1.1)]]></Time_tlist><Time_tout><![CDATA[touttlist]]></Time_tout><Time_rtol><![CDATA[rtol1.0E-5]]></Time_rtol><Time_atolglobalmethod><![CDATA[atolglobalmethodscaled]]></Time_atolglobalmethod><Time_atolglobalvaluemethod><![CDATA[atolglobalvaluemethodfactor]]></Time_atolglobalvaluemethod><Time_atolglobalfactor><![CDATA[atolglobalfactor0.1]]></Time_atolglobalfactor><Time_tderglobalmethod><![CDATA[tderglobalmethodauto]]></Time_tderglobalmethod><Time_ewtrescale><![CDATA[ewtrescaleon]]></Time_ewtrescale><Time_atolmethod><![CDATA[atolmethodcomp1_gop_atten|global|comp1_gop_I0|global|comp1_gop_lambda0|global|comp1_gop_Q0|global|comp1_gop_r|global|comp1_gop_s|global|comp1_kgop|global|comp1_qgop|global|]]></Time_atolmethod><Time_atolvaluemethod><![CDATA[atolvaluemethodcomp1_gop_atten|factor|comp1_gop_I0|factor|comp1_gop_lambda0|factor|comp1_gop_Q0|factor|comp1_gop_r|factor|comp1_gop_s|factor|comp1_kgop|factor|comp1_qgop|factor|]]></Time_atolvaluemethod><Time_atolfactor><![CDATA[atolfactorcomp1_gop_atten|0.1|comp1_gop_I0|0.1|comp1_gop_lambda0|0.1|comp1_gop_Q0|0.1|comp1_gop_r|0.1|comp1_gop_s|0.1|comp1_kgop|0.1|comp1_qgop|0.1|]]></Time_atolfactor><Time_tdermethod><![CDATA[tdermethodcomp1_gop_atten|auto|comp1_gop_I0|auto|comp1_gop_lambda0|auto|comp1_gop_Q0|auto|comp1_gop_r|auto|comp1_gop_s|auto|comp1_kgop|auto|comp1_qgop|auto|]]></Time_tdermethod><Time_tderfactor><![CDATA[tderfactorcomp1_gop_atten|1.0|comp1_gop_I0|1.0|comp1_gop_lambda0|1.0|comp1_gop_Q0|1.0|comp1_gop_r|1.0|comp1_gop_s|1.0|comp1_kgop|1.0|comp1_qgop|1.0|]]></Time_tderfactor><Time_atol><![CDATA[atolcomp1_gop_atten|1e-3|comp1_gop_I0|1e-3|comp1_gop_lambda0|1e-3|comp1_gop_Q0|1e-3|comp1_gop_r|1e-3|comp1_gop_s|1e-3|comp1_kgop|1e-3|comp1_qgop|1e-3|]]></Time_atol><Time_atoludot><![CDATA[atoludotcomp1_gop_atten|1e-3|comp1_gop_I0|1e-3|comp1_gop_lambda0|1e-3|comp1_gop_Q0|1e-3|comp1_gop_r|1e-3|comp1_gop_s|1e-3|comp1_kgop|1e-3|comp1_qgop|1e-3|]]></Time_atoludot><Time_timemethod><![CDATA[timemethodgenalpha]]></Time_timemethod><Time_masssingular><![CDATA[masssingularmaybe]]></Time_masssingular><Time_consistent><![CDATA[consistentbweuler]]></Time_consistent><Time_bwinitstepfrac><![CDATA[bwinitstepfrac0.001]]></Time_bwinitstepfrac><Time_estrat><![CDATA[estratexclude]]></Time_estrat><Time_tstepsgenalpha><![CDATA[tstepsgenalphastrict]]></Time_tstepsgenalpha><Time_initialstepgenalpha><![CDATA[initialstepgenalpha0.001]]></Time_initialstepgenalpha><Time_initialstepgenalphaactive><![CDATA[initialstepgenalphaactiveoff]]></Time_initialstepgenalphaactive><Time_maxstepconstraintgenalpha><![CDATA[maxstepconstraintgenalphaauto]]></Time_maxstepconstraintgenalpha><Time_incrdelay><![CDATA[incrdelay15]]></Time_incrdelay><Time_incrdelayactive><![CDATA[incrdelayactiveoff]]></Time_incrdelayactive><Time_rhoinf><![CDATA[rhoinf0.75]]></Time_rhoinf><Time_predictor><![CDATA[predictorlinear]]></Time_predictor><Time_rescaleafterinitbw><![CDATA[rescaleafterinitbwoff]]></Time_rescaleafterinitbw><Time_plot><![CDATA[plotoff]]></Time_plot><Time_probesel><![CDATA[probeselall]]></Time_probesel><Time_probefreq><![CDATA[probefreqtsteps]]></Time_probefreq><Time_reacf><![CDATA[reacfon]]></Time_reacf><Time_lumpedflux><![CDATA[lumpedfluxoff]]></Time_lumpedflux><Time_storeudot><![CDATA[storeudoton]]></Time_storeudot><Time_eventout><![CDATA[eventoutoff]]></Time_eventout><Time_complex><![CDATA[complexoff]]></Time_complex><Time_cosimstoressol><![CDATA[cosimstoressoloff]]></Time_cosimstoressol><Time_cosim><![CDATA[cosimoff]]></Time_cosim><Time_uselsqtimedata><![CDATA[uselsqtimedataon]]></Time_uselsqtimedata><Time_tlistlsq><![CDATA[tlistlsq]]></Time_tlistlsq><Time_excludelsqtimes><![CDATA[excludelsqtimeson]]></Time_excludelsqtimes><Time_cname><![CDATA[cname]]></Time_cname><Time_keeplog><![CDATA[keeplogoff]]></Time_keeplog><Time_const><![CDATA[const]]></Time_const><Time_SUBFEATURES><Direct><![CDATA[[notactive]]]></Direct><Advanced><Advanced_VALID><![CDATA[true]]></Advanced_VALID><Advanced_UNIT><![CDATA[[]]]></Advanced_UNIT><Advanced_symmetric><![CDATA[symmetricauto]]></Advanced_symmetric><Advanced_matrixformat><![CDATA[matrixformatauto]]></Advanced_matrixformat><Advanced_rowscale><![CDATA[rowscaleon]]></Advanced_rowscale><Advanced_nullfun><![CDATA[nullfunauto]]></Advanced_nullfun><Advanced_orthonormallimit><![CDATA[orthonormallimit1.0E7]]></Advanced_orthonormallimit><Advanced_storeresidual><![CDATA[storeresidualoff]]></Advanced_storeresidual><Advanced_convinfo><![CDATA[convinfoon]]></Advanced_convinfo><Advanced_logsampling><![CDATA[logsampling0.005]]></Advanced_logsampling><Advanced_blocksize><![CDATA[blocksize1000]]></Advanced_blocksize><Advanced_blocksizeactive><![CDATA[blocksizeactiveoff]]></Advanced_blocksizeactive><Advanced_assemloc><![CDATA[assemlocon]]></Advanced_assemloc><Advanced_cachepattern><![CDATA[cachepatternoff]]></Advanced_cachepattern><Advanced_complexfun><![CDATA[complexfunoff]]></Advanced_complexfun><Advanced_matherr><![CDATA[matherron]]></Advanced_matherr><Advanced_checkmatherr><![CDATA[checkmatherroff]]></Advanced_checkmatherr><Advanced_assemtol><![CDATA[assemtol1.0E-12]]></Advanced_assemtol><Advanced_keep><![CDATA[keepoff]]></Advanced_keep><Advanced_optthread><![CDATA[optthreadoff]]></Advanced_optthread><Advanced_SUBFEATURES></Advanced_SUBFEATURES><Advanced_EDITED>false</Advanced_EDITED></Advanced><FullyCoupled><FullyCoupled_VALID><![CDATA[true]]></FullyCoupled_VALID><FullyCoupled_UNIT><![CDATA[[]]]></FullyCoupled_UNIT><FullyCoupled_linsolver><![CDATA[linsolveri1]]></FullyCoupled_linsolver><FullyCoupled_dtech><![CDATA[dtechconst]]></FullyCoupled_dtech><FullyCoupled_maxiter><![CDATA[maxiter4]]></FullyCoupled_maxiter><FullyCoupled_ntolfact><![CDATA[ntolfact0.1]]></FullyCoupled_ntolfact><FullyCoupled_termonres><![CDATA[termonresoff]]></FullyCoupled_termonres><FullyCoupled_damp><![CDATA[damp1.0]]></FullyCoupled_damp><FullyCoupled_ratelimit><![CDATA[ratelimit0.9]]></FullyCoupled_ratelimit><FullyCoupled_ratelimitactive><![CDATA[ratelimitactiveoff]]></FullyCoupled_ratelimitactive><FullyCoupled_jtech><![CDATA[jtechminimal]]></FullyCoupled_jtech><FullyCoupled_ntermconst><![CDATA[ntermconsttol]]></FullyCoupled_ntermconst><FullyCoupled_stabacc><![CDATA[stabaccnone]]></FullyCoupled_stabacc><FullyCoupled_plot><![CDATA[plotoff]]></FullyCoupled_plot><FullyCoupled_probesel><![CDATA[probeselnone]]></FullyCoupled_probesel><FullyCoupled_SUBFEATURES></FullyCoupled_SUBFEATURES><FullyCoupled_EDITED>false</FullyCoupled_EDITED></FullyCoupled><Iterative><Iterative_VALID><![CDATA[true]]></Iterative_VALID><Iterative_UNIT><![CDATA[[]]]></Iterative_UNIT><Iterative_linsolver><![CDATA[linsolvergmres]]></Iterative_linsolver><Iterative_itrestart><![CDATA[itrestart50]]></Iterative_itrestart><Iterative_prefuntype><![CDATA[prefuntypeleft]]></Iterative_prefuntype><Iterative_irestol><![CDATA[irestol0.01]]></Iterative_irestol><Iterative_nlinnormuse><![CDATA[nlinnormuseon]]></Iterative_nlinnormuse><Iterative_nlinnormlevel><![CDATA[nlinnormlevel1.0]]></Iterative_nlinnormlevel><Iterative_usenlweights><![CDATA[usenlweightson]]></Iterative_usenlweights><Iterative_gcrodr><![CDATA[gcrodron]]></Iterative_gcrodr><Iterative_eigk><![CDATA[eigk25]]></Iterative_eigk><Iterative_keepy><![CDATA[keepyauto]]></Iterative_keepy><Iterative_gcrodrrel><![CDATA[gcrodrreloff]]></Iterative_gcrodrrel><Iterative_maxlinit><![CDATA[maxlinit10000]]></Iterative_maxlinit><Iterative_iterm><![CDATA[itermtol]]></Iterative_iterm><Iterative_iter><![CDATA[iter2]]></Iterative_iter><Iterative_rhob><![CDATA[rhob400.0]]></Iterative_rhob><Iterative_errorchk><![CDATA[errorchkauto]]></Iterative_errorchk><Iterative_maxilinit><![CDATA[maxilinit100]]></Iterative_maxilinit><Iterative_SUBFEATURES><IncompleteLU><![CDATA[[notactive]]]></IncompleteLU><Jacobi><Jacobi_VALID><![CDATA[true]]></Jacobi_VALID><Jacobi_UNIT><![CDATA[[]]]></Jacobi_UNIT><Jacobi_iterm><![CDATA[itermiter]]></Jacobi_iterm><Jacobi_iter><![CDATA[iter2]]></Jacobi_iter><Jacobi_relax><![CDATA[relax1.0]]></Jacobi_relax><Jacobi_prefun><![CDATA[prefunjac]]></Jacobi_prefun><Jacobi_rhob><![CDATA[rhob1.0]]></Jacobi_rhob><Jacobi_hybridization><![CDATA[hybridizationsingle]]></Jacobi_hybridization><Jacobi_SUBFEATURES></Jacobi_SUBFEATURES><Jacobi_EDITED>false</Jacobi_EDITED></Jacobi></Iterative_SUBFEATURES><Iterative_EDITED>false</Iterative_EDITED></Iterative></Time_SUBFEATURES><Time_EDITED>false</Time_EDITED></Time> BUILT true 2 3 107,'p:tlist_vector_method','p:tlist_vector_start','p:tlist_vector_stop','p:tlist_vector_step','p:tlist_vector_numvalues','p:tlist_vector_function','p:tlist_vector_interval','p:tlist_vector_freqperdec','p:tout','p:tstepsstore','p:atolglobalmethod','p:atolglobalvaluemethod','p:atolglobalfactor','p:tderglobalmethod','p:tderglobalfactor','p:atolglobal','p:ewtrescale','p:atolmethodAUX','p:atolvaluemethodAUX','p:atolfactorAUX','p:tdermethodAUX','p:tderfactorAUX','p:atolAUX','p:atoludotAUX','p:tstepsbdf','p:endtimeinterpolation','p:initialstepbdf','p:initialstepbdfactive','p:maxstepconstraintbdf','p:maxstepbdf','p:maxstepexpressionbdf','p:maxorder','p:minorder','p:bdforder','p:initialstepfractionbdf-1','p:initialstepgrowthratebdf-1','p:initialstepfractionbdf-2','p:initialstepgrowthratebdf-2','p:initialstepfractionbdf-3','p:initialstepgrowthratebdf-3','p:initialstepfractionbdf-4','p:initialstepgrowthratebdf-4','p:initialstepfractionbdf-5','p:initialstepgrowthratebdf-5','p:timestepbdf','p:eventtol','p:stabcntrl','p:masssingular','p:consistent','p:bwinitstepfrac','p:rkmethod','p:tstepsrk34','p:initialsteprk34','p:initialsteprk34active','p:timesteprk34','p:tstepsck5','p:initialstepck5','p:initialstepck5active','p:timestepck5','p:tstepsdopri5','p:initialstepdopri5','p:initialstepdopri5active','p:dopripicontrol','p:maxstepconstraintdopri5','p:maxstepdopri5','p:maxstepexpressiondopri5','p:doprigrowmin','p:doprigrowmax','p:doprisafe','p:timestepdopri5','p:rkstiffcheck','p:initialstepgenalpha','p:initialstepgenalphaactive','p:maxstepconstraintgenalpha','p:maxstepgenalpha','p:maxstepexpressiongenalpha','p:incrdelay','p:incrdelayactive','p:rhoinf','p:predictor','p:timestepgenalpha','p:rescaleafterinitbw','p:plot','p:plotfreq','p:probesel','p:probefreq','p:reacf','p:lumpedflux','p:storeudot','p:eventout','p:complex','p:cosimstoressol','p:cosim','p:cosiminput','p:cosimoutput','p:cosimconsistent','p:uselsqtimedata','p:tlistlsq','p:excludelsqtimes','p:lsqtimesout','p:clistctrl','p:cname','p:clist','p:keeplog','p:const','p:changedproperties','p:lastchangedproperty' DISABLED BUILT null 34,'p:linsolver','p:mumpsalloc','p:mumpsreorder','p:mumpsrreorder','p:reusereorder','p:pivotenable','p:thresh','p:pivotperturb','p:mumpsblr','p:mumpsblrtol','p:mumpsblrtype','p:ooc','p:memfracooc','p:incore','p:minicmemory','p:usetotmemory','p:internalmemusage','p:oocmemory','p:pardreorder','p:pardschedule','p:pardrreorder','p:pivotstrategy','p:pardmtsolve','p:clusterpardiso','p:preorder','p:pivotrefines','p:errorchk','p:rhob','p:iterrefine','p:maxrefinesteps','p:errorratiobound','p:nliniterrefine','p:changedproperties','p:lastchangedproperty' NOREMOVE|NODEACTIVATE BUILT 0 0 null 26,'p:symmetric','p:matrixformat','p:rowscale','p:nullfun','p:orthonormallimit','p:storeresidual','p:convinfo','p:logsampling','p:blocksize','p:blocksizeactive','p:assemloc','p:cachepattern','p:complexfun','p:matherr','p:checkmatherr','p:assemtol','p:keep','p:L','p:K','p:D','p:E','p:M','p:N','p:optthread','p:changedproperties','p:lastchangedproperty' BUILT 1 0 null null null null null null null null null null null null null null null null null null null null null null null null null null 23,'p:initstep','p:minstep','p:rstep','p:rstepabs','p:useminsteprecovery','p:minsteprecovery','p:ntermauto','p:niter','p:reserrfact','p:damp','p:ratelimit','p:ratelimitactive','p:jtech','p:ntermconst','p:stabacc','p:aaccdim','p:aaccmix','p:aaccdelay','p:initsteph','p:minsteph','p:plot','p:changedproperties','p:lastchangedproperty' NOREMOVE|NODEACTIVATE BUILT 2 1 20,'p:linsolver','p:itrestart','p:prefuntype','p:irestol','p:nlinnormuse','p:nlinnormlevel','p:usenlweights','p:gcrodr','p:eigk','p:keepy','p:gcrodrrel','p:eigkrel','p:maxlinit','p:iterm','p:iter','p:rhob','p:errorchk','p:maxilinit','p:changedproperties','p:lastchangedproperty' DISABLED null null 17,'p:prefun','p:droptype','p:droptol','p:fillratio','p:respectpattern','p:thresh','p:iterm','p:relax','p:ilutdroptol','p:ilutfillratio','p:preorder','p:rhob','p:hybridization','p:hybridvarspec','p:matrixformat','p:changedproperties','p:lastchangedproperty' EDITED 0 0 null null 9,'p:iterm','p:relax','p:prefun','p:rhob','p:hybridization','p:hybridvarspec','p:matrixformat','p:changedproperties','p:lastchangedproperty' NOREMOVE|NODEACTIVATE 9,'p:hasbeenevaluated','p:phaseshift','p:scalingfactor','p:showgeom','p:frametype','p:phase','p:scalefactor','p:probetag','p:evalcount' 6,'p:showgeom','p:frametype','p:phaseshift','p:phase','p:scalingfactor','p:scalefactor' true[]animboundingboxdataray1nonesolrepresentationsolutioninfoshowlooplevelon|off|off|looplevel111|showinterpoff|off|off|interp1.1|applyselectiontodatasetedgesoffsavedatainmodelofftitlenumberformatkey6viewautoautoshowhiddenobjectsoffinherithideoffedgesonframetypematerialGEOMgeom1true[]dataparentparentshowsolutionparamsoffsolrepresentationsolutioninfoshowloopleveloff|off|off|looplevelshowinterpoff|off|off|interplinetypelineinterpolationnoneshowcoloroffpointtypenoneusefixedpointsizeoffpointlineanimofflinetactiveoffextrastepsspecifiedtimesnumextrasteps100inheritplotnonenoneinheritarrowscaleoninheritcoloroninheritrangeoninheritdeformscaleoninheritspherescaleoninherittailscaleoninherittubescaleontrue[]unitdim0unittrans1exprgop.IunitW/m^2evalmethodactiveofftrue[]typeallevaluateall BUILT 122,'p:progressactive','p:renderinfo','p:ispendingzoom','p:isforexport','p:colortheme','p:isforreport','p:preventautozoomextents','p:needsstylerepaint','p:stylerepaintinprogress','p:defaultaxisunits','p:animating','p:playing','p:animboundingbox','p:legendactivechanged','p:solrepresentation','p:oldouteranalysistype','p:outertype','p:outersolnum','p:timeinterp','p:showinterp','p:solutiontouchtype','p:applyselectiontodatasetedges','p:savedatainmodel','p:titlenumberformatkey','p:titletype','p:titlecolor','p:customtitlecolor','p:titlenumberformat','p:titletrailingzeros','p:titleprecision','p:titleintegerdigits','p:titledecimals','p:titlealwayssign','p:titlealwaysimaginary','p:titleexponentdigits','p:titlealwayssignexp','p:datasetintitle','p:phaseintitle','p:solutionintitle','p:filenameintitle','p:dateintitle','p:timeintitle','p:prefixintitle','p:suffixintitle','p:typeintitle','p:descriptionintitle','p:expressionintitle','p:unitintitle','p:titleparamindicator','p:help1','p:help2','p:help3','p:temptitleexpr','p:temptitleunit','p:forceviewupdate','p:ignoreview','p:xlabel','p:xlabelactive','p:ylabel','p:ylabelactive','p:showhiddenobjects','p:inherithide','p:dataisaxisym','p:symmetryaxis','p:edges','p:edgecolor','p:customedgecolor','p:frametype','p:renderdatacached','p:inputmode','p:cutmode','p:planedepth','p:lastinputmode','p:linefirst','p:linesecond','p:lineisinit','p:planefirst','p:planesecond','p:planeisinit','p:cutlineds','p:cutlinedshash','p:cutplaneds','p:cutplanedshash','p:cutlinepg','p:cutlinepgds','p:cutplanepg','p:cutplanepgds','p:cutlineplot','p:cutplaneplot','p:showlegends','p:showlegendsmaxmin','p:showlegendsunit','p:legendpos','p:legendcolor','p:customlegendcolor','p:legendactive','p:legendnotation','p:legendcommonexp','p:legendtrailingzeros','p:legendupdate','p:axisactive','p:axisnotation','p:axiscommonexp','p:axistrailingzeros','p:axisupdate','p:plotarrayenable','p:arrayshape','p:arrayaxis','p:paddinglinear','p:relpadding','p:padding','p:order','p:paddingsquare','p:relrowpadding','p:relcolumnpadding','p:rowpadding','p:columnpadding','p:window','p:showwindowtitle','p:windowtitle','p:windowtitleactive','p:allowtableupdate' true[]dataparentparentshowsolutionparamsoffsolrepresentationsolutioninfoshowloopleveloff|off|off|looplevelshowinterpoff|off|off|interplinetypelineinterpolationnoneshowcoloroffpointtypenoneusefixedpointsizeoffpointlineanimofflinetactiveoffextrastepsspecifiedtimesnumextrasteps100inheritplotnonenoneinheritarrowscaleoninheritcoloroninheritrangeoninheritdeformscaleoninheritspherescaleoninherittailscaleoninherittubescaleontrue[]unitdim0unittrans1exprgop.IunitW/m^2evalmethodactiveofftrue[]typeallevaluatealltrue[]animboundingboxdataray1nonesolrepresentationsolutioninfoshowlooplevelon|off|off|looplevel111|showinterpoff|off|off|interp1.1|applyselectiontodatasetedgesoffsavedatainmodelofftitlenumberformatkey6viewautoautoshowhiddenobjectsoffinherithideoffedgesonframetypematerialGEOMgeom1 BUILT 79,'p:progressactive','p:isanim','p:isanimfirst','p:iscachedirty','p:readytoplot','p:legendactivechanged','p:showsolutionparams','p:solutionparams','p:solrepresentation','p:oldouteranalysistype','p:outertype','p:outersolnum','p:timeinterp','p:t','p:showlooplevel','p:looplevel','p:showinterp','p:interp','p:solutiontouchtype','p:titletype','p:title','p:truetuberadiusscale','p:linetype','p:interpolation','p:interpcount','p:linecolor','p:customlinecolor','p:radiusexpr','p:radiusunit','p:tuberadiusscale','p:tuberadiusscaleactive','p:pointtype','p:pointradiusexpr','p:pointradiusunit','p:sphereradiusscale','p:sphereradiusscaleactive','p:fixedpointsize','p:pointcolor','p:custompointcolor','p:tailscale','p:tailscaleactive','p:arrowtype','p:arrowlength','p:logrange','p:arrowbase','p:arrowscaleactive','p:truearrowscale','p:arrowscalebounds','p:truesphereradiusscale','p:usefixedpointsize','p:storedsphereradiusscaleactive','p:storedsphereradiusscale','p:truetailscale','p:pointlineanim','p:linet','p:linetactive','p:istimeanim','p:animframet','p:animcaller','p:animcallercache','p:tailscalebounds','p:extrasteps','p:numextrasteps','p:propextrasteps','p:inheritarrowscale','p:inheritcolor','p:inheritrange','p:inheritdeformscale','p:inheritspherescale','p:inherittailscale','p:inherittubescale','p:belongstoplotarray','p:manualindexing','p:arraydim','p:arrayindex','p:rowindex','p:colindex','p:applytodatasetedgesplotarr','p:plotarraysuccessful' true[]unitdim0unittrans1exprgop.IunitW/m^2evalmethodactiveofftrue[]dataparentparentshowsolutionparamsoffsolrepresentationsolutioninfoshowloopleveloff|off|off|looplevelshowinterpoff|off|off|interplinetypelineinterpolationnoneshowcoloroffpointtypenoneusefixedpointsizeoffpointlineanimofflinetactiveoffextrastepsspecifiedtimesnumextrasteps100inheritplotnonenoneinheritarrowscaleoninheritcoloroninheritrangeoninheritdeformscaleoninheritspherescaleoninherittailscaleoninherittubescaleontrue[]animboundingboxdataray1nonesolrepresentationsolutioninfoshowlooplevelon|off|off|looplevel111|showinterpoff|off|off|interp1.1|applyselectiontodatasetedgesoffsavedatainmodelofftitlenumberformatkey6viewautoautoshowhiddenobjectsoffinherithideoffedgesonframetypematerialGEOMgeom1 BUILT 34,'p:legendactivechanged','p:unitdim','p:unittrans','p:descractive','p:evalmethodactive','p:evalmethod','p:differential','p:titletype','p:prefixintitle','p:suffixintitle','p:typeintitle','p:descriptionintitle','p:expressionintitle','p:unitintitle','p:title','p:rangecoloractive','p:rangedataactive','p:rangeisshared','p:isuniformshown','p:isgradientshown','p:isuniform','p:isgradient','p:showcolor','p:coloring','p:colorlegend','p:legendunit','p:colortabletrans','p:nonlinearcolortablerev','p:colorcalibration','p:colorscalemode','p:topcolor','p:customtopcolor','p:bottomcolor','p:custombottomcolor' true[]typeallevaluatealltrue[]dataparentparentshowsolutionparamsoffsolrepresentationsolutioninfoshowloopleveloff|off|off|looplevelshowinterpoff|off|off|interplinetypelineinterpolationnoneshowcoloroffpointtypenoneusefixedpointsizeoffpointlineanimofflinetactiveoffextrastepsspecifiedtimesnumextrasteps100inheritplotnonenoneinheritarrowscaleoninheritcoloroninheritrangeoninheritdeformscaleoninheritspherescaleoninherittailscaleoninherittubescaleontrue[]animboundingboxdataray1nonesolrepresentationsolutioninfoshowlooplevelon|off|off|looplevel111|showinterpoff|off|off|interp1.1|applyselectiontodatasetedgesoffsavedatainmodelofftitlenumberformatkey6viewautoautoshowhiddenobjectsoffinherithideoffedgesonframetypematerialGEOMgeom1 BUILT 6,'p:legendactivechanged','p:type','p:logicalexpr','p:evaluate','p:fraction','p:number' true[]dataray1nonesolrepresentationsolutioninfoshowlooplevelinputon|off|off|looplevelinputlast|showloopleveloff|off|off|looplevel1|2|3|4|5|6|7|8|9|a|b|c|d|e|f|g|h|i|j|k|l|m|n|o|p|q|r|s|t|u|v|w|x|y|z|10|11|12|13|14|15|16|17|18|19|1a|1b|1c|1d|1e|1f|1g|1h|1i|1j|1k|1l|1m|1n|1o|1p|1q|1r|1s|1t|1u|1v|1w|1x|1y|1z|20|21|22|23|24|25|26|27|28|29|2a|2b|2c|2d|2e|2f|2g|2h|2i|2j|2k|2l|2m|2n|2o|2p|2q|2r|2s|2t|2u|2v|2w|2x|2y|2z|30|31|32|33|showlooplevelindicesoff|off|off|looplevelindicesshowinterpoff|off|off|interpsavedatainmodelofftitlenumberformatkey6showsecylabelofftwoyaxesoffswitchxyoffshowplotonsecyaxisoffaxislimitsoffpreserveaspectoffshowsecylogoffshowsecyextraofftrue[]dataparentparentshowsolutionparamsoffsolrepresentationsolutioninfoshowlooplevelinputoff|off|off|looplevelinputshowloopleveloff|off|off|looplevelshowlooplevelindicesoff|off|off|looplevelindicesshowinterpoff|off|off|interpunitdim0unittrans1expr100*(gop.relg1.Q0-gop.Q)/gop.relg1.Q0unit1evalmethodactiveoffconstactiveoffconstprefixes|xdataexprxdataexprgop.lambda0xdataunitnmxdataevalmethodactiveoffparticlesperoutersolnum0|dataseriessum BUILT 186,'p:progressactive','p:renderinfo','p:ispendingzoom','p:isforexport','p:colortheme','p:isforreport','p:preventautozoomextents','p:needsstylerepaint','p:stylerepaintinprogress','p:defaultaxisunits','p:animating','p:playing','p:legendactivechanged','p:probetag','p:probehasbeenplotted','p:solrepresentation','p:oldouteranalysistype','p:outertype','p:outerinput','p:outersolnum','p:outersolnumindices','p:outersolnumindices_vector_method','p:outersolnumindices_vector_start','p:outersolnumindices_vector_stop','p:outersolnumindices_vector_step','p:outersolnumindices_vector_numvalues','p:outersolnumindices_vector_function','p:outersolnumindices_vector_interval','p:outersolnumindices_vector_freqperdec','p:solnumindices','p:solnumindices_vector_method','p:solnumindices_vector_start','p:solnumindices_vector_stop','p:solnumindices_vector_step','p:solnumindices_vector_numvalues','p:solnumindices_vector_function','p:solnumindices_vector_interval','p:solnumindices_vector_freqperdec','p:t_vector_method','p:t_vector_start','p:t_vector_stop','p:t_vector_step','p:t_vector_numvalues','p:t_vector_function','p:t_vector_interval','p:t_vector_freqperdec','p:showlooplevel','p:showlooplevelindices','p:looplevelindices_vector_method','p:looplevelindices_vector_start','p:looplevelindices_vector_stop','p:looplevelindices_vector_step','p:looplevelindices_vector_numvalues','p:looplevelindices_vector_function','p:looplevelindices_vector_interval','p:looplevelindices_vector_freqperdec','p:showinterp','p:interp_vector_method','p:interp_vector_start','p:interp_vector_stop','p:interp_vector_step','p:interp_vector_numvalues','p:interp_vector_function','p:interp_vector_interval','p:interp_vector_freqperdec','p:solutiontouchtype','p:isnew','p:savedatainmodel','p:titlenumberformatkey','p:titlecolor','p:customtitlecolor','p:titlenumberformat','p:titletrailingzeros','p:titleprecision','p:titleintegerdigits','p:titledecimals','p:titlealwayssign','p:titlealwaysimaginary','p:titleexponentdigits','p:titlealwayssignexp','p:datasetintitle','p:phaseintitle','p:filenameintitle','p:dateintitle','p:timeintitle','p:prefixintitle','p:suffixintitle','p:typeintitle','p:descriptionintitle','p:expressionintitle','p:unitintitle','p:titleparamindicator','p:paramindicator','p:help1','p:help2','p:help3','p:temptitleexpr','p:temptitleunit','p:evaluatedparamindicator','p:showsecylabel','p:yseclabel','p:yseclabelactive','p:twoyaxes','p:switchxy','p:showplotonsecyaxis','p:renderdatacached','p:inputmode','p:cutmode','p:planedepth','p:lastinputmode','p:linefirst','p:linesecond','p:lineisinit','p:planefirst','p:planesecond','p:planeisinit','p:cutlineds','p:cutlinedshash','p:cutplaneds','p:cutplanedshash','p:cutlinepg','p:cutlinepgds','p:cutplanepg','p:cutplanepgds','p:cutlineplot','p:cutplaneplot','p:axislimits','p:showsecaxislimit','p:preserveaspect','p:xlog','p:ylog','p:showsecylog','p:ylogsec','p:showgrid','p:showmanualgrid','p:manualgrid','p:showxspacing','p:xspacing','p:showyspacing','p:yspacing','p:showsecyspacing','p:ysecspacing','p:xextra','p:xextra_vector_method','p:xextra_vector_start','p:xextra_vector_stop','p:xextra_vector_step','p:xextra_vector_numvalues','p:xextra_vector_function','p:xextra_vector_interval','p:xextra_vector_freqperdec','p:yextra','p:yextra_vector_method','p:yextra_vector_start','p:yextra_vector_stop','p:yextra_vector_step','p:yextra_vector_numvalues','p:yextra_vector_function','p:yextra_vector_interval','p:yextra_vector_freqperdec','p:showsecyextra','p:ysecextra','p:ysecextra_vector_method','p:ysecextra_vector_start','p:ysecextra_vector_stop','p:ysecextra_vector_step','p:ysecextra_vector_numvalues','p:ysecextra_vector_function','p:ysecextra_vector_interval','p:ysecextra_vector_freqperdec','p:showlegends','p:showlegendsmaxmin','p:legendpos','p:legendposx','p:legendposy','p:showlegendsactive','p:axisactive','p:axisnotation','p:axiscommonexp','p:axistrailingzeros','p:axisupdate','p:window','p:showwindowtitle','p:windowtitle','p:windowtitleactive','p:allowtableupdate' true[]dataparentparentshowsolutionparamsoffsolrepresentationsolutioninfoshowlooplevelinputoff|off|off|looplevelinputshowloopleveloff|off|off|looplevelshowlooplevelindicesoff|off|off|looplevelindicesshowinterpoff|off|off|interpunitdim0unittrans1expr100*(gop.relg1.Q0-gop.Q)/gop.relg1.Q0unit1evalmethodactiveoffconstactiveoffconstprefixes|xdataexprxdataexprgop.lambda0xdataunitnmxdataevalmethodactiveoffparticlesperoutersolnum0|dataseriessumtrue[]dataray1nonesolrepresentationsolutioninfoshowlooplevelinputon|off|off|looplevelinputlast|showloopleveloff|off|off|looplevel1|2|3|4|5|6|7|8|9|a|b|c|d|e|f|g|h|i|j|k|l|m|n|o|p|q|r|s|t|u|v|w|x|y|z|10|11|12|13|14|15|16|17|18|19|1a|1b|1c|1d|1e|1f|1g|1h|1i|1j|1k|1l|1m|1n|1o|1p|1q|1r|1s|1t|1u|1v|1w|1x|1y|1z|20|21|22|23|24|25|26|27|28|29|2a|2b|2c|2d|2e|2f|2g|2h|2i|2j|2k|2l|2m|2n|2o|2p|2q|2r|2s|2t|2u|2v|2w|2x|2y|2z|30|31|32|33|showlooplevelindicesoff|off|off|looplevelindicesshowinterpoff|off|off|interpsavedatainmodelofftitlenumberformatkey6showsecylabelofftwoyaxesoffswitchxyoffshowplotonsecyaxisoffaxislimitsoffpreserveaspectoffshowsecylogoffshowsecyextraoff BUILT 122,'p:progressactive','p:isanim','p:isanimfirst','p:iscachedirty','p:readytoplot','p:legendactivechanged','p:showsolutionparams','p:solutionparams','p:solrepresentation','p:oldanalysistype','p:oldouteranalysistype','p:outertype','p:outerinput','p:outersolnum','p:outersolnumindices','p:outersolnumindices_vector_method','p:outersolnumindices_vector_start','p:outersolnumindices_vector_stop','p:outersolnumindices_vector_step','p:outersolnumindices_vector_numvalues','p:outersolnumindices_vector_function','p:outersolnumindices_vector_interval','p:outersolnumindices_vector_freqperdec','p:solvertype','p:innerinput','p:solnumindices','p:solnumindices_vector_method','p:solnumindices_vector_start','p:solnumindices_vector_stop','p:solnumindices_vector_step','p:solnumindices_vector_numvalues','p:solnumindices_vector_function','p:solnumindices_vector_interval','p:solnumindices_vector_freqperdec','p:t_vector_method','p:t_vector_start','p:t_vector_stop','p:t_vector_step','p:t_vector_numvalues','p:t_vector_function','p:t_vector_interval','p:t_vector_freqperdec','p:showlooplevelinput','p:looplevelinput','p:showlooplevel','p:looplevel','p:showlooplevelindices','p:looplevelindices','p:looplevelindices_vector_method','p:looplevelindices_vector_start','p:looplevelindices_vector_stop','p:looplevelindices_vector_step','p:looplevelindices_vector_numvalues','p:looplevelindices_vector_function','p:looplevelindices_vector_interval','p:looplevelindices_vector_freqperdec','p:showinterp','p:interp','p:interp_vector_method','p:interp_vector_start','p:interp_vector_stop','p:interp_vector_step','p:interp_vector_numvalues','p:interp_vector_function','p:interp_vector_interval','p:interp_vector_freqperdec','p:solutiontouchtype','p:plotonsecyaxis','p:unitdim','p:unittrans','p:descractive','p:evalmethodactive','p:evalmethod','p:differential','p:constactive','p:const','p:constUnit','p:constprefixes','p:titletype','p:prefixintitle','p:suffixintitle','p:typeintitle','p:descriptionintitle','p:expressionintitle','p:unitintitle','p:title','p:hasmultilevel','p:xdatadescractive','p:xdataevalmethodactive','p:xdataevalmethod','p:xdatadifferential','p:showlinestyle','p:linestyle','p:showcolor','p:linecolor','p:customlinecolor','p:showwidth','p:linewidth','p:showmarker','p:linemarker','p:markerpos','p:markers','p:cyclecolors','p:renderindices','p:touchlinestyle','p:touchlinecolor','p:touchlinemarker','p:autosolution','p:autodescr','p:autoexpr','p:autounit','p:legendprefix','p:legendsuffix','p:legendallowexprshelp','p:legendexprprecision','p:legendpattern','p:legendtempexpr','p:legendtempunit','p:legendprefixeval','p:legendsuffixeval','p:legendeval','p:dataseries' 3 t(s("/component")) m(s("create")) s("comp1") b(true) t(s("/component/comp1/geom")) m(s("create")) s("geom1") i(2) t(s("/component/comp1/mesh")) m(s("create")) s("mesh1") g(s("geom1")) t(s("/component/comp1/physics")) m(s("create")) s("gop") s("GeometricalOptics") s("geom1") t(s("/study")) m(s("create")) s("std1") t(s("/study/std1")) m(s("create")) s("rtrac") s("RayTracing") t(s("/study/std1/feature/rtrac")) m(s("setSolveFor")) s("/physics/gop") b(true) t(s("/param")) m(s("set")) s("n_air") s("1") t(s("/param")) m(s("descr")) s("n_air") s("Refractive index of air") t(s("/param")) m(s("set")) s("n_glass") s("1.5") t(s("/param")) m(s("descr")) s("n_glass") s("Refractive index of glass") t(s("/param")) m(s("set")) s("n_Ag") s("0.13511") t(s("/param")) m(s("descr")) s("n_Ag") s("Refractive index of silver (?)") t(s("/param")) m(s("set")) s("lam0") s("550[nm]") t(s("/param")) m(s("descr")) s("lam0") s("Vacuum wavelength") t(s("/component/comp1/geom/geom1")) m(s("create")) s("sq1") s("Square") t(s("/component/comp1/geom/geom1/feature/sq1")) m(s("setIndex")) s("layer") d(0.5) i(0) t(s("/component/comp1/geom/geom1")) m(s("runPre")) s("fin") t(s("/component/comp1/geom/geom1")) m(s("run")) t(s("/component/comp1/material")) m(s("create")) s("mat1") s("Common") t(s("/component/comp1/material/mat1/materialmodel")) m(s("create")) s("RefractiveIndex") s("Refractive_index") t(s("/component/comp1/material/mat1/materialmodel/RefractiveIndex")) m(s("set")) s("n") sa(s("n_air")) t(s("/component/comp1/material")) m(s("create")) s("mat2") s("Common") t(s("/component/comp1/material/mat2/selection[geom1]")) m(s("set")) va() ia(1) t(s("/component/comp1/material/mat2/materialmodel")) m(s("create")) s("RefractiveIndex") s("Refractive_index") t(s("/component/comp1/material/mat2/materialmodel/RefractiveIndex")) m(s("set")) s("n") sa(s("n_glass")) t(s("/component/comp1/material/mat2")) m(s("label")) s("Glass") t(s("/component/comp1/material/mat1")) m(s("label")) s("Air") t(s("/component/comp1/geom/geom1")) m(s("runPre")) s("fin") t(s("/component/comp1/geom/geom1/feature/sq1")) m(s("setIndex")) s("layer") d(0.25) i(1) t(s("/component/comp1/geom/geom1")) m(s("runPre")) s("fin") t(s("/component/comp1/geom/geom1/feature/sq1")) m(s("setIndex")) s("layer") s("5[mm]") i(0) t(s("/component/comp1/geom/geom1/feature/sq1")) m(s("setIndex")) s("layer") s("1[mm]") i(1) t(s("/component/comp1/geom/geom1")) m(s("runPre")) s("fin") t(s("/component/comp1/geom/geom1/feature/sq1")) m(s("setIndex")) s("layer") s("5[mm]") i(1) t(s("/component/comp1/geom/geom1")) m(s("runPre")) s("fin") t(s("/component/comp1/geom/geom1")) m(s("run")) t(s("/component/comp1/material")) m(s("remove")) s("mat2") t(s("/component/comp1/material")) m(s("remove")) s("mat1") t(s("/component/comp1/material")) m(s("create")) s("mat1") s("Common") t(s("/component/comp1/material/mat1")) m(s("label")) s("Glass") t(s("/component/comp1/material/mat1/materialmodel")) m(s("create")) s("RefractiveIndex") s("Refractive_index") t(s("/component/comp1/material/mat1/materialmodel/RefractiveIndex")) m(s("set")) s("n") sa(s("n_glass")) t(s("/component/comp1/material")) m(s("create")) s("mat2") s("Common") t(s("/component/comp1/material/mat2")) m(s("label")) s("Silver") t(s("/component/comp1/material/mat2/selection[geom1]")) m(s("set")) va() ia(2) t(s("/component/comp1/material/mat2/materialmodel")) m(s("create")) s("RefractiveIndex") s("Refractive_index") t(s("/component/comp1/material/mat2/materialmodel/RefractiveIndex")) m(s("set")nU) s("n") sa(s("n_Ag")) t(s("/component/comp1/material/mat1/selection[geom1]")) m(s("set")) va() ia(1,2) t(s("/component/comp1/material")) m(s("create")) s("mat3") s("Common") t(s("/component/comp1/material/mat3/selection[geom1]")) m(s("set")) va() ia(3) t(s("/component/comp1/material/mat3")) m(s("label")) s("Air") t(s("/component/comp1/material/mat3/materialmodel")) m(s("create")) s("RefractiveIndex") s("Refractive_index") t(s("/component/comp1/material/mat3/materialmodel/RefractiveIndex")) m(s("set")) s("n") sa(s("n_air")) t(s("/component/comp1/physics/gop/prop/IntensityComputation")) m(s("setIndex")) s("IntensityComputation") s("ComputeIntensityAndPower") i(0) t(s("/component/comp1/physics/gop/prop/WavelengthDistribution")) m(s("setIndex")) s("WavelengthDistribution") s("PolychromaticWavelength") i(0) t(s("/component/comp1/physics/gop/prop/MaximumSecondary")) m(s("setIndex")) s("MaximumSecondary") i(0) i(0) t(s("/component/comp1/physics/gop/feature/matd1")) m(s("set")) s("ShowBoundaryNormal") b(true) t(s("/component/comp1/physics/gop/feature/matd1")) m(s("set")) s("ThinDielectricFilmsOnBoundary") s("AddLayersToSurface") t(s("/component/comp1/physics/gop/feature/matd1")) m(s("set")) s("ThinDielectricFilmsOnBoundary") s("NoneLayer") t(s("/component/comp1/physics/gop/feature/matd1")) m(s("set")) s("ThinDielectricFilmsOnBoundary") s("AddLayersToSurface") t(s("/component/comp1/physics/gop/feature/matd1")) m(s("set")) s("ReleaseReflectedRays") s("Never") t(s("/component/comp1/physics/gop")) m(s("create")) s("relg1") s("ReleaseGrid") i(-1) t(s("/component/comp1/physics/gop/feature/relg1")) m(s("setIndex")) s("x0") d(0.5) i(0) t(s("/component/comp1/physics/gop/feature/relg1")) m(s("setIndex")) s("x0") i(1) i(1) t(s("/component/comp1/physics/gop/feature/relg1")) m(s("set")) s("L0") ia(0,1,0) t(s("/component/comp1/physics/gop/feature/relg1")) m(s("set")) s("L0") ia(0,-1,0) t(s("/component/comp1/physics/gop/feature/relg1")) m(s("set")) s("LDistributionFunction") s("ListOfValues") t(s("/component/comp1/physics/gop/feature/relg1")) m(s("setIndex")) s("lambda0vals") s("range(400[nm],(800[nm]-(400[nm]))/99,800[nm])") i(0) t(s("/study/std1/feature/rtrac")) m(s("set")) s("tlist") s("range(0,0.01,1.1)") t(s("/sol")) m(s("create")) s("sol1") t(s("/sol/sol1")) m(s("study")) s("std1") t(s("/study/std1/feature/rtrac")) m(s("set")) s("notlistsolnum") i(1) t(s("/study/std1/feature/rtrac")) m(s("set")) s("notsolnum") s("auto") t(s("/study/std1/feature/rtrac")) m(s("set")) s("listsolnum") i(1) t(s("/study/std1/feature/rtrac")) m(s("set")) s("solnum") s("auto") t(s("/sol/sol1")) m(s("create")) s("st1") s("StudyStep") t(s("/sol/sol1/feature/st1")) m(s("set")) s("study") s("std1") t(s("/sol/sol1/feature/st1")) m(s("set")) s("studystep") s("rtrac") t(s("/sol/sol1")) m(s("create")) s("v1") s("Variables") t(s("/sol/sol1/feature/v1")) m(s("set")) s("control") s("rtrac") t(s("/sol/sol1")) m(s("create")) s("t1") s("Time") t(s("/sol/sol1/feature/t1")) m(s("set")) s("tlist") s("range(0,0.01,1.1)") t(s("/sol/sol1/feature/t1")) m(s("set")) s("plot") s("off") t(s("/sol/sol1/feature/t1")) m(s("set")) s("plotgroup") s("Default") t(s("/sol/sol1/feature/t1")) m(s("set")) s("plotfreq") s("tout") t(s("/sol/sol1/feature/t1")) m(s("set")) s("probesel") s("all") t(s("/sol/sol1/feature/t1")) m(s("set")) s("probes") sa() t(s("/sol/sol1/feature/t1")) m(s("set")) s("probefreq") s("tsteps") t(s("/sol/sol1/feature/t1")) m(s("set")) s("rtol") d(1.0E-5) t(s("/sol/sol1/feature/t1")) m(s("set")) s("atolglobalvaluemethod") s("factor") t(s("/sol/sol1/feature/t1")) m(s("set")) s("tstepsgenalpha") s("strict") t(s("/sol/sol1/feature/t1")) m(s("set")) s("endtimeinterpolation") b(true) t(s("/sol/sol1/feature/t1")) m(s("set")) s("timemethod") s("genalpha") t(s("/sol/sol1/feature/t1")) m(s("set")) s("estrat") s("exclude") t(s("/sol/sol1/feature/t1")) m(s("set")) s("control") s("rtrac") t(s("/sol/sol1/feature/t1")) m(s("create")) s("fc1") s("FullyCoupled") t(s("/sol/sol1/feature/t1/feature/fc1")) m(s("set")) s("ntolfact") d(0.1) t(s("/sol/sol1/feature/t1")) m(s("create")) s("i1") s("Iterative") t(s("/sol/sol1/feature/t1/feature/i1")) m(s("set")) s("linsolver") s("gmres") t(s("/sol/sol1/feature/t1/feature/i1")) m(s("create")) s("ja1") s("Jacobi") t(s("/sol/sol1/feature/t1/feature/fc1")) m(s("set")) s("linsolver") s("i1") t(s("/sol/sol1/feature/t1/feature/fc1")) m(s("set")) s("ntolfact") d(0.1) t(s("/sol/sol1/feature/t1/feature")) m(s("remove")) s("fcDef") t(s("/sol/sol1")) m(s("attach")) s("std1") t(s("/result/dataset")) m(s("create")) s("ray1") s("Ray") t(s("/result/dataset/ray1")) m(s("set")) s("solution") s("sol1") t(s("/result/dataset/ray1")) m(s("set")) s("posdof") sa(s("comp1.qx"),s("comp1.qy")) t(s("/result/dataset/ray1")) m(s("set")) s("geom") s("geom1") t(s("/result/dataset/ray1")) m(s("set")) s("rgeom") s("pgeom_gop") t(s("/result/dataset/ray1")) m(s("set")) s("rgeomspec") s("fromphysics") t(s("/result/dataset/ray1")) m(s("set")) s("physicsinterface") s("gop") t(s("/result/feature")) m(s("create")) s("pg1") s("PlotGroup2D") t(s("/result/feature/pg1")) m(s("set")) s("data") s("dset1") t(s("/result/feature/pg1")) m(s("label")) s("Ray Trajectories (gop)") t(s("/result/feature/pg1")) m(s("set")) s("data") s("ray1") t(s("/result/feature/pg1")) m(s("create")) s("rtrj1") s("RayTrajectories") t(s("/result/feature/pg1/feature/rtrj1")) m(s("set")) s("linetype") s("line") t(s("/result/feature/pg1/feature/rtrj1")) m(s("create")) s("col1") s("Color") t(s("/result/feature/pg1/feature/rtrj1/feature/col1")) m(s("set")) s("expr") s("gop.I") t(s("/result/feature/pg1/feature/rtrj1")) m(s("create")) s("filt1") s("RayTrajectoriesFilter") t(s("/sol/sol1")) m(s("runAll")) t(s("/result/feature/pg1")) m(s("run")) t(s("/result/feature")) m(s("create")) s("pg2") s("PlotGroup1D") t(s("/result/feature/pg2")) m(s("run")) t(s("/result/feature/pg2")) m(s("label")) s("Reflectance (Glass + Ag)") t(s("/result/feature/pg2")) m(s("set")) s("data") s("ray1") t(s("/result/feature/pg2")) m(s("setIndex")) s("looplevelinput") s("last") i(0) t(s("/result/feature/pg2")) m(s("set")) s("titletype") s("manual") t(s("/result/feature/pg2")) m(s("set")) s("title") s("Reflectance for Glass and Ag") t(s("/result/feature/pg2")) m(s("set")) s("xlabelactive") b(true) t(s("/result/feature/pg2")) m(s("set")) s("xlabel") s("Vacuum Wavelength") t(s("/result/feature/pg2")) m(s("set")) s("ylabelactive") b(true) t(s("/result/feature/pg2")) m(s("set")) s("ylabel") s("Reflectance (%)") t(s("/result/feature/pg2")) m(s("create")) s("rtp1") s("Ray1D") t(s("/result/feature/pg2/feature/rtp1")) m(s("set")) s("expr") s("100*(gop.relg1.Q0-gop.Q)/gop.relg1.Q0") t(s("/result/feature/pg2/feature/rtp1")) m(s("set")) s("xdata") s("expr") t(s("/result/feature/pg2/feature/rtp1")) m(s("set")) s("xdataexpr") s("gop.lambda0") t(s("/result/feature/pg2/feature/rtp1")) m(s("set")) s("xdataunit") s("nm") t(s("/result/feature/pg2/feature/rtp1")) m(s("set")) s("legend") b(true) t(s("/result/feature/pg2/feature/rtp1")) m(s("set")) s("legendmethod") s("manual") t(s("/result/feature/pg2/feature/rtp1")) m(s("setIndex")) s("legends") s("Glass+Ag") i(0) t(s("/result/feature/pg2")) m(s("run")) t(s("/result/feature/pg2")) m(s("run")) NOREMOVE|NODEACTIVATE /geom/geom1 4,'p:frametype','p:reversenormal','p:mastercoordsystcomp','p:mastersystem' NOREMOVE|NODEACTIVATE 0 Expected_computation_time
Baidu
 Last_computation_time 1 s
Baidu
 std1/rtrac false 1 all 0 true off 4 2,'geom1','pgeom_gop' 1,'t' 111,'0 ns','0.01 ns','0.02 ns','0.03 ns','0.04 ns','0.05 ns','0.06 ns','0.07 ns','0.08 ns','0.09 ns','0.1 ns','0.11 ns','0.12 ns','0.13 ns','0.14 ns','0.15 ns','0.16 ns','0.17 ns','0.18 ns','0.19 ns','0.2 ns','0.21 ns','0.22 ns','0.23 ns','0.24 ns','0.25 ns','0.26 ns','0.27 ns','0.28 ns','0.29 ns','0.3 ns','0.31 ns','0.32 ns','0.33 ns','0.34 ns','0.35 ns','0.36 ns','0.37 ns','0.38 ns','0.39 ns','0.4 ns','0.41 ns','0.42 ns','0.43 ns','0.44 ns','0.45 ns','0.46 ns','0.47 ns','0.48 ns','0.49 ns','0.5 ns','0.51 ns','0.52 ns','0.53 ns','0.54 ns','0.55 ns','0.56 ns','0.57 ns','0.58 ns','0.59 ns','0.6 ns','0.61 ns','0.62 ns','0.63 ns','0.64 ns','0.65 ns','0.66 ns','0.67 ns','0.68 ns','0.69 ns','0.7 ns','0.71 ns','0.72 ns','0.73 ns','0.74 ns','0.75 ns','0.76 ns','0.77 ns','0.78 ns','0.79 ns','0.8 ns','0.81 ns','0.82 ns','0.83 ns','0.84 ns','0.85 ns','0.86 ns','0.87 ns','0.88 ns','0.89 ns','0.9 ns','0.91 ns','0.92 ns','0.93 ns','0.94 ns','0.95 ns','0.96 ns','0.97 ns','0.98 ns','0.99 ns','1 ns','1.01 ns','1.02 ns','1.03 ns','1.04 ns','1.05 ns','1.06 ns','1.07 ns','1.08 ns','1.09 ns','1.1 ns' TIME 0.0,1.0000000000000001E-11,2.0000000000000002E-11,3.0E-11,4.0000000000000004E-11,5.000000000000001E-11,6.0E-11,7.000000000000002E-11,8.000000000000001E-11,9.0E-11,1.0000000000000002E-10,1.1000000000000001E-10,1.2E-10,1.3000000000000002E-10,1.4000000000000003E-10,1.5E-10,1.6000000000000002E-10,1.7000000000000003E-10,1.8E-10,1.9000000000000002E-10,2.0000000000000003E-10,2.1E-10,2.2000000000000002E-10,2.3000000000000003E-10,2.4E-10,2.5E-10,2.6000000000000003E-10,2.7000000000000005E-10,2.8000000000000007E-10,2.9E-10,3.0E-10,3.1E-10,3.2000000000000003E-10,3.3000000000000005E-10,3.4000000000000007E-10,3.5000000000000003E-10,3.6E-10,3.7E-10,3.8000000000000003E-10,3.9000000000000005E-10,4.0000000000000007E-10,4.1000000000000003E-10,4.2E-10,4.3E-10,4.4000000000000003E-10,4.5000000000000005E-10,4.6000000000000007E-10,4.7E-10,4.8E-10,4.900000000000001E-10,5.0E-10,5.1E-10,5.200000000000001E-10,5.3E-10,5.400000000000001E-10,5.500000000000001E-10,5.600000000000001E-10,5.700000000000001E-10,5.8E-10,5.9E-10,6.0E-10,6.100000000000001E-10,6.2E-10,6.3E-10,6.400000000000001E-10,6.5E-10,6.600000000000001E-10,6.700000000000001E-10,6.800000000000001E-10,6.900000000000001E-10,7.000000000000001E-10,7.1E-10,7.2E-10,7.300000000000001E-10,7.4E-10,7.500000000000001E-10,7.600000000000001E-10,7.7E-10,7.800000000000001E-10,7.900000000000001E-10,8.000000000000001E-10,8.100000000000001E-10,8.200000000000001E-10,8.300000000000001E-10,8.4E-10,8.500000000000001E-10,8.6E-10,8.700000000000001E-10,8.800000000000001E-10,8.9E-10,9.000000000000001E-10,9.100000000000001E-10,9.200000000000001E-10,9.300000000000001E-10,9.4E-10,9.5E-10,9.6E-10,9.7E-10,9.800000000000001E-10,9.9E-10,1.0E-9,1.01E-9,1.02E-9,1.0300000000000002E-9,1.0400000000000001E-9,1.05E-9,1.06E-9,1.07E-9,1.0800000000000002E-9,1.0900000000000002E-9,1.1000000000000001E-9 0.0,0.0,0.0,0.0,0.0,0.0,0.0,0.0,0.0,0.0,0.0,0.0,0.0,0.0,0.0,0.0,0.0,0.0,0.0,0.0,0.0,0.0,0.0,0.0,0.0,0.0,0.0,0.0,0.0,0.0,0.0,0.0,0.0,0.0,0.0,0.0,0.0,0.0,0.0,0.0,0.0,0.0,0.0,0.0,0.0,0.0,0.0,0.0,0.0,0.0,0.0,0.0,0.0,0.0,0.0,0.0,0.0,0.0,0.0,0.0,0.0,0.0,0.0,0.0,0.0,0.0,0.0,0.0,0.0,0.0,0.0,0.0,0.0,0.0,0.0,0.0,0.0,0.0,0.0,0.0,0.0,0.0,0.0,0.0,0.0,0.0,0.0,0.0,0.0,0.0,0.0,0.0,0.0,0.0,0.0,0.0,0.0,0.0,0.0,0.0,0.0,0.0,0.0,0.0,0.0,0.0,0.0,0.0,0.0,0.0,0.0 Time 1 1,'ns' /geom/geom1 geom1 {0,1,2,3,4,5,6,7,8},{0,1,2,3,4,5,6,7,8,9,10},{0,1,2,3} NODEACTIVATE /savePointData/savepoint1/geom/geom1 2 true true 14,'p:showlabels','p:showDirections','p:showgrid','p:rendermesh','p:showunits','p:plotgroupunits','p:locked','p:istemporary','p:showselection','p:showmaterial','p:hidestatus','p:isnew','p:postviewkey','p:workplaneclip' /geom/pgeom_gop pgeom_gop PKq}EnnPK"nX model.xml0PK{PK"nXsavepoint1/savepoint.xml  PKJIIPK"nX mesh1.mphbinR0objMeshhg?hw?@۪։?迄 ?`$0,?b}?0&?M?ni? k@5H?pث?qTE?Xl ?uն?*hw?*hg?7۪։?迄 ?$0,?a$??PNf?:.?'8*?Hڔx?xtx?{ ? m1?tYp?b}?Ѕni? 0&?M?ث?4k@5H?6qTE?݈l ?uն?b}?.hw?6۪։?$0,?迄 ?uCq?+b$??Nf?y;.? (8*?ڔx?tx?Y0T? { ?]m1?Yp?Й^8?pF?ļ?3?lD?Dk?r?h Πu?Y?>?do*/"?ʅni?}ث? 0&?M?0k@5H?3qTE?ڈl ?uն?疂?yҽI?yin ?ŧ?-˱>w?Us?Rl w?XV? \}?0i}ZRg?Z$e?߄yK??v;.?(b$??Nf?(8*?ڔx?tx?Z0T? { ?^m1?Yp?VЙ^8?F??O3?D?Dk?Hr? Πu?Y?A>?o*/"?=Q ? ?W?ɓE؆j?bS]?xN?q?yr?3 b?Ky?o*/"?|d?`3x?ʋ?ּa?^?huɔǫ?/yÙ$?<>O?yG?ai?&?8?v?U4qٳ?C ?J?lO7vj?1Յ?U/?M?<̓?e{ۅ?B?j?[Q2?ย@? t)N?2/n=?XV?J\}?͚?Oi}ZRg?y$e?߄yK??-tΫG?p;u?ƒ\?@?5?Z*?J-j?)WG4 l?~;$_?E??+i?|Qrn?a\N '?LQ?kdG?]?3)?t#cj?T[k??ǔn?p:ũ???07??:'?`_?~T5?9?ւ(?G?lKt?!$?J? hx$?B]?;?'`}e7?$~4?st?P?EM!?R1?} =?xo?imS?MVsr?h?pw6?jE??Cl?mMď?&P?˽?G>?'=@?a̰8?4J$?hi?1? :z*M?Dh??݁ 9?!r?f:ũ??e?\??'`'?݋?|C?F3`p=?.vy??~T5?:??ւ(?io?b?Dv.'?S0?n1 :V?D?\N?-ʐ'X?§a:?Wks?bu?Dh??.r?݁ 9?5ICB E?$+?d?>?@rB?h3A?=l?5cs? G?3 ?@v u+???͎z ?t_ L?e6H?d#!?(0?G?͵l?Gc?Ĺ;?@U?!?W?ܶ?@?q!O?r;?O%t?0-ͭ? )}?ZH?,X??0?:p ?1;ד?? cx?~e]|?2?G,$??+|^@?M&\?o ;?K?Z?j|&?|>ƛ?2'?žv?Rr?ld}?*i?lOܖ?Rc?B?T?(lkW?ŦxN9?͏?WDk?bL?+]b?(c?D?Ӫҿ?Vš?[io?˜b?Vv.'?S0?~1 :V?D?\N?:ʐ'X?Χa:?bks?bu?߫?wu?@χ?<$cQ?8]?;R ?f,y?j< i?f?&[?̮|R?fp ?;?633333?YUUUUU?˨`?`- ???C} ?C? l? !"ч?Չ?iT?@U?!?W?ն?F?j!O?q;?O%t?)-ͭ?^v? )}?SH?,X?}?0?9<?6j?]u?75p?Y;?97?B˲|R? 5?HhM7? īCT?/f?ZۜT?\= M? :aO?Q ?~?d?#Lz?x ?9R@iћ?5Tۈ#?wg+?-^X?> ?Js?p ?s?N/?G ?h4?V9k?֦?ɭ?Γ$#P?WkGE?侀2?.b?4W{S?Ji?Pqu?ּ?|wwwww??R d?xw?Dzk?ϊ0?R?[߼dZu?# ??>[? ?p 0?E??}?3?(?}J?se?͒7\?wj?M-3?*{o?ڶ?$?n!O?r;?O%t?*-ͭ?^v?C<4B=? v?m7%?չ/? )}?RH?,X?z?0?β?[?r?J?T$n?ށdm?OkV??#x??N/7?iM?Ng1?@_w?/cs?mw?-Yo?&S?mL?ҼH?Drn?'>?c;{?:NM?u?1^N/?qk?sLP2??Č-?:?!t?Ed?zri?#T?»?? v?Kᡅ?VHi? 8?yTu?TX?olHG?w ? `"?Oe#??ܢI?]=rE?/cŃT?Y?\)5 ,?0?*C6?5 ?O{?}=?̚?7.p?"e]K?&? `5?LRU?gSk ?o;~?}y7?wTgD?Ӽɣ?J?PZ?+A?ze?uX. ?94Nvu?\ѵ.?%:f?HV?v$HHU?Č?, ?}Uh?ظ?T[^?m#+?.ǡ?e=?nP?Ȇ1r?O[y*?֐8u?$,P?/?| $?o]J#?wƼZ???ݙT??ǿkH?*ިqm?i^=?tby?Zi?h/1A*?r?wv(Y?A70? 0t?v[DŽJ?G -?Le?_?@?LW??L"$? 2??Tg{i?Q?檱un?|ŕ?=1?F?T\"?dM?aK+?Ȉxm?t g?l ~?gE?pp?/?’ [?bnʶ?k?K??7!N?^#?@{?K#?V锇??U??R\x?bZNc[?7.?R?!Ÿ?䜛.X?I.?Q?Rͮ?cJ?Jq?4E׾U?+]?#thx?]~?>m?Ak4?foB) ?e?ŀU?rF!|?-ݳ?=?O?dW}?+ES?#RZ?^M7` ?Mf?׺?~%?̯7?)b?7H??ed?4aV?!?'N-?m H#?W?ƋY(ֱ?Zi?)V?x)o?F]#?$ߊ\?Ĵ?En?'b6??u!Qn?Fy?fRbt??jV.?:%?l?A?RN+R?U^? 0]?Ce?;go?Do?N(@b?î?Ȏ^??BE+]?FIA?b*1I??^d?A?aV?!?&A ?L?{Z_k?̛#R?*f.?%?"n? ir?s;?M\N{?''d?23?EO?贼n?4z?G?w)Z=f??)d?FTO?"3nd?ҚA?K?A]?f8&?y\?VD?`V'y?ZF?%IGL3i?2!A?SS?b?M+-?ϖ?mn?r?r?E?VO.?$VO.?ʜpE?4?+?8x?ax?n?~1,Cg*?4I??fxh$z?UO.?\Z ?dV?8?痡/?;O?@Axi)?->ʃ?.ׂ?@YE?:?aP?{m?ɋR[?ҽf?(?0V}?3l8?3l8?3l8?|(?cA!ϒ?55L+?#< ?nw^?TIߍM??ٮ?W[?7s?k8?ho?s??lȢhU ?#{L?妀?&0m?Y@?D!?v:?"A%?GA%?NA%??% ٟ??$$NHR?iCc??PԪJ?.3?9-m?qW3?{?=~Mx?w.?|e?v d?Z:?H&#YU?I!t?oK^?oK^?oK^?#s,?&/J?n{nj??U']?V2?%w_g?} ?Q ?TFHg?b0:?nS'?Z߳?ތ?Q?F@?vĩ?/ ?J}U?q}U?x}U?ؚ`|28?>??(j?H$@?^??UlO?w|+A?ş#?.w?{Gz?hؐ?l OՐ?X-Ӑ?{Gz?{Gz?{Gz?zGz?|Gz?{Gz?{Gz?zGz?{Gz?{Gz?|Gz?l^y+? xܖ?Pȼlӗ?W\?56?Ė??֗?`r?LQ??lq!? q?dl'~ ?vCV;?snh??{Gzt?zGzt?{Gzt?|Gzt?{Gzt?zGzt?zGzt?{Gzt?|Gzt?{Gzt?{Gz?{Gz?|Gz?zGz?{Gz?zGz?3N-ۗ?,5]?Dlˈ?⥧נu?@?wVt_?{/ ?pjgk?MZh?5q ?fo?=)Ґ? kl6?H=r?9>?e?@s9Đ?f׫?@T|? :׊?ɐ?{Gzt?|Gzt?{Gzt?zGzt?m>=M?p6k讞?P$~͞?#?(:㙞?P-]?܏щ? nա?0*]`a?3cRL?[) ~c=?x.!??28?kx?{Gz?|Gz?{Gz?{Gz?zGz?{Gz?{Gz?{Gz?{Gz?|Gz?P6?pnNc?׿Ϭ?~<ǭ?uН?D;?Uŝ?,{t?4#뾫?5@̜? r⦟?ꢘ]i?l Q֗?ӮJ^?طJ? ~?aO?_g?{?0ꗬĐ?ᖕ?$?f[ݰ?Ȑ??T?LI?ye?/ۙ_?l'?(3 ?T?lpA?${>?&TO?JCJއ?٣&?O)G?X҂NO?X? 6g-?\ݬx?͔F?=?[ې?5U?'?{Gz?v"ޡ ?{Gz?{Gz?{Gz?{Gz?{Gzt?{Gz?{Gz?{Gz?{Gz?{Gz?ǎ?ۚ?, }?(c0C? ? wӱ?4/e7I?xsc*?<7?d?*?d9X!?gmê?0U}?= ?CMn?^CL?W?=gu?REp)B?3̆/Z?{G?Q Y"a?z?oe?Y?l_?wDv?cR?XE?5m\%? *?a?g>???CJ@?ؿdB?C?#*?z?@u:,?Ȕ)?m0uȂ?Hj<}??ҿQ?`@8U?!$%"?S`?u;fv?7??\ ?r|VD?T??1{?K5?J?x!??Ӗ? l&ڐ? ϐ?{Gz?{Gzt?{Gzt?{Gzt?{Gzt?-=~ А?t^А?i%h\ΐ?8A?;NE?ƒA(?c}ѧ?ks ?PZɬ???圵?kʴ? W6S]?}1?۴u?ou"۵?Ubw)?@ L?0H3?0!?`&? G?{ո0I? Dh?@!5V?jx? yd#?:la̠?7Z?Βn?J)LD?IУP?ym?F ?s6q?v8w?~_ؐ?{Gz?{Gz?{Gzt?{Gzt?{Gz?{Gz? |xbၗ?0 +*G?uK^?@|ϗ?:޷mt?{Gzt?{Gzt?{Gzt?{Gzt?кПn?@Ȣ$?44?xQM6U?l?W&?E&?o]?jmī".?Uj%?+㫙?ф1? +𧥤?|R?Y_Ђ?6;?:7/?Pehq?*ZwS?HQ?A!ɿ?/z?\?E9?$?(9x=?(~d+?eO?Jp?Pw?RN;FO?S:?3T?e-z?X?G4ڸ?B7?z?ҿ#?ӄE1? ڟ?8?:?n$?Ȧt? ?E7R?UZ.?ieo?{Gzt?{Gzt?{Gz?|Gz?{Gz?{Gz?lk/"?x?B?oa:?ЀCA?Ј}?@Q˩?F?۽ݡ?ʏ#?@/??P?b8)W?\+?VBL?b@)h?hw?NxU?G?6\?~KR#?V}?zσqR?l? 4?б?=?w?Lg?xRʤ?՛B ? pz/?fF[?@amR?F>=?\6?iq355?nK%?ru??>mk?'[{?j(?0x@ʄ?hWھM?YjU8?{Gzt?{Gzt?{Gz?{Gz?{Gzt?{Gzt?^'gÐ?y?Ȥ?s~\5Ð?jHrC?1>?w ? V-Y ޝ?@ j?д"5?'!?)A?!.#? W6? ?/-tY?dݝ?OBڠ?PIE?-?4S%)?G] ?ܲq'?fUҼ?;\?6;?Os[? L?xP ?-?ʫA:?{0%?-cE6?s8y2?$00D?G?xxO?~ȥ`?{Gzt?{Gzt?CkR ?=tn?۵wH?{Gz?{Gz?6Q/D͐?PdڛĐ?{Gz?{Gz?Ԙ?_?ЌV;e?!W\?DFd ?ftB?‚sQ?p[D?Moѝ?zң?a?lC?*Q?2"?j"? Ij?[om?E+??F>@.?=^6? ?%4:?m?\Dz?& !?X9?xf9!4?iMF?{Gzt?{Gzt?{Gz?{Gz?1uKw?oud?I?и?;.R̐?𿽸ǐ?Q f?^GCg?ʃ?S÷+?Y?Ȧ?S@?.#N1?ͮ? ?Uo?'.(G?Cd->?Qg?`6q3R?s g?p|u?X<F?8:|nB?'?k+7?"$Gf?sch?6kv?Dd^? ???7$Tِ?{Gz?{Gzt?t[驼?p^?~Hؽ?hrI?4n=V4?(<ο?N?+3?Ze-H&?@>ː?{Gz?zGzt?)eh´?P1?o?2㡭?>Gz7?gj?p(g:?ؐ?{Gz?{Gzt?ujuqB?ғZ?w.!?(Kۥ?ЭOVϝ?<?=?{Gz?{Gzt? O?6 &`?snh?@? WujTڗ?q?{Gz?{Gzt?a?*]?ﹻ? 6?6h?{Gz?{Gzt??::?X,Jٓ?j5?n1?{Gz?{Gzt?f?ENtL?n߽ErP?&4S?{Gz?{Gzt?{Gz?{Gz?{Gz?{Gzt?{Gzt?{Gzt?vtxedg   !#"$%&)*,'/012354679:;<=>?@ABCDE+FGH(IJ.TUVWXYK[\Z]^8_ab`defghijklmSnc~#$%'()/058&9:;><@?AB*efgpqrs=t34zyhux    %&('*+,-./012 TUVWXYZ[\k]wx)yz|}~l{&'()f hgjqrstiuvwZkx !"#$OPU%WVYNZX / -.C3ABRFPQ_U]^jbhitmrs}w{|  !" $#%&')*,+./0123467859:;<=>?@AB(DFGHEIJKSCTUVWX[\Z]^_`abcdefghijklmn~Y#$%&'()*/3459:;<=?>AB@efgh0pqrtuxy8sz     %&')(*+,-./01TUVWXYZ[\]klwxyz{|}~2 &'(Zfghijk)qrsuvwxt "#$%N!OUVWXYZP  -.3AB/FPQCU]^Rbhi_mrsjw{|t}0ӷ?T?2ڣ_?~&?B?s {w?sI_?B|{?i ?IewrB?}U?oK^?`A%?*hw?7۪։?迄 ?3l8?6VO.?xh$z? A?wd?!?MaV?$ߊ\?#G]#?Ѕni?$0,? 0&?ث?M?4k@5H?b}?6qTE?݈l ?.hw?6۪։?迄 ?uն?+b$??Nf?y;.? (8*?ڔx?i?tx? { ?]m1?Y(ֱ?d\x?U??:Ÿ?R?8.?{ZNc[?|̗"?QJ̇?~?'F5tw?ʅni?}ث?$0,? 0&?M?0k@5H?b}?3qTE?ڈl ?X/d62*w?ij>?(C`?hKV?m?M?>;CZ?;p9!?uն?(b$??Nf?v;.?(8*?ڔx?Yp?tx? { ?^m1?Z0T?VЙ^8?F??O3?D?Dk?Hr? Πu?Y?A>?^=Ȋ?չ/?7%? v?U<4B=?^v?+0??,X?lH? )}?o*/"?XV?:\}?Fi}ZRg?o$e?߄yK?Yp?Z0T?ZЙ^8?F??V3?D?Dk?Rr? Πu?Y?N>?B-ͭ?O%t?r;?!O?(D0??U/?M?<̓?e{ۅ?B?j?ย@? t)N?2/n=?o*/"?XV?J\}?Oi}ZRg?y$e?߄yK??Y?W?/!?[Q2?d?`3x?ʋ?XlFy?lT:?@U?cu?pks?ۧa:?Fʐ'X?]v.'?\N?D?S0?1 :V?͚?U/?!M?K̓?u{ۅ?B?G/n=?j?@?t)N?ּa?(l?QMď?z&P?qQ2?d?`3x?ʋ?Șb?3r?MLi??ؘt?De?˽?~T5?9?ւ(?X ?G?Y? Πu?%;CZ?m?M?OKV?(C`?Y-?\r? Dk?D?`3?Թ/?;p9!?yij>?F5tw?~?8J̇?;CZ?m?M?BKV?(C`?Y-? ?F?|̗"?bZNc[?7.?R?jij>?F5tw?~?&J̇?jD?dЙ^8?Z0T?!Ÿ?U??Yp?hm1?|̗"?NZNc[?7.?vR?Y-?{ ?tx?K\x?Y(ֱ? Ÿ?U??ui? G]#???ڔx?$ߊ\?4aV?2\x?ƋY(ֱ?Zi?F]#?0(8*?jD?!?^d?$ߊ\?aV?;.?!\ό?A?!?>d?xh$z?Nf?Y-?ҚA?fxh$z?UO.?VO.?8b$??:?3l8?3l8?uն???"A%?GA%?舀l ?+8_?oK^?oK^?@qTE?x=|?J}U?q}U?b}?p4=?ީsI_?sI_?ni??ri ?i ?ث?F?ewrB?0ewrB?@k@5H?$;bI?B|{?B|{?M?:o?. {w?Z {w? 0&?v}C?B?B?$0,? Gݔ?V~&?~&?迄 ?ڣ_?T?0ӷ?7?ڣ_?۪։?T?0ӷ?iw??0ӷ?T?2ڣ_??~&?B?i ?s {w?IewrB?B|{?sI_?}U?oK^?*hw?7۪։?迄 ?$0,??`A%?3l8?6VO.?xh$z? A?wd?!?MaV?$ߊ\?b}? 0&?M?Ѕni?4k@5H?ث?6qTE?݈l ?uն?.hw?6۪։?迄 ?$0,?X/d62*w?+b$??Nf?y;.? (8*?ڔx?tx?#G]#? { ?]m1?Yp?i?Y(ֱ?d\x?U??:Ÿ?R?8.?{ZNc[?|̗"?QJ̇?~?b}?ʅni? 0&?M?0k@5H?}ث?3qTE?ڈl ?uն?^=Ȋ?'F5tw?ij>?(C`?hKV?m?M?>;CZ?(b$??Nf?v;.?(8*?ڔx?tx?Z0T? { ?^m1?Yp?VЙ^8?F??O3?D?Dk?Hr? Πu?Y?A>?o*/"?(D0?;p9!?չ/?7%? v?U<4B=?^v?+0??,X?lH?XV?:\}?Fi}ZRg?o$e?߄yK??Z0T?ZЙ^8?F??V3?D?Dk?Rr? Πu?Y?N>?o*/"? )}?B-ͭ?O%t?r;?XlFy?U/?M?<̓?e{ۅ?B?j?ย@? t)N?2/n=?[Q2?XV?J\}?Oi}ZRg?y$e?߄yK?͚?!O??Y?W?d?`3x?ʋ?ּa?MLi???/!?@U?cu?pks?ۧa:?S0?Fʐ'X?\N?1 :V?D?U/?!M?K̓?u{ۅ?B?j?qQ2?@?t)N?G/n=?(l?QMď?z&P?˽?d?`3x?ʋ?׼a?]v.'?Șb? ??lT:?ؘt?~T5?9?ւ(?G?Y?m?M?OKV?(C`?yij>?Y-? Πu?\r? Dk?D?;p9!?;CZ?F5tw?~?8J̇?|̗"?m?M?BKV?(C`?jij>?jD?`3? ?bZNc[?7.?R?!Ÿ?F5tw?~?&J̇?|̗"?Y-?F?dЙ^8?U??K\x?Z0T?Yp?NZNc[?7.?vR? Ÿ???hm1?{ ?Y(ֱ?ui?U??2\x? G]#?$ߊ\?jD?tx?4aV?!?ƋY(ֱ?Zi?F]#?$ߊ\?ڔx?!\ό?^d?A?aV?!?0(8*?Y-?xh$z?>d?ҚA?VO.?;.?:?fxh$z?UO.?3l8?3l8?Nf???"A%?GA%?8b$??+8_?oK^?oK^?uն?x=|?J}U?q}U?舀l ?p4=?ީsI_?sI_?@qTE??ri ?i ?b}?F?ewrB?0ewrB?ni?$;bI?B|{?B|{?ث?:o?. {w?Z {w?@k@5H?v}C?B?B?M? Gݔ?V~&?~&? 0&?7?ڣ_?ڣ_?$0,?T?0ӷ???T?迄 ?0ӷ???۪։?iw??                     trim  ! " $#% &'*+,-./01234678 (D#F!"G$HEI%&J'KD(MNO-P*Q,+--R1[/0Z\]23^4_`5a67b8c9d:ef;<g=hi>?j@klABmCnELHoqFGqpsItJuKvoLxyyQsPR|||R{~TUVWXY]Z[^_a`bcdefghijklmnpwrrstuvwx{||}}     !!#$%&'()*12659:;<=?>A@BDCEFGHJILKM!MOP PO MPWZZX\^^_]ab!!cd#ef$%g&h'i(j)k*l+mT,.--/t0u1m2vw{485{6~~|9:;<=>@?BADOEGILMMOOPPSSTVWWW[ZZ\^^^```bbbdddfeghikmoonnpqrstuvwyz{~~~       !"#$%&')335357887::85:DCEFGGGIIKLMNLRSETUVWXYZ[\  ] ^ _ a`b7bQeffghijmnopq  ! sst"u#v$%wx&'yz(){*|+}~,-./01233557788::=>ABBEFGGHIILLNNNOPQRRSSUTVWXY[Z\]^babbdeghjiklmnopqtuvwxyz{|}~      "##$+++,1021679:<<=>?@8A:DFFHHIIJ7KLJMNPQR S  T UUV W XR[\^^!aaaccdeffghij k!_"m$#$n%p&uv'(w)xy++y--E.//10}4y4337577A\::<<<>>>@@@AAEBDCFFFEYIIHILSMOQPRSUUUVY\\^]^^ldabcbdddegejhiklopqrstuvwxyy{|~~       "#$%'())+-../0123)3535:897<=@ A   DEEBFGHIJJELLANQQ,UVWXY !Z#"\[$]%^.'&`+a))cccS-.e.fg/5gi1gi33kl55mnQ@L:qq><=;@?>?@@MBuFwDDEEvGyHzI{J|KL}LuMOPQQTdTSUVWXYZ\i]`_fcclafdeffggiillnnnoo~psstrtvywz{|~}      !  !  #$$&(('!++,-.&2!!45$$577889'((;;<+<++,?-@.A/BD0922E55<67799;J;H<<LL?L???AOBPCQSISFTHGKSJVMLKYMY[O[P\]Q^R`W`ba`VXYYde[e[[]g^h_ikkkmlndeeepgphqirjsuuulvxopyppr{{s|tvxvyz{z|}m    !# "$%&%))!,*'/01234657DE +"$F#GH(&'I/J(IL+))*P,QNROS2K01\[Z34]6^89_78a`b:`;de<=f>gh?@iAjkBClTmDoEpFqHGrNJMKt[uLMwMxNz{OP{Q}}SnUVWXYZ\v\]^_cdabcefghijklmnzopqrstvuyxwyz     "#$%'(#)++,,.-.1+2234677&9:;/><@?BA DCEFG'IKHL  N    Q  RSTSUUVVUXYYYUY\[]\_ `a"b_cNda$*e%&f9g(J)i*jekm+nnoon0=ptvvwwxy6||677}88h:;<?t=>A@BCCDFFEHHGJKJIKLRcQVUYXY[]_acgflhjjillkuqrsu{z}|}    "" %&('469;<==>>??@AA@=BDEFEFFHIHJBKLM4NKOOPPQQRS TUVWXY Z[ %\ ^T _acdddeghfji#km$poqrr!r#$mtto&]w')x)*zy+z,|}-.~/0126M<c9;>C??@@ADDCHJKMPOVU`WXYZ\[]w__^``aeifghjlnnuvqprrssuvxy{{|}~    !!"$*,-...//0.112*34456589:;9=>;?@=A?BBCCBEEGGJKLMLON NPRT   T PVVXGZY[\8][_```bbc%ef &h ghj"!#lnn%$eo'iu()vqw2z-*,{{||3}}02~~45689;=?CBDGHOJJKKMNOQWQXTSWWXY[`]_`fgkiukmlmnopxrstvwxzz}    "#$&'&'*+*(,-,-/0"1468899:;<;==>??; A BCC CD FGHIKMN7RRSTTS U%WUV!OY$#2\%[W]&('_a`b4*+a,ded_e00/h221jk6lbmhnko78p:pqrrrrssrotAuBvJwxxKFyGzH{I|J}pK~MPZRRVXYX^Z[[\^^]a`_bjmkmpquvwxyz{~}         "#"$%%&'')))*-./011011334*5##66%(0&0::78)4=*,>@>A,B-C.2DDDFF4GGG6HI8II:J=K=KM>N@OP@QARBESTEUVVVIWWXXXMYNZ\N]OP^Q_T`aUbWccZdcdfZ\gh\i]j^a`lbmknnfooqfrgshtilkvwwuxyxqz{zr|s}u~v~{|~m  !" #$ %&'())*+,)-/01234678D E!FG"H$#%IJ&K'LM(F*O,O+PQ.R.Z/[\102]^3_45`6ab7c8d9e:;fg<h=>ij?k@AlmBnCoDpEGNrrHqtIuJvKwxLtMzNO{QPzSR}TUVWXYZ\[]^_`abcdefghijklmnsopqsuyvwxy}{z~~       ""#$%&'()*++,---+..1769:;<=>?@ABCDEFGHIJKL NN D QQ RR ST,TSVXUYX[[\]]_` a  "c""e#$fg%h&i'j(k)l*1.,-m.ot/u0213234{57}}|7z9:;<=>?@ABECGFLHiIJKNNNQRQQRRTnVUWXZY[\]_acefghkjlvmopqrstuwvxxwy{|}G      !"#$%&')446699;;<<=>=?>@A?ABBCDHJJKMO@POQTUVWXYZ[ \] ^ _ `a ^ccdegihjmnoe!qrp!"t#u$vw%&xy'(z{)|*}+,~-./0124446669;99<;;<<=>A?O@JCCDSEFHJJPKMPdQRTUVWXYZ[\]a_`cccfdgpfhjiklmnosqsrtuvwxyz{|}~      !"#$%%**,--/.023/436689;;=?BCBD,DGGHKMNHOPQKSR TS  V WYZ[]`]bc__fghijk llm"#moop%u&'vw(x)**zz{z,0.|51|~2|}65J8C9;=?{CDEGMLLONPQRTTWVXXYZ[]_`abcpfeghijjknmnopqrstuvwx~z{}|      "#$%'(**+,&/01244/6679:;<<=>9?>7A B  C  FGHIJCK8MRSRTUVWX YZ![\"#]$^%_``&((*bb*+d,--e_1hh0\jj24k446m667op89:9=?<;>qstruAvBCCwDxyFzG{H|Iwx~~KMNOPoRSTUVWXYZ][^abedhhhjjjkmtqsruv|xx}yz{|}      ""  #  %''%&**,-./012 "4""6%#6%&)8)':):**=>=>@,A-B.C110E32G64HH:DI8;J:KG>=>MMON@PAQBRDDEUEJHGWIJLKVNXZNN\O]^P_QSSTTTcWVdXXZZfgf\h]i^j`caaaccdonffqgrhsitknlmlnnoozyqq|r}s~u~wvxxyyz{|~~m m PKkHGPK"nXgeometry7.mphbinR0objGeom2|=-C6?{Gzt?|={Gz?|=???{Gzt?|=?{Gz?|=?? ????????? ?  BezierCurveGzt? BezierCurve? BezierCurveGzt?Gz? BezierCurve{Gzt???{Gzt?? BezierCurveGz?? BezierCurve{Gz???{Gz?? BezierCurve??? BezierCurve?{Gzt?? BezierCurve?{Gz??{Gzt? BezierCurve???{Gz?AssocHistoryAttrib VectorInth  PKR PK"nXgeometry8.mphbin R0objGeom2|=-C6?{Gzt?|={Gz?|=???{Gzt?|=?{Gz?|=?? ????????? ?  BezierCurveGzt? BezierCurve? BezierCurveGzt?Gz? BezierCurve{Gzt???{Gzt?? BezierCurveGz?? BezierCurve{Gz???{Gz?? BezierCurve??? BezierCurve?{Gzt?? BezierCurve?{Gz??{Gzt? BezierCurve???{Gz?AssocHistoryAttrib VectorIntf  PK;HPK"nXgeometry2.mphbin}R0objGeom1|=PKg }PK"nX xmesh1.mphbinR0objXmeshtModel2 globalscopeGLOBAL?tmaterialGeom0|=geom1l_HSTANDARD?tmeshgeometrymaterialspatialXmYmXgYgXYxycomp1. pgeom_gop&RAY?tmaterial particleindexMeshvtxmesh1l `mesh1l `MeshMeshmesh1l `main<?xml version="1.0" encoding="UTF-8"?> <rec> <str>elem</str> <str>elvar</str> <str>g</str> <arr> <str>1</str> </arr> <str>geomdim</str> <arr> <arr> <rec> <str>var</str> <arr> <str>Xm$2</str> <arr> <str>Xmg</str> </arr> <str>Ym$2</str> <arr> <str>Ymg</str> </arr> </arr> <str>ind</str> <arr> <arr> <str>1</str> <str>2</str> <str>3</str> <str>4</str> <str>5</str> <str>6</str> <str>7</str> <str>8</str> </arr> </arr> </rec> <rec> <str>var</str> <arr> <str>Xm$2</str> <arr> <str>Xmg</str> </arr> <str>Ym$2</str> <arr> <str>Ymg</str> </arr> </arr> <str>ind</str> <arr> <arr> <str>1</str> <str>2</str> <str>3</str> <str>4</str> <str>5</str> <str>6</str> <str>7</str> <str>8</str> <str>9</str> <str>10</str> </arr> </arr> </rec> <rec> <str>var</str> <arr> <str>Xm$2</str> <arr> <str>Xmg</str> </arr> <str>Ym$2</str> <arr> <str>Ymg</str> </arr> </arr> <str>ind</str> <arr> <arr> <str>1</str> <str>2</str> <str>3</str> </arr> </arr> </rec> </arr> </arr> <str>protected</str> <str>false</str> </rec> h<?xml version="1.0" encoding="UTF-8"?> <rec> <str>elem</str> <str>elepspec</str> <str>g</str> <arr> <str>0</str> </arr> <str>geom</str> <arr> <rec> <str>ep</str> <arr> <str>1</str> </arr> </rec> </arr> </rec> <?xml version="1.0" encoding="UTF-8"?> <rec> <str>elem</str> <str>elconst</str> <str>var</str> <arr> <str>n_air</str> <str>1</str> <str>n_glass</str> <str>1.5</str> <str>n_Ag</str> <str>0.13511</str> <str>lam0</str> <str>550*unit_nm_cf</str> </arr> </rec> <?xml version="1.0" encoding="UTF-8"?> <rec> <str>elem</str> <str>elconst</str> <str>var</str> <arr> <str>g_const</str> <str>9.80665*unit_m_cf/unit_s_cf^2</str> <str>N_A_const</str> <str>6.02214076E23/unit_mol_cf</str> <str>k_B_const</str> <str>1.380649E-23*unit_J_cf/unit_K_cf</str> <str>Z0_const</str> <str>mu0_const*c_const</str> <str>me_const</str> <str>9.10938356E-31*unit_kg_cf</str> <str>e_const</str> <str>1.602176634E-19*unit_C_cf</str> <str>F_const</str> <str>96485.33289*unit_C_cf/unit_mol_cf</str> <str>alpha_const</str> <str>0.0072973525664</str> <str>G_const</str> <str>6.67408E-11*unit_m_cf^3/(unit_kg_cf*unit_s_cf^2)</str> <str>hbar_const</str> <str>1.0545718E-34*unit_J_cf*unit_s_cf/unit_rad_cf</str> <str>V_m_const</str> <str>0.022413962*unit_m_cf^3/unit_mol_cf</str> <str>mn_const</str> <str>1.674927471E-27*unit_kg_cf</str> <str>epsilon0_const</str> <str>1/(mu0_const*c_const^2)</str> <str>mu0_const</str> <str>2*alpha_const*h_const/(c_const*e_const^2)</str> <str>h_const</str> <str>6.62607015E-34*unit_J_cf*unit_s_cf</str> <str>mp_const</str> <str>1.672621898E-27*unit_kg_cf</str> <str>c_const</str> <str>299792458*unit_m_cf/unit_s_cf</str> <str>sigma_const</str> <str>5.670367E-8*unit_kg_cf/(unit_s_cf^3*unit_K_cf^4)</str> <str>R_const</str> <str>8.3144598*unit_J_cf/(unit_K_cf*unit_mol_cf)</str> <str>b_const</str> <str>0.0028977729*unit_m_cf*unit_K_cf</str> <str>isRHS</str> <str>0</str> <str>t</str> <str>0</str> </arr> </rec> <?xml version="1.0" encoding="UTF-8"?> <rec> <str>elem</str> <str>elconst</str> <str>var</str> <arr> <str>comp1.gop.mp1.minput_temperature</str> <str>293.15*unit_K_cf</str> <str>comp1.gop.Nt</str> <str>part_count_all</str> <str>comp1.gop.Nsel</str> <str>part_count_sel</str> <str>comp1.gop.alpha</str> <str>part_count_sel/part_count_all</str> <str>comp1.gop.fitol</str> <str>0.9</str> <str>comp1.gop.dGeomChar</str> <str>1.4142135623730951</str> <str>comp1.gop.Nta</str> <str>comp1.gop.sum(1)</str> <str>comp1.gop.qavex</str> <str>comp1.gop.sum(comp1.qx)/comp1.gop.Nta</str> <str>comp1.gop.qavey</str> <str>comp1.gop.sum(comp1.qy)/comp1.gop.Nta</str> <str>comp1.gop.qavez</str> <str>0</str> <str>comp1.gop.qmidx</str> <str>0.5*(comp1.gop.min(comp1.qx)+comp1.gop.max(comp1.qx))</str> <str>comp1.gop.qmidy</str> <str>0.5*(comp1.gop.min(comp1.qy)+comp1.gop.max(comp1.qy))</str> <str>comp1.gop.qmidz</str> <str>0</str> <str>comp1.gop.rrms</str> <str>sqrt(comp1.gop.sum(comp1.gop.deltaqsumsq)/comp1.gop.Nta)</str> <str>comp1.gop.rmrms</str> <str>sqrt(comp1.gop.sum(comp1.gop.deltaqmidsumsq)/comp1.gop.Nta)</str> <str>comp1.gop.rmaxall</str> <str>comp1.gop.relg1.rmaxrel</str> <str>comp1.gop.rmmax</str> <str>comp1.gop.relg1.rmmax</str> <str>comp1.gop.rrmsave</str> <str>comp1.gop.relg1.rrms</str> <str>comp1.gop.rrmsmin</str> <str>comp1.gop.relg1.rrms</str> <str>comp1.gop.rrmsmax</str> <str>comp1.gop.relg1.rrms</str> <str>comp1.gop.rmrmsave</str> <str>comp1.gop.relg1.rmrms</str> <str>comp1.gop.rmrmsmin</str> <str>comp1.gop.relg1.rmrms</str> <str>comp1.gop.rmrmsmax</str> <str>comp1.gop.relg1.rmrms</str> <str>comp1.gop.op1.kiext</str> <str>0</str> <str>comp1.gop.op1.next</str> <str>1</str> <str>comp1.gop.relg1.Ntf</str> <str>nojac(comp1.gop.sum_all(if(comp1.gop.prf==1,1,0)))</str> <str>comp1.gop.relg1.Ntfa</str> <str>comp1.gop.sum(if(comp1.gop.prf==1,1,0))</str> <str>comp1.gop.relg1.qavex</str> <str>comp1.gop.sum(if(comp1.gop.prf==1,comp1.qx,0))/comp1.gop.relg1.Ntfa</str> <str>comp1.gop.relg1.qavey</str> <str>comp1.gop.sum(if(comp1.gop.prf==1,comp1.qy,0))/comp1.gop.relg1.Ntfa</str> <str>comp1.gop.relg1.qavez</str> <str>0</str> <str>comp1.gop.relg1.qmidx</str> <str>0.5*(comp1.gop.min(if(comp1.gop.prf==1,comp1.qx,Inf))+comp1.gop.max(if(comp1.gop.prf==1,comp1.qx,-Inf)))</str> <str>comp1.gop.relg1.qmidy</str> <str>0.5*(comp1.gop.min(if(comp1.gop.prf==1,comp1.qy,Inf))+comp1.gop.max(if(comp1.gop.prf==1,comp1.qy,-Inf)))</str> <str>comp1.gop.relg1.qmidz</str> <str>0</str> <str>comp1.gop.relg1.rrms</str> <str>sqrt(comp1.gop.sum(if(comp1.gop.prf==1,comp1.gop.relg1.deltaqsumsq,0))/comp1.gop.relg1.Ntfa)</str> <str>comp1.gop.relg1.rmrms</str> <str>sqrt(comp1.gop.sum(if(comp1.gop.prf==1,comp1.gop.relg1.deltaqmidsumsq,0))/comp1.gop.relg1.Ntfa)</str> <str>comp1.gop.relg1.rmaxrel</str> <str>comp1.gop.max(if(comp1.gop.prf==1,comp1.gop.relg1.rall,0))</str> <str>comp1.gop.relg1.rmaxall</str> <str>comp1.gop.max(if(comp1.gop.prf==1,comp1.gop.relg1.rall,0))</str> <str>comp1.gop.relg1.rmmax</str> <str>comp1.gop.max(if(comp1.gop.prf==1,comp1.gop.relg1.rmall,0))</str> </arr> </rec> P<?xml version="1.0" encoding="UTF-8"?> <rec> <str>elem</str> <str>elconst</str> <str>var</str> <arr> <str>comp1.mat1.rfi.n11</str> <str>n_glass</str> <str>comp1.mat1.rfi.n21</str> <str>0</str> <str>comp1.mat1.rfi.n31</str> <str>0</str> <str>comp1.mat1.rfi.n12</str> <str>0</str> <str>comp1.mat1.rfi.n22</str> <str>n_glass</str> <str>comp1.mat1.rfi.n32</str> <str>0</str> <str>comp1.mat1.rfi.n13</str> <str>0</str> <str>comp1.mat1.rfi.n23</str> <str>0</str> <str>comp1.mat1.rfi.n33</str> <str>n_glass</str> <str>comp1.mat1.rfi.n_iso</str> <str>n_glass</str> <str>comp1.mat1.rfi.n_symmetry</str> <str>0</str> <str>comp1.mat1.rfi.ki11</str> <str>0</str> <str>comp1.mat1.rfi.ki21</str> <str>0</str> <str>comp1.mat1.rfi.ki31</str> <str>0</str> <str>comp1.mat1.rfi.ki12</str> <str>0</str> <str>comp1.mat1.rfi.ki22</str> <str>0</str> <str>comp1.mat1.rfi.ki32</str> <str>0</str> <str>comp1.mat1.rfi.ki13</str> <str>0</str> <str>comp1.mat1.rfi.ki23</str> <str>0</str> <str>comp1.mat1.rfi.ki33</str> <str>0</str> <str>comp1.mat1.rfi.ki_iso</str> <str>0</str> <str>comp1.mat1.rfi.ki_symmetry</str> <str>0</str> <str>comp1.mat1.lst.epsilonPrim11</str> <str>comp1.mat1.rfi.n_iso^2-comp1.mat1.rfi.ki_iso^2</str> <str>comp1.mat1.lst.epsilonPrim21</str> <str>0</str> <str>comp1.mat1.lst.epsilonPrim31</str> <str>0</str> <str>comp1.mat1.lst.epsilonPrim12</str> <str>0</str> <str>comp1.mat1.lst.epsilonPrim22</str> <str>comp1.mat1.rfi.n_iso^2-comp1.mat1.rfi.ki_iso^2</str> <str>comp1.mat1.lst.epsilonPrim32</str> <str>0</str> <str>comp1.mat1.lst.epsilonPrim13</str> <str>0</str> <str>comp1.mat1.lst.epsilonPrim23</str> <str>0</str> <str>comp1.mat1.lst.epsilonPrim33</str> <str>comp1.mat1.rfi.n_iso^2-comp1.mat1.rfi.ki_iso^2</str> <str>comp1.mat1.lst.epsilonPrim_iso</str> <str>comp1.mat1.rfi.n_iso^2-comp1.mat1.rfi.ki_iso^2</str> <str>comp1.mat1.lst.epsilonPrim_symmetry</str> <str>79</str> <str>comp1.mat1.lst.delta</str> <str>atan2(2*comp1.mat1.rfi.n_iso*comp1.mat1.rfi.ki_iso,comp1.mat1.rfi.n_iso^2-comp1.mat1.rfi.ki_iso^2)*unit_rad_cf</str> <str>comp1.mat1.def.epsilonr11</str> <str>comp1.mat1.rfi.n11^2-comp1.mat1.rfi.ki11^2-2*j*comp1.mat1.rfi.n11*comp1.mat1.rfi.ki11+comp1.mat1.rfi.n21^2-comp1.mat1.rfi.ki21^2-2*j*comp1.mat1.rfi.n21*comp1.mat1.rfi.ki21+comp1.mat1.rfi.n31^2-comp1.mat1.rfi.ki31^2-2*j*comp1.mat1.rfi.n31*comp1.mat1.rfi.ki31</str> <str>comp1.mat1.def.epsilonr21</str> <str>comp1.mat1.rfi.n11*comp1.mat1.rfi.n12-comp1.mat1.rfi.ki11*comp1.mat1.rfi.ki12-j*(comp1.mat1.rfi.n11*comp1.mat1.rfi.ki12+comp1.mat1.rfi.ki11*comp1.mat1.rfi.n12)+comp1.mat1.rfi.n21*comp1.mat1.rfi.n22-comp1.mat1.rfi.ki21*comp1.mat1.rfi.ki22-j*(comp1.mat1.rfi.n21*comp1.mat1.rfi.ki22+comp1.mat1.rfi.ki21*comp1.mat1.rfi.n22)+comp1.mat1.rfi.n31*comp1.mat1.rfi.n32-comp1.mat1.rfi.ki31*comp1.mat1.rfi.ki32-j*(comp1.mat1.rfi.n31*comp1.mat1.rfi.ki32+comp1.mat1.rfi.ki31*comp1.mat1.rfi.n32)</str> <str>comp1.mat1.def.epsilonr31</str> <str>comp1.mat1.rfi.n11*comp1.mat1.rfi.n13-comp1.mat1.rfi.ki11*comp1.mat1.rfi.ki13-j*(comp1.mat1.rfi.n11*comp1.mat1.rfi.ki13+comp1.mat1.rfi.ki11*comp1.mat1.rfi.n13)+comp1.mat1.rfi.n21*comp1.mat1.rfi.n23-comp1.mat1.rfi.ki21*comp1.mat1.rfi.ki23-j*(comp1.mat1.rfi.n21*comp1.mat1.rfi.ki23+comp1.mat1.rfi.ki21*comp1.mat1.rfi.n23)+comp1.mat1.rfi.n31*comp1.mat1.rfi.n33-comp1.mat1.rfi.ki31*comp1.mat1.rfi.ki33-j*(comp1.mat1.rfi.n31*comp1.mat1.rfi.ki33+comp1.mat1.rfi.ki31*comp1.mat1.rfi.n33)</str> <str>comp1.mat1.def.epsilonr12</str> <str>comp1.mat1.rfi.n12*comp1.mat1.rfi.n11-comp1.mat1.rfi.ki12*comp1.mat1.rfi.ki11-j*(comp1.mat1.rfi.n12*comp1.mat1.rfi.ki11+comp1.mat1.rfi.ki12*comp1.mat1.rfi.n11)+comp1.mat1.rfi.n22*comp1.mat1.rfi.n21-comp1.mat1.rfi.ki22*comp1.mat1.rfi.ki21-j*(comp1.mat1.rfi.n22*comp1.mat1.rfi.ki21+comp1.mat1.rfi.ki22*comp1.mat1.rfi.n21)+comp1.mat1.rfi.n32*comp1.mat1.rfi.n31-comp1.mat1.rfi.ki32*comp1.mat1.rfi.ki31-j*(comp1.mat1.rfi.n32*comp1.mat1.rfi.ki31+comp1.mat1.rfi.ki32*comp1.mat1.rfi.n31)</str> <str>comp1.mat1.def.epsilonr22</str> <str>comp1.mat1.rfi.n12^2-comp1.mat1.rfi.ki12^2-2*j*comp1.mat1.rfi.n12*comp1.mat1.rfi.ki12+comp1.mat1.rfi.n22^2-comp1.mat1.rfi.ki22^2-2*j*comp1.mat1.rfi.n22*comp1.mat1.rfi.ki22+comp1.mat1.rfi.n32^2-comp1.mat1.rfi.ki32^2-2*j*comp1.mat1.rfi.n32*comp1.mat1.rfi.ki32</str> <str>comp1.mat1.def.epsilonr32</str> <str>comp1.mat1.rfi.n12*comp1.mat1.rfi.n13-comp1.mat1.rfi.ki12*comp1.mat1.rfi.ki13-j*(comp1.mat1.rfi.n12*comp1.mat1.rfi.ki13+comp1.mat1.rfi.ki12*comp1.mat1.rfi.n13)+comp1.mat1.rfi.n22*comp1.mat1.rfi.n23-comp1.mat1.rfi.ki22*comp1.mat1.rfi.ki23-j*(comp1.mat1.rfi.n22*comp1.mat1.rfi.ki23+comp1.mat1.rfi.ki22*comp1.mat1.rfi.n23)+comp1.mat1.rfi.n32*comp1.mat1.rfi.n33-comp1.mat1.rfi.ki32*comp1.mat1.rfi.ki33-j*(comp1.mat1.rfi.n32*comp1.mat1.rfi.ki33+comp1.mat1.rfi.ki32*comp1.mat1.rfi.n33)</str> <str>comp1.mat1.def.epsilonr13</str> <str>comp1.mat1.rfi.n13*comp1.mat1.rfi.n11-comp1.mat1.rfi.ki13*comp1.mat1.rfi.ki11-j*(comp1.mat1.rfi.n13*comp1.mat1.rfi.ki11+comp1.mat1.rfi.ki13*comp1.mat1.rfi.n11)+comp1.mat1.rfi.n23*comp1.mat1.rfi.n21-comp1.mat1.rfi.ki23*comp1.mat1.rfi.ki21-j*(comp1.mat1.rfi.n23*comp1.mat1.rfi.ki21+comp1.mat1.rfi.ki23*comp1.mat1.rfi.n21)+comp1.mat1.rfi.n33*comp1.mat1.rfi.n31-comp1.mat1.rfi.ki33*comp1.mat1.rfi.ki31-j*(comp1.mat1.rfi.n33*comp1.mat1.rfi.ki31+comp1.mat1.rfi.ki33*comp1.mat1.rfi.n31)</str> <str>comp1.mat1.def.epsilonr23</str> <str>comp1.mat1.rfi.n13*comp1.mat1.rfi.n12-comp1.mat1.rfi.ki13*comp1.mat1.rfi.ki12-j*(comp1.mat1.rfi.n13*comp1.mat1.rfi.ki12+comp1.mat1.rfi.ki13*comp1.mat1.rfi.n12)+comp1.mat1.rfi.n23*comp1.mat1.rfi.n22-comp1.mat1.rfi.ki23*comp1.mat1.rfi.ki22-j*(comp1.mat1.rfi.n23*comp1.mat1.rfi.ki22+comp1.mat1.rfi.ki23*comp1.mat1.rfi.n22)+comp1.mat1.rfi.n33*comp1.mat1.rfi.n32-comp1.mat1.rfi.ki33*comp1.mat1.rfi.ki32-j*(comp1.mat1.rfi.n33*comp1.mat1.rfi.ki32+comp1.mat1.rfi.ki33*comp1.mat1.rfi.n32)</str> <str>comp1.mat1.def.epsilonr33</str> <str>comp1.mat1.rfi.n13^2-comp1.mat1.rfi.ki13^2-2*j*comp1.mat1.rfi.n13*comp1.mat1.rfi.ki13+comp1.mat1.rfi.n23^2-comp1.mat1.rfi.ki23^2-2*j*comp1.mat1.rfi.n23*comp1.mat1.rfi.ki23+comp1.mat1.rfi.n33^2-comp1.mat1.rfi.ki33^2-2*j*comp1.mat1.rfi.n33*comp1.mat1.rfi.ki33</str> <str>comp1.mat1.def.epsilonr_iso</str> <str>if(comp1.mat1.rfi.n12*comp1.mat1.rfi.n11-comp1.mat1.rfi.ki12*comp1.mat1.rfi.ki11-j*(comp1.mat1.rfi.n12*comp1.mat1.rfi.ki11+comp1.mat1.rfi.ki12*comp1.mat1.rfi.n11)+comp1.mat1.rfi.n22*comp1.mat1.rfi.n21-comp1.mat1.rfi.ki22*comp1.mat1.rfi.ki21-j*(comp1.mat1.rfi.n22*comp1.mat1.rfi.ki21+comp1.mat1.rfi.ki22*comp1.mat1.rfi.n21)+comp1.mat1.rfi.n32*comp1.mat1.rfi.n31-comp1.mat1.rfi.ki32*comp1.mat1.rfi.ki31-j*(comp1.mat1.rfi.n32*comp1.mat1.rfi.ki31+comp1.mat1.rfi.ki32*comp1.mat1.rfi.n31)==0&amp;&amp;comp1.mat1.rfi.n13*comp1.mat1.rfi.n11-comp1.mat1.rfi.ki13*comp1.mat1.rfi.ki11-j*(comp1.mat1.rfi.n13*comp1.mat1.rfi.ki11+comp1.mat1.rfi.ki13*comp1.mat1.rfi.n11)+comp1.mat1.rfi.n23*comp1.mat1.rfi.n21-comp1.mat1.rfi.ki23*comp1.mat1.rfi.ki21-j*(comp1.mat1.rfi.n23*comp1.mat1.rfi.ki21+comp1.mat1.rfi.ki23*comp1.mat1.rfi.n21)+comp1.mat1.rfi.n33*comp1.mat1.rfi.n31-comp1.mat1.rfi.ki33*comp1.mat1.rfi.ki31-j*(comp1.mat1.rfi.n33*comp1.mat1.rfi.ki31+comp1.mat1.rfi.ki33*comp1.mat1.rfi.n31)==0&amp;&amp;comp1.mat1.rfi.n12*comp1.mat1.rfi.n11-comp1.mat1.rfi.ki12*comp1.mat1.rfi.ki11-j*(comp1.mat1.rfi.n12*comp1.mat1.rfi.ki11+comp1.mat1.rfi.ki12*comp1.mat1.rfi.n11)+comp1.mat1.rfi.n22*comp1.mat1.rfi.n21-comp1.mat1.rfi.ki22*comp1.mat1.rfi.ki21-j*(comp1.mat1.rfi.n22*comp1.mat1.rfi.ki21+comp1.mat1.rfi.ki22*comp1.mat1.rfi.n21)+comp1.mat1.rfi.n32*comp1.mat1.rfi.n31-comp1.mat1.rfi.ki32*comp1.mat1.rfi.ki31-j*(comp1.mat1.rfi.n32*comp1.mat1.rfi.ki31+comp1.mat1.rfi.ki32*comp1.mat1.rfi.n31)==0&amp;&amp;comp1.mat1.rfi.n12^2-comp1.mat1.rfi.ki12^2-2*j*comp1.mat1.rfi.n12*comp1.mat1.rfi.ki12+comp1.mat1.rfi.n22^2-comp1.mat1.rfi.ki22^2-2*j*comp1.mat1.rfi.n22*comp1.mat1.rfi.ki22+comp1.mat1.rfi.n32^2-comp1.mat1.rfi.ki32^2-2*j*comp1.mat1.rfi.n32*comp1.mat1.rfi.ki32==comp1.mat1.rfi.n11^2-comp1.mat1.rfi.ki11^2-2*j*comp1.mat1.rfi.n11*comp1.mat1.rfi.ki11+comp1.mat1.rfi.n21^2-comp1.mat1.rfi.ki21^2-2*j*comp1.mat1.rfi.n21*comp1.mat1.rfi.ki21+comp1.mat1.rfi.n31^2-comp1.mat1.rfi.ki31^2-2*j*comp1.mat1.rfi.n31*comp1.mat1.rfi.ki31&amp;&amp;comp1.mat1.rfi.n13*comp1.mat1.rfi.n12-comp1.mat1.rfi.ki13*comp1.mat1.rfi.ki12-j*(comp1.mat1.rfi.n13*comp1.mat1.rfi.ki12+comp1.mat1.rfi.ki13*comp1.mat1.rfi.n12)+comp1.mat1.rfi.n23*comp1.mat1.rfi.n22-comp1.mat1.rfi.ki23*comp1.mat1.rfi.ki22-j*(comp1.mat1.rfi.n23*comp1.mat1.rfi.ki22+comp1.mat1.rfi.ki23*comp1.mat1.rfi.n22)+comp1.mat1.rfi.n33*comp1.mat1.rfi.n32-comp1.mat1.rfi.ki33*comp1.mat1.rfi.ki32-j*(comp1.mat1.rfi.n33*comp1.mat1.rfi.ki32+comp1.mat1.rfi.ki33*comp1.mat1.rfi.n32)==0&amp;&amp;comp1.mat1.rfi.n13*comp1.mat1.rfi.n11-comp1.mat1.rfi.ki13*comp1.mat1.rfi.ki11-j*(comp1.mat1.rfi.n13*comp1.mat1.rfi.ki11+comp1.mat1.rfi.ki13*comp1.mat1.rfi.n11)+comp1.mat1.rfi.n23*comp1.mat1.rfi.n21-comp1.mat1.rfi.ki23*comp1.mat1.rfi.ki21-j*(comp1.mat1.rfi.n23*comp1.mat1.rfi.ki21+comp1.mat1.rfi.ki23*comp1.mat1.rfi.n21)+comp1.mat1.rfi.n33*comp1.mat1.rfi.n31-comp1.mat1.rfi.ki33*comp1.mat1.rfi.ki31-j*(comp1.mat1.rfi.n33*comp1.mat1.rfi.ki31+comp1.mat1.rfi.ki33*comp1.mat1.rfi.n31)==0&amp;&amp;comp1.mat1.rfi.n13*comp1.mat1.rfi.n12-comp1.mat1.rfi.ki13*comp1.mat1.rfi.ki12-j*(comp1.mat1.rfi.n13*comp1.mat1.rfi.ki12+comp1.mat1.rfi.ki13*comp1.mat1.rfi.n12)+comp1.mat1.rfi.n23*comp1.mat1.rfi.n22-comp1.mat1.rfi.ki23*comp1.mat1.rfi.ki22-j*(comp1.mat1.rfi.n23*comp1.mat1.rfi.ki22+comp1.mat1.rfi.ki23*comp1.mat1.rfi.n22)+comp1.mat1.rfi.n33*comp1.mat1.rfi.n32-comp1.mat1.rfi.ki33*comp1.mat1.rfi.ki32-j*(comp1.mat1.rfi.n33*comp1.mat1.rfi.ki32+comp1.mat1.rfi.ki33*comp1.mat1.rfi.n32)==0&amp;&amp;comp1.mat1.rfi.n13^2-comp1.mat1.rfi.ki13^2-2*j*comp1.mat1.rfi.n13*comp1.mat1.rfi.ki13+comp1.mat1.rfi.n23^2-comp1.mat1.rfi.ki23^2-2*j*comp1.mat1.rfi.n23*comp1.mat1.rfi.ki23+comp1.mat1.rfi.n33^2-comp1.mat1.rfi.ki33^2-2*j*comp1.mat1.rfi.n33*comp1.mat1.rfi.ki33==comp1.mat1.rfi.n11^2-comp1.mat1.rfi.ki11^2-2*j*comp1.mat1.rfi.n11*comp1.mat1.rfi.ki11+comp1.mat1.rfi.n21^2-comp1.mat1.rfi.ki21^2-2*j*comp1.mat1.rfi.n21*comp1.mat1.rfi.ki21+comp1.mat1.rfi.n31^2-comp1.mat1.rfi.ki31^2-2*j*comp1.mat1.rfi.n31*comp1.mat1.rfi.ki31,comp1.mat1.rfi.n11^2-comp1.mat1.rfi.ki11^2-2*j*comp1.mat1.rfi.n11*comp1.mat1.rfi.ki11+comp1.mat1.rfi.n21^2-comp1.mat1.rfi.ki21^2-2*j*comp1.mat1.rfi.n21*comp1.mat1.rfi.ki21+comp1.mat1.rfi.n31^2-comp1.mat1.rfi.ki31^2-2*j*comp1.mat1.rfi.n31*comp1.mat1.rfi.ki31,error('$base64:RmFpbGVkIHRvIGV2YWx1YXRlIGFuIGlzb3Ryb3BpYyB2YWx1ZSBvZiBhbiBhbmlzb3Ryb3BpYyB0ZW5zb3IAAAAAAAA='))</str> <str>comp1.mat1.def.epsilonr_symmetry</str> <str>79</str> <str>comp1.mat1.lstdf.tanDelta</str> <str>2*comp1.mat1.rfi.n_iso*comp1.mat1.rfi.ki_iso/(comp1.mat1.rfi.n_iso^2-comp1.mat1.rfi.ki_iso^2)</str> <str>comp1.mat1.lstdf.epsilonPrim11</str> <str>comp1.mat1.rfi.n_iso^2-comp1.mat1.rfi.ki_iso^2</str> <str>comp1.mat1.lstdf.epsilonPrim21</str> <str>0</str> <str>comp1.mat1.lstdf.epsilonPrim31</str> <str>0</str> <str>comp1.mat1.lstdf.epsilonPrim12</str> <str>0</str> <str>comp1.mat1.lstdf.epsilonPrim22</str> <str>comp1.mat1.rfi.n_iso^2-comp1.mat1.rfi.ki_iso^2</str> <str>comp1.mat1.lstdf.epsilonPrim32</str> <str>0</str> <str>comp1.mat1.lstdf.epsilonPrim13</str> <str>0</str> <str>comp1.mat1.lstdf.epsilonPrim23</str> <str>0</str> <str>comp1.mat1.lstdf.epsilonPrim33</str> <str>comp1.mat1.rfi.n_iso^2-comp1.mat1.rfi.ki_iso^2</str> <str>comp1.mat1.lstdf.epsilonPrim_iso</str> <str>comp1.mat1.rfi.n_iso^2-comp1.mat1.rfi.ki_iso^2</str> <str>comp1.mat1.lstdf.epsilonPrim_symmetry</str> <str>79</str> <str>comp1.mat1.del.epsilonPrim11</str> <str>comp1.mat1.rfi.n11^2-comp1.mat1.rfi.ki11^2+comp1.mat1.rfi.n21^2-comp1.mat1.rfi.ki21^2+comp1.mat1.rfi.n31^2-comp1.mat1.rfi.ki31^2</str> <str>comp1.mat1.del.epsilonPrim21</str> <str>comp1.mat1.rfi.n11*comp1.mat1.rfi.n12-comp1.mat1.rfi.ki11*comp1.mat1.rfi.ki12+comp1.mat1.rfi.n21*comp1.mat1.rfi.n22-comp1.mat1.rfi.ki21*comp1.mat1.rfi.ki22+comp1.mat1.rfi.n31*comp1.mat1.rfi.n32-comp1.mat1.rfi.ki31*comp1.mat1.rfi.ki32</str> <str>comp1.mat1.del.epsilonPrim31</str> <str>comp1.mat1.rfi.n11*comp1.mat1.rfi.n13-comp1.mat1.rfi.ki11*comp1.mat1.rfi.ki13+comp1.mat1.rfi.n21*comp1.mat1.rfi.n23-comp1.mat1.rfi.ki21*comp1.mat1.rfi.ki23+comp1.mat1.rfi.n31*comp1.mat1.rfi.n33-comp1.mat1.rfi.ki31*comp1.mat1.rfi.ki33</str> <str>comp1.mat1.del.epsilonPrim12</str> <str>comp1.mat1.rfi.n12*comp1.mat1.rfi.n11-comp1.mat1.rfi.ki12*comp1.mat1.rfi.ki11+comp1.mat1.rfi.n22*comp1.mat1.rfi.n21-comp1.mat1.rfi.ki22*comp1.mat1.rfi.ki21+comp1.mat1.rfi.n32*comp1.mat1.rfi.n31-comp1.mat1.rfi.ki32*comp1.mat1.rfi.ki31</str> <str>comp1.mat1.del.epsilonPrim22</str> <str>comp1.mat1.rfi.n12^2-comp1.mat1.rfi.ki12^2+comp1.mat1.rfi.n22^2-comp1.mat1.rfi.ki22^2+comp1.mat1.rfi.n32^2-comp1.mat1.rfi.ki32^2</str> <str>comp1.mat1.del.epsilonPrim32</str> <str>comp1.mat1.rfi.n12*comp1.mat1.rfi.n13-comp1.mat1.rfi.ki12*comp1.mat1.rfi.ki13+comp1.mat1.rfi.n22*comp1.mat1.rfi.n23-comp1.mat1.rfi.ki22*comp1.mat1.rfi.ki23+comp1.mat1.rfi.n32*comp1.mat1.rfi.n33-comp1.mat1.rfi.ki32*comp1.mat1.rfi.ki33</str> <str>comp1.mat1.del.epsilonPrim13</str> <str>comp1.mat1.rfi.n13*comp1.mat1.rfi.n11-comp1.mat1.rfi.ki13*comp1.mat1.rfi.ki11+comp1.mat1.rfi.n23*comp1.mat1.rfi.n21-comp1.mat1.rfi.ki23*comp1.mat1.rfi.ki21+comp1.mat1.rfi.n33*comp1.mat1.rfi.n31-comp1.mat1.rfi.ki33*comp1.mat1.rfi.ki31</str> <str>comp1.mat1.del.epsilonPrim23</str> <str>comp1.mat1.rfi.n13*comp1.mat1.rfi.n12-comp1.mat1.rfi.ki13*comp1.mat1.rfi.ki12+comp1.mat1.rfi.n23*comp1.mat1.rfi.n22-comp1.mat1.rfi.ki23*comp1.mat1.rfi.ki22+comp1.mat1.rfi.n33*comp1.mat1.rfi.n32-comp1.mat1.rfi.ki33*comp1.mat1.rfi.ki32</str> <str>comp1.mat1.del.epsilonPrim33</str> <str>comp1.mat1.rfi.n13^2-comp1.mat1.rfi.ki13^2+comp1.mat1.rfi.n23^2-comp1.mat1.rfi.ki23^2+comp1.mat1.rfi.n33^2-comp1.mat1.rfi.ki33^2</str> <str>comp1.mat1.del.epsilonPrim_iso</str> <str>if(comp1.mat1.rfi.n12*comp1.mat1.rfi.n11-comp1.mat1.rfi.ki12*comp1.mat1.rfi.ki11+comp1.mat1.rfi.n22*comp1.mat1.rfi.n21-comp1.mat1.rfi.ki22*comp1.mat1.rfi.ki21+comp1.mat1.rfi.n32*comp1.mat1.rfi.n31-comp1.mat1.rfi.ki32*comp1.mat1.rfi.ki31==0&amp;&amp;comp1.mat1.rfi.n13*comp1.mat1.rfi.n11-comp1.mat1.rfi.ki13*comp1.mat1.rfi.ki11+comp1.mat1.rfi.n23*comp1.mat1.rfi.n21-comp1.mat1.rfi.ki23*comp1.mat1.rfi.ki21+comp1.mat1.rfi.n33*comp1.mat1.rfi.n31-comp1.mat1.rfi.ki33*comp1.mat1.rfi.ki31==0&amp;&amp;comp1.mat1.rfi.n12*comp1.mat1.rfi.n11-comp1.mat1.rfi.ki12*comp1.mat1.rfi.ki11+comp1.mat1.rfi.n22*comp1.mat1.rfi.n21-comp1.mat1.rfi.ki22*comp1.mat1.rfi.ki21+comp1.mat1.rfi.n32*comp1.mat1.rfi.n31-comp1.mat1.rfi.ki32*comp1.mat1.rfi.ki31==0&amp;&amp;comp1.mat1.rfi.n12^2-comp1.mat1.rfi.ki12^2+comp1.mat1.rfi.n22^2-comp1.mat1.rfi.ki22^2+comp1.mat1.rfi.n32^2-comp1.mat1.rfi.ki32^2==comp1.mat1.rfi.n11^2-comp1.mat1.rfi.ki11^2+comp1.mat1.rfi.n21^2-comp1.mat1.rfi.ki21^2+comp1.mat1.rfi.n31^2-comp1.mat1.rfi.ki31^2&amp;&amp;comp1.mat1.rfi.n13*comp1.mat1.rfi.n12-comp1.mat1.rfi.ki13*comp1.mat1.rfi.ki12+comp1.mat1.rfi.n23*comp1.mat1.rfi.n22-comp1.mat1.rfi.ki23*comp1.mat1.rfi.ki22+comp1.mat1.rfi.n33*comp1.mat1.rfi.n32-comp1.mat1.rfi.ki33*comp1.mat1.rfi.ki32==0&amp;&amp;comp1.mat1.rfi.n13*comp1.mat1.rfi.n11-comp1.mat1.rfi.ki13*comp1.mat1.rfi.ki11+comp1.mat1.rfi.n23*comp1.mat1.rfi.n21-comp1.mat1.rfi.ki23*comp1.mat1.rfi.ki21+comp1.mat1.rfi.n33*comp1.mat1.rfi.n31-comp1.mat1.rfi.ki33*comp1.mat1.rfi.ki31==0&amp;&amp;comp1.mat1.rfi.n13*comp1.mat1.rfi.n12-comp1.mat1.rfi.ki13*comp1.mat1.rfi.ki12+comp1.mat1.rfi.n23*comp1.mat1.rfi.n22-comp1.mat1.rfi.ki23*comp1.mat1.rfi.ki22+comp1.mat1.rfi.n33*comp1.mat1.rfi.n32-comp1.mat1.rfi.ki33*comp1.mat1.rfi.ki32==0&amp;&amp;comp1.mat1.rfi.n13^2-comp1.mat1.rfi.ki13^2+comp1.mat1.rfi.n23^2-comp1.mat1.rfi.ki23^2+comp1.mat1.rfi.n33^2-comp1.mat1.rfi.ki33^2==comp1.mat1.rfi.n11^2-comp1.mat1.rfi.ki11^2+comp1.mat1.rfi.n21^2-comp1.mat1.rfi.ki21^2+comp1.mat1.rfi.n31^2-comp1.mat1.rfi.ki31^2,comp1.mat1.rfi.n11^2-comp1.mat1.rfi.ki11^2+comp1.mat1.rfi.n21^2-comp1.mat1.rfi.ki21^2+comp1.mat1.rfi.n31^2-comp1.mat1.rfi.ki31^2,error('$base64:RmFpbGVkIHRvIGV2YWx1YXRlIGFuIGlzb3Ryb3BpYyB2YWx1ZSBvZiBhbiBhbmlzb3Ryb3BpYyB0ZW5zb3IAAAAAAAA='))</str> <str>comp1.mat1.del.epsilonPrim_symmetry</str> <str>79</str> <str>comp1.mat1.del.epsilonBis11</str> <str>2*(comp1.mat1.rfi.n11*comp1.mat1.rfi.ki11+comp1.mat1.rfi.n21*comp1.mat1.rfi.ki21+comp1.mat1.rfi.n31*comp1.mat1.rfi.ki31)</str> <str>comp1.mat1.del.epsilonBis21</str> <str>comp1.mat1.rfi.n11*comp1.mat1.rfi.ki12+comp1.mat1.rfi.ki11*comp1.mat1.rfi.n12+comp1.mat1.rfi.n21*comp1.mat1.rfi.ki22+comp1.mat1.rfi.ki21*comp1.mat1.rfi.n22+comp1.mat1.rfi.n31*comp1.mat1.rfi.ki32+comp1.mat1.rfi.ki31*comp1.mat1.rfi.n32</str> <str>comp1.mat1.del.epsilonBis31</str> <str>comp1.mat1.rfi.n11*comp1.mat1.rfi.ki13+comp1.mat1.rfi.ki11*comp1.mat1.rfi.n13+comp1.mat1.rfi.n21*comp1.mat1.rfi.ki23+comp1.mat1.rfi.ki21*comp1.mat1.rfi.n23+comp1.mat1.rfi.n31*comp1.mat1.rfi.ki33+comp1.mat1.rfi.ki31*comp1.mat1.rfi.n33</str> <str>comp1.mat1.del.epsilonBis12</str> <str>comp1.mat1.rfi.n12*comp1.mat1.rfi.ki11+comp1.mat1.rfi.ki12*comp1.mat1.rfi.n11+comp1.mat1.rfi.n22*comp1.mat1.rfi.ki21+comp1.mat1.rfi.ki22*comp1.mat1.rfi.n21+comp1.mat1.rfi.n32*comp1.mat1.rfi.ki31+comp1.mat1.rfi.ki32*comp1.mat1.rfi.n31</str> <str>comp1.mat1.del.epsilonBis22</str> <str>2*(comp1.mat1.rfi.n12*comp1.mat1.rfi.ki12+comp1.mat1.rfi.n22*comp1.mat1.rfi.ki22+comp1.mat1.rfi.n32*comp1.mat1.rfi.ki32)</str> <str>comp1.mat1.del.epsilonBis32</str> <str>comp1.mat1.rfi.n12*comp1.mat1.rfi.ki13+comp1.mat1.rfi.ki12*comp1.mat1.rfi.n13+comp1.mat1.rfi.n22*comp1.mat1.rfi.ki23+comp1.mat1.rfi.ki22*comp1.mat1.rfi.n23+comp1.mat1.rfi.n32*comp1.mat1.rfi.ki33+comp1.mat1.rfi.ki32*comp1.mat1.rfi.n33</str> <str>comp1.mat1.del.epsilonBis13</str> <str>comp1.mat1.rfi.n13*comp1.mat1.rfi.ki11+comp1.mat1.rfi.ki13*comp1.mat1.rfi.n11+comp1.mat1.rfi.n23*comp1.mat1.rfi.ki21+comp1.mat1.rfi.ki23*comp1.mat1.rfi.n21+comp1.mat1.rfi.n33*comp1.mat1.rfi.ki31+comp1.mat1.rfi.ki33*comp1.mat1.rfi.n31</str> <str>comp1.mat1.del.epsilonBis23</str> <str>comp1.mat1.rfi.n13*comp1.mat1.rfi.ki12+comp1.mat1.rfi.ki13*comp1.mat1.rfi.n12+comp1.mat1.rfi.n23*comp1.mat1.rfi.ki22+comp1.mat1.rfi.ki23*comp1.mat1.rfi.n22+comp1.mat1.rfi.n33*comp1.mat1.rfi.ki32+comp1.mat1.rfi.ki33*comp1.mat1.rfi.n32</str> <str>comp1.mat1.del.epsilonBis33</str> <str>2*(comp1.mat1.rfi.n13*comp1.mat1.rfi.ki13+comp1.mat1.rfi.n23*comp1.mat1.rfi.ki23+comp1.mat1.rfi.n33*comp1.mat1.rfi.ki33)</str> <str>comp1.mat1.del.epsilonBis_iso</str> <str>if(comp1.mat1.rfi.n12*comp1.mat1.rfi.ki11+comp1.mat1.rfi.ki12*comp1.mat1.rfi.n11+comp1.mat1.rfi.n22*comp1.mat1.rfi.ki21+comp1.mat1.rfi.ki22*comp1.mat1.rfi.n21+comp1.mat1.rfi.n32*comp1.mat1.rfi.ki31+comp1.mat1.rfi.ki32*comp1.mat1.rfi.n31==0&amp;&amp;comp1.mat1.rfi.n13*comp1.mat1.rfi.ki11+comp1.mat1.rfi.ki13*comp1.mat1.rfi.n11+comp1.mat1.rfi.n23*comp1.mat1.rfi.ki21+comp1.mat1.rfi.ki23*comp1.mat1.rfi.n21+comp1.mat1.rfi.n33*comp1.mat1.rfi.ki31+comp1.mat1.rfi.ki33*comp1.mat1.rfi.n31==0&amp;&amp;comp1.mat1.rfi.n12*comp1.mat1.rfi.ki11+comp1.mat1.rfi.ki12*comp1.mat1.rfi.n11+comp1.mat1.rfi.n22*comp1.mat1.rfi.ki21+comp1.mat1.rfi.ki22*comp1.mat1.rfi.n21+comp1.mat1.rfi.n32*comp1.mat1.rfi.ki31+comp1.mat1.rfi.ki32*comp1.mat1.rfi.n31==0&amp;&amp;2*(comp1.mat1.rfi.n12*comp1.mat1.rfi.ki12+comp1.mat1.rfi.n22*comp1.mat1.rfi.ki22+comp1.mat1.rfi.n32*comp1.mat1.rfi.ki32)==2*(comp1.mat1.rfi.n11*comp1.mat1.rfi.ki11+comp1.mat1.rfi.n21*comp1.mat1.rfi.ki21+comp1.mat1.rfi.n31*comp1.mat1.rfi.ki31)&amp;&amp;comp1.mat1.rfi.n13*comp1.mat1.rfi.ki12+comp1.mat1.rfi.ki13*comp1.mat1.rfi.n12+comp1.mat1.rfi.n23*comp1.mat1.rfi.ki22+comp1.mat1.rfi.ki23*comp1.mat1.rfi.n22+comp1.mat1.rfi.n33*comp1.mat1.rfi.ki32+comp1.mat1.rfi.ki33*comp1.mat1.rfi.n32==0&amp;&amp;comp1.mat1.rfi.n13*comp1.mat1.rfi.ki11+comp1.mat1.rfi.ki13*comp1.mat1.rfi.n11+comp1.mat1.rfi.n23*comp1.mat1.rfi.ki21+comp1.mat1.rfi.ki23*comp1.mat1.rfi.n21+comp1.mat1.rfi.n33*comp1.mat1.rfi.ki31+comp1.mat1.rfi.ki33*comp1.mat1.rfi.n31==0&amp;&amp;comp1.mat1.rfi.n13*comp1.mat1.rfi.ki12+comp1.mat1.rfi.ki13*comp1.mat1.rfi.n12+comp1.mat1.rfi.n23*comp1.mat1.rfi.ki22+comp1.mat1.rfi.ki23*comp1.mat1.rfi.n22+comp1.mat1.rfi.n33*comp1.mat1.rfi.ki32+comp1.mat1.rfi.ki33*comp1.mat1.rfi.n32==0&amp;&amp;2*(comp1.mat1.rfi.n13*comp1.mat1.rfi.ki13+comp1.mat1.rfi.n23*comp1.mat1.rfi.ki23+comp1.mat1.rfi.n33*comp1.mat1.rfi.ki33)==2*(comp1.mat1.rfi.n11*comp1.mat1.rfi.ki11+comp1.mat1.rfi.n21*comp1.mat1.rfi.ki21+comp1.mat1.rfi.n31*comp1.mat1.rfi.ki31),2*(comp1.mat1.rfi.n11*comp1.mat1.rfi.ki11+comp1.mat1.rfi.n21*comp1.mat1.rfi.ki21+comp1.mat1.rfi.n31*comp1.mat1.rfi.ki31),error('$base64:RmFpbGVkIHRvIGV2YWx1YXRlIGFuIGlzb3Ryb3BpYyB2YWx1ZSBvZiBhbiBhbmlzb3Ryb3BpYyB0ZW5zb3IAAAAAAAA='))</str> <str>comp1.mat1.del.epsilonBis_symmetry</str> <str>79</str> </arr> </rec> P<?xml version="1.0" encoding="UTF-8"?> <rec> <str>elem</str> <str>elconst</str> <str>var</str> <arr> <str>comp1.mat2.rfi.n11</str> <str>n_Ag</str> <str>comp1.mat2.rfi.n21</str> <str>0</str> <str>comp1.mat2.rfi.n31</str> <str>0</str> <str>comp1.mat2.rfi.n12</str> <str>0</str> <str>comp1.mat2.rfi.n22</str> <str>n_Ag</str> <str>comp1.mat2.rfi.n32</str> <str>0</str> <str>comp1.mat2.rfi.n13</str> <str>0</str> <str>comp1.mat2.rfi.n23</str> <str>0</str> <str>comp1.mat2.rfi.n33</str> <str>n_Ag</str> <str>comp1.mat2.rfi.n_iso</str> <str>n_Ag</str> <str>comp1.mat2.rfi.n_symmetry</str> <str>0</str> <str>comp1.mat2.rfi.ki11</str> <str>0</str> <str>comp1.mat2.rfi.ki21</str> <str>0</str> <str>comp1.mat2.rfi.ki31</str> <str>0</str> <str>comp1.mat2.rfi.ki12</str> <str>0</str> <str>comp1.mat2.rfi.ki22</str> <str>0</str> <str>comp1.mat2.rfi.ki32</str> <str>0</str> <str>comp1.mat2.rfi.ki13</str> <str>0</str> <str>comp1.mat2.rfi.ki23</str> <str>0</str> <str>comp1.mat2.rfi.ki33</str> <str>0</str> <str>comp1.mat2.rfi.ki_iso</str> <str>0</str> <str>comp1.mat2.rfi.ki_symmetry</str> <str>0</str> <str>comp1.mat2.lst.epsilonPrim11</str> <str>comp1.mat2.rfi.n_iso^2-comp1.mat2.rfi.ki_iso^2</str> <str>comp1.mat2.lst.epsilonPrim21</str> <str>0</str> <str>comp1.mat2.lst.epsilonPrim31</str> <str>0</str> <str>comp1.mat2.lst.epsilonPrim12</str> <str>0</str> <str>comp1.mat2.lst.epsilonPrim22</str> <str>comp1.mat2.rfi.n_iso^2-comp1.mat2.rfi.ki_iso^2</str> <str>comp1.mat2.lst.epsilonPrim32</str> <str>0</str> <str>comp1.mat2.lst.epsilonPrim13</str> <str>0</str> <str>comp1.mat2.lst.epsilonPrim23</str> <str>0</str> <str>comp1.mat2.lst.epsilonPrim33</str> <str>comp1.mat2.rfi.n_iso^2-comp1.mat2.rfi.ki_iso^2</str> <str>comp1.mat2.lst.epsilonPrim_iso</str> <str>comp1.mat2.rfi.n_iso^2-comp1.mat2.rfi.ki_iso^2</str> <str>comp1.mat2.lst.epsilonPrim_symmetry</str> <str>79</str> <str>comp1.mat2.lst.delta</str> <str>atan2(2*comp1.mat2.rfi.n_iso*comp1.mat2.rfi.ki_iso,comp1.mat2.rfi.n_iso^2-comp1.mat2.rfi.ki_iso^2)*unit_rad_cf</str> <str>comp1.mat2.def.epsilonr11</str> <str>comp1.mat2.rfi.n11^2-comp1.mat2.rfi.ki11^2-2*j*comp1.mat2.rfi.n11*comp1.mat2.rfi.ki11+comp1.mat2.rfi.n21^2-comp1.mat2.rfi.ki21^2-2*j*comp1.mat2.rfi.n21*comp1.mat2.rfi.ki21+comp1.mat2.rfi.n31^2-comp1.mat2.rfi.ki31^2-2*j*comp1.mat2.rfi.n31*comp1.mat2.rfi.ki31</str> <str>comp1.mat2.def.epsilonr21</str> <str>comp1.mat2.rfi.n11*comp1.mat2.rfi.n12-comp1.mat2.rfi.ki11*comp1.mat2.rfi.ki12-j*(comp1.mat2.rfi.n11*comp1.mat2.rfi.ki12+comp1.mat2.rfi.ki11*comp1.mat2.rfi.n12)+comp1.mat2.rfi.n21*comp1.mat2.rfi.n22-comp1.mat2.rfi.ki21*comp1.mat2.rfi.ki22-j*(comp1.mat2.rfi.n21*comp1.mat2.rfi.ki22+comp1.mat2.rfi.ki21*comp1.mat2.rfi.n22)+comp1.mat2.rfi.n31*comp1.mat2.rfi.n32-comp1.mat2.rfi.ki31*comp1.mat2.rfi.ki32-j*(comp1.mat2.rfi.n31*comp1.mat2.rfi.ki32+comp1.mat2.rfi.ki31*comp1.mat2.rfi.n32)</str> <str>comp1.mat2.def.epsilonr31</str> <str>comp1.mat2.rfi.n11*comp1.mat2.rfi.n13-comp1.mat2.rfi.ki11*comp1.mat2.rfi.ki13-j*(comp1.mat2.rfi.n11*comp1.mat2.rfi.ki13+comp1.mat2.rfi.ki11*comp1.mat2.rfi.n13)+comp1.mat2.rfi.n21*comp1.mat2.rfi.n23-comp1.mat2.rfi.ki21*comp1.mat2.rfi.ki23-j*(comp1.mat2.rfi.n21*comp1.mat2.rfi.ki23+comp1.mat2.rfi.ki21*comp1.mat2.rfi.n23)+comp1.mat2.rfi.n31*comp1.mat2.rfi.n33-comp1.mat2.rfi.ki31*comp1.mat2.rfi.ki33-j*(comp1.mat2.rfi.n31*comp1.mat2.rfi.ki33+comp1.mat2.rfi.ki31*comp1.mat2.rfi.n33)</str> <str>comp1.mat2.def.epsilonr12</str> <str>comp1.mat2.rfi.n12*comp1.mat2.rfi.n11-comp1.mat2.rfi.ki12*comp1.mat2.rfi.ki11-j*(comp1.mat2.rfi.n12*comp1.mat2.rfi.ki11+comp1.mat2.rfi.ki12*comp1.mat2.rfi.n11)+comp1.mat2.rfi.n22*comp1.mat2.rfi.n21-comp1.mat2.rfi.ki22*comp1.mat2.rfi.ki21-j*(comp1.mat2.rfi.n22*comp1.mat2.rfi.ki21+comp1.mat2.rfi.ki22*comp1.mat2.rfi.n21)+comp1.mat2.rfi.n32*comp1.mat2.rfi.n31-comp1.mat2.rfi.ki32*comp1.mat2.rfi.ki31-j*(comp1.mat2.rfi.n32*comp1.mat2.rfi.ki31+comp1.mat2.rfi.ki32*comp1.mat2.rfi.n31)</str> <str>comp1.mat2.def.epsilonr22</str> <str>comp1.mat2.rfi.n12^2-comp1.mat2.rfi.ki12^2-2*j*comp1.mat2.rfi.n12*comp1.mat2.rfi.ki12+comp1.mat2.rfi.n22^2-comp1.mat2.rfi.ki22^2-2*j*comp1.mat2.rfi.n22*comp1.mat2.rfi.ki22+comp1.mat2.rfi.n32^2-comp1.mat2.rfi.ki32^2-2*j*comp1.mat2.rfi.n32*comp1.mat2.rfi.ki32</str> <str>comp1.mat2.def.epsilonr32</str> <str>comp1.mat2.rfi.n12*comp1.mat2.rfi.n13-comp1.mat2.rfi.ki12*comp1.mat2.rfi.ki13-j*(comp1.mat2.rfi.n12*comp1.mat2.rfi.ki13+comp1.mat2.rfi.ki12*comp1.mat2.rfi.n13)+comp1.mat2.rfi.n22*comp1.mat2.rfi.n23-comp1.mat2.rfi.ki22*comp1.mat2.rfi.ki23-j*(comp1.mat2.rfi.n22*comp1.mat2.rfi.ki23+comp1.mat2.rfi.ki22*comp1.mat2.rfi.n23)+comp1.mat2.rfi.n32*comp1.mat2.rfi.n33-comp1.mat2.rfi.ki32*comp1.mat2.rfi.ki33-j*(comp1.mat2.rfi.n32*comp1.mat2.rfi.ki33+comp1.mat2.rfi.ki32*comp1.mat2.rfi.n33)</str> <str>comp1.mat2.def.epsilonr13</str> <str>comp1.mat2.rfi.n13*comp1.mat2.rfi.n11-comp1.mat2.rfi.ki13*comp1.mat2.rfi.ki11-j*(comp1.mat2.rfi.n13*comp1.mat2.rfi.ki11+comp1.mat2.rfi.ki13*comp1.mat2.rfi.n11)+comp1.mat2.rfi.n23*comp1.mat2.rfi.n21-comp1.mat2.rfi.ki23*comp1.mat2.rfi.ki21-j*(comp1.mat2.rfi.n23*comp1.mat2.rfi.ki21+comp1.mat2.rfi.ki23*comp1.mat2.rfi.n21)+comp1.mat2.rfi.n33*comp1.mat2.rfi.n31-comp1.mat2.rfi.ki33*comp1.mat2.rfi.ki31-j*(comp1.mat2.rfi.n33*comp1.mat2.rfi.ki31+comp1.mat2.rfi.ki33*comp1.mat2.rfi.n31)</str> <str>comp1.mat2.def.epsilonr23</str> <str>comp1.mat2.rfi.n13*comp1.mat2.rfi.n12-comp1.mat2.rfi.ki13*comp1.mat2.rfi.ki12-j*(comp1.mat2.rfi.n13*comp1.mat2.rfi.ki12+comp1.mat2.rfi.ki13*comp1.mat2.rfi.n12)+comp1.mat2.rfi.n23*comp1.mat2.rfi.n22-comp1.mat2.rfi.ki23*comp1.mat2.rfi.ki22-j*(comp1.mat2.rfi.n23*comp1.mat2.rfi.ki22+comp1.mat2.rfi.ki23*comp1.mat2.rfi.n22)+comp1.mat2.rfi.n33*comp1.mat2.rfi.n32-comp1.mat2.rfi.ki33*comp1.mat2.rfi.ki32-j*(comp1.mat2.rfi.n33*comp1.mat2.rfi.ki32+comp1.mat2.rfi.ki33*comp1.mat2.rfi.n32)</str> <str>comp1.mat2.def.epsilonr33</str> <str>comp1.mat2.rfi.n13^2-comp1.mat2.rfi.ki13^2-2*j*comp1.mat2.rfi.n13*comp1.mat2.rfi.ki13+comp1.mat2.rfi.n23^2-comp1.mat2.rfi.ki23^2-2*j*comp1.mat2.rfi.n23*comp1.mat2.rfi.ki23+comp1.mat2.rfi.n33^2-comp1.mat2.rfi.ki33^2-2*j*comp1.mat2.rfi.n33*comp1.mat2.rfi.ki33</str> <str>comp1.mat2.def.epsilonr_iso</str> <str>if(comp1.mat2.rfi.n12*comp1.mat2.rfi.n11-comp1.mat2.rfi.ki12*comp1.mat2.rfi.ki11-j*(comp1.mat2.rfi.n12*comp1.mat2.rfi.ki11+comp1.mat2.rfi.ki12*comp1.mat2.rfi.n11)+comp1.mat2.rfi.n22*comp1.mat2.rfi.n21-comp1.mat2.rfi.ki22*comp1.mat2.rfi.ki21-j*(comp1.mat2.rfi.n22*comp1.mat2.rfi.ki21+comp1.mat2.rfi.ki22*comp1.mat2.rfi.n21)+comp1.mat2.rfi.n32*comp1.mat2.rfi.n31-comp1.mat2.rfi.ki32*comp1.mat2.rfi.ki31-j*(comp1.mat2.rfi.n32*comp1.mat2.rfi.ki31+comp1.mat2.rfi.ki32*comp1.mat2.rfi.n31)==0&amp;&amp;comp1.mat2.rfi.n13*comp1.mat2.rfi.n11-comp1.mat2.rfi.ki13*comp1.mat2.rfi.ki11-j*(comp1.mat2.rfi.n13*comp1.mat2.rfi.ki11+comp1.mat2.rfi.ki13*comp1.mat2.rfi.n11)+comp1.mat2.rfi.n23*comp1.mat2.rfi.n21-comp1.mat2.rfi.ki23*comp1.mat2.rfi.ki21-j*(comp1.mat2.rfi.n23*comp1.mat2.rfi.ki21+comp1.mat2.rfi.ki23*comp1.mat2.rfi.n21)+comp1.mat2.rfi.n33*comp1.mat2.rfi.n31-comp1.mat2.rfi.ki33*comp1.mat2.rfi.ki31-j*(comp1.mat2.rfi.n33*comp1.mat2.rfi.ki31+comp1.mat2.rfi.ki33*comp1.mat2.rfi.n31)==0&amp;&amp;comp1.mat2.rfi.n12*comp1.mat2.rfi.n11-comp1.mat2.rfi.ki12*comp1.mat2.rfi.ki11-j*(comp1.mat2.rfi.n12*comp1.mat2.rfi.ki11+comp1.mat2.rfi.ki12*comp1.mat2.rfi.n11)+comp1.mat2.rfi.n22*comp1.mat2.rfi.n21-comp1.mat2.rfi.ki22*comp1.mat2.rfi.ki21-j*(comp1.mat2.rfi.n22*comp1.mat2.rfi.ki21+comp1.mat2.rfi.ki22*comp1.mat2.rfi.n21)+comp1.mat2.rfi.n32*comp1.mat2.rfi.n31-comp1.mat2.rfi.ki32*comp1.mat2.rfi.ki31-j*(comp1.mat2.rfi.n32*comp1.mat2.rfi.ki31+comp1.mat2.rfi.ki32*comp1.mat2.rfi.n31)==0&amp;&amp;comp1.mat2.rfi.n12^2-comp1.mat2.rfi.ki12^2-2*j*comp1.mat2.rfi.n12*comp1.mat2.rfi.ki12+comp1.mat2.rfi.n22^2-comp1.mat2.rfi.ki22^2-2*j*comp1.mat2.rfi.n22*comp1.mat2.rfi.ki22+comp1.mat2.rfi.n32^2-comp1.mat2.rfi.ki32^2-2*j*comp1.mat2.rfi.n32*comp1.mat2.rfi.ki32==comp1.mat2.rfi.n11^2-comp1.mat2.rfi.ki11^2-2*j*comp1.mat2.rfi.n11*comp1.mat2.rfi.ki11+comp1.mat2.rfi.n21^2-comp1.mat2.rfi.ki21^2-2*j*comp1.mat2.rfi.n21*comp1.mat2.rfi.ki21+comp1.mat2.rfi.n31^2-comp1.mat2.rfi.ki31^2-2*j*comp1.mat2.rfi.n31*comp1.mat2.rfi.ki31&amp;&amp;comp1.mat2.rfi.n13*comp1.mat2.rfi.n12-comp1.mat2.rfi.ki13*comp1.mat2.rfi.ki12-j*(comp1.mat2.rfi.n13*comp1.mat2.rfi.ki12+comp1.mat2.rfi.ki13*comp1.mat2.rfi.n12)+comp1.mat2.rfi.n23*comp1.mat2.rfi.n22-comp1.mat2.rfi.ki23*comp1.mat2.rfi.ki22-j*(comp1.mat2.rfi.n23*comp1.mat2.rfi.ki22+comp1.mat2.rfi.ki23*comp1.mat2.rfi.n22)+comp1.mat2.rfi.n33*comp1.mat2.rfi.n32-comp1.mat2.rfi.ki33*comp1.mat2.rfi.ki32-j*(comp1.mat2.rfi.n33*comp1.mat2.rfi.ki32+comp1.mat2.rfi.ki33*comp1.mat2.rfi.n32)==0&amp;&amp;comp1.mat2.rfi.n13*comp1.mat2.rfi.n11-comp1.mat2.rfi.ki13*comp1.mat2.rfi.ki11-j*(comp1.mat2.rfi.n13*comp1.mat2.rfi.ki11+comp1.mat2.rfi.ki13*comp1.mat2.rfi.n11)+comp1.mat2.rfi.n23*comp1.mat2.rfi.n21-comp1.mat2.rfi.ki23*comp1.mat2.rfi.ki21-j*(comp1.mat2.rfi.n23*comp1.mat2.rfi.ki21+comp1.mat2.rfi.ki23*comp1.mat2.rfi.n21)+comp1.mat2.rfi.n33*comp1.mat2.rfi.n31-comp1.mat2.rfi.ki33*comp1.mat2.rfi.ki31-j*(comp1.mat2.rfi.n33*comp1.mat2.rfi.ki31+comp1.mat2.rfi.ki33*comp1.mat2.rfi.n31)==0&amp;&amp;comp1.mat2.rfi.n13*comp1.mat2.rfi.n12-comp1.mat2.rfi.ki13*comp1.mat2.rfi.ki12-j*(comp1.mat2.rfi.n13*comp1.mat2.rfi.ki12+comp1.mat2.rfi.ki13*comp1.mat2.rfi.n12)+comp1.mat2.rfi.n23*comp1.mat2.rfi.n22-comp1.mat2.rfi.ki23*comp1.mat2.rfi.ki22-j*(comp1.mat2.rfi.n23*comp1.mat2.rfi.ki22+comp1.mat2.rfi.ki23*comp1.mat2.rfi.n22)+comp1.mat2.rfi.n33*comp1.mat2.rfi.n32-comp1.mat2.rfi.ki33*comp1.mat2.rfi.ki32-j*(comp1.mat2.rfi.n33*comp1.mat2.rfi.ki32+comp1.mat2.rfi.ki33*comp1.mat2.rfi.n32)==0&amp;&amp;comp1.mat2.rfi.n13^2-comp1.mat2.rfi.ki13^2-2*j*comp1.mat2.rfi.n13*comp1.mat2.rfi.ki13+comp1.mat2.rfi.n23^2-comp1.mat2.rfi.ki23^2-2*j*comp1.mat2.rfi.n23*comp1.mat2.rfi.ki23+comp1.mat2.rfi.n33^2-comp1.mat2.rfi.ki33^2-2*j*comp1.mat2.rfi.n33*comp1.mat2.rfi.ki33==comp1.mat2.rfi.n11^2-comp1.mat2.rfi.ki11^2-2*j*comp1.mat2.rfi.n11*comp1.mat2.rfi.ki11+comp1.mat2.rfi.n21^2-comp1.mat2.rfi.ki21^2-2*j*comp1.mat2.rfi.n21*comp1.mat2.rfi.ki21+comp1.mat2.rfi.n31^2-comp1.mat2.rfi.ki31^2-2*j*comp1.mat2.rfi.n31*comp1.mat2.rfi.ki31,comp1.mat2.rfi.n11^2-comp1.mat2.rfi.ki11^2-2*j*comp1.mat2.rfi.n11*comp1.mat2.rfi.ki11+comp1.mat2.rfi.n21^2-comp1.mat2.rfi.ki21^2-2*j*comp1.mat2.rfi.n21*comp1.mat2.rfi.ki21+comp1.mat2.rfi.n31^2-comp1.mat2.rfi.ki31^2-2*j*comp1.mat2.rfi.n31*comp1.mat2.rfi.ki31,error('$base64:RmFpbGVkIHRvIGV2YWx1YXRlIGFuIGlzb3Ryb3BpYyB2YWx1ZSBvZiBhbiBhbmlzb3Ryb3BpYyB0ZW5zb3IAAAAAAAA='))</str> <str>comp1.mat2.def.epsilonr_symmetry</str> <str>79</str> <str>comp1.mat2.lstdf.tanDelta</str> <str>2*comp1.mat2.rfi.n_iso*comp1.mat2.rfi.ki_iso/(comp1.mat2.rfi.n_iso^2-comp1.mat2.rfi.ki_iso^2)</str> <str>comp1.mat2.lstdf.epsilonPrim11</str> <str>comp1.mat2.rfi.n_iso^2-comp1.mat2.rfi.ki_iso^2</str> <str>comp1.mat2.lstdf.epsilonPrim21</str> <str>0</str> <str>comp1.mat2.lstdf.epsilonPrim31</str> <str>0</str> <str>comp1.mat2.lstdf.epsilonPrim12</str> <str>0</str> <str>comp1.mat2.lstdf.epsilonPrim22</str> <str>comp1.mat2.rfi.n_iso^2-comp1.mat2.rfi.ki_iso^2</str> <str>comp1.mat2.lstdf.epsilonPrim32</str> <str>0</str> <str>comp1.mat2.lstdf.epsilonPrim13</str> <str>0</str> <str>comp1.mat2.lstdf.epsilonPrim23</str> <str>0</str> <str>comp1.mat2.lstdf.epsilonPrim33</str> <str>comp1.mat2.rfi.n_iso^2-comp1.mat2.rfi.ki_iso^2</str> <str>comp1.mat2.lstdf.epsilonPrim_iso</str> <str>comp1.mat2.rfi.n_iso^2-comp1.mat2.rfi.ki_iso^2</str> <str>comp1.mat2.lstdf.epsilonPrim_symmetry</str> <str>79</str> <str>comp1.mat2.del.epsilonPrim11</str> <str>comp1.mat2.rfi.n11^2-comp1.mat2.rfi.ki11^2+comp1.mat2.rfi.n21^2-comp1.mat2.rfi.ki21^2+comp1.mat2.rfi.n31^2-comp1.mat2.rfi.ki31^2</str> <str>comp1.mat2.del.epsilonPrim21</str> <str>comp1.mat2.rfi.n11*comp1.mat2.rfi.n12-comp1.mat2.rfi.ki11*comp1.mat2.rfi.ki12+comp1.mat2.rfi.n21*comp1.mat2.rfi.n22-comp1.mat2.rfi.ki21*comp1.mat2.rfi.ki22+comp1.mat2.rfi.n31*comp1.mat2.rfi.n32-comp1.mat2.rfi.ki31*comp1.mat2.rfi.ki32</str> <str>comp1.mat2.del.epsilonPrim31</str> <str>comp1.mat2.rfi.n11*comp1.mat2.rfi.n13-comp1.mat2.rfi.ki11*comp1.mat2.rfi.ki13+comp1.mat2.rfi.n21*comp1.mat2.rfi.n23-comp1.mat2.rfi.ki21*comp1.mat2.rfi.ki23+comp1.mat2.rfi.n31*comp1.mat2.rfi.n33-comp1.mat2.rfi.ki31*comp1.mat2.rfi.ki33</str> <str>comp1.mat2.del.epsilonPrim12</str> <str>comp1.mat2.rfi.n12*comp1.mat2.rfi.n11-comp1.mat2.rfi.ki12*comp1.mat2.rfi.ki11+comp1.mat2.rfi.n22*comp1.mat2.rfi.n21-comp1.mat2.rfi.ki22*comp1.mat2.rfi.ki21+comp1.mat2.rfi.n32*comp1.mat2.rfi.n31-comp1.mat2.rfi.ki32*comp1.mat2.rfi.ki31</str> <str>comp1.mat2.del.epsilonPrim22</str> <str>comp1.mat2.rfi.n12^2-comp1.mat2.rfi.ki12^2+comp1.mat2.rfi.n22^2-comp1.mat2.rfi.ki22^2+comp1.mat2.rfi.n32^2-comp1.mat2.rfi.ki32^2</str> <str>comp1.mat2.del.epsilonPrim32</str> <str>comp1.mat2.rfi.n12*comp1.mat2.rfi.n13-comp1.mat2.rfi.ki12*comp1.mat2.rfi.ki13+comp1.mat2.rfi.n22*comp1.mat2.rfi.n23-comp1.mat2.rfi.ki22*comp1.mat2.rfi.ki23+comp1.mat2.rfi.n32*comp1.mat2.rfi.n33-comp1.mat2.rfi.ki32*comp1.mat2.rfi.ki33</str> <str>comp1.mat2.del.epsilonPrim13</str> <str>comp1.mat2.rfi.n13*comp1.mat2.rfi.n11-comp1.mat2.rfi.ki13*comp1.mat2.rfi.ki11+comp1.mat2.rfi.n23*comp1.mat2.rfi.n21-comp1.mat2.rfi.ki23*comp1.mat2.rfi.ki21+comp1.mat2.rfi.n33*comp1.mat2.rfi.n31-comp1.mat2.rfi.ki33*comp1.mat2.rfi.ki31</str> <str>comp1.mat2.del.epsilonPrim23</str> <str>comp1.mat2.rfi.n13*comp1.mat2.rfi.n12-comp1.mat2.rfi.ki13*comp1.mat2.rfi.ki12+comp1.mat2.rfi.n23*comp1.mat2.rfi.n22-comp1.mat2.rfi.ki23*comp1.mat2.rfi.ki22+comp1.mat2.rfi.n33*comp1.mat2.rfi.n32-comp1.mat2.rfi.ki33*comp1.mat2.rfi.ki32</str> <str>comp1.mat2.del.epsilonPrim33</str> <str>comp1.mat2.rfi.n13^2-comp1.mat2.rfi.ki13^2+comp1.mat2.rfi.n23^2-comp1.mat2.rfi.ki23^2+comp1.mat2.rfi.n33^2-comp1.mat2.rfi.ki33^2</str> <str>comp1.mat2.del.epsilonPrim_iso</str> <str>if(comp1.mat2.rfi.n12*comp1.mat2.rfi.n11-comp1.mat2.rfi.ki12*comp1.mat2.rfi.ki11+comp1.mat2.rfi.n22*comp1.mat2.rfi.n21-comp1.mat2.rfi.ki22*comp1.mat2.rfi.ki21+comp1.mat2.rfi.n32*comp1.mat2.rfi.n31-comp1.mat2.rfi.ki32*comp1.mat2.rfi.ki31==0&amp;&amp;comp1.mat2.rfi.n13*comp1.mat2.rfi.n11-comp1.mat2.rfi.ki13*comp1.mat2.rfi.ki11+comp1.mat2.rfi.n23*comp1.mat2.rfi.n21-comp1.mat2.rfi.ki23*comp1.mat2.rfi.ki21+comp1.mat2.rfi.n33*comp1.mat2.rfi.n31-comp1.mat2.rfi.ki33*comp1.mat2.rfi.ki31==0&amp;&amp;comp1.mat2.rfi.n12*comp1.mat2.rfi.n11-comp1.mat2.rfi.ki12*comp1.mat2.rfi.ki11+comp1.mat2.rfi.n22*comp1.mat2.rfi.n21-comp1.mat2.rfi.ki22*comp1.mat2.rfi.ki21+comp1.mat2.rfi.n32*comp1.mat2.rfi.n31-comp1.mat2.rfi.ki32*comp1.mat2.rfi.ki31==0&amp;&amp;comp1.mat2.rfi.n12^2-comp1.mat2.rfi.ki12^2+comp1.mat2.rfi.n22^2-comp1.mat2.rfi.ki22^2+comp1.mat2.rfi.n32^2-comp1.mat2.rfi.ki32^2==comp1.mat2.rfi.n11^2-comp1.mat2.rfi.ki11^2+comp1.mat2.rfi.n21^2-comp1.mat2.rfi.ki21^2+comp1.mat2.rfi.n31^2-comp1.mat2.rfi.ki31^2&amp;&amp;comp1.mat2.rfi.n13*comp1.mat2.rfi.n12-comp1.mat2.rfi.ki13*comp1.mat2.rfi.ki12+comp1.mat2.rfi.n23*comp1.mat2.rfi.n22-comp1.mat2.rfi.ki23*comp1.mat2.rfi.ki22+comp1.mat2.rfi.n33*comp1.mat2.rfi.n32-comp1.mat2.rfi.ki33*comp1.mat2.rfi.ki32==0&amp;&amp;comp1.mat2.rfi.n13*comp1.mat2.rfi.n11-comp1.mat2.rfi.ki13*comp1.mat2.rfi.ki11+comp1.mat2.rfi.n23*comp1.mat2.rfi.n21-comp1.mat2.rfi.ki23*comp1.mat2.rfi.ki21+comp1.mat2.rfi.n33*comp1.mat2.rfi.n31-comp1.mat2.rfi.ki33*comp1.mat2.rfi.ki31==0&amp;&amp;comp1.mat2.rfi.n13*comp1.mat2.rfi.n12-comp1.mat2.rfi.ki13*comp1.mat2.rfi.ki12+comp1.mat2.rfi.n23*comp1.mat2.rfi.n22-comp1.mat2.rfi.ki23*comp1.mat2.rfi.ki22+comp1.mat2.rfi.n33*comp1.mat2.rfi.n32-comp1.mat2.rfi.ki33*comp1.mat2.rfi.ki32==0&amp;&amp;comp1.mat2.rfi.n13^2-comp1.mat2.rfi.ki13^2+comp1.mat2.rfi.n23^2-comp1.mat2.rfi.ki23^2+comp1.mat2.rfi.n33^2-comp1.mat2.rfi.ki33^2==comp1.mat2.rfi.n11^2-comp1.mat2.rfi.ki11^2+comp1.mat2.rfi.n21^2-comp1.mat2.rfi.ki21^2+comp1.mat2.rfi.n31^2-comp1.mat2.rfi.ki31^2,comp1.mat2.rfi.n11^2-comp1.mat2.rfi.ki11^2+comp1.mat2.rfi.n21^2-comp1.mat2.rfi.ki21^2+comp1.mat2.rfi.n31^2-comp1.mat2.rfi.ki31^2,error('$base64:RmFpbGVkIHRvIGV2YWx1YXRlIGFuIGlzb3Ryb3BpYyB2YWx1ZSBvZiBhbiBhbmlzb3Ryb3BpYyB0ZW5zb3IAAAAAAAA='))</str> <str>comp1.mat2.del.epsilonPrim_symmetry</str> <str>79</str> <str>comp1.mat2.del.epsilonBis11</str> <str>2*(comp1.mat2.rfi.n11*comp1.mat2.rfi.ki11+comp1.mat2.rfi.n21*comp1.mat2.rfi.ki21+comp1.mat2.rfi.n31*comp1.mat2.rfi.ki31)</str> <str>comp1.mat2.del.epsilonBis21</str> <str>comp1.mat2.rfi.n11*comp1.mat2.rfi.ki12+comp1.mat2.rfi.ki11*comp1.mat2.rfi.n12+comp1.mat2.rfi.n21*comp1.mat2.rfi.ki22+comp1.mat2.rfi.ki21*comp1.mat2.rfi.n22+comp1.mat2.rfi.n31*comp1.mat2.rfi.ki32+comp1.mat2.rfi.ki31*comp1.mat2.rfi.n32</str> <str>comp1.mat2.del.epsilonBis31</str> <str>comp1.mat2.rfi.n11*comp1.mat2.rfi.ki13+comp1.mat2.rfi.ki11*comp1.mat2.rfi.n13+comp1.mat2.rfi.n21*comp1.mat2.rfi.ki23+comp1.mat2.rfi.ki21*comp1.mat2.rfi.n23+comp1.mat2.rfi.n31*comp1.mat2.rfi.ki33+comp1.mat2.rfi.ki31*comp1.mat2.rfi.n33</str> <str>comp1.mat2.del.epsilonBis12</str> <str>comp1.mat2.rfi.n12*comp1.mat2.rfi.ki11+comp1.mat2.rfi.ki12*comp1.mat2.rfi.n11+comp1.mat2.rfi.n22*comp1.mat2.rfi.ki21+comp1.mat2.rfi.ki22*comp1.mat2.rfi.n21+comp1.mat2.rfi.n32*comp1.mat2.rfi.ki31+comp1.mat2.rfi.ki32*comp1.mat2.rfi.n31</str> <str>comp1.mat2.del.epsilonBis22</str> <str>2*(comp1.mat2.rfi.n12*comp1.mat2.rfi.ki12+comp1.mat2.rfi.n22*comp1.mat2.rfi.ki22+comp1.mat2.rfi.n32*comp1.mat2.rfi.ki32)</str> <str>comp1.mat2.del.epsilonBis32</str> <str>comp1.mat2.rfi.n12*comp1.mat2.rfi.ki13+comp1.mat2.rfi.ki12*comp1.mat2.rfi.n13+comp1.mat2.rfi.n22*comp1.mat2.rfi.ki23+comp1.mat2.rfi.ki22*comp1.mat2.rfi.n23+comp1.mat2.rfi.n32*comp1.mat2.rfi.ki33+comp1.mat2.rfi.ki32*comp1.mat2.rfi.n33</str> <str>comp1.mat2.del.epsilonBis13</str> <str>comp1.mat2.rfi.n13*comp1.mat2.rfi.ki11+comp1.mat2.rfi.ki13*comp1.mat2.rfi.n11+comp1.mat2.rfi.n23*comp1.mat2.rfi.ki21+comp1.mat2.rfi.ki23*comp1.mat2.rfi.n21+comp1.mat2.rfi.n33*comp1.mat2.rfi.ki31+comp1.mat2.rfi.ki33*comp1.mat2.rfi.n31</str> <str>comp1.mat2.del.epsilonBis23</str> <str>comp1.mat2.rfi.n13*comp1.mat2.rfi.ki12+comp1.mat2.rfi.ki13*comp1.mat2.rfi.n12+comp1.mat2.rfi.n23*comp1.mat2.rfi.ki22+comp1.mat2.rfi.ki23*comp1.mat2.rfi.n22+comp1.mat2.rfi.n33*comp1.mat2.rfi.ki32+comp1.mat2.rfi.ki33*comp1.mat2.rfi.n32</str> <str>comp1.mat2.del.epsilonBis33</str> <str>2*(comp1.mat2.rfi.n13*comp1.mat2.rfi.ki13+comp1.mat2.rfi.n23*comp1.mat2.rfi.ki23+comp1.mat2.rfi.n33*comp1.mat2.rfi.ki33)</str> <str>comp1.mat2.del.epsilonBis_iso</str> <str>if(comp1.mat2.rfi.n12*comp1.mat2.rfi.ki11+comp1.mat2.rfi.ki12*comp1.mat2.rfi.n11+comp1.mat2.rfi.n22*comp1.mat2.rfi.ki21+comp1.mat2.rfi.ki22*comp1.mat2.rfi.n21+comp1.mat2.rfi.n32*comp1.mat2.rfi.ki31+comp1.mat2.rfi.ki32*comp1.mat2.rfi.n31==0&amp;&amp;comp1.mat2.rfi.n13*comp1.mat2.rfi.ki11+comp1.mat2.rfi.ki13*comp1.mat2.rfi.n11+comp1.mat2.rfi.n23*comp1.mat2.rfi.ki21+comp1.mat2.rfi.ki23*comp1.mat2.rfi.n21+comp1.mat2.rfi.n33*comp1.mat2.rfi.ki31+comp1.mat2.rfi.ki33*comp1.mat2.rfi.n31==0&amp;&amp;comp1.mat2.rfi.n12*comp1.mat2.rfi.ki11+comp1.mat2.rfi.ki12*comp1.mat2.rfi.n11+comp1.mat2.rfi.n22*comp1.mat2.rfi.ki21+comp1.mat2.rfi.ki22*comp1.mat2.rfi.n21+comp1.mat2.rfi.n32*comp1.mat2.rfi.ki31+comp1.mat2.rfi.ki32*comp1.mat2.rfi.n31==0&amp;&amp;2*(comp1.mat2.rfi.n12*comp1.mat2.rfi.ki12+comp1.mat2.rfi.n22*comp1.mat2.rfi.ki22+comp1.mat2.rfi.n32*comp1.mat2.rfi.ki32)==2*(comp1.mat2.rfi.n11*comp1.mat2.rfi.ki11+comp1.mat2.rfi.n21*comp1.mat2.rfi.ki21+comp1.mat2.rfi.n31*comp1.mat2.rfi.ki31)&amp;&amp;comp1.mat2.rfi.n13*comp1.mat2.rfi.ki12+comp1.mat2.rfi.ki13*comp1.mat2.rfi.n12+comp1.mat2.rfi.n23*comp1.mat2.rfi.ki22+comp1.mat2.rfi.ki23*comp1.mat2.rfi.n22+comp1.mat2.rfi.n33*comp1.mat2.rfi.ki32+comp1.mat2.rfi.ki33*comp1.mat2.rfi.n32==0&amp;&amp;comp1.mat2.rfi.n13*comp1.mat2.rfi.ki11+comp1.mat2.rfi.ki13*comp1.mat2.rfi.n11+comp1.mat2.rfi.n23*comp1.mat2.rfi.ki21+comp1.mat2.rfi.ki23*comp1.mat2.rfi.n21+comp1.mat2.rfi.n33*comp1.mat2.rfi.ki31+comp1.mat2.rfi.ki33*comp1.mat2.rfi.n31==0&amp;&amp;comp1.mat2.rfi.n13*comp1.mat2.rfi.ki12+comp1.mat2.rfi.ki13*comp1.mat2.rfi.n12+comp1.mat2.rfi.n23*comp1.mat2.rfi.ki22+comp1.mat2.rfi.ki23*comp1.mat2.rfi.n22+comp1.mat2.rfi.n33*comp1.mat2.rfi.ki32+comp1.mat2.rfi.ki33*comp1.mat2.rfi.n32==0&amp;&amp;2*(comp1.mat2.rfi.n13*comp1.mat2.rfi.ki13+comp1.mat2.rfi.n23*comp1.mat2.rfi.ki23+comp1.mat2.rfi.n33*comp1.mat2.rfi.ki33)==2*(comp1.mat2.rfi.n11*comp1.mat2.rfi.ki11+comp1.mat2.rfi.n21*comp1.mat2.rfi.ki21+comp1.mat2.rfi.n31*comp1.mat2.rfi.ki31),2*(comp1.mat2.rfi.n11*comp1.mat2.rfi.ki11+comp1.mat2.rfi.n21*comp1.mat2.rfi.ki21+comp1.mat2.rfi.n31*comp1.mat2.rfi.ki31),error('$base64:RmFpbGVkIHRvIGV2YWx1YXRlIGFuIGlzb3Ryb3BpYyB2YWx1ZSBvZiBhbiBhbmlzb3Ryb3BpYyB0ZW5zb3IAAAAAAAA='))</str> <str>comp1.mat2.del.epsilonBis_symmetry</str> <str>79</str> </arr> </rec> P<?xml version="1.0" encoding="UTF-8"?> <rec> <str>elem</str> <str>elconst</str> <str>var</str> <arr> <str>comp1.mat3.rfi.n11</str> <str>n_air</str> <str>comp1.mat3.rfi.n21</str> <str>0</str> <str>comp1.mat3.rfi.n31</str> <str>0</str> <str>comp1.mat3.rfi.n12</str> <str>0</str> <str>comp1.mat3.rfi.n22</str> <str>n_air</str> <str>comp1.mat3.rfi.n32</str> <str>0</str> <str>comp1.mat3.rfi.n13</str> <str>0</str> <str>comp1.mat3.rfi.n23</str> <str>0</str> <str>comp1.mat3.rfi.n33</str> <str>n_air</str> <str>comp1.mat3.rfi.n_iso</str> <str>n_air</str> <str>comp1.mat3.rfi.n_symmetry</str> <str>0</str> <str>comp1.mat3.rfi.ki11</str> <str>0</str> <str>comp1.mat3.rfi.ki21</str> <str>0</str> <str>comp1.mat3.rfi.ki31</str> <str>0</str> <str>comp1.mat3.rfi.ki12</str> <str>0</str> <str>comp1.mat3.rfi.ki22</str> <str>0</str> <str>comp1.mat3.rfi.ki32</str> <str>0</str> <str>comp1.mat3.rfi.ki13</str> <str>0</str> <str>comp1.mat3.rfi.ki23</str> <str>0</str> <str>comp1.mat3.rfi.ki33</str> <str>0</str> <str>comp1.mat3.rfi.ki_iso</str> <str>0</str> <str>comp1.mat3.rfi.ki_symmetry</str> <str>0</str> <str>comp1.mat3.lst.epsilonPrim11</str> <str>comp1.mat3.rfi.n_iso^2-comp1.mat3.rfi.ki_iso^2</str> <str>comp1.mat3.lst.epsilonPrim21</str> <str>0</str> <str>comp1.mat3.lst.epsilonPrim31</str> <str>0</str> <str>comp1.mat3.lst.epsilonPrim12</str> <str>0</str> <str>comp1.mat3.lst.epsilonPrim22</str> <str>comp1.mat3.rfi.n_iso^2-comp1.mat3.rfi.ki_iso^2</str> <str>comp1.mat3.lst.epsilonPrim32</str> <str>0</str> <str>comp1.mat3.lst.epsilonPrim13</str> <str>0</str> <str>comp1.mat3.lst.epsilonPrim23</str> <str>0</str> <str>comp1.mat3.lst.epsilonPrim33</str> <str>comp1.mat3.rfi.n_iso^2-comp1.mat3.rfi.ki_iso^2</str> <str>comp1.mat3.lst.epsilonPrim_iso</str> <str>comp1.mat3.rfi.n_iso^2-comp1.mat3.rfi.ki_iso^2</str> <str>comp1.mat3.lst.epsilonPrim_symmetry</str> <str>79</str> <str>comp1.mat3.lst.delta</str> <str>atan2(2*comp1.mat3.rfi.n_iso*comp1.mat3.rfi.ki_iso,comp1.mat3.rfi.n_iso^2-comp1.mat3.rfi.ki_iso^2)*unit_rad_cf</str> <str>comp1.mat3.def.epsilonr11</str> <str>comp1.mat3.rfi.n11^2-comp1.mat3.rfi.ki11^2-2*j*comp1.mat3.rfi.n11*comp1.mat3.rfi.ki11+comp1.mat3.rfi.n21^2-comp1.mat3.rfi.ki21^2-2*j*comp1.mat3.rfi.n21*comp1.mat3.rfi.ki21+comp1.mat3.rfi.n31^2-comp1.mat3.rfi.ki31^2-2*j*comp1.mat3.rfi.n31*comp1.mat3.rfi.ki31</str> <str>comp1.mat3.def.epsilonr21</str> <str>comp1.mat3.rfi.n11*comp1.mat3.rfi.n12-comp1.mat3.rfi.ki11*comp1.mat3.rfi.ki12-j*(comp1.mat3.rfi.n11*comp1.mat3.rfi.ki12+comp1.mat3.rfi.ki11*comp1.mat3.rfi.n12)+comp1.mat3.rfi.n21*comp1.mat3.rfi.n22-comp1.mat3.rfi.ki21*comp1.mat3.rfi.ki22-j*(comp1.mat3.rfi.n21*comp1.mat3.rfi.ki22+comp1.mat3.rfi.ki21*comp1.mat3.rfi.n22)+comp1.mat3.rfi.n31*comp1.mat3.rfi.n32-comp1.mat3.rfi.ki31*comp1.mat3.rfi.ki32-j*(comp1.mat3.rfi.n31*comp1.mat3.rfi.ki32+comp1.mat3.rfi.ki31*comp1.mat3.rfi.n32)</str> <str>comp1.mat3.def.epsilonr31</str> <str>comp1.mat3.rfi.n11*comp1.mat3.rfi.n13-comp1.mat3.rfi.ki11*comp1.mat3.rfi.ki13-j*(comp1.mat3.rfi.n11*comp1.mat3.rfi.ki13+comp1.mat3.rfi.ki11*comp1.mat3.rfi.n13)+comp1.mat3.rfi.n21*comp1.mat3.rfi.n23-comp1.mat3.rfi.ki21*comp1.mat3.rfi.ki23-j*(comp1.mat3.rfi.n21*comp1.mat3.rfi.ki23+comp1.mat3.rfi.ki21*comp1.mat3.rfi.n23)+comp1.mat3.rfi.n31*comp1.mat3.rfi.n33-comp1.mat3.rfi.ki31*comp1.mat3.rfi.ki33-j*(comp1.mat3.rfi.n31*comp1.mat3.rfi.ki33+comp1.mat3.rfi.ki31*comp1.mat3.rfi.n33)</str> <str>comp1.mat3.def.epsilonr12</str> <str>comp1.mat3.rfi.n12*comp1.mat3.rfi.n11-comp1.mat3.rfi.ki12*comp1.mat3.rfi.ki11-j*(comp1.mat3.rfi.n12*comp1.mat3.rfi.ki11+comp1.mat3.rfi.ki12*comp1.mat3.rfi.n11)+comp1.mat3.rfi.n22*comp1.mat3.rfi.n21-comp1.mat3.rfi.ki22*comp1.mat3.rfi.ki21-j*(comp1.mat3.rfi.n22*comp1.mat3.rfi.ki21+comp1.mat3.rfi.ki22*comp1.mat3.rfi.n21)+comp1.mat3.rfi.n32*comp1.mat3.rfi.n31-comp1.mat3.rfi.ki32*comp1.mat3.rfi.ki31-j*(comp1.mat3.rfi.n32*comp1.mat3.rfi.ki31+comp1.mat3.rfi.ki32*comp1.mat3.rfi.n31)</str> <str>comp1.mat3.def.epsilonr22</str> <str>comp1.mat3.rfi.n12^2-comp1.mat3.rfi.ki12^2-2*j*comp1.mat3.rfi.n12*comp1.mat3.rfi.ki12+comp1.mat3.rfi.n22^2-comp1.mat3.rfi.ki22^2-2*j*comp1.mat3.rfi.n22*comp1.mat3.rfi.ki22+comp1.mat3.rfi.n32^2-comp1.mat3.rfi.ki32^2-2*j*comp1.mat3.rfi.n32*comp1.mat3.rfi.ki32</str> <str>comp1.mat3.def.epsilonr32</str> <str>comp1.mat3.rfi.n12*comp1.mat3.rfi.n13-comp1.mat3.rfi.ki12*comp1.mat3.rfi.ki13-j*(comp1.mat3.rfi.n12*comp1.mat3.rfi.ki13+comp1.mat3.rfi.ki12*comp1.mat3.rfi.n13)+comp1.mat3.rfi.n22*comp1.mat3.rfi.n23-comp1.mat3.rfi.ki22*comp1.mat3.rfi.ki23-j*(comp1.mat3.rfi.n22*comp1.mat3.rfi.ki23+comp1.mat3.rfi.ki22*comp1.mat3.rfi.n23)+comp1.mat3.rfi.n32*comp1.mat3.rfi.n33-comp1.mat3.rfi.ki32*comp1.mat3.rfi.ki33-j*(comp1.mat3.rfi.n32*comp1.mat3.rfi.ki33+comp1.mat3.rfi.ki32*comp1.mat3.rfi.n33)</str> <str>comp1.mat3.def.epsilonr13</str> <str>comp1.mat3.rfi.n13*comp1.mat3.rfi.n11-comp1.mat3.rfi.ki13*comp1.mat3.rfi.ki11-j*(comp1.mat3.rfi.n13*comp1.mat3.rfi.ki11+comp1.mat3.rfi.ki13*comp1.mat3.rfi.n11)+comp1.mat3.rfi.n23*comp1.mat3.rfi.n21-comp1.mat3.rfi.ki23*comp1.mat3.rfi.ki21-j*(comp1.mat3.rfi.n23*comp1.mat3.rfi.ki21+comp1.mat3.rfi.ki23*comp1.mat3.rfi.n21)+comp1.mat3.rfi.n33*comp1.mat3.rfi.n31-comp1.mat3.rfi.ki33*comp1.mat3.rfi.ki31-j*(comp1.mat3.rfi.n33*comp1.mat3.rfi.ki31+comp1.mat3.rfi.ki33*comp1.mat3.rfi.n31)</str> <str>comp1.mat3.def.epsilonr23</str> <str>comp1.mat3.rfi.n13*comp1.mat3.rfi.n12-comp1.mat3.rfi.ki13*comp1.mat3.rfi.ki12-j*(comp1.mat3.rfi.n13*comp1.mat3.rfi.ki12+comp1.mat3.rfi.ki13*comp1.mat3.rfi.n12)+comp1.mat3.rfi.n23*comp1.mat3.rfi.n22-comp1.mat3.rfi.ki23*comp1.mat3.rfi.ki22-j*(comp1.mat3.rfi.n23*comp1.mat3.rfi.ki22+comp1.mat3.rfi.ki23*comp1.mat3.rfi.n22)+comp1.mat3.rfi.n33*comp1.mat3.rfi.n32-comp1.mat3.rfi.ki33*comp1.mat3.rfi.ki32-j*(comp1.mat3.rfi.n33*comp1.mat3.rfi.ki32+comp1.mat3.rfi.ki33*comp1.mat3.rfi.n32)</str> <str>comp1.mat3.def.epsilonr33</str> <str>comp1.mat3.rfi.n13^2-comp1.mat3.rfi.ki13^2-2*j*comp1.mat3.rfi.n13*comp1.mat3.rfi.ki13+comp1.mat3.rfi.n23^2-comp1.mat3.rfi.ki23^2-2*j*comp1.mat3.rfi.n23*comp1.mat3.rfi.ki23+comp1.mat3.rfi.n33^2-comp1.mat3.rfi.ki33^2-2*j*comp1.mat3.rfi.n33*comp1.mat3.rfi.ki33</str> <str>comp1.mat3.def.epsilonr_iso</str> <str>if(comp1.mat3.rfi.n12*comp1.mat3.rfi.n11-comp1.mat3.rfi.ki12*comp1.mat3.rfi.ki11-j*(comp1.mat3.rfi.n12*comp1.mat3.rfi.ki11+comp1.mat3.rfi.ki12*comp1.mat3.rfi.n11)+comp1.mat3.rfi.n22*comp1.mat3.rfi.n21-comp1.mat3.rfi.ki22*comp1.mat3.rfi.ki21-j*(comp1.mat3.rfi.n22*comp1.mat3.rfi.ki21+comp1.mat3.rfi.ki22*comp1.mat3.rfi.n21)+comp1.mat3.rfi.n32*comp1.mat3.rfi.n31-comp1.mat3.rfi.ki32*comp1.mat3.rfi.ki31-j*(comp1.mat3.rfi.n32*comp1.mat3.rfi.ki31+comp1.mat3.rfi.ki32*comp1.mat3.rfi.n31)==0&amp;&amp;comp1.mat3.rfi.n13*comp1.mat3.rfi.n11-comp1.mat3.rfi.ki13*comp1.mat3.rfi.ki11-j*(comp1.mat3.rfi.n13*comp1.mat3.rfi.ki11+comp1.mat3.rfi.ki13*comp1.mat3.rfi.n11)+comp1.mat3.rfi.n23*comp1.mat3.rfi.n21-comp1.mat3.rfi.ki23*comp1.mat3.rfi.ki21-j*(comp1.mat3.rfi.n23*comp1.mat3.rfi.ki21+comp1.mat3.rfi.ki23*comp1.mat3.rfi.n21)+comp1.mat3.rfi.n33*comp1.mat3.rfi.n31-comp1.mat3.rfi.ki33*comp1.mat3.rfi.ki31-j*(comp1.mat3.rfi.n33*comp1.mat3.rfi.ki31+comp1.mat3.rfi.ki33*comp1.mat3.rfi.n31)==0&amp;&amp;comp1.mat3.rfi.n12*comp1.mat3.rfi.n11-comp1.mat3.rfi.ki12*comp1.mat3.rfi.ki11-j*(comp1.mat3.rfi.n12*comp1.mat3.rfi.ki11+comp1.mat3.rfi.ki12*comp1.mat3.rfi.n11)+comp1.mat3.rfi.n22*comp1.mat3.rfi.n21-comp1.mat3.rfi.ki22*comp1.mat3.rfi.ki21-j*(comp1.mat3.rfi.n22*comp1.mat3.rfi.ki21+comp1.mat3.rfi.ki22*comp1.mat3.rfi.n21)+comp1.mat3.rfi.n32*comp1.mat3.rfi.n31-comp1.mat3.rfi.ki32*comp1.mat3.rfi.ki31-j*(comp1.mat3.rfi.n32*comp1.mat3.rfi.ki31+comp1.mat3.rfi.ki32*comp1.mat3.rfi.n31)==0&amp;&amp;comp1.mat3.rfi.n12^2-comp1.mat3.rfi.ki12^2-2*j*comp1.mat3.rfi.n12*comp1.mat3.rfi.ki12+comp1.mat3.rfi.n22^2-comp1.mat3.rfi.ki22^2-2*j*comp1.mat3.rfi.n22*comp1.mat3.rfi.ki22+comp1.mat3.rfi.n32^2-comp1.mat3.rfi.ki32^2-2*j*comp1.mat3.rfi.n32*comp1.mat3.rfi.ki32==comp1.mat3.rfi.n11^2-comp1.mat3.rfi.ki11^2-2*j*comp1.mat3.rfi.n11*comp1.mat3.rfi.ki11+comp1.mat3.rfi.n21^2-comp1.mat3.rfi.ki21^2-2*j*comp1.mat3.rfi.n21*comp1.mat3.rfi.ki21+comp1.mat3.rfi.n31^2-comp1.mat3.rfi.ki31^2-2*j*comp1.mat3.rfi.n31*comp1.mat3.rfi.ki31&amp;&amp;comp1.mat3.rfi.n13*comp1.mat3.rfi.n12-comp1.mat3.rfi.ki13*comp1.mat3.rfi.ki12-j*(comp1.mat3.rfi.n13*comp1.mat3.rfi.ki12+comp1.mat3.rfi.ki13*comp1.mat3.rfi.n12)+comp1.mat3.rfi.n23*comp1.mat3.rfi.n22-comp1.mat3.rfi.ki23*comp1.mat3.rfi.ki22-j*(comp1.mat3.rfi.n23*comp1.mat3.rfi.ki22+comp1.mat3.rfi.ki23*comp1.mat3.rfi.n22)+comp1.mat3.rfi.n33*comp1.mat3.rfi.n32-comp1.mat3.rfi.ki33*comp1.mat3.rfi.ki32-j*(comp1.mat3.rfi.n33*comp1.mat3.rfi.ki32+comp1.mat3.rfi.ki33*comp1.mat3.rfi.n32)==0&amp;&amp;comp1.mat3.rfi.n13*comp1.mat3.rfi.n11-comp1.mat3.rfi.ki13*comp1.mat3.rfi.ki11-j*(comp1.mat3.rfi.n13*comp1.mat3.rfi.ki11+comp1.mat3.rfi.ki13*comp1.mat3.rfi.n11)+comp1.mat3.rfi.n23*comp1.mat3.rfi.n21-comp1.mat3.rfi.ki23*comp1.mat3.rfi.ki21-j*(comp1.mat3.rfi.n23*comp1.mat3.rfi.ki21+comp1.mat3.rfi.ki23*comp1.mat3.rfi.n21)+comp1.mat3.rfi.n33*comp1.mat3.rfi.n31-comp1.mat3.rfi.ki33*comp1.mat3.rfi.ki31-j*(comp1.mat3.rfi.n33*comp1.mat3.rfi.ki31+comp1.mat3.rfi.ki33*comp1.mat3.rfi.n31)==0&amp;&amp;comp1.mat3.rfi.n13*comp1.mat3.rfi.n12-comp1.mat3.rfi.ki13*comp1.mat3.rfi.ki12-j*(comp1.mat3.rfi.n13*comp1.mat3.rfi.ki12+comp1.mat3.rfi.ki13*comp1.mat3.rfi.n12)+comp1.mat3.rfi.n23*comp1.mat3.rfi.n22-comp1.mat3.rfi.ki23*comp1.mat3.rfi.ki22-j*(comp1.mat3.rfi.n23*comp1.mat3.rfi.ki22+comp1.mat3.rfi.ki23*comp1.mat3.rfi.n22)+comp1.mat3.rfi.n33*comp1.mat3.rfi.n32-comp1.mat3.rfi.ki33*comp1.mat3.rfi.ki32-j*(comp1.mat3.rfi.n33*comp1.mat3.rfi.ki32+comp1.mat3.rfi.ki33*comp1.mat3.rfi.n32)==0&amp;&amp;comp1.mat3.rfi.n13^2-comp1.mat3.rfi.ki13^2-2*j*comp1.mat3.rfi.n13*comp1.mat3.rfi.ki13+comp1.mat3.rfi.n23^2-comp1.mat3.rfi.ki23^2-2*j*comp1.mat3.rfi.n23*comp1.mat3.rfi.ki23+comp1.mat3.rfi.n33^2-comp1.mat3.rfi.ki33^2-2*j*comp1.mat3.rfi.n33*comp1.mat3.rfi.ki33==comp1.mat3.rfi.n11^2-comp1.mat3.rfi.ki11^2-2*j*comp1.mat3.rfi.n11*comp1.mat3.rfi.ki11+comp1.mat3.rfi.n21^2-comp1.mat3.rfi.ki21^2-2*j*comp1.mat3.rfi.n21*comp1.mat3.rfi.ki21+comp1.mat3.rfi.n31^2-comp1.mat3.rfi.ki31^2-2*j*comp1.mat3.rfi.n31*comp1.mat3.rfi.ki31,comp1.mat3.rfi.n11^2-comp1.mat3.rfi.ki11^2-2*j*comp1.mat3.rfi.n11*comp1.mat3.rfi.ki11+comp1.mat3.rfi.n21^2-comp1.mat3.rfi.ki21^2-2*j*comp1.mat3.rfi.n21*comp1.mat3.rfi.ki21+comp1.mat3.rfi.n31^2-comp1.mat3.rfi.ki31^2-2*j*comp1.mat3.rfi.n31*comp1.mat3.rfi.ki31,error('$base64:RmFpbGVkIHRvIGV2YWx1YXRlIGFuIGlzb3Ryb3BpYyB2YWx1ZSBvZiBhbiBhbmlzb3Ryb3BpYyB0ZW5zb3IAAAAAAAA='))</str> <str>comp1.mat3.def.epsilonr_symmetry</str> <str>79</str> <str>comp1.mat3.lstdf.tanDelta</str> <str>2*comp1.mat3.rfi.n_iso*comp1.mat3.rfi.ki_iso/(comp1.mat3.rfi.n_iso^2-comp1.mat3.rfi.ki_iso^2)</str> <str>comp1.mat3.lstdf.epsilonPrim11</str> <str>comp1.mat3.rfi.n_iso^2-comp1.mat3.rfi.ki_iso^2</str> <str>comp1.mat3.lstdf.epsilonPrim21</str> <str>0</str> <str>comp1.mat3.lstdf.epsilonPrim31</str> <str>0</str> <str>comp1.mat3.lstdf.epsilonPrim12</str> <str>0</str> <str>comp1.mat3.lstdf.epsilonPrim22</str> <str>comp1.mat3.rfi.n_iso^2-comp1.mat3.rfi.ki_iso^2</str> <str>comp1.mat3.lstdf.epsilonPrim32</str> <str>0</str> <str>comp1.mat3.lstdf.epsilonPrim13</str> <str>0</str> <str>comp1.mat3.lstdf.epsilonPrim23</str> <str>0</str> <str>comp1.mat3.lstdf.epsilonPrim33</str> <str>comp1.mat3.rfi.n_iso^2-comp1.mat3.rfi.ki_iso^2</str> <str>comp1.mat3.lstdf.epsilonPrim_iso</str> <str>comp1.mat3.rfi.n_iso^2-comp1.mat3.rfi.ki_iso^2</str> <str>comp1.mat3.lstdf.epsilonPrim_symmetry</str> <str>79</str> <str>comp1.mat3.del.epsilonPrim11</str> <str>comp1.mat3.rfi.n11^2-comp1.mat3.rfi.ki11^2+comp1.mat3.rfi.n21^2-comp1.mat3.rfi.ki21^2+comp1.mat3.rfi.n31^2-comp1.mat3.rfi.ki31^2</str> <str>comp1.mat3.del.epsilonPrim21</str> <str>comp1.mat3.rfi.n11*comp1.mat3.rfi.n12-comp1.mat3.rfi.ki11*comp1.mat3.rfi.ki12+comp1.mat3.rfi.n21*comp1.mat3.rfi.n22-comp1.mat3.rfi.ki21*comp1.mat3.rfi.ki22+comp1.mat3.rfi.n31*comp1.mat3.rfi.n32-comp1.mat3.rfi.ki31*comp1.mat3.rfi.ki32</str> <str>comp1.mat3.del.epsilonPrim31</str> <str>comp1.mat3.rfi.n11*comp1.mat3.rfi.n13-comp1.mat3.rfi.ki11*comp1.mat3.rfi.ki13+comp1.mat3.rfi.n21*comp1.mat3.rfi.n23-comp1.mat3.rfi.ki21*comp1.mat3.rfi.ki23+comp1.mat3.rfi.n31*comp1.mat3.rfi.n33-comp1.mat3.rfi.ki31*comp1.mat3.rfi.ki33</str> <str>comp1.mat3.del.epsilonPrim12</str> <str>comp1.mat3.rfi.n12*comp1.mat3.rfi.n11-comp1.mat3.rfi.ki12*comp1.mat3.rfi.ki11+comp1.mat3.rfi.n22*comp1.mat3.rfi.n21-comp1.mat3.rfi.ki22*comp1.mat3.rfi.ki21+comp1.mat3.rfi.n32*comp1.mat3.rfi.n31-comp1.mat3.rfi.ki32*comp1.mat3.rfi.ki31</str> <str>comp1.mat3.del.epsilonPrim22</str> <str>comp1.mat3.rfi.n12^2-comp1.mat3.rfi.ki12^2+comp1.mat3.rfi.n22^2-comp1.mat3.rfi.ki22^2+comp1.mat3.rfi.n32^2-comp1.mat3.rfi.ki32^2</str> <str>comp1.mat3.del.epsilonPrim32</str> <str>comp1.mat3.rfi.n12*comp1.mat3.rfi.n13-comp1.mat3.rfi.ki12*comp1.mat3.rfi.ki13+comp1.mat3.rfi.n22*comp1.mat3.rfi.n23-comp1.mat3.rfi.ki22*comp1.mat3.rfi.ki23+comp1.mat3.rfi.n32*comp1.mat3.rfi.n33-comp1.mat3.rfi.ki32*comp1.mat3.rfi.ki33</str> <str>comp1.mat3.del.epsilonPrim13</str> <str>comp1.mat3.rfi.n13*comp1.mat3.rfi.n11-comp1.mat3.rfi.ki13*comp1.mat3.rfi.ki11+comp1.mat3.rfi.n23*comp1.mat3.rfi.n21-comp1.mat3.rfi.ki23*comp1.mat3.rfi.ki21+comp1.mat3.rfi.n33*comp1.mat3.rfi.n31-comp1.mat3.rfi.ki33*comp1.mat3.rfi.ki31</str> <str>comp1.mat3.del.epsilonPrim23</str> <str>comp1.mat3.rfi.n13*comp1.mat3.rfi.n12-comp1.mat3.rfi.ki13*comp1.mat3.rfi.ki12+comp1.mat3.rfi.n23*comp1.mat3.rfi.n22-comp1.mat3.rfi.ki23*comp1.mat3.rfi.ki22+comp1.mat3.rfi.n33*comp1.mat3.rfi.n32-comp1.mat3.rfi.ki33*comp1.mat3.rfi.ki32</str> <str>comp1.mat3.del.epsilonPrim33</str> <str>comp1.mat3.rfi.n13^2-comp1.mat3.rfi.ki13^2+comp1.mat3.rfi.n23^2-comp1.mat3.rfi.ki23^2+comp1.mat3.rfi.n33^2-comp1.mat3.rfi.ki33^2</str> <str>comp1.mat3.del.epsilonPrim_iso</str> <str>if(comp1.mat3.rfi.n12*comp1.mat3.rfi.n11-comp1.mat3.rfi.ki12*comp1.mat3.rfi.ki11+comp1.mat3.rfi.n22*comp1.mat3.rfi.n21-comp1.mat3.rfi.ki22*comp1.mat3.rfi.ki21+comp1.mat3.rfi.n32*comp1.mat3.rfi.n31-comp1.mat3.rfi.ki32*comp1.mat3.rfi.ki31==0&amp;&amp;comp1.mat3.rfi.n13*comp1.mat3.rfi.n11-comp1.mat3.rfi.ki13*comp1.mat3.rfi.ki11+comp1.mat3.rfi.n23*comp1.mat3.rfi.n21-comp1.mat3.rfi.ki23*comp1.mat3.rfi.ki21+comp1.mat3.rfi.n33*comp1.mat3.rfi.n31-comp1.mat3.rfi.ki33*comp1.mat3.rfi.ki31==0&amp;&amp;comp1.mat3.rfi.n12*comp1.mat3.rfi.n11-comp1.mat3.rfi.ki12*comp1.mat3.rfi.ki11+comp1.mat3.rfi.n22*comp1.mat3.rfi.n21-comp1.mat3.rfi.ki22*comp1.mat3.rfi.ki21+comp1.mat3.rfi.n32*comp1.mat3.rfi.n31-comp1.mat3.rfi.ki32*comp1.mat3.rfi.ki31==0&amp;&amp;comp1.mat3.rfi.n12^2-comp1.mat3.rfi.ki12^2+comp1.mat3.rfi.n22^2-comp1.mat3.rfi.ki22^2+comp1.mat3.rfi.n32^2-comp1.mat3.rfi.ki32^2==comp1.mat3.rfi.n11^2-comp1.mat3.rfi.ki11^2+comp1.mat3.rfi.n21^2-comp1.mat3.rfi.ki21^2+comp1.mat3.rfi.n31^2-comp1.mat3.rfi.ki31^2&amp;&amp;comp1.mat3.rfi.n13*comp1.mat3.rfi.n12-comp1.mat3.rfi.ki13*comp1.mat3.rfi.ki12+comp1.mat3.rfi.n23*comp1.mat3.rfi.n22-comp1.mat3.rfi.ki23*comp1.mat3.rfi.ki22+comp1.mat3.rfi.n33*comp1.mat3.rfi.n32-comp1.mat3.rfi.ki33*comp1.mat3.rfi.ki32==0&amp;&amp;comp1.mat3.rfi.n13*comp1.mat3.rfi.n11-comp1.mat3.rfi.ki13*comp1.mat3.rfi.ki11+comp1.mat3.rfi.n23*comp1.mat3.rfi.n21-comp1.mat3.rfi.ki23*comp1.mat3.rfi.ki21+comp1.mat3.rfi.n33*comp1.mat3.rfi.n31-comp1.mat3.rfi.ki33*comp1.mat3.rfi.ki31==0&amp;&amp;comp1.mat3.rfi.n13*comp1.mat3.rfi.n12-comp1.mat3.rfi.ki13*comp1.mat3.rfi.ki12+comp1.mat3.rfi.n23*comp1.mat3.rfi.n22-comp1.mat3.rfi.ki23*comp1.mat3.rfi.ki22+comp1.mat3.rfi.n33*comp1.mat3.rfi.n32-comp1.mat3.rfi.ki33*comp1.mat3.rfi.ki32==0&amp;&amp;comp1.mat3.rfi.n13^2-comp1.mat3.rfi.ki13^2+comp1.mat3.rfi.n23^2-comp1.mat3.rfi.ki23^2+comp1.mat3.rfi.n33^2-comp1.mat3.rfi.ki33^2==comp1.mat3.rfi.n11^2-comp1.mat3.rfi.ki11^2+comp1.mat3.rfi.n21^2-comp1.mat3.rfi.ki21^2+comp1.mat3.rfi.n31^2-comp1.mat3.rfi.ki31^2,comp1.mat3.rfi.n11^2-comp1.mat3.rfi.ki11^2+comp1.mat3.rfi.n21^2-comp1.mat3.rfi.ki21^2+comp1.mat3.rfi.n31^2-comp1.mat3.rfi.ki31^2,error('$base64:RmFpbGVkIHRvIGV2YWx1YXRlIGFuIGlzb3Ryb3BpYyB2YWx1ZSBvZiBhbiBhbmlzb3Ryb3BpYyB0ZW5zb3IAAAAAAAA='))</str> <str>comp1.mat3.del.epsilonPrim_symmetry</str> <str>79</str> <str>comp1.mat3.del.epsilonBis11</str> <str>2*(comp1.mat3.rfi.n11*comp1.mat3.rfi.ki11+comp1.mat3.rfi.n21*comp1.mat3.rfi.ki21+comp1.mat3.rfi.n31*comp1.mat3.rfi.ki31)</str> <str>comp1.mat3.del.epsilonBis21</str> <str>comp1.mat3.rfi.n11*comp1.mat3.rfi.ki12+comp1.mat3.rfi.ki11*comp1.mat3.rfi.n12+comp1.mat3.rfi.n21*comp1.mat3.rfi.ki22+comp1.mat3.rfi.ki21*comp1.mat3.rfi.n22+comp1.mat3.rfi.n31*comp1.mat3.rfi.ki32+comp1.mat3.rfi.ki31*comp1.mat3.rfi.n32</str> <str>comp1.mat3.del.epsilonBis31</str> <str>comp1.mat3.rfi.n11*comp1.mat3.rfi.ki13+comp1.mat3.rfi.ki11*comp1.mat3.rfi.n13+comp1.mat3.rfi.n21*comp1.mat3.rfi.ki23+comp1.mat3.rfi.ki21*comp1.mat3.rfi.n23+comp1.mat3.rfi.n31*comp1.mat3.rfi.ki33+comp1.mat3.rfi.ki31*comp1.mat3.rfi.n33</str> <str>comp1.mat3.del.epsilonBis12</str> <str>comp1.mat3.rfi.n12*comp1.mat3.rfi.ki11+comp1.mat3.rfi.ki12*comp1.mat3.rfi.n11+comp1.mat3.rfi.n22*comp1.mat3.rfi.ki21+comp1.mat3.rfi.ki22*comp1.mat3.rfi.n21+comp1.mat3.rfi.n32*comp1.mat3.rfi.ki31+comp1.mat3.rfi.ki32*comp1.mat3.rfi.n31</str> <str>comp1.mat3.del.epsilonBis22</str> <str>2*(comp1.mat3.rfi.n12*comp1.mat3.rfi.ki12+comp1.mat3.rfi.n22*comp1.mat3.rfi.ki22+comp1.mat3.rfi.n32*comp1.mat3.rfi.ki32)</str> <str>comp1.mat3.del.epsilonBis32</str> <str>comp1.mat3.rfi.n12*comp1.mat3.rfi.ki13+comp1.mat3.rfi.ki12*comp1.mat3.rfi.n13+comp1.mat3.rfi.n22*comp1.mat3.rfi.ki23+comp1.mat3.rfi.ki22*comp1.mat3.rfi.n23+comp1.mat3.rfi.n32*comp1.mat3.rfi.ki33+comp1.mat3.rfi.ki32*comp1.mat3.rfi.n33</str> <str>comp1.mat3.del.epsilonBis13</str> <str>comp1.mat3.rfi.n13*comp1.mat3.rfi.ki11+comp1.mat3.rfi.ki13*comp1.mat3.rfi.n11+comp1.mat3.rfi.n23*comp1.mat3.rfi.ki21+comp1.mat3.rfi.ki23*comp1.mat3.rfi.n21+comp1.mat3.rfi.n33*comp1.mat3.rfi.ki31+comp1.mat3.rfi.ki33*comp1.mat3.rfi.n31</str> <str>comp1.mat3.del.epsilonBis23</str> <str>comp1.mat3.rfi.n13*comp1.mat3.rfi.ki12+comp1.mat3.rfi.ki13*comp1.mat3.rfi.n12+comp1.mat3.rfi.n23*comp1.mat3.rfi.ki22+comp1.mat3.rfi.ki23*comp1.mat3.rfi.n22+comp1.mat3.rfi.n33*comp1.mat3.rfi.ki32+comp1.mat3.rfi.ki33*comp1.mat3.rfi.n32</str> <str>comp1.mat3.del.epsilonBis33</str> <str>2*(comp1.mat3.rfi.n13*comp1.mat3.rfi.ki13+comp1.mat3.rfi.n23*comp1.mat3.rfi.ki23+comp1.mat3.rfi.n33*comp1.mat3.rfi.ki33)</str> <str>comp1.mat3.del.epsilonBis_iso</str> <str>if(comp1.mat3.rfi.n12*comp1.mat3.rfi.ki11+comp1.mat3.rfi.ki12*comp1.mat3.rfi.n11+comp1.mat3.rfi.n22*comp1.mat3.rfi.ki21+comp1.mat3.rfi.ki22*comp1.mat3.rfi.n21+comp1.mat3.rfi.n32*comp1.mat3.rfi.ki31+comp1.mat3.rfi.ki32*comp1.mat3.rfi.n31==0&amp;&amp;comp1.mat3.rfi.n13*comp1.mat3.rfi.ki11+comp1.mat3.rfi.ki13*comp1.mat3.rfi.n11+comp1.mat3.rfi.n23*comp1.mat3.rfi.ki21+comp1.mat3.rfi.ki23*comp1.mat3.rfi.n21+comp1.mat3.rfi.n33*comp1.mat3.rfi.ki31+comp1.mat3.rfi.ki33*comp1.mat3.rfi.n31==0&amp;&amp;comp1.mat3.rfi.n12*comp1.mat3.rfi.ki11+comp1.mat3.rfi.ki12*comp1.mat3.rfi.n11+comp1.mat3.rfi.n22*comp1.mat3.rfi.ki21+comp1.mat3.rfi.ki22*comp1.mat3.rfi.n21+comp1.mat3.rfi.n32*comp1.mat3.rfi.ki31+comp1.mat3.rfi.ki32*comp1.mat3.rfi.n31==0&amp;&amp;2*(comp1.mat3.rfi.n12*comp1.mat3.rfi.ki12+comp1.mat3.rfi.n22*comp1.mat3.rfi.ki22+comp1.mat3.rfi.n32*comp1.mat3.rfi.ki32)==2*(comp1.mat3.rfi.n11*comp1.mat3.rfi.ki11+comp1.mat3.rfi.n21*comp1.mat3.rfi.ki21+comp1.mat3.rfi.n31*comp1.mat3.rfi.ki31)&amp;&amp;comp1.mat3.rfi.n13*comp1.mat3.rfi.ki12+comp1.mat3.rfi.ki13*comp1.mat3.rfi.n12+comp1.mat3.rfi.n23*comp1.mat3.rfi.ki22+comp1.mat3.rfi.ki23*comp1.mat3.rfi.n22+comp1.mat3.rfi.n33*comp1.mat3.rfi.ki32+comp1.mat3.rfi.ki33*comp1.mat3.rfi.n32==0&amp;&amp;comp1.mat3.rfi.n13*comp1.mat3.rfi.ki11+comp1.mat3.rfi.ki13*comp1.mat3.rfi.n11+comp1.mat3.rfi.n23*comp1.mat3.rfi.ki21+comp1.mat3.rfi.ki23*comp1.mat3.rfi.n21+comp1.mat3.rfi.n33*comp1.mat3.rfi.ki31+comp1.mat3.rfi.ki33*comp1.mat3.rfi.n31==0&amp;&amp;comp1.mat3.rfi.n13*comp1.mat3.rfi.ki12+comp1.mat3.rfi.ki13*comp1.mat3.rfi.n12+comp1.mat3.rfi.n23*comp1.mat3.rfi.ki22+comp1.mat3.rfi.ki23*comp1.mat3.rfi.n22+comp1.mat3.rfi.n33*comp1.mat3.rfi.ki32+comp1.mat3.rfi.ki33*comp1.mat3.rfi.n32==0&amp;&amp;2*(comp1.mat3.rfi.n13*comp1.mat3.rfi.ki13+comp1.mat3.rfi.n23*comp1.mat3.rfi.ki23+comp1.mat3.rfi.n33*comp1.mat3.rfi.ki33)==2*(comp1.mat3.rfi.n11*comp1.mat3.rfi.ki11+comp1.mat3.rfi.n21*comp1.mat3.rfi.ki21+comp1.mat3.rfi.n31*comp1.mat3.rfi.ki31),2*(comp1.mat3.rfi.n11*comp1.mat3.rfi.ki11+comp1.mat3.rfi.n21*comp1.mat3.rfi.ki21+comp1.mat3.rfi.n31*comp1.mat3.rfi.ki31),error('$base64:RmFpbGVkIHRvIGV2YWx1YXRlIGFuIGlzb3Ryb3BpYyB2YWx1ZSBvZiBhbiBhbmlzb3Ryb3BpYyB0ZW5zb3IAAAAAAAA='))</str> <str>comp1.mat3.del.epsilonBis_symmetry</str> <str>79</str> </arr> </rec> <?xml version="1.0" encoding="UTF-8"?> <rec> <str>elem</str> <str>elvar</str> <str>g</str> <arr> <str>1</str> </arr> <str>geomdim</str> <arr> <arr> <rec> <str>var</str> <arr> <str>comp1.material.F11</str> <arr> <str>1</str> </arr> <str>comp1.material.F21</str> <arr> <str>0</str> </arr> <str>comp1.material.F31</str> <arr> <str>0</str> </arr> <str>comp1.material.F12</str> <arr> <str>0</str> </arr> <str>comp1.material.F22</str> <arr> <str>1</str> </arr> <str>comp1.material.F32</str> <arr> <str>0</str> </arr> <str>comp1.material.F13</str> <arr> <str>0</str> </arr> <str>comp1.material.F23</str> <arr> <str>0</str> </arr> <str>comp1.material.F33</str> <arr> <str>1</str> </arr> <str>comp1.material.detF</str> <arr> <str>1</str> </arr> <str>comp1.material.gSubXgXg</str> <arr> <str>comp1.material.F11^2</str> </arr> <str>comp1.material.gSubYgXg</str> <arr> <str>0</str> </arr> <str>comp1.material.gSubZgXg</str> <arr> <str>0</str> </arr> <str>comp1.material.gSubXgYg</str> <arr> <str>0</str> </arr> <str>comp1.material.gSubYgYg</str> <arr> <str>comp1.material.F22^2</str> </arr> <str>comp1.material.gSubZgYg</str> <arr> <str>0</str> </arr> <str>comp1.material.gSubXgZg</str> <arr> <str>0</str> </arr> <str>comp1.material.gSubYgZg</str> <arr> <str>0</str> </arr> <str>comp1.material.gSubZgZg</str> <arr> <str>1</str> </arr> <str>comp1.material.gSupXgXg</str> <arr> <str>comp1.material.invF11^2</str> </arr> <str>comp1.material.gSupYgXg</str> <arr> <str>0</str> </arr> <str>comp1.material.gSupZgXg</str> <arr> <str>0</str> </arr> <str>comp1.material.gSupXgYg</str> <arr> <str>0</str> </arr> <str>comp1.material.gSupYgYg</str> <arr> <str>comp1.material.invF22^2</str> </arr> <str>comp1.material.gSupZgYg</str> <arr> <str>0</str> </arr> <str>comp1.material.gSupXgZg</str> <arr> <str>0</str> </arr> <str>comp1.material.gSupYgZg</str> <arr> <str>0</str> </arr> <str>comp1.material.gSupZgZg</str> <arr> <str>1</str> </arr> <str>comp1.spatial.F11</str> <arr> <str>1</str> </arr> <str>comp1.spatial.F21</str> <arr> <str>0</str> </arr> <str>comp1.spatial.F31</str> <arr> <str>0</str> </arr> <str>comp1.spatial.F12</str> <arr> <str>0</str> </arr> <str>comp1.spatial.F22</str> <arr> <str>1</str> </arr> <str>comp1.spatial.F32</str> <arr> <str>0</str> </arr> <str>comp1.spatial.F13</str> <arr> <str>0</str> </arr> <str>comp1.spatial.F23</str> <arr> <str>0</str> </arr> <str>comp1.spatial.F33</str> <arr> <str>1</str> </arr> <str>comp1.spatial.detF</str> <arr> <str>1</str> </arr> <str>comp1.spatial.gSubXX</str> <arr> <str>comp1.spatial.F11^2</str> </arr> <str>comp1.spatial.gSubYX</str> <arr> <str>0</str> </arr> <str>comp1.spatial.gSubZX</str> <arr> <str>0</str> </arr> <str>comp1.spatial.gSubXY</str> <arr> <str>0</str> </arr> <str>comp1.spatial.gSubYY</str> <arr> <str>comp1.spatial.F22^2</str> </arr> <str>comp1.spatial.gSubZY</str> <arr> <str>0</str> </arr> <str>comp1.spatial.gSubXZ</str> <arr> <str>0</str> </arr> <str>comp1.spatial.gSubYZ</str> <arr> <str>0</str> </arr> <str>comp1.spatial.gSubZZ</str> <arr> <str>1</str> </arr> <str>comp1.spatial.gSupXX</str> <arr> <str>comp1.spatial.invF11^2</str> </arr> <str>comp1.spatial.gSupYX</str> <arr> <str>0</str> </arr> <str>comp1.spatial.gSupZX</str> <arr> <str>0</str> </arr> <str>comp1.spatial.gSupXY</str> <arr> <str>0</str> </arr> <str>comp1.spatial.gSupYY</str> <arr> <str>comp1.spatial.invF22^2</str> </arr> <str>comp1.spatial.gSupZY</str> <arr> <str>0</str> </arr> <str>comp1.spatial.gSupXZ</str> <arr> <str>0</str> </arr> <str>comp1.spatial.gSupYZ</str> <arr> <str>0</str> </arr> <str>comp1.spatial.gSupZZ</str> <arr> <str>1</str> </arr> <str>comp1.spatial.invF11</str> <arr> <str>1</str> </arr> <str>comp1.spatial.invF21</str> <arr> <str>0</str> </arr> <str>comp1.spatial.invF31</str> <arr> <str>0</str> </arr> <str>comp1.spatial.invF12</str> <arr> <str>0</str> </arr> <str>comp1.spatial.invF22</str> <arr> <str>1</str> </arr> <str>comp1.spatial.invF32</str> <arr> <str>0</str> </arr> <str>comp1.spatial.invF13</str> <arr> <str>0</str> </arr> <str>comp1.spatial.invF23</str> <arr> <str>0</str> </arr> <str>comp1.spatial.invF33</str> <arr> <str>1</str> </arr> <str>comp1.spatial.detInvF</str> <arr> <str>1</str> </arr> <str>comp1.material.gSubxx</str> <arr> <str>comp1.spatial.invF11^2</str> </arr> <str>comp1.material.gSubyx</str> <arr> <str>0</str> </arr> <str>comp1.material.gSubzx</str> <arr> <str>0</str> </arr> <str>comp1.material.gSubxy</str> <arr> <str>0</str> </arr> <str>comp1.material.gSubyy</str> <arr> <str>comp1.spatial.invF22^2</str> </arr> <str>comp1.material.gSubzy</str> <arr> <str>0</str> </arr> <str>comp1.material.gSubxz</str> <arr> <str>0</str> </arr> <str>comp1.material.gSubyz</str> <arr> <str>0</str> </arr> <str>comp1.material.gSubzz</str> <arr> <str>1</str> </arr> <str>comp1.material.gSupxx</str> <arr> <str>comp1.spatial.F11^2</str> </arr> <str>comp1.material.gSupyx</str> <arr> <str>0</str> </arr> <str>comp1.material.gSupzx</str> <arr> <str>0</str> </arr> <str>comp1.material.gSupxy</str> <arr> <str>0</str> </arr> <str>comp1.material.gSupyy</str> <arr> <str>comp1.spatial.F22^2</str> </arr> <str>comp1.material.gSupzy</str> <arr> <str>0</str> </arr> <str>comp1.material.gSupxz</str> <arr> <str>0</str> </arr> <str>comp1.material.gSupyz</str> <arr> <str>0</str> </arr> <str>comp1.material.gSupzz</str> <arr> <str>1</str> </arr> <str>comp1.material.invF11</str> <arr> <str>1</str> </arr> <str>comp1.material.invF21</str> <arr> <str>0</str> </arr> <str>comp1.material.invF31</str> <arr> <str>0</str> </arr> <str>comp1.material.invF12</str> <arr> <str>0</str> </arr> <str>comp1.material.invF22</str> <arr> <str>1</str> </arr> <str>comp1.material.invF32</str> <arr> <str>0</str> </arr> <str>comp1.material.invF13</str> <arr> <str>0</str> </arr> <str>comp1.material.invF23</str> <arr> <str>0</str> </arr> <str>comp1.material.invF33</str> <arr> <str>1</str> </arr> <str>comp1.material.detInvF</str> <arr> <str>1</str> </arr> <str>comp1.geometry.gSubXX</str> <arr> <str>comp1.material.invF11^2</str> </arr> <str>comp1.geometry.gSubYX</str> <arr> <str>0</str> </arr> <str>comp1.geometry.gSubZX</str> <arr> <str>0</str> </arr> <str>comp1.geometry.gSubXY</str> <arr> <str>0</str> </arr> <str>comp1.geometry.gSubYY</str> <arr> <str>comp1.material.invF22^2</str> </arr> <str>comp1.geometry.gSubZY</str> <arr> <str>0</str> </arr> <str>comp1.geometry.gSubXZ</str> <arr> <str>0</str> </arr> <str>comp1.geometry.gSubYZ</str> <arr> <str>0</str> </arr> <str>comp1.geometry.gSubZZ</str> <arr> <str>1</str> </arr> <str>comp1.geometry.gSupXX</str> <arr> <str>comp1.material.F11^2</str> </arr> <str>comp1.geometry.gSupYX</str> <arr> <str>0</str> </arr> <str>comp1.geometry.gSupZX</str> <arr> <str>0</str> </arr> <str>comp1.geometry.gSupXY</str> <arr> <str>0</str> </arr> <str>comp1.geometry.gSupYY</str> <arr> <str>comp1.material.F22^2</str> </arr> <str>comp1.geometry.gSupZY</str> <arr> <str>0</str> </arr> <str>comp1.geometry.gSupXZ</str> <arr> <str>0</str> </arr> <str>comp1.geometry.gSupYZ</str> <arr> <str>0</str> </arr> <str>comp1.geometry.gSupZZ</str> <arr> <str>1</str> </arr> <str>comp1.dGeomChar</str> <arr> <str>1.4142135623730951</str> </arr> <str>material.point</str> <arr> <str>0</str> </arr> </arr> <str>ind</str> <arr> <arr> <str>1</str> <str>2</str> <str>3</str> <str>4</str> <str>5</str> <str>6</str> <str>7</str> <str>8</str> </arr> </arr> </rec> </arr> </arr> <str>protected</str> <str>false</str> </rec> <?xml version="1.0" encoding="UTF-8"?> <rec> <str>elem</str> <str>elvar</str> <str>g</str> <arr> <str>1</str> </arr> <str>geomdim</str> <arr> <arr> <arr> </arr> <rec> <str>var</str> <arr> <str>comp1.material.F11</str> <arr> <str>1</str> </arr> <str>comp1.material.F21</str> <arr> <str>0</str> </arr> <str>comp1.material.F31</str> <arr> <str>0</str> </arr> <str>comp1.material.F12</str> <arr> <str>0</str> </arr> <str>comp1.material.F22</str> <arr> <str>1</str> </arr> <str>comp1.material.F32</str> <arr> <str>0</str> </arr> <str>comp1.material.F13</str> <arr> <str>0</str> </arr> <str>comp1.material.F23</str> <arr> <str>0</str> </arr> <str>comp1.material.F33</str> <arr> <str>1</str> </arr> <str>comp1.material.detF</str> <arr> <str>1</str> </arr> <str>comp1.material.en</str> <arr> <str>1</str> </arr> <str>comp1.material.gSubXgXg</str> <arr> <str>comp1.material.F11^2</str> </arr> <str>comp1.material.gSubYgXg</str> <arr> <str>0</str> </arr> <str>comp1.material.gSubZgXg</str> <arr> <str>0</str> </arr> <str>comp1.material.gSubXgYg</str> <arr> <str>0</str> </arr> <str>comp1.material.gSubYgYg</str> <arr> <str>comp1.material.F22^2</str> </arr> <str>comp1.material.gSubZgYg</str> <arr> <str>0</str> </arr> <str>comp1.material.gSubXgZg</str> <arr> <str>0</str> </arr> <str>comp1.material.gSubYgZg</str> <arr> <str>0</str> </arr> <str>comp1.material.gSubZgZg</str> <arr> <str>1</str> </arr> <str>comp1.material.gSupXgXg</str> <arr> <str>comp1.material.invF11^2</str> </arr> <str>comp1.material.gSupYgXg</str> <arr> <str>0</str> </arr> <str>comp1.material.gSupZgXg</str> <arr> <str>0</str> </arr> <str>comp1.material.gSupXgYg</str> <arr> <str>0</str> </arr> <str>comp1.material.gSupYgYg</str> <arr> <str>comp1.material.invF22^2</str> </arr> <str>comp1.material.gSupZgYg</str> <arr> <str>0</str> </arr> <str>comp1.material.gSupXgZg</str> <arr> <str>0</str> </arr> <str>comp1.material.gSupYgZg</str> <arr> <str>0</str> </arr> <str>comp1.material.gSupZgZg</str> <arr> <str>1</str> </arr> <str>comp1.spatial.F11</str> <arr> <str>1</str> </arr> <str>comp1.spatial.F21</str> <arr> <str>0</str> </arr> <str>comp1.spatial.F31</str> <arr> <str>0</str> </arr> <str>comp1.spatial.F12</str> <arr> <str>0</str> </arr> <str>comp1.spatial.F22</str> <arr> <str>1</str> </arr> <str>comp1.spatial.F32</str> <arr> <str>0</str> </arr> <str>comp1.spatial.F13</str> <arr> <str>0</str> </arr> <str>comp1.spatial.F23</str> <arr> <str>0</str> </arr> <str>comp1.spatial.F33</str> <arr> <str>1</str> </arr> <str>comp1.spatial.detF</str> <arr> <str>1</str> </arr> <str>comp1.spatial.en</str> <arr> <str>1</str> </arr> <str>comp1.spatial.gSubXX</str> <arr> <str>comp1.spatial.F11^2</str> </arr> <str>comp1.spatial.gSubYX</str> <arr> <str>0</str> </arr> <str>comp1.spatial.gSubZX</str> <arr> <str>0</str> </arr> <str>comp1.spatial.gSubXY</str> <arr> <str>0</str> </arr> <str>comp1.spatial.gSubYY</str> <arr> <str>comp1.spatial.F22^2</str> </arr> <str>comp1.spatial.gSubZY</str> <arr> <str>0</str> </arr> <str>comp1.spatial.gSubXZ</str> <arr> <str>0</str> </arr> <str>comp1.spatial.gSubYZ</str> <arr> <str>0</str> </arr> <str>comp1.spatial.gSubZZ</str> <arr> <str>1</str> </arr> <str>comp1.spatial.gSupXX</str> <arr> <str>comp1.spatial.invF11^2</str> </arr> <str>comp1.spatial.gSupYX</str> <arr> <str>0</str> </arr> <str>comp1.spatial.gSupZX</str> <arr> <str>0</str> </arr> <str>comp1.spatial.gSupXY</str> <arr> <str>0</str> </arr> <str>comp1.spatial.gSupYY</str> <arr> <str>comp1.spatial.invF22^2</str> </arr> <str>comp1.spatial.gSupZY</str> <arr> <str>0</str> </arr> <str>comp1.spatial.gSupXZ</str> <arr> <str>0</str> </arr> <str>comp1.spatial.gSupYZ</str> <arr> <str>0</str> </arr> <str>comp1.spatial.gSupZZ</str> <arr> <str>1</str> </arr> <str>comp1.spatial.invF11</str> <arr> <str>1</str> </arr> <str>comp1.spatial.invF21</str> <arr> <str>0</str> </arr> <str>comp1.spatial.invF31</str> <arr> <str>0</str> </arr> <str>comp1.spatial.invF12</str> <arr> <str>0</str> </arr> <str>comp1.spatial.invF22</str> <arr> <str>1</str> </arr> <str>comp1.spatial.invF32</str> <arr> <str>0</str> </arr> <str>comp1.spatial.invF13</str> <arr> <str>0</str> </arr> <str>comp1.spatial.invF23</str> <arr> <str>0</str> </arr> <str>comp1.spatial.invF33</str> <arr> <str>1</str> </arr> <str>comp1.spatial.detInvF</str> <arr> <str>1</str> </arr> <str>comp1.material.gSubxx</str> <arr> <str>comp1.spatial.invF11^2</str> </arr> <str>comp1.material.gSubyx</str> <arr> <str>0</str> </arr> <str>comp1.material.gSubzx</str> <arr> <str>0</str> </arr> <str>comp1.material.gSubxy</str> <arr> <str>0</str> </arr> <str>comp1.material.gSubyy</str> <arr> <str>comp1.spatial.invF22^2</str> </arr> <str>comp1.material.gSubzy</str> <arr> <str>0</str> </arr> <str>comp1.material.gSubxz</str> <arr> <str>0</str> </arr> <str>comp1.material.gSubyz</str> <arr> <str>0</str> </arr> <str>comp1.material.gSubzz</str> <arr> <str>1</str> </arr> <str>comp1.material.gSupxx</str> <arr> <str>comp1.spatial.F11^2</str> </arr> <str>comp1.material.gSupyx</str> <arr> <str>0</str> </arr> <str>comp1.material.gSupzx</str> <arr> <str>0</str> </arr> <str>comp1.material.gSupxy</str> <arr> <str>0</str> </arr> <str>comp1.material.gSupyy</str> <arr> <str>comp1.spatial.F22^2</str> </arr> <str>comp1.material.gSupzy</str> <arr> <str>0</str> </arr> <str>comp1.material.gSupxz</str> <arr> <str>0</str> </arr> <str>comp1.material.gSupyz</str> <arr> <str>0</str> </arr> <str>comp1.material.gSupzz</str> <arr> <str>1</str> </arr> <str>comp1.material.invF11</str> <arr> <str>1</str> </arr> <str>comp1.material.invF21</str> <arr> <str>0</str> </arr> <str>comp1.material.invF31</str> <arr> <str>0</str> </arr> <str>comp1.material.invF12</str> <arr> <str>0</str> </arr> <str>comp1.material.invF22</str> <arr> <str>1</str> </arr> <str>comp1.material.invF32</str> <arr> <str>0</str> </arr> <str>comp1.material.invF13</str> <arr> <str>0</str> </arr> <str>comp1.material.invF23</str> <arr> <str>0</str> </arr> <str>comp1.material.invF33</str> <arr> <str>1</str> </arr> <str>comp1.material.detInvF</str> <arr> <str>1</str> </arr> <str>comp1.geometry.gSubXX</str> <arr> <str>comp1.material.invF11^2</str> </arr> <str>comp1.geometry.gSubYX</str> <arr> <str>0</str> </arr> <str>comp1.geometry.gSubZX</str> <arr> <str>0</str> </arr> <str>comp1.geometry.gSubXY</str> <arr> <str>0</str> </arr> <str>comp1.geometry.gSubYY</str> <arr> <str>comp1.material.invF22^2</str> </arr> <str>comp1.geometry.gSubZY</str> <arr> <str>0</str> </arr> <str>comp1.geometry.gSubXZ</str> <arr> <str>0</str> </arr> <str>comp1.geometry.gSubYZ</str> <arr> <str>0</str> </arr> <str>comp1.geometry.gSubZZ</str> <arr> <str>1</str> </arr> <str>comp1.geometry.gSupXX</str> <arr> <str>comp1.material.F11^2</str> </arr> <str>comp1.geometry.gSupYX</str> <arr> <str>0</str> </arr> <str>comp1.geometry.gSupZX</str> <arr> <str>0</str> </arr> <str>comp1.geometry.gSupXY</str> <arr> <str>0</str> </arr> <str>comp1.geometry.gSupYY</str> <arr> <str>comp1.material.F22^2</str> </arr> <str>comp1.geometry.gSupZY</str> <arr> <str>0</str> </arr> <str>comp1.geometry.gSupXZ</str> <arr> <str>0</str> </arr> <str>comp1.geometry.gSupYZ</str> <arr> <str>0</str> </arr> <str>comp1.geometry.gSupZZ</str> <arr> <str>1</str> </arr> <str>comp1.isPML</str> <arr> <str>0</str> </arr> <str>comp1.dGeomChar</str> <arr> <str>1.4142135623730951</str> </arr> <str>material.boundary</str> <arr> <str>0</str> </arr> </arr> <str>ind</str> <arr> <arr> <str>1</str> <str>2</str> <str>3</str> <str>4</str> <str>5</str> <str>6</str> <str>7</str> <str>8</str> <str>9</str> <str>10</str> </arr> </arr> </rec> </arr> </arr> <str>protected</str> <str>false</str> </rec> <?xml version="1.0" encoding="UTF-8"?> <rec> <str>elem</str> <str>elvar</str> <str>g</str> <arr> <str>1</str> </arr> <str>geomdim</str> <arr> <arr> <arr> </arr> <arr> </arr> <rec> <str>var</str> <arr> <str>comp1.material.F11</str> <arr> <str>1</str> </arr> <str>comp1.material.F21</str> <arr> <str>0</str> </arr> <str>comp1.material.F31</str> <arr> <str>0</str> </arr> <str>comp1.material.F12</str> <arr> <str>0</str> </arr> <str>comp1.material.F22</str> <arr> <str>1</str> </arr> <str>comp1.material.F32</str> <arr> <str>0</str> </arr> <str>comp1.material.F13</str> <arr> <str>0</str> </arr> <str>comp1.material.F23</str> <arr> <str>0</str> </arr> <str>comp1.material.F33</str> <arr> <str>1</str> </arr> <str>comp1.material.detF</str> <arr> <str>1</str> </arr> <str>comp1.material.gSubXgXg</str> <arr> <str>comp1.material.F11^2</str> </arr> <str>comp1.material.gSubYgXg</str> <arr> <str>0</str> </arr> <str>comp1.material.gSubZgXg</str> <arr> <str>0</str> </arr> <str>comp1.material.gSubXgYg</str> <arr> <str>0</str> </arr> <str>comp1.material.gSubYgYg</str> <arr> <str>comp1.material.F22^2</str> </arr> <str>comp1.material.gSubZgYg</str> <arr> <str>0</str> </arr> <str>comp1.material.gSubXgZg</str> <arr> <str>0</str> </arr> <str>comp1.material.gSubYgZg</str> <arr> <str>0</str> </arr> <str>comp1.material.gSubZgZg</str> <arr> <str>1</str> </arr> <str>comp1.material.gSupXgXg</str> <arr> <str>comp1.material.invF11^2</str> </arr> <str>comp1.material.gSupYgXg</str> <arr> <str>0</str> </arr> <str>comp1.material.gSupZgXg</str> <arr> <str>0</str> </arr> <str>comp1.material.gSupXgYg</str> <arr> <str>0</str> </arr> <str>comp1.material.gSupYgYg</str> <arr> <str>comp1.material.invF22^2</str> </arr> <str>comp1.material.gSupZgYg</str> <arr> <str>0</str> </arr> <str>comp1.material.gSupXgZg</str> <arr> <str>0</str> </arr> <str>comp1.material.gSupYgZg</str> <arr> <str>0</str> </arr> <str>comp1.material.gSupZgZg</str> <arr> <str>1</str> </arr> <str>comp1.spatial.F11</str> <arr> <str>1</str> </arr> <str>comp1.spatial.F21</str> <arr> <str>0</str> </arr> <str>comp1.spatial.F31</str> <arr> <str>0</str> </arr> <str>comp1.spatial.F12</str> <arr> <str>0</str> </arr> <str>comp1.spatial.F22</str> <arr> <str>1</str> </arr> <str>comp1.spatial.F32</str> <arr> <str>0</str> </arr> <str>comp1.spatial.F13</str> <arr> <str>0</str> </arr> <str>comp1.spatial.F23</str> <arr> <str>0</str> </arr> <str>comp1.spatial.F33</str> <arr> <str>1</str> </arr> <str>comp1.spatial.detF</str> <arr> <str>1</str> </arr> <str>comp1.spatial.gSubXX</str> <arr> <str>comp1.spatial.F11^2</str> </arr> <str>comp1.spatial.gSubYX</str> <arr> <str>0</str> </arr> <str>comp1.spatial.gSubZX</str> <arr> <str>0</str> </arr> <str>comp1.spatial.gSubXY</str> <arr> <str>0</str> </arr> <str>comp1.spatial.gSubYY</str> <arr> <str>comp1.spatial.F22^2</str> </arr> <str>comp1.spatial.gSubZY</str> <arr> <str>0</str> </arr> <str>comp1.spatial.gSubXZ</str> <arr> <str>0</str> </arr> <str>comp1.spatial.gSubYZ</str> <arr> <str>0</str> </arr> <str>comp1.spatial.gSubZZ</str> <arr> <str>1</str> </arr> <str>comp1.spatial.gSupXX</str> <arr> <str>comp1.spatial.invF11^2</str> </arr> <str>comp1.spatial.gSupYX</str> <arr> <str>0</str> </arr> <str>comp1.spatial.gSupZX</str> <arr> <str>0</str> </arr> <str>comp1.spatial.gSupXY</str> <arr> <str>0</str> </arr> <str>comp1.spatial.gSupYY</str> <arr> <str>comp1.spatial.invF22^2</str> </arr> <str>comp1.spatial.gSupZY</str> <arr> <str>0</str> </arr> <str>comp1.spatial.gSupXZ</str> <arr> <str>0</str> </arr> <str>comp1.spatial.gSupYZ</str> <arr> <str>0</str> </arr> <str>comp1.spatial.gSupZZ</str> <arr> <str>1</str> </arr> <str>comp1.spatial.invF11</str> <arr> <str>1</str> </arr> <str>comp1.spatial.invF21</str> <arr> <str>0</str> </arr> <str>comp1.spatial.invF31</str> <arr> <str>0</str> </arr> <str>comp1.spatial.invF12</str> <arr> <str>0</str> </arr> <str>comp1.spatial.invF22</str> <arr> <str>1</str> </arr> <str>comp1.spatial.invF32</str> <arr> <str>0</str> </arr> <str>comp1.spatial.invF13</str> <arr> <str>0</str> </arr> <str>comp1.spatial.invF23</str> <arr> <str>0</str> </arr> <str>comp1.spatial.invF33</str> <arr> <str>1</str> </arr> <str>comp1.spatial.detInvF</str> <arr> <str>1</str> </arr> <str>comp1.material.gSubxx</str> <arr> <str>comp1.spatial.invF11^2</str> </arr> <str>comp1.material.gSubyx</str> <arr> <str>0</str> </arr> <str>comp1.material.gSubzx</str> <arr> <str>0</str> </arr> <str>comp1.material.gSubxy</str> <arr> <str>0</str> </arr> <str>comp1.material.gSubyy</str> <arr> <str>comp1.spatial.invF22^2</str> </arr> <str>comp1.material.gSubzy</str> <arr> <str>0</str> </arr> <str>comp1.material.gSubxz</str> <arr> <str>0</str> </arr> <str>comp1.material.gSubyz</str> <arr> <str>0</str> </arr> <str>comp1.material.gSubzz</str> <arr> <str>1</str> </arr> <str>comp1.material.gSupxx</str> <arr> <str>comp1.spatial.F11^2</str> </arr> <str>comp1.material.gSupyx</str> <arr> <str>0</str> </arr> <str>comp1.material.gSupzx</str> <arr> <str>0</str> </arr> <str>comp1.material.gSupxy</str> <arr> <str>0</str> </arr> <str>comp1.material.gSupyy</str> <arr> <str>comp1.spatial.F22^2</str> </arr> <str>comp1.material.gSupzy</str> <arr> <str>0</str> </arr> <str>comp1.material.gSupxz</str> <arr> <str>0</str> </arr> <str>comp1.material.gSupyz</str> <arr> <str>0</str> </arr> <str>comp1.material.gSupzz</str> <arr> <str>1</str> </arr> <str>comp1.material.invF11</str> <arr> <str>1</str> </arr> <str>comp1.material.invF21</str> <arr> <str>0</str> </arr> <str>comp1.material.invF31</str> <arr> <str>0</str> </arr> <str>comp1.material.invF12</str> <arr> <str>0</str> </arr> <str>comp1.material.invF22</str> <arr> <str>1</str> </arr> <str>comp1.material.invF32</str> <arr> <str>0</str> </arr> <str>comp1.material.invF13</str> <arr> <str>0</str> </arr> <str>comp1.material.invF23</str> <arr> <str>0</str> </arr> <str>comp1.material.invF33</str> <arr> <str>1</str> </arr> <str>comp1.material.detInvF</str> <arr> <str>1</str> </arr> <str>comp1.geometry.gSubXX</str> <arr> <str>comp1.material.invF11^2</str> </arr> <str>comp1.geometry.gSubYX</str> <arr> <str>0</str> </arr> <str>comp1.geometry.gSubZX</str> <arr> <str>0</str> </arr> <str>comp1.geometry.gSubXY</str> <arr> <str>0</str> </arr> <str>comp1.geometry.gSubYY</str> <arr> <str>comp1.material.invF22^2</str> </arr> <str>comp1.geometry.gSubZY</str> <arr> <str>0</str> </arr> <str>comp1.geometry.gSubXZ</str> <arr> <str>0</str> </arr> <str>comp1.geometry.gSubYZ</str> <arr> <str>0</str> </arr> <str>comp1.geometry.gSubZZ</str> <arr> <str>1</str> </arr> <str>comp1.geometry.gSupXX</str> <arr> <str>comp1.material.F11^2</str> </arr> <str>comp1.geometry.gSupYX</str> <arr> <str>0</str> </arr> <str>comp1.geometry.gSupZX</str> <arr> <str>0</str> </arr> <str>comp1.geometry.gSupXY</str> <arr> <str>0</str> </arr> <str>comp1.geometry.gSupYY</str> <arr> <str>comp1.material.F22^2</str> </arr> <str>comp1.geometry.gSupZY</str> <arr> <str>0</str> </arr> <str>comp1.geometry.gSupXZ</str> <arr> <str>0</str> </arr> <str>comp1.geometry.gSupYZ</str> <arr> <str>0</str> </arr> <str>comp1.geometry.gSupZZ</str> <arr> <str>1</str> </arr> <str>comp1.isScalingSystemDomain</str> <arr> <str>0</str> </arr> <str>comp1.isPML</str> <arr> <str>0</str> </arr> <str>comp1.dGeomChar</str> <arr> <str>1.4142135623730951</str> </arr> </arr> <str>ind</str> <arr> <arr> <str>1</str> <str>2</str> <str>3</str> </arr> </arr> </rec> </arr> </arr> <str>protected</str> <str>false</str> </rec> <?xml version="1.0" encoding="UTF-8"?> <rec> <str>elem</str> <str>elvar</str> <str>g</str> <arr> <str>1</str> </arr> <str>geomdim</str> <arr> <arr> <arr> </arr> <arr> </arr> <rec> <str>var</str> <arr> <str>minput.l</str> <arr> <str>0</str> </arr> <str>minput.I</str> <arr> <str>0</str> </arr> <str>minput.T</str> <arr> <str>293.15*unit_K_cf</str> </arr> <str>minput.phi</str> <arr> <str>0</str> </arr> <str>minput.li</str> <arr> <str>0</str> </arr> <str>minput.omega</str> <arr> <str>0</str> </arr> <str>minput.c</str> <arr> <str>0</str> </arr> <str>minput.Ene</str> <arr> <str>0</str> </arr> <str>minput.freq</str> <arr> <str>comp1.gop.f0</str> </arr> <str>minput.phil</str> <arr> <str>0</str> </arr> <str>minput.sigmal</str> <arr> <str>0</str> </arr> <str>minput.Tu</str> <arr> <str>293.15*unit_K_cf</str> </arr> <str>minput.Td</str> <arr> <str>293.15*unit_K_cf</str> </arr> <str>minput.Q</str> <arr> <str>0</str> </arr> <str>minput.J1</str> <arr> <str>0</str> </arr> <str>minput.J2</str> <arr> <str>0</str> </arr> <str>minput.J3</str> <arr> <str>0</str> </arr> <str>minput.Qj</str> <arr> <str>0</str> </arr> <str>minput.Df1</str> <arr> <str>0</str> </arr> <str>minput.Df2</str> <arr> <str>0</str> </arr> <str>minput.Df3</str> <arr> <str>0</str> </arr> <str>minput.E1</str> <arr> <str>0</str> </arr> <str>minput.E2</str> <arr> <str>0</str> </arr> <str>minput.E3</str> <arr> <str>0</str> </arr> <str>minput.V</str> <arr> <str>0</str> </arr> <str>minput.W</str> <arr> <str>0</str> </arr> <str>minput.Ql</str> <arr> <str>0</str> </arr> <str>minput.Qjl</str> <arr> <str>0</str> </arr> <str>minput.H1</str> <arr> <str>0</str> </arr> <str>minput.H2</str> <arr> <str>0</str> </arr> <str>minput.H3</str> <arr> <str>0</str> </arr> <str>minput.B1</str> <arr> <str>0</str> </arr> <str>minput.B2</str> <arr> <str>0</str> </arr> <str>minput.B3</str> <arr> <str>0</str> </arr> <str>minput.nFe</str> <arr> <str>0</str> </arr> <str>minput.nF</str> <arr> <str>0</str> </arr> <str>minput.I0</str> <arr> <str>0</str> </arr> <str>minput.pFlow</str> <arr> <str>0</str> </arr> <str>minput.rhoq</str> <arr> <str>0</str> </arr> <str>minput.rhoqs</str> <arr> <str>0</str> </arr> <str>minput.Js1</str> <arr> <str>0</str> </arr> <str>minput.Js2</str> <arr> <str>0</str> </arr> <str>minput.Js3</str> <arr> <str>0</str> </arr> <str>minput.Jms1</str> <arr> <str>0</str> </arr> <str>minput.Jms2</str> <arr> <str>0</str> </arr> <str>minput.Jms3</str> <arr> <str>0</str> </arr> <str>minput.D</str> <arr> <str>0</str> </arr> <str>minput.u_d1</str> <arr> <str>0</str> </arr> <str>minput.u_d2</str> <arr> <str>0</str> </arr> <str>minput.u_d3</str> <arr> <str>0</str> </arr> <str>minput.epet</str> <arr> <str>0</str> </arr> <str>minput.epe</str> <arr> <str>0</str> </arr> <str>minput.epm</str> <arr> <str>0</str> </arr> <str>minput.evpe</str> <arr> <str>0</str> </arr> <str>minput.evpet</str> <arr> <str>0</str> </arr> <str>minput.esh</str> <arr> <str>0</str> </arr> <str>minput.Spr</str> <arr> <str>35</str> </arr> <str>minput.Sp</str> <arr> <str>0</str> </arr> <str>minput.Tempref</str> <arr> <str>293.15*unit_K_cf</str> </arr> <str>minput.eax</str> <arr> <str>0</str> </arr> <str>minput.Na</str> <arr> <str>0</str> </arr> <str>minput.a</str> <arr> <str>0</str> </arr> <str>minput.cr</str> <arr> <str>0</str> </arr> <str>minput.uc1</str> <arr> <str>0</str> </arr> <str>minput.uc2</str> <arr> <str>0</str> </arr> <str>minput.uc3</str> <arr> <str>0</str> </arr> <str>minput.pc</str> <arr> <str>0</str> </arr> <str>minput.phid</str> <arr> <str>0</str> </arr> <str>minput.Nd</str> <arr> <str>0</str> </arr> <str>minput.rhogeff</str> <arr> <str>0</str> </arr> <str>minput.ne</str> <arr> <str>0</str> </arr> <str>minput.en</str> <arr> <str>0</str> </arr> <str>minput.seflux</str> <arr> <str>0</str> </arr> <str>minput.f1</str> <arr> <str>0</str> </arr> <str>minput.f2</str> <arr> <str>0</str> </arr> <str>minput.f3</str> <arr> <str>0</str> </arr> <str>minput.Rb</str> <arr> <str>0</str> </arr> <str>minput.eta</str> <arr> <str>0</str> </arr> <str>minput.q0</str> <arr> <str>0</str> </arr> <str>minput.qs</str> <arr> <str>0</str> </arr> <str>minput.kh</str> <arr> <str>0</str> </arr> <str>minput.K11</str> <arr> <str>0</str> </arr> <str>minput.K21</str> <arr> <str>0</str> </arr> <str>minput.K31</str> <arr> <str>0</str> </arr> <str>minput.K12</str> <arr> <str>0</str> </arr> <str>minput.K22</str> <arr> <str>0</str> </arr> <str>minput.K32</str> <arr> <str>0</str> </arr> <str>minput.K13</str> <arr> <str>0</str> </arr> <str>minput.K23</str> <arr> <str>0</str> </arr> <str>minput.K33</str> <arr> <str>0</str> </arr> <str>minput.dHpdt</str> <arr> <str>0</str> </arr> <str>minput.Sen</str> <arr> <str>0</str> </arr> <str>minput.neinit</str> <arr> <str>0</str> </arr> <str>minput.nu</str> <arr> <str>0</str> </arr> <str>minput.Ne</str> <arr> <str>0</str> </arr> <str>minput.En</str> <arr> <str>0</str> </arr> <str>minput.phils</str> <arr> <str>0</str> </arr> <str>minput.cm</str> <arr> <str>0</str> </arr> <str>minput.w</str> <arr> <str>0</str> </arr> <str>minput.Qm</str> <arr> <str>0</str> </arr> <str>minput.ebar</str> <arr> <str>0</str> </arr> <str>minput.Ns</str> <arr> <str>0</str> </arr> <str>minput.Vmol</str> <arr> <str>0</str> </arr> <str>minput.nd</str> <arr> <str>0</str> </arr> <str>minput.psi</str> <arr> <str>0</str> </arr> <str>minput.phipf</str> <arr> <str>0</str> </arr> <str>minput.pA</str> <arr> <str>unit_atm_cf</str> </arr> <str>minput.ep</str> <arr> <str>0</str> </arr> <str>minput.nutilde</str> <arr> <str>0</str> </arr> <str>minput.DeN</str> <arr> <str>0</str> </arr> <str>minput.muN</str> <arr> <str>0</str> </arr> <str>minput.EN</str> <arr> <str>0</str> </arr> <str>minput.slipvel</str> <arr> <str>0</str> </arr> <str>minput.sr</str> <arr> <str>0</str> </arr> <str>minput.es</str> <arr> <str>0</str> </arr> <str>minput.sflux</str> <arr> <str>0</str> </arr> <str>minput.u1</str> <arr> <str>0</str> </arr> <str>minput.u2</str> <arr> <str>0</str> </arr> <str>minput.u3</str> <arr> <str>0</str> </arr> <str>minput.Vf</str> <arr> <str>0</str> </arr> <str>minput.Cvol</str> <arr> <str>0</str> </arr> <str>minput.h</str> <arr> <str>0</str> </arr> <str>minput.gamma</str> <arr> <str>0</str> </arr> </arr> <str>ind</str> <arr> <arr> <str>1</str> <str>2</str> <str>3</str> </arr> </arr> </rec> </arr> </arr> <str>protected</str> <str>false</str> </rec> x<?xml version="1.0" encoding="UTF-8"?> <rec> <str>elem</str> <str>elvar</str> <str>g</str> <arr> <str>2</str> </arr> <str>geomdim</str> <arr> <arr> <rec> <str>var</str> <arr> <str>minput.l</str> <arr> <str>0</str> </arr> <str>minput.I</str> <arr> <str>0</str> </arr> <str>minput.T</str> <arr> <str>293.15*unit_K_cf</str> </arr> <str>minput.phi</str> <arr> <str>0</str> </arr> <str>minput.li</str> <arr> <str>0</str> </arr> <str>minput.omega</str> <arr> <str>0</str> </arr> <str>minput.c</str> <arr> <str>0</str> </arr> <str>minput.Ene</str> <arr> <str>0</str> </arr> <str>minput.freq</str> <arr> <str>0</str> </arr> <str>minput.phil</str> <arr> <str>0</str> </arr> <str>minput.sigmal</str> <arr> <str>0</str> </arr> <str>minput.Tu</str> <arr> <str>293.15*unit_K_cf</str> </arr> <str>minput.Td</str> <arr> <str>293.15*unit_K_cf</str> </arr> <str>minput.Q</str> <arr> <str>0</str> </arr> <str>minput.J1</str> <arr> <str>0</str> </arr> <str>minput.J2</str> <arr> <str>0</str> </arr> <str>minput.J3</str> <arr> <str>0</str> </arr> <str>minput.Qj</str> <arr> <str>0</str> </arr> <str>minput.Df1</str> <arr> <str>0</str> </arr> <str>minput.Df2</str> <arr> <str>0</str> </arr> <str>minput.Df3</str> <arr> <str>0</str> </arr> <str>minput.E1</str> <arr> <str>0</str> </arr> <str>minput.E2</str> <arr> <str>0</str> </arr> <str>minput.E3</str> <arr> <str>0</str> </arr> <str>minput.V</str> <arr> <str>0</str> </arr> <str>minput.W</str> <arr> <str>0</str> </arr> <str>minput.Ql</str> <arr> <str>0</str> </arr> <str>minput.Qjl</str> <arr> <str>0</str> </arr> <str>minput.H1</str> <arr> <str>0</str> </arr> <str>minput.H2</str> <arr> <str>0</str> </arr> <str>minput.H3</str> <arr> <str>0</str> </arr> <str>minput.B1</str> <arr> <str>0</str> </arr> <str>minput.B2</str> <arr> <str>0</str> </arr> <str>minput.B3</str> <arr> <str>0</str> </arr> <str>minput.nFe</str> <arr> <str>0</str> </arr> <str>minput.nF</str> <arr> <str>0</str> </arr> <str>minput.I0</str> <arr> <str>0</str> </arr> <str>minput.pFlow</str> <arr> <str>0</str> </arr> <str>minput.rhoq</str> <arr> <str>0</str> </arr> <str>minput.rhoqs</str> <arr> <str>0</str> </arr> <str>minput.Js1</str> <arr> <str>0</str> </arr> <str>minput.Js2</str> <arr> <str>0</str> </arr> <str>minput.Js3</str> <arr> <str>0</str> </arr> <str>minput.Jms1</str> <arr> <str>0</str> </arr> <str>minput.Jms2</str> <arr> <str>0</str> </arr> <str>minput.Jms3</str> <arr> <str>0</str> </arr> <str>minput.D</str> <arr> <str>0</str> </arr> <str>minput.u_d1</str> <arr> <str>0</str> </arr> <str>minput.u_d2</str> <arr> <str>0</str> </arr> <str>minput.u_d3</str> <arr> <str>0</str> </arr> <str>minput.epet</str> <arr> <str>0</str> </arr> <str>minput.epe</str> <arr> <str>0</str> </arr> <str>minput.epm</str> <arr> <str>0</str> </arr> <str>minput.evpe</str> <arr> <str>0</str> </arr> <str>minput.evpet</str> <arr> <str>0</str> </arr> <str>minput.esh</str> <arr> <str>0</str> </arr> <str>minput.Spr</str> <arr> <str>35</str> </arr> <str>minput.Sp</str> <arr> <str>0</str> </arr> <str>minput.Tempref</str> <arr> <str>293.15*unit_K_cf</str> </arr> <str>minput.eax</str> <arr> <str>0</str> </arr> <str>minput.Na</str> <arr> <str>0</str> </arr> <str>minput.a</str> <arr> <str>0</str> </arr> <str>minput.cr</str> <arr> <str>0</str> </arr> <str>minput.uc1</str> <arr> <str>0</str> </arr> <str>minput.uc2</str> <arr> <str>0</str> </arr> <str>minput.uc3</str> <arr> <str>0</str> </arr> <str>minput.pc</str> <arr> <str>0</str> </arr> <str>minput.phid</str> <arr> <str>0</str> </arr> <str>minput.Nd</str> <arr> <str>0</str> </arr> <str>minput.rhogeff</str> <arr> <str>0</str> </arr> <str>minput.ne</str> <arr> <str>0</str> </arr> <str>minput.en</str> <arr> <str>0</str> </arr> <str>minput.seflux</str> <arr> <str>0</str> </arr> <str>minput.f1</str> <arr> <str>0</str> </arr> <str>minput.f2</str> <arr> <str>0</str> </arr> <str>minput.f3</str> <arr> <str>0</str> </arr> <str>minput.Rb</str> <arr> <str>0</str> </arr> <str>minput.eta</str> <arr> <str>0</str> </arr> <str>minput.q0</str> <arr> <str>0</str> </arr> <str>minput.qs</str> <arr> <str>0</str> </arr> <str>minput.kh</str> <arr> <str>0</str> </arr> <str>minput.K11</str> <arr> <str>0</str> </arr> <str>minput.K21</str> <arr> <str>0</str> </arr> <str>minput.K31</str> <arr> <str>0</str> </arr> <str>minput.K12</str> <arr> <str>0</str> </arr> <str>minput.K22</str> <arr> <str>0</str> </arr> <str>minput.K32</str> <arr> <str>0</str> </arr> <str>minput.K13</str> <arr> <str>0</str> </arr> <str>minput.K23</str> <arr> <str>0</str> </arr> <str>minput.K33</str> <arr> <str>0</str> </arr> <str>minput.dHpdt</str> <arr> <str>0</str> </arr> <str>minput.Sen</str> <arr> <str>0</str> </arr> <str>minput.neinit</str> <arr> <str>0</str> </arr> <str>minput.nu</str> <arr> <str>0</str> </arr> <str>minput.Ne</str> <arr> <str>0</str> </arr> <str>minput.En</str> <arr> <str>0</str> </arr> <str>minput.phils</str> <arr> <str>0</str> </arr> <str>minput.cm</str> <arr> <str>0</str> </arr> <str>minput.w</str> <arr> <str>0</str> </arr> <str>minput.Qm</str> <arr> <str>0</str> </arr> <str>minput.ebar</str> <arr> <str>0</str> </arr> <str>minput.Ns</str> <arr> <str>0</str> </arr> <str>minput.Vmol</str> <arr> <str>0</str> </arr> <str>minput.nd</str> <arr> <str>0</str> </arr> <str>minput.psi</str> <arr> <str>0</str> </arr> <str>minput.phipf</str> <arr> <str>0</str> </arr> <str>minput.pA</str> <arr> <str>unit_atm_cf</str> </arr> <str>minput.ep</str> <arr> <str>0</str> </arr> <str>minput.nutilde</str> <arr> <str>0</str> </arr> <str>minput.DeN</str> <arr> <str>0</str> </arr> <str>minput.muN</str> <arr> <str>0</str> </arr> <str>minput.EN</str> <arr> <str>0</str> </arr> <str>minput.slipvel</str> <arr> <str>0</str> </arr> <str>minput.sr</str> <arr> <str>0</str> </arr> <str>minput.es</str> <arr> <str>0</str> </arr> <str>minput.sflux</str> <arr> <str>0</str> </arr> <str>minput.u1</str> <arr> <str>0</str> </arr> <str>minput.u2</str> <arr> <str>0</str> </arr> <str>minput.u3</str> <arr> <str>0</str> </arr> <str>minput.Vf</str> <arr> <str>0</str> </arr> <str>minput.Cvol</str> <arr> <str>0</str> </arr> <str>minput.h</str> <arr> <str>0</str> </arr> <str>minput.gamma</str> <arr> <str>0</str> </arr> </arr> <str>ind</str> <arr> <arr> <str>1</str> </arr> </arr> </rec> </arr> </arr> <str>protected</str> <str>false</str> </rec> <?xml version="1.0" encoding="UTF-8"?> <rec> <str>elem</str> <str>elvar</str> <str>g</str> <arr> <str>1</str> </arr> <str>geomdim</str> <arr> <arr> <rec> <str>var</str> <arr> <str>comp1.q_fld_act</str> <arr> <str>0</str> </arr> <str>comp1.k_fld_act</str> <arr> <str>0</str> </arr> </arr> <str>ind</str> <arr> <arr> <str>1</str> <str>2</str> <str>3</str> <str>4</str> <str>5</str> <str>6</str> <str>7</str> <str>8</str> </arr> </arr> </rec> </arr> </arr> <str>protected</str> <str>false</str> </rec> <?xml version="1.0" encoding="UTF-8"?> <rec> <str>elem</str> <str>elvar</str> <str>g</str> <arr> <str>1</str> </arr> <str>geomdim</str> <arr> <arr> <arr> </arr> <rec> <str>var</str> <arr> <str>comp1.q_fld_act</str> <arr> <str>0</str> </arr> <str>comp1.k_fld_act</str> <arr> <str>0</str> </arr> <str>comp1.gop.k1s</str> <arr> <str>curv_spatial</str> </arr> <str>comp1.gop.r1s</str> <arr> <str>1/(comp1.gop.k1s+sqrt(eps))</str> </arr> </arr> <str>ind</str> <arr> <arr> <str>1</str> <str>2</str> <str>3</str> <str>4</str> <str>5</str> <str>6</str> <str>7</str> <str>8</str> <str>9</str> <str>10</str> </arr> </arr> </rec> </arr> </arr> <str>protected</str> <str>false</str> </rec> n<?xml version="1.0" encoding="UTF-8"?> <rec> <str>elem</str> <str>elvar</str> <str>g</str> <arr> <str>1</str> </arr> <str>geomdim</str> <arr> <arr> <arr> </arr> <arr> </arr> <rec> <str>var</str> <arr> <str>comp1.q_fld_act</str> <arr> <str>0</str> </arr> <str>comp1.k_fld_act</str> <arr> <str>0</str> </arr> <str>comp1.gop.f0</str> <arr> <str>noenv(comp1.gop.nu)</str> </arr> <str>comp1.gop.mp1.lambda0</str> <arr> <str>noenv(comp1.gop.lambda0)</str> </arr> <str>comp1.gop.lambda0norm</str> <arr> <str>comp1.gop.mp1.lambda0/unit_um_cf</str> </arr> <str>comp1.gop.nabs_local_real</str> <arr> <str>0.5*(comp1.gop.N_localxx+comp1.gop.N_localyy)</str> </arr> <str>comp1.gop.kappa_local</str> <arr> <str>0</str> </arr> <str>comp1.gop.nabs_local</str> <arr> <str>comp1.gop.nabs_local_real</str> </arr> <str>comp1.gop.nref_local</str> <arr> <str>comp1.gop.nabs_local</str> </arr> <str>comp1.gop.nrefd</str> <arr> <str>subst(comp1.gop.nref_local,comp1.gop.mp1.lambda0,587.56*unit_nm_cf,comp1.gop.f0,0.0017019538430117778*c_const/unit_nm_cf)</str> </arr> <str>comp1.gop.nrefC</str> <arr> <str>subst(comp1.gop.nref_local,comp1.gop.mp1.lambda0,656.28*unit_nm_cf,comp1.gop.f0,0.0015237398671298836*c_const/unit_nm_cf)</str> </arr> <str>comp1.gop.nrefF</str> <arr> <str>subst(comp1.gop.nref_local,comp1.gop.mp1.lambda0,486.13*unit_nm_cf,comp1.gop.f0,0.002057062925554893*c_const/unit_nm_cf)</str> </arr> <str>comp1.gop.Vd</str> <arr> <str>(-1+comp1.gop.nrefd)/(comp1.gop.nrefF-comp1.gop.nrefC)</str> </arr> </arr> <str>ind</str> <arr> <arr> <str>1</str> <str>2</str> <str>3</str> </arr> </arr> </rec> </arr> </arr> <str>protected</str> <str>false</str> </rec> C<?xml version="1.0" encoding="UTF-8"?> <rec> <str>elem</str> <str>elvar</str> <str>g</str> <arr> <str>2</str> </arr> <str>geomdim</str> <arr> <arr> <rec> <str>var</str> <arr> <str>comp1.gop.lambda0_fld_act</str> <arr> <str>1</str> </arr> <str>comp1.gop.r_fld_act</str> <arr> <str>1</str> </arr> <str>comp1.gop.I0_fld_act</str> <arr> <str>1</str> </arr> <str>comp1.gop.s_fld_act</str> <arr> <str>1</str> </arr> <str>comp1.gop.atten_fld_act</str> <arr> <str>1</str> </arr> <str>comp1.gop.Q0_fld_act</str> <arr> <str>1</str> </arr> <str>comp1.gop.omega</str> <arr> <str>c_const*sqrt(comp1.kx^2+comp1.ky^2+eps)/real(comp1.gop.nref)</str> </arr> <str>comp1.gop.kappa</str> <arr> <str>comp1.gop.kappa_local</str> </arr> <str>comp1.gop.nref</str> <arr> <str>comp1.gop.nref_local</str> </arr> <str>comp1.gop.matd1.nssign</str> <arr> <str>sign(bndenv(comp1.gop.nx)*comp1.gop.nix+bndenv(comp1.gop.ny)*comp1.gop.niy)</str> </arr> <str>comp1.gop.matd1.nsx</str> <arr> <str>bndenv(comp1.gop.nx)*comp1.gop.matd1.nssign</str> </arr> <str>comp1.gop.matd1.nsy</str> <arr> <str>bndenv(comp1.gop.ny)*comp1.gop.matd1.nssign</str> </arr> <str>comp1.gop.matd1.nsz</str> <arr> <str>0</str> </arr> <str>comp1.gop.matd1.thetai</str> <arr> <str>acos(comp1.gop.matd1.nsx*comp1.gop.nix+comp1.gop.matd1.nsy*comp1.gop.niy)*unit_rad_cf</str> </arr> <str>comp1.gop.matd1.eta</str> <arr> <str>env_in(real(comp1.gop.nref_local))/env_out(real(comp1.gop.nref_local))</str> </arr> <str>comp1.gop.matd1.thetat</str> <arr> <str>asin(comp1.gop.matd1.eta*sin(comp1.gop.matd1.thetai))*unit_rad_cf</str> </arr> <str>comp1.gop.matd1.gam</str> <arr> <str>-comp1.gop.matd1.eta*cos(comp1.gop.matd1.thetai)+cos(real(comp1.gop.matd1.thetat))</str> </arr> <str>comp1.gop.matd1.k1t</str> <arr> <str>comp1.gop.matd1.eta*(cos(comp1.gop.matd1.thetai)/cos(real(comp1.gop.matd1.thetat)))^2/comp1.gop.r1+comp1.gop.matd1.gam*bndenv(comp1.gop.k1s)*comp1.gop.matd1.nssign/cos(real(comp1.gop.matd1.thetat))^2</str> </arr> <str>comp1.gop.matd1.r1t</str> <arr> <str>1/comp1.gop.matd1.k1t</str> </arr> <str>comp1.gop.matd1.k1r</str> <arr> <str>1/comp1.gop.r1-2*bndenv(comp1.gop.k1s)*comp1.gop.matd1.nssign/cos(comp1.gop.matd1.thetai)</str> </arr> <str>comp1.gop.matd1.r1r</str> <arr> <str>1/comp1.gop.matd1.k1r</str> </arr> <str>comp1.gop.matd1.costheta_in</str> <arr> <str>cos(comp1.gop.matd1.thetai)</str> </arr> <str>comp1.gop.matd1.costheta_out</str> <arr> <str>if(sin(comp1.gop.matd1.thetai)&gt;env_out(comp1.gop.nref_local)/env_in(comp1.gop.nref_local),-sqrt(-1+(env_in(comp1.gop.nref_local)*sin(comp1.gop.matd1.thetai)/env_out(comp1.gop.nref_local))^2)*i,sqrt(1-(env_in(comp1.gop.nref_local)*sin(comp1.gop.matd1.thetai)/env_out(comp1.gop.nref_local))^2))</str> </arr> <str>comp1.gop.matd1.thetaB</str> <arr> <str>atan2(env_out(real(comp1.gop.nref_local)),env_in(real(comp1.gop.nref_local)))*unit_rad_cf</str> </arr> <str>comp1.gop.matd1.thetac</str> <arr> <str>if(env_out(real(comp1.gop.nref_local))&lt;env_in(real(comp1.gop.nref_local)),asin(env_out(real(comp1.gop.nref_local))/env_in(real(comp1.gop.nref_local)))*unit_rad_cf,0.5*pi)</str> </arr> <str>comp1.gop.matd1.ddelta</str> <arr> <str>unit_rad_cf*(arg((env_out(real(comp1.gop.nref_local))*cos(comp1.gop.matd1.thetai)-env_in(real(comp1.gop.nref_local))*cos(comp1.gop.matd1.thetat))/(env_out(real(comp1.gop.nref_local))*cos(comp1.gop.matd1.thetai)+env_in(real(comp1.gop.nref_local))*cos(comp1.gop.matd1.thetat)))-arg((env_in(real(comp1.gop.nref_local))*cos(comp1.gop.matd1.thetai)-env_out(real(comp1.gop.nref_local))*cos(comp1.gop.matd1.thetat))/(env_in(real(comp1.gop.nref_local))*cos(comp1.gop.matd1.thetai)+env_out(real(comp1.gop.nref_local))*cos(comp1.gop.matd1.thetat))))</str> </arr> <str>comp1.gop.matd1.tp</str> <arr> <str>2*env_in(real(comp1.gop.nref_local))*cos(comp1.gop.matd1.thetai)/(env_out(real(comp1.gop.nref_local))*cos(comp1.gop.matd1.thetai)+env_in(real(comp1.gop.nref_local))*cos(comp1.gop.matd1.thetat))</str> </arr> <str>comp1.gop.matd1.ts</str> <arr> <str>2*env_in(real(comp1.gop.nref_local))*cos(comp1.gop.matd1.thetai)/(env_in(real(comp1.gop.nref_local))*cos(comp1.gop.matd1.thetai)+env_out(real(comp1.gop.nref_local))*cos(comp1.gop.matd1.thetat))</str> </arr> <str>comp1.gop.matd1.rp</str> <arr> <str>(env_out(real(comp1.gop.nref_local))*cos(comp1.gop.matd1.thetai)-env_in(real(comp1.gop.nref_local))*cos(comp1.gop.matd1.thetat))/(env_out(real(comp1.gop.nref_local))*cos(comp1.gop.matd1.thetai)+env_in(real(comp1.gop.nref_local))*cos(comp1.gop.matd1.thetat))</str> </arr> <str>comp1.gop.matd1.rs</str> <arr> <str>(env_in(real(comp1.gop.nref_local))*cos(comp1.gop.matd1.thetai)-env_out(real(comp1.gop.nref_local))*cos(comp1.gop.matd1.thetat))/(env_in(real(comp1.gop.nref_local))*cos(comp1.gop.matd1.thetai)+env_out(real(comp1.gop.nref_local))*cos(comp1.gop.matd1.thetat))</str> </arr> <str>comp1.gop.matd1.I0t</str> <arr> <str>0.5*comp1.gop.I*((1+comp1.gop.sn1)*abs(comp1.gop.matd1.ts)^2+(1-comp1.gop.sn1)*abs(comp1.gop.matd1.tp)^2)*env_out(comp1.gop.nref_local)*cos(comp1.gop.matd1.thetat)/(env_in(comp1.gop.nref_local)*cos(comp1.gop.matd1.thetai))</str> </arr> <str>comp1.gop.matd1.Q0t</str> <arr> <str>0.5*comp1.gop.Q*((1+comp1.gop.sn1)*abs(comp1.gop.matd1.ts)^2+(1-comp1.gop.sn1)*abs(comp1.gop.matd1.tp)^2)*env_out(comp1.gop.nref_local)*cos(comp1.gop.matd1.thetat)/(env_in(comp1.gop.nref_local)*cos(comp1.gop.matd1.thetai))</str> </arr> <str>comp1.gop.matd1.snt1</str> <arr> <str>((1+comp1.gop.sn1)*abs(comp1.gop.matd1.ts)^2-(1-comp1.gop.sn1)*abs(comp1.gop.matd1.tp)^2)/((1+comp1.gop.sn1)*abs(comp1.gop.matd1.ts)^2+(1-comp1.gop.sn1)*abs(comp1.gop.matd1.tp)^2+100*eps)</str> </arr> <str>comp1.gop.matd1.snt2</str> <arr> <str>2*abs(comp1.gop.matd1.ts)*abs(comp1.gop.matd1.tp)*comp1.gop.sn2/((1+comp1.gop.sn1)*abs(comp1.gop.matd1.ts)^2+(1-comp1.gop.sn1)*abs(comp1.gop.matd1.tp)^2+100*eps)</str> </arr> <str>comp1.gop.matd1.snt3</str> <arr> <str>2*abs(comp1.gop.matd1.ts)*abs(comp1.gop.matd1.tp)*comp1.gop.sn3/((1+comp1.gop.sn1)*abs(comp1.gop.matd1.ts)^2+(1-comp1.gop.sn1)*abs(comp1.gop.matd1.tp)^2+100*eps)</str> </arr> <str>comp1.gop.matd1.I0r</str> <arr> <str>0.5*comp1.gop.I*((1+comp1.gop.sn1)*abs(comp1.gop.matd1.rs)^2+(1-comp1.gop.sn1)*abs(comp1.gop.matd1.rp)^2)</str> </arr> <str>comp1.gop.matd1.Q0r</str> <arr> <str>0.5*comp1.gop.Q*((1+comp1.gop.sn1)*abs(comp1.gop.matd1.rs)^2+(1-comp1.gop.sn1)*abs(comp1.gop.matd1.rp)^2)</str> </arr> <str>comp1.gop.matd1.snr1</str> <arr> <str>((1+comp1.gop.sn1)*abs(comp1.gop.matd1.rs)^2-(1-comp1.gop.sn1)*abs(comp1.gop.matd1.rp)^2)/((1+comp1.gop.sn1)*abs(comp1.gop.matd1.rs)^2+(1-comp1.gop.sn1)*abs(comp1.gop.matd1.rp)^2+100*eps)</str> </arr> <str>comp1.gop.matd1.snr2</str> <arr> <str>2*abs(comp1.gop.matd1.rs)*abs(comp1.gop.matd1.rp)*(comp1.gop.sn2*cos(comp1.gop.matd1.ddelta)-comp1.gop.sn3*sin(comp1.gop.matd1.ddelta))/((1+comp1.gop.sn1)*abs(comp1.gop.matd1.rs)^2+(1-comp1.gop.sn1)*abs(comp1.gop.matd1.rp)^2+100*eps)</str> </arr> <str>comp1.gop.matd1.snr3</str> <arr> <str>2*abs(comp1.gop.matd1.rs)*abs(comp1.gop.matd1.rp)*(comp1.gop.sn2*sin(comp1.gop.matd1.ddelta)+comp1.gop.sn3*cos(comp1.gop.matd1.ddelta))/((1+comp1.gop.sn1)*abs(comp1.gop.matd1.rs)^2+(1-comp1.gop.sn1)*abs(comp1.gop.matd1.rp)^2+100*eps)</str> </arr> <str>comp1.gop.matd1.Q0a</str> <arr> <str>comp1.gop.Q-real(comp1.gop.matd1.Q0r)-real(comp1.gop.matd1.Q0t)</str> </arr> <str>comp1.qgop_fld_act</str> <arr> <str>1</str> </arr> <str>comp1.kgop_fld_act</str> <arr> <str>1</str> </arr> <str>comp1.gop.dkdtx</str> <arr> <str>-d(comp1.gop.omega,comp1.qx)</str> </arr> <str>comp1.gop.dkdty</str> <arr> <str>-d(comp1.gop.omega,comp1.qy)</str> </arr> <str>comp1.gop.dkdtz</str> <arr> <str>0</str> </arr> <str>comp1.gop.vgx</str> <arr> <str>d(comp1.gop.omega,comp1.kx)</str> </arr> <str>comp1.gop.vgy</str> <arr> <str>d(comp1.gop.omega,comp1.ky)</str> </arr> <str>comp1.gop.vgz</str> <arr> <str>0</str> </arr> <str>comp1.gop.Vg</str> <arr> <str>sqrt(comp1.gop.vgx^2+comp1.gop.vgy^2+comp1.gop.vgz^2+eps)</str> </arr> <str>comp1.gop.nvx</str> <arr> <str>-comp1.gop.vgx</str> </arr> <str>comp1.gop.nvy</str> <arr> <str>-comp1.gop.vgy</str> </arr> <str>comp1.gop.nvz</str> <arr> <str>-comp1.gop.vgz</str> </arr> <str>comp1.gop.vp</str> <arr> <str>comp1.gop.omega/sqrt(comp1.kx^2+comp1.ky^2+eps)</str> </arr> <str>comp1.gop.mp</str> <arr> <str>1</str> </arr> <str>comp1.gop.prt</str> <arr> <str>releasetime</str> </arr> <str>comp1.gop.prf</str> <arr> <str>releasefeature</str> </arr> <str>comp1.gop.Ntf</str> <arr> <str>numreleased</str> </arr> <str>comp1.gop.pidx</str> <arr> <str>particleindex</str> </arr> <str>comp1.gop.phii</str> <arr> <str>acos(abs(comp1.gop.nix*bndenv(comp1.gop.nx)+comp1.gop.niy*bndenv(comp1.gop.ny)))*unit_rad_cf</str> </arr> <str>comp1.gop.deltaqx</str> <arr> <str>comp1.qx-comp1.gop.qavex</str> </arr> <str>comp1.gop.deltaqy</str> <arr> <str>comp1.qy-comp1.gop.qavey</str> </arr> <str>comp1.gop.deltaqz</str> <arr> <str>0</str> </arr> <str>comp1.gop.deltaqmidx</str> <arr> <str>comp1.qx-comp1.gop.qmidx</str> </arr> <str>comp1.gop.deltaqmidy</str> <arr> <str>comp1.qy-comp1.gop.qmidy</str> </arr> <str>comp1.gop.deltaqmidz</str> <arr> <str>0</str> </arr> <str>comp1.gop.deltaqsumsq</str> <arr> <str>comp1.gop.deltaqx^2+comp1.gop.deltaqy^2+comp1.gop.deltaqz^2</str> </arr> <str>comp1.gop.rall</str> <arr> <str>sqrt(comp1.gop.deltaqsumsq)</str> </arr> <str>comp1.gop.deltaqmidsumsq</str> <arr> <str>comp1.gop.deltaqmidx^2+comp1.gop.deltaqmidy^2+comp1.gop.deltaqmidz^2</str> </arr> <str>comp1.gop.rmall</str> <arr> <str>sqrt(comp1.gop.deltaqmidsumsq)</str> </arr> <str>comp1.gop.rrel</str> <arr> <str>comp1.gop.relg1.rall</str> </arr> <str>comp1.gop.rmrel</str> <arr> <str>comp1.gop.relg1.rmall</str> </arr> <str>comp1.gop.nu</str> <arr> <str>c_const/(comp1.gop.lambda0+1.0E-30*unit_m_cf)</str> </arr> <str>comp1.gop.k0</str> <arr> <str>2*pi/(comp1.gop.lambda0+1.0E-30*unit_m_cf)</str> </arr> <str>comp1.gop.normk</str> <arr> <str>sqrt(comp1.kx^2+comp1.ky^2+eps)</str> </arr> <str>comp1.gop.nix</str> <arr> <str>comp1.kx/comp1.gop.normk</str> </arr> <str>comp1.gop.niy</str> <arr> <str>comp1.ky/comp1.gop.normk</str> </arr> <str>comp1.gop.niz</str> <arr> <str>0</str> </arr> <str>comp1.gop.Pixx</str> <arr> <str>1-comp1.gop.nix^2</str> </arr> <str>comp1.gop.Piyx</str> <arr> <str>-comp1.gop.niy*comp1.gop.nix</str> </arr> <str>comp1.gop.Pizx</str> <arr> <str>-comp1.gop.niz*comp1.gop.nix</str> </arr> <str>comp1.gop.Pixy</str> <arr> <str>-comp1.gop.nix*comp1.gop.niy</str> </arr> <str>comp1.gop.Piyy</str> <arr> <str>1-comp1.gop.niy^2</str> </arr> <str>comp1.gop.Pizy</str> <arr> <str>-comp1.gop.niz*comp1.gop.niy</str> </arr> <str>comp1.gop.Pixz</str> <arr> <str>-comp1.gop.nix*comp1.gop.niz</str> </arr> <str>comp1.gop.Piyz</str> <arr> <str>-comp1.gop.niy*comp1.gop.niz</str> </arr> <str>comp1.gop.Pizz</str> <arr> <str>1-comp1.gop.niz^2</str> </arr> <str>comp1.gop.dnds</str> <arr> <str>comp1.gop.nix*d(real(comp1.gop.nref),x)+comp1.gop.niy*d(real(comp1.gop.nref),y)</str> </arr> <str>comp1.gop.dNhdsx</str> <arr> <str>(comp1.gop.Pixx*d(real(comp1.gop.nref),x)+comp1.gop.Pixy*d(real(comp1.gop.nref),y))/real(comp1.gop.nref)</str> </arr> <str>comp1.gop.dNhdsy</str> <arr> <str>(comp1.gop.Piyx*d(real(comp1.gop.nref),x)+comp1.gop.Piyy*d(real(comp1.gop.nref),y))/real(comp1.gop.nref)</str> </arr> <str>comp1.gop.dNhdsz</str> <arr> <str>(comp1.gop.Pizx*d(real(comp1.gop.nref),x)+comp1.gop.Pizy*d(real(comp1.gop.nref),y))/real(comp1.gop.nref)</str> </arr> <str>comp1.gop.km</str> <arr> <str>comp1.gop.mp*comp1.gop.k0*real(comp1.gop.nref)</str> </arr> <str>comp1.gop.k1</str> <arr> <str>1/comp1.gop.r1</str> </arr> <str>comp1.gop.e1x</str> <arr> <str>0</str> </arr> <str>comp1.gop.e1y</str> <arr> <str>0</str> </arr> <str>comp1.gop.e1z</str> <arr> <str>1</str> </arr> <str>comp1.gop.e2x</str> <arr> <str>comp1.gop.e1z*comp1.gop.niy-comp1.gop.e1y*comp1.gop.niz</str> </arr> <str>comp1.gop.e2y</str> <arr> <str>-comp1.gop.e1z*comp1.gop.nix+comp1.gop.e1x*comp1.gop.niz</str> </arr> <str>comp1.gop.e2z</str> <arr> <str>comp1.gop.e1y*comp1.gop.nix-comp1.gop.e1x*comp1.gop.niy</str> </arr> <str>comp1.gop.rpl</str> <arr> <str>100000000*comp1.gop.dGeomChar</str> </arr> <str>comp1.gop.I</str> <arr> <str>comp1.gop.I0*abs(comp1.gop.r1_init)*exp(comp1.gop.atten)/(abs(comp1.gop.r1)+1.0E-14*comp1.gop.dGeomChar)</str> </arr> <str>comp1.gop.logI</str> <arr> <str>log10(comp1.gop.I)</str> </arr> <str>comp1.gop.s0</str> <arr> <str>comp1.gop.I</str> </arr> <str>comp1.gop.s1</str> <arr> <str>comp1.gop.I*comp1.gop.sn1</str> </arr> <str>comp1.gop.s2</str> <arr> <str>comp1.gop.I*comp1.gop.sn2</str> </arr> <str>comp1.gop.s3</str> <arr> <str>comp1.gop.I*comp1.gop.sn3</str> </arr> <str>comp1.gop.normE</str> <arr> <str>sqrt(2*comp1.gop.I*comp1.gop.P/(real(comp1.gop.nref)*c_const*epsilon0_const))</str> </arr> <str>comp1.gop.P</str> <arr> <str>sqrt(comp1.gop.sn1^2+comp1.gop.sn2^2+comp1.gop.sn3^2)</str> </arr> <str>comp1.gop.a1</str> <arr> <str>sqrt(abs((comp1.gop.P+comp1.gop.sn1)/(2*comp1.gop.P+eps)))</str> </arr> <str>comp1.gop.a2</str> <arr> <str>sqrt(abs((comp1.gop.P-comp1.gop.sn1)/(2*comp1.gop.P+eps)))</str> </arr> <str>comp1.gop.delta</str> <arr> <str>if(abs(comp1.gop.sn2)&lt;abs(comp1.gop.sn1)*sqrt(eps)&amp;&amp;abs(comp1.gop.sn3)&lt;abs(comp1.gop.sn1)*sqrt(eps),0,acos(comp1.gop.sn2/sqrt(comp1.gop.sn2^2+comp1.gop.sn3^2+100*eps))*unit_rad_cf*if(comp1.gop.sn3&lt;0,-1,1))</str> </arr> <str>comp1.gop.pax</str> <arr> <str>if(comp1.gop.P&lt;1.0E-6,0,(comp1.gop.e1x*cos(0.5*atan2(comp1.gop.sn2,comp1.gop.sn1)*unit_rad_cf)+comp1.gop.e2x*sin(0.5*atan2(comp1.gop.sn2,comp1.gop.sn1)*unit_rad_cf))*cos(if(abs(0.5*asin(comp1.gop.sn3)*unit_rad_cf)&lt;1.0E-6,1.0E-6,0.5*asin(comp1.gop.sn3)*unit_rad_cf)))</str> </arr> <str>comp1.gop.pay</str> <arr> <str>if(comp1.gop.P&lt;1.0E-6,0,(comp1.gop.e1y*cos(0.5*atan2(comp1.gop.sn2,comp1.gop.sn1)*unit_rad_cf)+comp1.gop.e2y*sin(0.5*atan2(comp1.gop.sn2,comp1.gop.sn1)*unit_rad_cf))*cos(if(abs(0.5*asin(comp1.gop.sn3)*unit_rad_cf)&lt;1.0E-6,1.0E-6,0.5*asin(comp1.gop.sn3)*unit_rad_cf)))</str> </arr> <str>comp1.gop.paz</str> <arr> <str>if(comp1.gop.P&lt;1.0E-6,0,(comp1.gop.e1z*cos(0.5*atan2(comp1.gop.sn2,comp1.gop.sn1)*unit_rad_cf)+comp1.gop.e2z*sin(0.5*atan2(comp1.gop.sn2,comp1.gop.sn1)*unit_rad_cf))*cos(if(abs(0.5*asin(comp1.gop.sn3)*unit_rad_cf)&lt;1.0E-6,1.0E-6,0.5*asin(comp1.gop.sn3)*unit_rad_cf)))</str> </arr> <str>comp1.gop.pbx</str> <arr> <str>if(comp1.gop.P&lt;1.0E-6,0,(-comp1.gop.e1x*sin(0.5*atan2(comp1.gop.sn2,comp1.gop.sn1)*unit_rad_cf)+comp1.gop.e2x*cos(0.5*atan2(comp1.gop.sn2,comp1.gop.sn1)*unit_rad_cf))*sin(if(abs(0.5*asin(comp1.gop.sn3)*unit_rad_cf)&lt;1.0E-6,1.0E-6,0.5*asin(comp1.gop.sn3)*unit_rad_cf)))</str> </arr> <str>comp1.gop.pby</str> <arr> <str>if(comp1.gop.P&lt;1.0E-6,0,(-comp1.gop.e1y*sin(0.5*atan2(comp1.gop.sn2,comp1.gop.sn1)*unit_rad_cf)+comp1.gop.e2y*cos(0.5*atan2(comp1.gop.sn2,comp1.gop.sn1)*unit_rad_cf))*sin(if(abs(0.5*asin(comp1.gop.sn3)*unit_rad_cf)&lt;1.0E-6,1.0E-6,0.5*asin(comp1.gop.sn3)*unit_rad_cf)))</str> </arr> <str>comp1.gop.pbz</str> <arr> <str>if(comp1.gop.P&lt;1.0E-6,0,(-comp1.gop.e1z*sin(0.5*atan2(comp1.gop.sn2,comp1.gop.sn1)*unit_rad_cf)+comp1.gop.e2z*cos(0.5*atan2(comp1.gop.sn2,comp1.gop.sn1)*unit_rad_cf))*sin(if(abs(0.5*asin(comp1.gop.sn3)*unit_rad_cf)&lt;1.0E-6,1.0E-6,0.5*asin(comp1.gop.sn3)*unit_rad_cf)))</str> </arr> <str>comp1.gop.attenCoeff</str> <arr> <str>2*imag(comp1.gop.nref)*comp1.gop.k0*c_const/real(comp1.gop.nref)</str> </arr> <str>comp1.gop.Q</str> <arr> <str>exp(comp1.gop.atten)*comp1.gop.Q0</str> </arr> <str>comp1.gop.relg1.L0normx</str> <arr> <str>0</str> </arr> <str>comp1.gop.relg1.L0normy</str> <arr> <str>-1</str> </arr> <str>comp1.gop.relg1.L0normz</str> <arr> <str>0</str> </arr> <str>comp1.gop.relg1.deltaqx</str> <arr> <str>if(comp1.gop.prf==1,comp1.qx-comp1.gop.relg1.qavex,NaN)</str> </arr> <str>comp1.gop.relg1.deltaqy</str> <arr> <str>if(comp1.gop.prf==1,comp1.qy-comp1.gop.relg1.qavey,NaN)</str> </arr> <str>comp1.gop.relg1.deltaqz</str> <arr> <str>0</str> </arr> <str>comp1.gop.relg1.deltaqmidx</str> <arr> <str>if(comp1.gop.prf==1,comp1.qx-comp1.gop.relg1.qmidx,NaN)</str> </arr> <str>comp1.gop.relg1.deltaqmidy</str> <arr> <str>if(comp1.gop.prf==1,comp1.qy-comp1.gop.relg1.qmidy,NaN)</str> </arr> <str>comp1.gop.relg1.deltaqmidz</str> <arr> <str>0</str> </arr> <str>comp1.gop.relg1.deltaqsumsq</str> <arr> <str>comp1.gop.relg1.deltaqx^2+comp1.gop.relg1.deltaqy^2+comp1.gop.relg1.deltaqz^2</str> </arr> <str>comp1.gop.relg1.rall</str> <arr> <str>sqrt(comp1.gop.relg1.deltaqsumsq)</str> </arr> <str>comp1.gop.relg1.deltaqmidsumsq</str> <arr> <str>comp1.gop.relg1.deltaqmidx^2+comp1.gop.relg1.deltaqmidy^2+comp1.gop.relg1.deltaqmidz^2</str> </arr> <str>comp1.gop.relg1.rmall</str> <arr> <str>sqrt(comp1.gop.relg1.deltaqmidsumsq)</str> </arr> <str>comp1.gop.relg1.r01</str> <arr> <str>comp1.gop.rpl</str> </arr> <str>comp1.gop.relg1.I0</str> <arr> <str>1000*unit_W_cf/unit_m_cf^2</str> </arr> <str>comp1.gop.relg1.P0</str> <arr> <str>0</str> </arr> <str>comp1.gop.relg1.sn01</str> <arr> <str>0</str> </arr> <str>comp1.gop.relg1.sn02</str> <arr> <str>0</str> </arr> <str>comp1.gop.relg1.sn03</str> <arr> <str>0</str> </arr> <str>comp1.gop.relg1.Q0</str> <arr> <str>unit_W_cf/(unit_m_cf*comp1.gop.Ntf)</str> </arr> </arr> <str>ind</str> <arr> <arr> <str>1</str> </arr> </arr> </rec> </arr> </arr> <str>protected</str> <str>false</str> </rec> <?xml version="1.0" encoding="UTF-8"?> <rec> <str>elem</str> <str>elvar</str> <str>g</str> <arr> <str>1</str> </arr> <str>geomdim</str> <arr> <arr> <arr> </arr> <rec> <str>var</str> <arr> <str>comp1.gop.nx</str> <arr> <str>dnx</str> </arr> <str>comp1.gop.ny</str> <arr> <str>dny</str> </arr> <str>comp1.gop.nz</str> <arr> <str>0</str> </arr> <str>comp1.gop.nxmesh</str> <arr> <str>dnxmesh</str> </arr> <str>comp1.gop.nymesh</str> <arr> <str>dnymesh</str> </arr> <str>comp1.gop.nzmesh</str> <arr> <str>0</str> </arr> </arr> <str>ind</str> <arr> <arr> <str>1</str> <str>2</str> <str>3</str> <str>5</str> <str>7</str> <str>8</str> <str>9</str> <str>10</str> </arr> </arr> </rec> </arr> </arr> <str>protected</str> <str>false</str> </rec> <?xml version="1.0" encoding="UTF-8"?> <rec> <str>elem</str> <str>elvar</str> <str>g</str> <arr> <str>1</str> </arr> <str>geomdim</str> <arr> <arr> <arr> </arr> <rec> <str>var</str> <arr> <str>comp1.gop.nx</str> <arr> <str>nx</str> </arr> <str>comp1.gop.ny</str> <arr> <str>ny</str> </arr> <str>comp1.gop.nz</str> <arr> <str>0</str> </arr> <str>comp1.gop.nxmesh</str> <arr> <str>nxmesh</str> </arr> <str>comp1.gop.nymesh</str> <arr> <str>nymesh</str> </arr> <str>comp1.gop.nzmesh</str> <arr> <str>0</str> </arr> </arr> <str>ind</str> <arr> <arr> <str>4</str> <str>6</str> </arr> </arr> </rec> </arr> </arr> <str>protected</str> <str>false</str> </rec> <?xml version="1.0" encoding="UTF-8"?> <rec> <str>elem</str> <str>elvar</str> <str>g</str> <arr> <str>1</str> </arr> <str>geomdim</str> <arr> <arr> <arr> </arr> <arr> </arr> <rec> <str>var</str> <arr> <str>comp1.gop.N_localxx</str> <arr> <str>comp1.mat1.rfi.n11</str> </arr> <str>comp1.gop.N_localyx</str> <arr> <str>0</str> </arr> <str>comp1.gop.N_localzx</str> <arr> <str>0</str> </arr> <str>comp1.gop.N_localxy</str> <arr> <str>0</str> </arr> <str>comp1.gop.N_localyy</str> <arr> <str>comp1.mat1.rfi.n22</str> </arr> <str>comp1.gop.N_localzy</str> <arr> <str>0</str> </arr> <str>comp1.gop.N_localxz</str> <arr> <str>0</str> </arr> <str>comp1.gop.N_localyz</str> <arr> <str>0</str> </arr> <str>comp1.gop.N_localzz</str> <arr> <str>comp1.mat1.rfi.n33</str> </arr> <str>comp1.gop.ki_localxx</str> <arr> <str>0</str> </arr> <str>comp1.gop.ki_localyx</str> <arr> <str>0</str> </arr> <str>comp1.gop.ki_localzx</str> <arr> <str>0</str> </arr> <str>comp1.gop.ki_localxy</str> <arr> <str>0</str> </arr> <str>comp1.gop.ki_localyy</str> <arr> <str>0</str> </arr> <str>comp1.gop.ki_localzy</str> <arr> <str>0</str> </arr> <str>comp1.gop.ki_localxz</str> <arr> <str>0</str> </arr> <str>comp1.gop.ki_localyz</str> <arr> <str>0</str> </arr> <str>comp1.gop.ki_localzz</str> <arr> <str>0</str> </arr> </arr> <str>ind</str> <arr> <arr> <str>1</str> </arr> </arr> </rec> </arr> </arr> <str>protected</str> <str>false</str> </rec> <?xml version="1.0" encoding="UTF-8"?> <rec> <str>elem</str> <str>elvar</str> <str>g</str> <arr> <str>1</str> </arr> <str>geomdim</str> <arr> <arr> <arr> </arr> <arr> </arr> <rec> <str>var</str> <arr> <str>comp1.gop.N_localxx</str> <arr> <str>comp1.mat2.rfi.n11</str> </arr> <str>comp1.gop.N_localyx</str> <arr> <str>0</str> </arr> <str>comp1.gop.N_localzx</str> <arr> <str>0</str> </arr> <str>comp1.gop.N_localxy</str> <arr> <str>0</str> </arr> <str>comp1.gop.N_localyy</str> <arr> <str>comp1.mat2.rfi.n22</str> </arr> <str>comp1.gop.N_localzy</str> <arr> <str>0</str> </arr> <str>comp1.gop.N_localxz</str> <arr> <str>0</str> </arr> <str>comp1.gop.N_localyz</str> <arr> <str>0</str> </arr> <str>comp1.gop.N_localzz</str> <arr> <str>comp1.mat2.rfi.n33</str> </arr> <str>comp1.gop.ki_localxx</str> <arr> <str>0</str> </arr> <str>comp1.gop.ki_localyx</str> <arr> <str>0</str> </arr> <str>comp1.gop.ki_localzx</str> <arr> <str>0</str> </arr> <str>comp1.gop.ki_localxy</str> <arr> <str>0</str> </arr> <str>comp1.gop.ki_localyy</str> <arr> <str>0</str> </arr> <str>comp1.gop.ki_localzy</str> <arr> <str>0</str> </arr> <str>comp1.gop.ki_localxz</str> <arr> <str>0</str> </arr> <str>comp1.gop.ki_localyz</str> <arr> <str>0</str> </arr> <str>comp1.gop.ki_localzz</str> <arr> <str>0</str> </arr> </arr> <str>ind</str> <arr> <arr> <str>2</str> </arr> </arr> </rec> </arr> </arr> <str>protected</str> <str>false</str> </rec> <?xml version="1.0" encoding="UTF-8"?> <rec> <str>elem</str> <str>elvar</str> <str>g</str> <arr> <str>1</str> </arr> <str>geomdim</str> <arr> <arr> <arr> </arr> <arr> </arr> <rec> <str>var</str> <arr> <str>comp1.gop.N_localxx</str> <arr> <str>comp1.mat3.rfi.n11</str> </arr> <str>comp1.gop.N_localyx</str> <arr> <str>0</str> </arr> <str>comp1.gop.N_localzx</str> <arr> <str>0</str> </arr> <str>comp1.gop.N_localxy</str> <arr> <str>0</str> </arr> <str>comp1.gop.N_localyy</str> <arr> <str>comp1.mat3.rfi.n22</str> </arr> <str>comp1.gop.N_localzy</str> <arr> <str>0</str> </arr> <str>comp1.gop.N_localxz</str> <arr> <str>0</str> </arr> <str>comp1.gop.N_localyz</str> <arr> <str>0</str> </arr> <str>comp1.gop.N_localzz</str> <arr> <str>comp1.mat3.rfi.n33</str> </arr> <str>comp1.gop.ki_localxx</str> <arr> <str>0</str> </arr> <str>comp1.gop.ki_localyx</str> <arr> <str>0</str> </arr> <str>comp1.gop.ki_localzx</str> <arr> <str>0</str> </arr> <str>comp1.gop.ki_localxy</str> <arr> <str>0</str> </arr> <str>comp1.gop.ki_localyy</str> <arr> <str>0</str> </arr> <str>comp1.gop.ki_localzy</str> <arr> <str>0</str> </arr> <str>comp1.gop.ki_localxz</str> <arr> <str>0</str> </arr> <str>comp1.gop.ki_localyz</str> <arr> <str>0</str> </arr> <str>comp1.gop.ki_localzz</str> <arr> <str>0</str> </arr> </arr> <str>ind</str> <arr> <arr> <str>3</str> </arr> </arr> </rec> </arr> </arr> <str>protected</str> <str>false</str> </rec> "<?xml version="1.0" encoding="UTF-8"?> <rec> <str>elem</str> <str>elvar</str> <str>g</str> <arr> <str>1</str> </arr> <str>geomdim</str> <arr> <arr> <arr> </arr> <rec> <str>var</str> <arr> <str>comp1.sys1.Tdef11</str> <arr> <str>if(sqrt((nymesh*comp1.sys1.nSign)^2+(nxmesh*comp1.sys1.nSign)^2)&gt;1.0E-10,nymesh*comp1.sys1.nSign/sqrt((nymesh*comp1.sys1.nSign)^2+(nxmesh*comp1.sys1.nSign)^2),(nymesh*comp1.sys1.nSign)^2/sqrt((nymesh*comp1.sys1.nSign)^2))</str> </arr> <str>comp1.sys1.Tdef21</str> <arr> <str>nxmesh*comp1.sys1.nSign</str> </arr> <str>comp1.sys1.Tdef31</str> <arr> <str>0</str> </arr> <str>comp1.sys1.Tdef12</str> <arr> <str>if(sqrt((nymesh*comp1.sys1.nSign)^2+(nxmesh*comp1.sys1.nSign)^2)&gt;1.0E-10,-nxmesh*comp1.sys1.nSign/sqrt((nymesh*comp1.sys1.nSign)^2+(nxmesh*comp1.sys1.nSign)^2),-nxmesh*nymesh*comp1.sys1.nSign^2/sqrt((nymesh*comp1.sys1.nSign)^2))</str> </arr> <str>comp1.sys1.Tdef22</str> <arr> <str>nymesh*comp1.sys1.nSign</str> </arr> <str>comp1.sys1.Tdef32</str> <arr> <str>0</str> </arr> <str>comp1.sys1.Tdef13</str> <arr> <str>0</str> </arr> <str>comp1.sys1.Tdef23</str> <arr> <str>0</str> </arr> <str>comp1.sys1.Tdef33</str> <arr> <str>if(sqrt((nymesh*comp1.sys1.nSign)^2+(nxmesh*comp1.sys1.nSign)^2)&gt;1.0E-10,((nymesh*comp1.sys1.nSign)^2+(nxmesh*comp1.sys1.nSign)^2)/sqrt((nymesh*comp1.sys1.nSign)^2+(nxmesh*comp1.sys1.nSign)^2),nymesh*comp1.sys1.nSign/sqrt((nymesh*comp1.sys1.nSign)^2))</str> </arr> <str>comp1.sys1.invTdef11</str> <arr> <str>comp1.sys1.Tdef11</str> </arr> <str>comp1.sys1.invTdef21</str> <arr> <str>comp1.sys1.Tdef12</str> </arr> <str>comp1.sys1.invTdef31</str> <arr> <str>0</str> </arr> <str>comp1.sys1.invTdef12</str> <arr> <str>comp1.sys1.Tdef21</str> </arr> <str>comp1.sys1.invTdef22</str> <arr> <str>comp1.sys1.Tdef22</str> </arr> <str>comp1.sys1.invTdef32</str> <arr> <str>0</str> </arr> <str>comp1.sys1.invTdef13</str> <arr> <str>0</str> </arr> <str>comp1.sys1.invTdef23</str> <arr> <str>0</str> </arr> <str>comp1.sys1.invTdef33</str> <arr> <str>comp1.sys1.Tdef33</str> </arr> <str>comp1.sys1.T11</str> <arr> <str>comp1.sys1.Tdef11</str> </arr> <str>comp1.sys1.T21</str> <arr> <str>comp1.sys1.Tdef21</str> </arr> <str>comp1.sys1.T31</str> <arr> <str>0</str> </arr> <str>comp1.sys1.T12</str> <arr> <str>comp1.sys1.Tdef12</str> </arr> <str>comp1.sys1.T22</str> <arr> <str>comp1.sys1.Tdef22</str> </arr> <str>comp1.sys1.T32</str> <arr> <str>0</str> </arr> <str>comp1.sys1.T13</str> <arr> <str>0</str> </arr> <str>comp1.sys1.T23</str> <arr> <str>0</str> </arr> <str>comp1.sys1.T33</str> <arr> <str>comp1.sys1.Tdef33</str> </arr> <str>comp1.sys1.invT11</str> <arr> <str>comp1.sys1.Tdef11</str> </arr> <str>comp1.sys1.invT21</str> <arr> <str>comp1.sys1.Tdef12</str> </arr> <str>comp1.sys1.invT31</str> <arr> <str>0</str> </arr> <str>comp1.sys1.invT12</str> <arr> <str>comp1.sys1.Tdef21</str> </arr> <str>comp1.sys1.invT22</str> <arr> <str>comp1.sys1.Tdef22</str> </arr> <str>comp1.sys1.invT32</str> <arr> <str>0</str> </arr> <str>comp1.sys1.invT13</str> <arr> <str>0</str> </arr> <str>comp1.sys1.invT23</str> <arr> <str>0</str> </arr> <str>comp1.sys1.invT33</str> <arr> <str>comp1.sys1.Tdef33</str> </arr> <str>comp1.sys1.e_t11</str> <arr> <str>comp1.sys1.Tdef11</str> </arr> <str>comp1.sys1.e_t12</str> <arr> <str>comp1.sys1.Tdef12</str> </arr> <str>comp1.sys1.e_t13</str> <arr> <str>0</str> </arr> <str>comp1.sys1.e_n1</str> <arr> <str>comp1.sys1.Tdef21</str> </arr> <str>comp1.sys1.e_n2</str> <arr> <str>comp1.sys1.Tdef22</str> </arr> <str>comp1.sys1.e_n3</str> <arr> <str>0</str> </arr> <str>comp1.sys1.e_to1</str> <arr> <str>0</str> </arr> <str>comp1.sys1.e_to2</str> <arr> <str>0</str> </arr> <str>comp1.sys1.e_to3</str> <arr> <str>comp1.sys1.Tdef33</str> </arr> <str>comp1.sys1.Tref11</str> <arr> <str>if(sqrt((nYmesh*comp1.sys1.nSign)^2+(nXmesh*comp1.sys1.nSign)^2)&gt;1.0E-10,nYmesh*comp1.sys1.nSign/sqrt((nYmesh*comp1.sys1.nSign)^2+(nXmesh*comp1.sys1.nSign)^2),(nYmesh*comp1.sys1.nSign)^2/sqrt((nYmesh*comp1.sys1.nSign)^2))</str> </arr> <str>comp1.sys1.Tref21</str> <arr> <str>nXmesh*comp1.sys1.nSign</str> </arr> <str>comp1.sys1.Tref31</str> <arr> <str>0</str> </arr> <str>comp1.sys1.Tref12</str> <arr> <str>if(sqrt((nYmesh*comp1.sys1.nSign)^2+(nXmesh*comp1.sys1.nSign)^2)&gt;1.0E-10,-nXmesh*comp1.sys1.nSign/sqrt((nYmesh*comp1.sys1.nSign)^2+(nXmesh*comp1.sys1.nSign)^2),-nXmesh*nYmesh*comp1.sys1.nSign^2/sqrt((nYmesh*comp1.sys1.nSign)^2))</str> </arr> <str>comp1.sys1.Tref22</str> <arr> <str>nYmesh*comp1.sys1.nSign</str> </arr> <str>comp1.sys1.Tref32</str> <arr> <str>0</str> </arr> <str>comp1.sys1.Tref13</str> <arr> <str>0</str> </arr> <str>comp1.sys1.Tref23</str> <arr> <str>0</str> </arr> <str>comp1.sys1.Tref33</str> <arr> <str>if(sqrt((nYmesh*comp1.sys1.nSign)^2+(nXmesh*comp1.sys1.nSign)^2)&gt;1.0E-10,((nYmesh*comp1.sys1.nSign)^2+(nXmesh*comp1.sys1.nSign)^2)/sqrt((nYmesh*comp1.sys1.nSign)^2+(nXmesh*comp1.sys1.nSign)^2),nYmesh*comp1.sys1.nSign/sqrt((nYmesh*comp1.sys1.nSign)^2))</str> </arr> <str>comp1.sys1.invTref11</str> <arr> <str>comp1.sys1.Tref11</str> </arr> <str>comp1.sys1.invTref21</str> <arr> <str>comp1.sys1.Tref12</str> </arr> <str>comp1.sys1.invTref31</str> <arr> <str>0</str> </arr> <str>comp1.sys1.invTref12</str> <arr> <str>comp1.sys1.Tref21</str> </arr> <str>comp1.sys1.invTref22</str> <arr> <str>comp1.sys1.Tref22</str> </arr> <str>comp1.sys1.invTref32</str> <arr> <str>0</str> </arr> <str>comp1.sys1.invTref13</str> <arr> <str>0</str> </arr> <str>comp1.sys1.invTref23</str> <arr> <str>0</str> </arr> <str>comp1.sys1.invTref33</str> <arr> <str>comp1.sys1.Tref33</str> </arr> <str>comp1.sys1.Tgeom11</str> <arr> <str>if(sqrt((nYgmesh*comp1.sys1.nSign)^2+(nXgmesh*comp1.sys1.nSign)^2)&gt;1.0E-10,nYgmesh*comp1.sys1.nSign/sqrt((nYgmesh*comp1.sys1.nSign)^2+(nXgmesh*comp1.sys1.nSign)^2),(nYgmesh*comp1.sys1.nSign)^2/sqrt((nYgmesh*comp1.sys1.nSign)^2))</str> </arr> <str>comp1.sys1.Tgeom21</str> <arr> <str>nXgmesh*comp1.sys1.nSign</str> </arr> <str>comp1.sys1.Tgeom31</str> <arr> <str>0</str> </arr> <str>comp1.sys1.Tgeom12</str> <arr> <str>if(sqrt((nYgmesh*comp1.sys1.nSign)^2+(nXgmesh*comp1.sys1.nSign)^2)&gt;1.0E-10,-nXgmesh*comp1.sys1.nSign/sqrt((nYgmesh*comp1.sys1.nSign)^2+(nXgmesh*comp1.sys1.nSign)^2),-nXgmesh*nYgmesh*comp1.sys1.nSign^2/sqrt((nYgmesh*comp1.sys1.nSign)^2))</str> </arr> <str>comp1.sys1.Tgeom22</str> <arr> <str>nYgmesh*comp1.sys1.nSign</str> </arr> <str>comp1.sys1.Tgeom32</str> <arr> <str>0</str> </arr> <str>comp1.sys1.Tgeom13</str> <arr> <str>0</str> </arr> <str>comp1.sys1.Tgeom23</str> <arr> <str>0</str> </arr> <str>comp1.sys1.Tgeom33</str> <arr> <str>if(sqrt((nYgmesh*comp1.sys1.nSign)^2+(nXgmesh*comp1.sys1.nSign)^2)&gt;1.0E-10,((nYgmesh*comp1.sys1.nSign)^2+(nXgmesh*comp1.sys1.nSign)^2)/sqrt((nYgmesh*comp1.sys1.nSign)^2+(nXgmesh*comp1.sys1.nSign)^2),nYgmesh*comp1.sys1.nSign/sqrt((nYgmesh*comp1.sys1.nSign)^2))</str> </arr> <str>comp1.sys1.invTgeom11</str> <arr> <str>comp1.sys1.Tgeom11</str> </arr> <str>comp1.sys1.invTgeom21</str> <arr> <str>comp1.sys1.Tgeom12</str> </arr> <str>comp1.sys1.invTgeom31</str> <arr> <str>0</str> </arr> <str>comp1.sys1.invTgeom12</str> <arr> <str>comp1.sys1.Tgeom21</str> </arr> <str>comp1.sys1.invTgeom22</str> <arr> <str>comp1.sys1.Tgeom22</str> </arr> <str>comp1.sys1.invTgeom32</str> <arr> <str>0</str> </arr> <str>comp1.sys1.invTgeom13</str> <arr> <str>0</str> </arr> <str>comp1.sys1.invTgeom23</str> <arr> <str>0</str> </arr> <str>comp1.sys1.invTgeom33</str> <arr> <str>comp1.sys1.Tgeom33</str> </arr> <str>comp1.sys1.detT</str> <arr> <str>1</str> </arr> <str>comp1.sys1.detInvT</str> <arr> <str>1</str> </arr> <str>comp1.sys1.gSub11</str> <arr> <str>1</str> </arr> <str>comp1.sys1.gSub21</str> <arr> <str>0</str> </arr> <str>comp1.sys1.gSub31</str> <arr> <str>0</str> </arr> <str>comp1.sys1.gSub12</str> <arr> <str>0</str> </arr> <str>comp1.sys1.gSub22</str> <arr> <str>1</str> </arr> <str>comp1.sys1.gSub32</str> <arr> <str>0</str> </arr> <str>comp1.sys1.gSub13</str> <arr> <str>0</str> </arr> <str>comp1.sys1.gSub23</str> <arr> <str>0</str> </arr> <str>comp1.sys1.gSub33</str> <arr> <str>1</str> </arr> <str>comp1.sys1.gSup11</str> <arr> <str>1</str> </arr> <str>comp1.sys1.gSup21</str> <arr> <str>0</str> </arr> <str>comp1.sys1.gSup31</str> <arr> <str>0</str> </arr> <str>comp1.sys1.gSup12</str> <arr> <str>0</str> </arr> <str>comp1.sys1.gSup22</str> <arr> <str>1</str> </arr> <str>comp1.sys1.gSup32</str> <arr> <str>0</str> </arr> <str>comp1.sys1.gSup13</str> <arr> <str>0</str> </arr> <str>comp1.sys1.gSup23</str> <arr> <str>0</str> </arr> <str>comp1.sys1.gSup33</str> <arr> <str>1</str> </arr> <str>comp1.sys1.nSign</str> <arr> <str>1</str> </arr> </arr> <str>ind</str> <arr> <arr> <str>1</str> <str>2</str> <str>3</str> <str>4</str> <str>5</str> <str>6</str> <str>7</str> <str>8</str> <str>9</str> <str>10</str> </arr> </arr> </rec> </arr> </arr> <str>protected</str> <str>false</str> </rec> v<?xml version="1.0" encoding="UTF-8"?> <rec> <str>elem</str> <str>elvar</str> <str>g</str> <arr> <str>1</str> </arr> <str>geomdim</str> <arr> <arr> <arr> </arr> <arr> </arr> <rec> <str>var</str> <arr> <str>material.rfi.n11</str> <arr> <str>n_glass</str> </arr> <str>material.rfi.n21</str> <arr> <str>0</str> </arr> <str>material.rfi.n31</str> <arr> <str>0</str> </arr> <str>material.rfi.n12</str> <arr> <str>0</str> </arr> <str>material.rfi.n22</str> <arr> <str>n_glass</str> </arr> <str>material.rfi.n32</str> <arr> <str>0</str> </arr> <str>material.rfi.n13</str> <arr> <str>0</str> </arr> <str>material.rfi.n23</str> <arr> <str>0</str> </arr> <str>material.rfi.n33</str> <arr> <str>n_glass</str> </arr> <str>material.rfi.n_symmetry</str> <arr> <str>0</str> </arr> <str>material.rfi.n_iso</str> <arr> <str>n_glass</str> </arr> <str>material.rfi.ki11</str> <arr> <str>0</str> </arr> <str>material.rfi.ki21</str> <arr> <str>0</str> </arr> <str>material.rfi.ki31</str> <arr> <str>0</str> </arr> <str>material.rfi.ki12</str> <arr> <str>0</str> </arr> <str>material.rfi.ki22</str> <arr> <str>0</str> </arr> <str>material.rfi.ki32</str> <arr> <str>0</str> </arr> <str>material.rfi.ki13</str> <arr> <str>0</str> </arr> <str>material.rfi.ki23</str> <arr> <str>0</str> </arr> <str>material.rfi.ki33</str> <arr> <str>0</str> </arr> <str>material.rfi.ki_symmetry</str> <arr> <str>0</str> </arr> <str>material.rfi.ki_iso</str> <arr> <str>0</str> </arr> <str>material.lst.epsilonPrim11</str> <arr> <str>comp1.mat1.rfi.n_iso^2-comp1.mat1.rfi.ki_iso^2</str> </arr> <str>material.lst.epsilonPrim21</str> <arr> <str>0</str> </arr> <str>material.lst.epsilonPrim31</str> <arr> <str>0</str> </arr> <str>material.lst.epsilonPrim12</str> <arr> <str>0</str> </arr> <str>material.lst.epsilonPrim22</str> <arr> <str>comp1.mat1.rfi.n_iso^2-comp1.mat1.rfi.ki_iso^2</str> </arr> <str>material.lst.epsilonPrim32</str> <arr> <str>0</str> </arr> <str>material.lst.epsilonPrim13</str> <arr> <str>0</str> </arr> <str>material.lst.epsilonPrim23</str> <arr> <str>0</str> </arr> <str>material.lst.epsilonPrim33</str> <arr> <str>comp1.mat1.rfi.n_iso^2-comp1.mat1.rfi.ki_iso^2</str> </arr> <str>material.lst.epsilonPrim_iso</str> <arr> <str>comp1.mat1.rfi.n_iso^2-comp1.mat1.rfi.ki_iso^2</str> </arr> <str>material.lst.epsilonPrim_symmetry</str> <arr> <str>79</str> </arr> <str>material.lst.delta</str> <arr> <str>atan2(2*comp1.mat1.rfi.n_iso*comp1.mat1.rfi.ki_iso,comp1.mat1.rfi.n_iso^2-comp1.mat1.rfi.ki_iso^2)*unit_rad_cf</str> </arr> <str>material.def.epsilonr11</str> <arr> <str>comp1.mat1.rfi.n11^2-comp1.mat1.rfi.ki11^2-2*j*comp1.mat1.rfi.n11*comp1.mat1.rfi.ki11+comp1.mat1.rfi.n21^2-comp1.mat1.rfi.ki21^2-2*j*comp1.mat1.rfi.n21*comp1.mat1.rfi.ki21+comp1.mat1.rfi.n31^2-comp1.mat1.rfi.ki31^2-2*j*comp1.mat1.rfi.n31*comp1.mat1.rfi.ki31</str> </arr> <str>material.def.epsilonr21</str> <arr> <str>comp1.mat1.rfi.n11*comp1.mat1.rfi.n12-comp1.mat1.rfi.ki11*comp1.mat1.rfi.ki12-j*(comp1.mat1.rfi.n11*comp1.mat1.rfi.ki12+comp1.mat1.rfi.ki11*comp1.mat1.rfi.n12)+comp1.mat1.rfi.n21*comp1.mat1.rfi.n22-comp1.mat1.rfi.ki21*comp1.mat1.rfi.ki22-j*(comp1.mat1.rfi.n21*comp1.mat1.rfi.ki22+comp1.mat1.rfi.ki21*comp1.mat1.rfi.n22)+comp1.mat1.rfi.n31*comp1.mat1.rfi.n32-comp1.mat1.rfi.ki31*comp1.mat1.rfi.ki32-j*(comp1.mat1.rfi.n31*comp1.mat1.rfi.ki32+comp1.mat1.rfi.ki31*comp1.mat1.rfi.n32)</str> </arr> <str>material.def.epsilonr31</str> <arr> <str>comp1.mat1.rfi.n11*comp1.mat1.rfi.n13-comp1.mat1.rfi.ki11*comp1.mat1.rfi.ki13-j*(comp1.mat1.rfi.n11*comp1.mat1.rfi.ki13+comp1.mat1.rfi.ki11*comp1.mat1.rfi.n13)+comp1.mat1.rfi.n21*comp1.mat1.rfi.n23-comp1.mat1.rfi.ki21*comp1.mat1.rfi.ki23-j*(comp1.mat1.rfi.n21*comp1.mat1.rfi.ki23+comp1.mat1.rfi.ki21*comp1.mat1.rfi.n23)+comp1.mat1.rfi.n31*comp1.mat1.rfi.n33-comp1.mat1.rfi.ki31*comp1.mat1.rfi.ki33-j*(comp1.mat1.rfi.n31*comp1.mat1.rfi.ki33+comp1.mat1.rfi.ki31*comp1.mat1.rfi.n33)</str> </arr> <str>material.def.epsilonr12</str> <arr> <str>comp1.mat1.rfi.n12*comp1.mat1.rfi.n11-comp1.mat1.rfi.ki12*comp1.mat1.rfi.ki11-j*(comp1.mat1.rfi.n12*comp1.mat1.rfi.ki11+comp1.mat1.rfi.ki12*comp1.mat1.rfi.n11)+comp1.mat1.rfi.n22*comp1.mat1.rfi.n21-comp1.mat1.rfi.ki22*comp1.mat1.rfi.ki21-j*(comp1.mat1.rfi.n22*comp1.mat1.rfi.ki21+comp1.mat1.rfi.ki22*comp1.mat1.rfi.n21)+comp1.mat1.rfi.n32*comp1.mat1.rfi.n31-comp1.mat1.rfi.ki32*comp1.mat1.rfi.ki31-j*(comp1.mat1.rfi.n32*comp1.mat1.rfi.ki31+comp1.mat1.rfi.ki32*comp1.mat1.rfi.n31)</str> </arr> <str>material.def.epsilonr22</str> <arr> <str>comp1.mat1.rfi.n12^2-comp1.mat1.rfi.ki12^2-2*j*comp1.mat1.rfi.n12*comp1.mat1.rfi.ki12+comp1.mat1.rfi.n22^2-comp1.mat1.rfi.ki22^2-2*j*comp1.mat1.rfi.n22*comp1.mat1.rfi.ki22+comp1.mat1.rfi.n32^2-comp1.mat1.rfi.ki32^2-2*j*comp1.mat1.rfi.n32*comp1.mat1.rfi.ki32</str> </arr> <str>material.def.epsilonr32</str> <arr> <str>comp1.mat1.rfi.n12*comp1.mat1.rfi.n13-comp1.mat1.rfi.ki12*comp1.mat1.rfi.ki13-j*(comp1.mat1.rfi.n12*comp1.mat1.rfi.ki13+comp1.mat1.rfi.ki12*comp1.mat1.rfi.n13)+comp1.mat1.rfi.n22*comp1.mat1.rfi.n23-comp1.mat1.rfi.ki22*comp1.mat1.rfi.ki23-j*(comp1.mat1.rfi.n22*comp1.mat1.rfi.ki23+comp1.mat1.rfi.ki22*comp1.mat1.rfi.n23)+comp1.mat1.rfi.n32*comp1.mat1.rfi.n33-comp1.mat1.rfi.ki32*comp1.mat1.rfi.ki33-j*(comp1.mat1.rfi.n32*comp1.mat1.rfi.ki33+comp1.mat1.rfi.ki32*comp1.mat1.rfi.n33)</str> </arr> <str>material.def.epsilonr13</str> <arr> <str>comp1.mat1.rfi.n13*comp1.mat1.rfi.n11-comp1.mat1.rfi.ki13*comp1.mat1.rfi.ki11-j*(comp1.mat1.rfi.n13*comp1.mat1.rfi.ki11+comp1.mat1.rfi.ki13*comp1.mat1.rfi.n11)+comp1.mat1.rfi.n23*comp1.mat1.rfi.n21-comp1.mat1.rfi.ki23*comp1.mat1.rfi.ki21-j*(comp1.mat1.rfi.n23*comp1.mat1.rfi.ki21+comp1.mat1.rfi.ki23*comp1.mat1.rfi.n21)+comp1.mat1.rfi.n33*comp1.mat1.rfi.n31-comp1.mat1.rfi.ki33*comp1.mat1.rfi.ki31-j*(comp1.mat1.rfi.n33*comp1.mat1.rfi.ki31+comp1.mat1.rfi.ki33*comp1.mat1.rfi.n31)</str> </arr> <str>material.def.epsilonr23</str> <arr> <str>comp1.mat1.rfi.n13*comp1.mat1.rfi.n12-comp1.mat1.rfi.ki13*comp1.mat1.rfi.ki12-j*(comp1.mat1.rfi.n13*comp1.mat1.rfi.ki12+comp1.mat1.rfi.ki13*comp1.mat1.rfi.n12)+comp1.mat1.rfi.n23*comp1.mat1.rfi.n22-comp1.mat1.rfi.ki23*comp1.mat1.rfi.ki22-j*(comp1.mat1.rfi.n23*comp1.mat1.rfi.ki22+comp1.mat1.rfi.ki23*comp1.mat1.rfi.n22)+comp1.mat1.rfi.n33*comp1.mat1.rfi.n32-comp1.mat1.rfi.ki33*comp1.mat1.rfi.ki32-j*(comp1.mat1.rfi.n33*comp1.mat1.rfi.ki32+comp1.mat1.rfi.ki33*comp1.mat1.rfi.n32)</str> </arr> <str>material.def.epsilonr33</str> <arr> <str>comp1.mat1.rfi.n13^2-comp1.mat1.rfi.ki13^2-2*j*comp1.mat1.rfi.n13*comp1.mat1.rfi.ki13+comp1.mat1.rfi.n23^2-comp1.mat1.rfi.ki23^2-2*j*comp1.mat1.rfi.n23*comp1.mat1.rfi.ki23+comp1.mat1.rfi.n33^2-comp1.mat1.rfi.ki33^2-2*j*comp1.mat1.rfi.n33*comp1.mat1.rfi.ki33</str> </arr> <str>material.def.epsilonr_iso</str> <arr> <str>if(comp1.mat1.rfi.n12*comp1.mat1.rfi.n11-comp1.mat1.rfi.ki12*comp1.mat1.rfi.ki11-j*(comp1.mat1.rfi.n12*comp1.mat1.rfi.ki11+comp1.mat1.rfi.ki12*comp1.mat1.rfi.n11)+comp1.mat1.rfi.n22*comp1.mat1.rfi.n21-comp1.mat1.rfi.ki22*comp1.mat1.rfi.ki21-j*(comp1.mat1.rfi.n22*comp1.mat1.rfi.ki21+comp1.mat1.rfi.ki22*comp1.mat1.rfi.n21)+comp1.mat1.rfi.n32*comp1.mat1.rfi.n31-comp1.mat1.rfi.ki32*comp1.mat1.rfi.ki31-j*(comp1.mat1.rfi.n32*comp1.mat1.rfi.ki31+comp1.mat1.rfi.ki32*comp1.mat1.rfi.n31)==0&amp;&amp;comp1.mat1.rfi.n13*comp1.mat1.rfi.n11-comp1.mat1.rfi.ki13*comp1.mat1.rfi.ki11-j*(comp1.mat1.rfi.n13*comp1.mat1.rfi.ki11+comp1.mat1.rfi.ki13*comp1.mat1.rfi.n11)+comp1.mat1.rfi.n23*comp1.mat1.rfi.n21-comp1.mat1.rfi.ki23*comp1.mat1.rfi.ki21-j*(comp1.mat1.rfi.n23*comp1.mat1.rfi.ki21+comp1.mat1.rfi.ki23*comp1.mat1.rfi.n21)+comp1.mat1.rfi.n33*comp1.mat1.rfi.n31-comp1.mat1.rfi.ki33*comp1.mat1.rfi.ki31-j*(comp1.mat1.rfi.n33*comp1.mat1.rfi.ki31+comp1.mat1.rfi.ki33*comp1.mat1.rfi.n31)==0&amp;&amp;comp1.mat1.rfi.n12*comp1.mat1.rfi.n11-comp1.mat1.rfi.ki12*comp1.mat1.rfi.ki11-j*(comp1.mat1.rfi.n12*comp1.mat1.rfi.ki11+comp1.mat1.rfi.ki12*comp1.mat1.rfi.n11)+comp1.mat1.rfi.n22*comp1.mat1.rfi.n21-comp1.mat1.rfi.ki22*comp1.mat1.rfi.ki21-j*(comp1.mat1.rfi.n22*comp1.mat1.rfi.ki21+comp1.mat1.rfi.ki22*comp1.mat1.rfi.n21)+comp1.mat1.rfi.n32*comp1.mat1.rfi.n31-comp1.mat1.rfi.ki32*comp1.mat1.rfi.ki31-j*(comp1.mat1.rfi.n32*comp1.mat1.rfi.ki31+comp1.mat1.rfi.ki32*comp1.mat1.rfi.n31)==0&amp;&amp;comp1.mat1.rfi.n12^2-comp1.mat1.rfi.ki12^2-2*j*comp1.mat1.rfi.n12*comp1.mat1.rfi.ki12+comp1.mat1.rfi.n22^2-comp1.mat1.rfi.ki22^2-2*j*comp1.mat1.rfi.n22*comp1.mat1.rfi.ki22+comp1.mat1.rfi.n32^2-comp1.mat1.rfi.ki32^2-2*j*comp1.mat1.rfi.n32*comp1.mat1.rfi.ki32==comp1.mat1.rfi.n11^2-comp1.mat1.rfi.ki11^2-2*j*comp1.mat1.rfi.n11*comp1.mat1.rfi.ki11+comp1.mat1.rfi.n21^2-comp1.mat1.rfi.ki21^2-2*j*comp1.mat1.rfi.n21*comp1.mat1.rfi.ki21+comp1.mat1.rfi.n31^2-comp1.mat1.rfi.ki31^2-2*j*comp1.mat1.rfi.n31*comp1.mat1.rfi.ki31&amp;&amp;comp1.mat1.rfi.n13*comp1.mat1.rfi.n12-comp1.mat1.rfi.ki13*comp1.mat1.rfi.ki12-j*(comp1.mat1.rfi.n13*comp1.mat1.rfi.ki12+comp1.mat1.rfi.ki13*comp1.mat1.rfi.n12)+comp1.mat1.rfi.n23*comp1.mat1.rfi.n22-comp1.mat1.rfi.ki23*comp1.mat1.rfi.ki22-j*(comp1.mat1.rfi.n23*comp1.mat1.rfi.ki22+comp1.mat1.rfi.ki23*comp1.mat1.rfi.n22)+comp1.mat1.rfi.n33*comp1.mat1.rfi.n32-comp1.mat1.rfi.ki33*comp1.mat1.rfi.ki32-j*(comp1.mat1.rfi.n33*comp1.mat1.rfi.ki32+comp1.mat1.rfi.ki33*comp1.mat1.rfi.n32)==0&amp;&amp;comp1.mat1.rfi.n13*comp1.mat1.rfi.n11-comp1.mat1.rfi.ki13*comp1.mat1.rfi.ki11-j*(comp1.mat1.rfi.n13*comp1.mat1.rfi.ki11+comp1.mat1.rfi.ki13*comp1.mat1.rfi.n11)+comp1.mat1.rfi.n23*comp1.mat1.rfi.n21-comp1.mat1.rfi.ki23*comp1.mat1.rfi.ki21-j*(comp1.mat1.rfi.n23*comp1.mat1.rfi.ki21+comp1.mat1.rfi.ki23*comp1.mat1.rfi.n21)+comp1.mat1.rfi.n33*comp1.mat1.rfi.n31-comp1.mat1.rfi.ki33*comp1.mat1.rfi.ki31-j*(comp1.mat1.rfi.n33*comp1.mat1.rfi.ki31+comp1.mat1.rfi.ki33*comp1.mat1.rfi.n31)==0&amp;&amp;comp1.mat1.rfi.n13*comp1.mat1.rfi.n12-comp1.mat1.rfi.ki13*comp1.mat1.rfi.ki12-j*(comp1.mat1.rfi.n13*comp1.mat1.rfi.ki12+comp1.mat1.rfi.ki13*comp1.mat1.rfi.n12)+comp1.mat1.rfi.n23*comp1.mat1.rfi.n22-comp1.mat1.rfi.ki23*comp1.mat1.rfi.ki22-j*(comp1.mat1.rfi.n23*comp1.mat1.rfi.ki22+comp1.mat1.rfi.ki23*comp1.mat1.rfi.n22)+comp1.mat1.rfi.n33*comp1.mat1.rfi.n32-comp1.mat1.rfi.ki33*comp1.mat1.rfi.ki32-j*(comp1.mat1.rfi.n33*comp1.mat1.rfi.ki32+comp1.mat1.rfi.ki33*comp1.mat1.rfi.n32)==0&amp;&amp;comp1.mat1.rfi.n13^2-comp1.mat1.rfi.ki13^2-2*j*comp1.mat1.rfi.n13*comp1.mat1.rfi.ki13+comp1.mat1.rfi.n23^2-comp1.mat1.rfi.ki23^2-2*j*comp1.mat1.rfi.n23*comp1.mat1.rfi.ki23+comp1.mat1.rfi.n33^2-comp1.mat1.rfi.ki33^2-2*j*comp1.mat1.rfi.n33*comp1.mat1.rfi.ki33==comp1.mat1.rfi.n11^2-comp1.mat1.rfi.ki11^2-2*j*comp1.mat1.rfi.n11*comp1.mat1.rfi.ki11+comp1.mat1.rfi.n21^2-comp1.mat1.rfi.ki21^2-2*j*comp1.mat1.rfi.n21*comp1.mat1.rfi.ki21+comp1.mat1.rfi.n31^2-comp1.mat1.rfi.ki31^2-2*j*comp1.mat1.rfi.n31*comp1.mat1.rfi.ki31,comp1.mat1.rfi.n11^2-comp1.mat1.rfi.ki11^2-2*j*comp1.mat1.rfi.n11*comp1.mat1.rfi.ki11+comp1.mat1.rfi.n21^2-comp1.mat1.rfi.ki21^2-2*j*comp1.mat1.rfi.n21*comp1.mat1.rfi.ki21+comp1.mat1.rfi.n31^2-comp1.mat1.rfi.ki31^2-2*j*comp1.mat1.rfi.n31*comp1.mat1.rfi.ki31,error('$base64:RmFpbGVkIHRvIGV2YWx1YXRlIGFuIGlzb3Ryb3BpYyB2YWx1ZSBvZiBhbiBhbmlzb3Ryb3BpYyB0ZW5zb3IAAAAAAAA='))</str> </arr> <str>material.def.epsilonr_symmetry</str> <arr> <str>79</str> </arr> <str>material.epsilonr11</str> <arr> <str>comp1.mat1.rfi.n11^2-comp1.mat1.rfi.ki11^2-2*j*comp1.mat1.rfi.n11*comp1.mat1.rfi.ki11+comp1.mat1.rfi.n21^2-comp1.mat1.rfi.ki21^2-2*j*comp1.mat1.rfi.n21*comp1.mat1.rfi.ki21+comp1.mat1.rfi.n31^2-comp1.mat1.rfi.ki31^2-2*j*comp1.mat1.rfi.n31*comp1.mat1.rfi.ki31</str> </arr> <str>material.epsilonr21</str> <arr> <str>comp1.mat1.rfi.n11*comp1.mat1.rfi.n12-comp1.mat1.rfi.ki11*comp1.mat1.rfi.ki12-j*(comp1.mat1.rfi.n11*comp1.mat1.rfi.ki12+comp1.mat1.rfi.ki11*comp1.mat1.rfi.n12)+comp1.mat1.rfi.n21*comp1.mat1.rfi.n22-comp1.mat1.rfi.ki21*comp1.mat1.rfi.ki22-j*(comp1.mat1.rfi.n21*comp1.mat1.rfi.ki22+comp1.mat1.rfi.ki21*comp1.mat1.rfi.n22)+comp1.mat1.rfi.n31*comp1.mat1.rfi.n32-comp1.mat1.rfi.ki31*comp1.mat1.rfi.ki32-j*(comp1.mat1.rfi.n31*comp1.mat1.rfi.ki32+comp1.mat1.rfi.ki31*comp1.mat1.rfi.n32)</str> </arr> <str>material.epsilonr31</str> <arr> <str>comp1.mat1.rfi.n11*comp1.mat1.rfi.n13-comp1.mat1.rfi.ki11*comp1.mat1.rfi.ki13-j*(comp1.mat1.rfi.n11*comp1.mat1.rfi.ki13+comp1.mat1.rfi.ki11*comp1.mat1.rfi.n13)+comp1.mat1.rfi.n21*comp1.mat1.rfi.n23-comp1.mat1.rfi.ki21*comp1.mat1.rfi.ki23-j*(comp1.mat1.rfi.n21*comp1.mat1.rfi.ki23+comp1.mat1.rfi.ki21*comp1.mat1.rfi.n23)+comp1.mat1.rfi.n31*comp1.mat1.rfi.n33-comp1.mat1.rfi.ki31*comp1.mat1.rfi.ki33-j*(comp1.mat1.rfi.n31*comp1.mat1.rfi.ki33+comp1.mat1.rfi.ki31*comp1.mat1.rfi.n33)</str> </arr> <str>material.epsilonr12</str> <arr> <str>comp1.mat1.rfi.n12*comp1.mat1.rfi.n11-comp1.mat1.rfi.ki12*comp1.mat1.rfi.ki11-j*(comp1.mat1.rfi.n12*comp1.mat1.rfi.ki11+comp1.mat1.rfi.ki12*comp1.mat1.rfi.n11)+comp1.mat1.rfi.n22*comp1.mat1.rfi.n21-comp1.mat1.rfi.ki22*comp1.mat1.rfi.ki21-j*(comp1.mat1.rfi.n22*comp1.mat1.rfi.ki21+comp1.mat1.rfi.ki22*comp1.mat1.rfi.n21)+comp1.mat1.rfi.n32*comp1.mat1.rfi.n31-comp1.mat1.rfi.ki32*comp1.mat1.rfi.ki31-j*(comp1.mat1.rfi.n32*comp1.mat1.rfi.ki31+comp1.mat1.rfi.ki32*comp1.mat1.rfi.n31)</str> </arr> <str>material.epsilonr22</str> <arr> <str>comp1.mat1.rfi.n12^2-comp1.mat1.rfi.ki12^2-2*j*comp1.mat1.rfi.n12*comp1.mat1.rfi.ki12+comp1.mat1.rfi.n22^2-comp1.mat1.rfi.ki22^2-2*j*comp1.mat1.rfi.n22*comp1.mat1.rfi.ki22+comp1.mat1.rfi.n32^2-comp1.mat1.rfi.ki32^2-2*j*comp1.mat1.rfi.n32*comp1.mat1.rfi.ki32</str> </arr> <str>material.epsilonr32</str> <arr> <str>comp1.mat1.rfi.n12*comp1.mat1.rfi.n13-comp1.mat1.rfi.ki12*comp1.mat1.rfi.ki13-j*(comp1.mat1.rfi.n12*comp1.mat1.rfi.ki13+comp1.mat1.rfi.ki12*comp1.mat1.rfi.n13)+comp1.mat1.rfi.n22*comp1.mat1.rfi.n23-comp1.mat1.rfi.ki22*comp1.mat1.rfi.ki23-j*(comp1.mat1.rfi.n22*comp1.mat1.rfi.ki23+comp1.mat1.rfi.ki22*comp1.mat1.rfi.n23)+comp1.mat1.rfi.n32*comp1.mat1.rfi.n33-comp1.mat1.rfi.ki32*comp1.mat1.rfi.ki33-j*(comp1.mat1.rfi.n32*comp1.mat1.rfi.ki33+comp1.mat1.rfi.ki32*comp1.mat1.rfi.n33)</str> </arr> <str>material.epsilonr13</str> <arr> <str>comp1.mat1.rfi.n13*comp1.mat1.rfi.n11-comp1.mat1.rfi.ki13*comp1.mat1.rfi.ki11-j*(comp1.mat1.rfi.n13*comp1.mat1.rfi.ki11+comp1.mat1.rfi.ki13*comp1.mat1.rfi.n11)+comp1.mat1.rfi.n23*comp1.mat1.rfi.n21-comp1.mat1.rfi.ki23*comp1.mat1.rfi.ki21-j*(comp1.mat1.rfi.n23*comp1.mat1.rfi.ki21+comp1.mat1.rfi.ki23*comp1.mat1.rfi.n21)+comp1.mat1.rfi.n33*comp1.mat1.rfi.n31-comp1.mat1.rfi.ki33*comp1.mat1.rfi.ki31-j*(comp1.mat1.rfi.n33*comp1.mat1.rfi.ki31+comp1.mat1.rfi.ki33*comp1.mat1.rfi.n31)</str> </arr> <str>material.epsilonr23</str> <arr> <str>comp1.mat1.rfi.n13*comp1.mat1.rfi.n12-comp1.mat1.rfi.ki13*comp1.mat1.rfi.ki12-j*(comp1.mat1.rfi.n13*comp1.mat1.rfi.ki12+comp1.mat1.rfi.ki13*comp1.mat1.rfi.n12)+comp1.mat1.rfi.n23*comp1.mat1.rfi.n22-comp1.mat1.rfi.ki23*comp1.mat1.rfi.ki22-j*(comp1.mat1.rfi.n23*comp1.mat1.rfi.ki22+comp1.mat1.rfi.ki23*comp1.mat1.rfi.n22)+comp1.mat1.rfi.n33*comp1.mat1.rfi.n32-comp1.mat1.rfi.ki33*comp1.mat1.rfi.ki32-j*(comp1.mat1.rfi.n33*comp1.mat1.rfi.ki32+comp1.mat1.rfi.ki33*comp1.mat1.rfi.n32)</str> </arr> <str>material.epsilonr33</str> <arr> <str>comp1.mat1.rfi.n13^2-comp1.mat1.rfi.ki13^2-2*j*comp1.mat1.rfi.n13*comp1.mat1.rfi.ki13+comp1.mat1.rfi.n23^2-comp1.mat1.rfi.ki23^2-2*j*comp1.mat1.rfi.n23*comp1.mat1.rfi.ki23+comp1.mat1.rfi.n33^2-comp1.mat1.rfi.ki33^2-2*j*comp1.mat1.rfi.n33*comp1.mat1.rfi.ki33</str> </arr> <str>material.epsilonr_iso</str> <arr> <str>if(comp1.mat1.rfi.n12*comp1.mat1.rfi.n11-comp1.mat1.rfi.ki12*comp1.mat1.rfi.ki11-j*(comp1.mat1.rfi.n12*comp1.mat1.rfi.ki11+comp1.mat1.rfi.ki12*comp1.mat1.rfi.n11)+comp1.mat1.rfi.n22*comp1.mat1.rfi.n21-comp1.mat1.rfi.ki22*comp1.mat1.rfi.ki21-j*(comp1.mat1.rfi.n22*comp1.mat1.rfi.ki21+comp1.mat1.rfi.ki22*comp1.mat1.rfi.n21)+comp1.mat1.rfi.n32*comp1.mat1.rfi.n31-comp1.mat1.rfi.ki32*comp1.mat1.rfi.ki31-j*(comp1.mat1.rfi.n32*comp1.mat1.rfi.ki31+comp1.mat1.rfi.ki32*comp1.mat1.rfi.n31)==0&amp;&amp;comp1.mat1.rfi.n13*comp1.mat1.rfi.n11-comp1.mat1.rfi.ki13*comp1.mat1.rfi.ki11-j*(comp1.mat1.rfi.n13*comp1.mat1.rfi.ki11+comp1.mat1.rfi.ki13*comp1.mat1.rfi.n11)+comp1.mat1.rfi.n23*comp1.mat1.rfi.n21-comp1.mat1.rfi.ki23*comp1.mat1.rfi.ki21-j*(comp1.mat1.rfi.n23*comp1.mat1.rfi.ki21+comp1.mat1.rfi.ki23*comp1.mat1.rfi.n21)+comp1.mat1.rfi.n33*comp1.mat1.rfi.n31-comp1.mat1.rfi.ki33*comp1.mat1.rfi.ki31-j*(comp1.mat1.rfi.n33*comp1.mat1.rfi.ki31+comp1.mat1.rfi.ki33*comp1.mat1.rfi.n31)==0&amp;&amp;comp1.mat1.rfi.n12*comp1.mat1.rfi.n11-comp1.mat1.rfi.ki12*comp1.mat1.rfi.ki11-j*(comp1.mat1.rfi.n12*comp1.mat1.rfi.ki11+comp1.mat1.rfi.ki12*comp1.mat1.rfi.n11)+comp1.mat1.rfi.n22*comp1.mat1.rfi.n21-comp1.mat1.rfi.ki22*comp1.mat1.rfi.ki21-j*(comp1.mat1.rfi.n22*comp1.mat1.rfi.ki21+comp1.mat1.rfi.ki22*comp1.mat1.rfi.n21)+comp1.mat1.rfi.n32*comp1.mat1.rfi.n31-comp1.mat1.rfi.ki32*comp1.mat1.rfi.ki31-j*(comp1.mat1.rfi.n32*comp1.mat1.rfi.ki31+comp1.mat1.rfi.ki32*comp1.mat1.rfi.n31)==0&amp;&amp;comp1.mat1.rfi.n12^2-comp1.mat1.rfi.ki12^2-2*j*comp1.mat1.rfi.n12*comp1.mat1.rfi.ki12+comp1.mat1.rfi.n22^2-comp1.mat1.rfi.ki22^2-2*j*comp1.mat1.rfi.n22*comp1.mat1.rfi.ki22+comp1.mat1.rfi.n32^2-comp1.mat1.rfi.ki32^2-2*j*comp1.mat1.rfi.n32*comp1.mat1.rfi.ki32==comp1.mat1.rfi.n11^2-comp1.mat1.rfi.ki11^2-2*j*comp1.mat1.rfi.n11*comp1.mat1.rfi.ki11+comp1.mat1.rfi.n21^2-comp1.mat1.rfi.ki21^2-2*j*comp1.mat1.rfi.n21*comp1.mat1.rfi.ki21+comp1.mat1.rfi.n31^2-comp1.mat1.rfi.ki31^2-2*j*comp1.mat1.rfi.n31*comp1.mat1.rfi.ki31&amp;&amp;comp1.mat1.rfi.n13*comp1.mat1.rfi.n12-comp1.mat1.rfi.ki13*comp1.mat1.rfi.ki12-j*(comp1.mat1.rfi.n13*comp1.mat1.rfi.ki12+comp1.mat1.rfi.ki13*comp1.mat1.rfi.n12)+comp1.mat1.rfi.n23*comp1.mat1.rfi.n22-comp1.mat1.rfi.ki23*comp1.mat1.rfi.ki22-j*(comp1.mat1.rfi.n23*comp1.mat1.rfi.ki22+comp1.mat1.rfi.ki23*comp1.mat1.rfi.n22)+comp1.mat1.rfi.n33*comp1.mat1.rfi.n32-comp1.mat1.rfi.ki33*comp1.mat1.rfi.ki32-j*(comp1.mat1.rfi.n33*comp1.mat1.rfi.ki32+comp1.mat1.rfi.ki33*comp1.mat1.rfi.n32)==0&amp;&amp;comp1.mat1.rfi.n13*comp1.mat1.rfi.n11-comp1.mat1.rfi.ki13*comp1.mat1.rfi.ki11-j*(comp1.mat1.rfi.n13*comp1.mat1.rfi.ki11+comp1.mat1.rfi.ki13*comp1.mat1.rfi.n11)+comp1.mat1.rfi.n23*comp1.mat1.rfi.n21-comp1.mat1.rfi.ki23*comp1.mat1.rfi.ki21-j*(comp1.mat1.rfi.n23*comp1.mat1.rfi.ki21+comp1.mat1.rfi.ki23*comp1.mat1.rfi.n21)+comp1.mat1.rfi.n33*comp1.mat1.rfi.n31-comp1.mat1.rfi.ki33*comp1.mat1.rfi.ki31-j*(comp1.mat1.rfi.n33*comp1.mat1.rfi.ki31+comp1.mat1.rfi.ki33*comp1.mat1.rfi.n31)==0&amp;&amp;comp1.mat1.rfi.n13*comp1.mat1.rfi.n12-comp1.mat1.rfi.ki13*comp1.mat1.rfi.ki12-j*(comp1.mat1.rfi.n13*comp1.mat1.rfi.ki12+comp1.mat1.rfi.ki13*comp1.mat1.rfi.n12)+comp1.mat1.rfi.n23*comp1.mat1.rfi.n22-comp1.mat1.rfi.ki23*comp1.mat1.rfi.ki22-j*(comp1.mat1.rfi.n23*comp1.mat1.rfi.ki22+comp1.mat1.rfi.ki23*comp1.mat1.rfi.n22)+comp1.mat1.rfi.n33*comp1.mat1.rfi.n32-comp1.mat1.rfi.ki33*comp1.mat1.rfi.ki32-j*(comp1.mat1.rfi.n33*comp1.mat1.rfi.ki32+comp1.mat1.rfi.ki33*comp1.mat1.rfi.n32)==0&amp;&amp;comp1.mat1.rfi.n13^2-comp1.mat1.rfi.ki13^2-2*j*comp1.mat1.rfi.n13*comp1.mat1.rfi.ki13+comp1.mat1.rfi.n23^2-comp1.mat1.rfi.ki23^2-2*j*comp1.mat1.rfi.n23*comp1.mat1.rfi.ki23+comp1.mat1.rfi.n33^2-comp1.mat1.rfi.ki33^2-2*j*comp1.mat1.rfi.n33*comp1.mat1.rfi.ki33==comp1.mat1.rfi.n11^2-comp1.mat1.rfi.ki11^2-2*j*comp1.mat1.rfi.n11*comp1.mat1.rfi.ki11+comp1.mat1.rfi.n21^2-comp1.mat1.rfi.ki21^2-2*j*comp1.mat1.rfi.n21*comp1.mat1.rfi.ki21+comp1.mat1.rfi.n31^2-comp1.mat1.rfi.ki31^2-2*j*comp1.mat1.rfi.n31*comp1.mat1.rfi.ki31,comp1.mat1.rfi.n11^2-comp1.mat1.rfi.ki11^2-2*j*comp1.mat1.rfi.n11*comp1.mat1.rfi.ki11+comp1.mat1.rfi.n21^2-comp1.mat1.rfi.ki21^2-2*j*comp1.mat1.rfi.n21*comp1.mat1.rfi.ki21+comp1.mat1.rfi.n31^2-comp1.mat1.rfi.ki31^2-2*j*comp1.mat1.rfi.n31*comp1.mat1.rfi.ki31,error('$base64:RmFpbGVkIHRvIGV2YWx1YXRlIGFuIGlzb3Ryb3BpYyB2YWx1ZSBvZiBhbiBhbmlzb3Ryb3BpYyB0ZW5zb3IAAAAAAAA='))</str> </arr> <str>material.epsilonr_symmetry</str> <arr> <str>79</str> </arr> <str>material.lstdf.tanDelta</str> <arr> <str>2*comp1.mat1.rfi.n_iso*comp1.mat1.rfi.ki_iso/(comp1.mat1.rfi.n_iso^2-comp1.mat1.rfi.ki_iso^2)</str> </arr> <str>material.lstdf.epsilonPrim11</str> <arr> <str>comp1.mat1.rfi.n_iso^2-comp1.mat1.rfi.ki_iso^2</str> </arr> <str>material.lstdf.epsilonPrim21</str> <arr> <str>0</str> </arr> <str>material.lstdf.epsilonPrim31</str> <arr> <str>0</str> </arr> <str>material.lstdf.epsilonPrim12</str> <arr> <str>0</str> </arr> <str>material.lstdf.epsilonPrim22</str> <arr> <str>comp1.mat1.rfi.n_iso^2-comp1.mat1.rfi.ki_iso^2</str> </arr> <str>material.lstdf.epsilonPrim32</str> <arr> <str>0</str> </arr> <str>material.lstdf.epsilonPrim13</str> <arr> <str>0</str> </arr> <str>material.lstdf.epsilonPrim23</str> <arr> <str>0</str> </arr> <str>material.lstdf.epsilonPrim33</str> <arr> <str>comp1.mat1.rfi.n_iso^2-comp1.mat1.rfi.ki_iso^2</str> </arr> <str>material.lstdf.epsilonPrim_iso</str> <arr> <str>comp1.mat1.rfi.n_iso^2-comp1.mat1.rfi.ki_iso^2</str> </arr> <str>material.lstdf.epsilonPrim_symmetry</str> <arr> <str>79</str> </arr> <str>material.del.epsilonPrim11</str> <arr> <str>comp1.mat1.rfi.n11^2-comp1.mat1.rfi.ki11^2+comp1.mat1.rfi.n21^2-comp1.mat1.rfi.ki21^2+comp1.mat1.rfi.n31^2-comp1.mat1.rfi.ki31^2</str> </arr> <str>material.del.epsilonPrim21</str> <arr> <str>comp1.mat1.rfi.n11*comp1.mat1.rfi.n12-comp1.mat1.rfi.ki11*comp1.mat1.rfi.ki12+comp1.mat1.rfi.n21*comp1.mat1.rfi.n22-comp1.mat1.rfi.ki21*comp1.mat1.rfi.ki22+comp1.mat1.rfi.n31*comp1.mat1.rfi.n32-comp1.mat1.rfi.ki31*comp1.mat1.rfi.ki32</str> </arr> <str>material.del.epsilonPrim31</str> <arr> <str>comp1.mat1.rfi.n11*comp1.mat1.rfi.n13-comp1.mat1.rfi.ki11*comp1.mat1.rfi.ki13+comp1.mat1.rfi.n21*comp1.mat1.rfi.n23-comp1.mat1.rfi.ki21*comp1.mat1.rfi.ki23+comp1.mat1.rfi.n31*comp1.mat1.rfi.n33-comp1.mat1.rfi.ki31*comp1.mat1.rfi.ki33</str> </arr> <str>material.del.epsilonPrim12</str> <arr> <str>comp1.mat1.rfi.n12*comp1.mat1.rfi.n11-comp1.mat1.rfi.ki12*comp1.mat1.rfi.ki11+comp1.mat1.rfi.n22*comp1.mat1.rfi.n21-comp1.mat1.rfi.ki22*comp1.mat1.rfi.ki21+comp1.mat1.rfi.n32*comp1.mat1.rfi.n31-comp1.mat1.rfi.ki32*comp1.mat1.rfi.ki31</str> </arr> <str>material.del.epsilonPrim22</str> <arr> <str>comp1.mat1.rfi.n12^2-comp1.mat1.rfi.ki12^2+comp1.mat1.rfi.n22^2-comp1.mat1.rfi.ki22^2+comp1.mat1.rfi.n32^2-comp1.mat1.rfi.ki32^2</str> </arr> <str>material.del.epsilonPrim32</str> <arr> <str>comp1.mat1.rfi.n12*comp1.mat1.rfi.n13-comp1.mat1.rfi.ki12*comp1.mat1.rfi.ki13+comp1.mat1.rfi.n22*comp1.mat1.rfi.n23-comp1.mat1.rfi.ki22*comp1.mat1.rfi.ki23+comp1.mat1.rfi.n32*comp1.mat1.rfi.n33-comp1.mat1.rfi.ki32*comp1.mat1.rfi.ki33</str> </arr> <str>material.del.epsilonPrim13</str> <arr> <str>comp1.mat1.rfi.n13*comp1.mat1.rfi.n11-comp1.mat1.rfi.ki13*comp1.mat1.rfi.ki11+comp1.mat1.rfi.n23*comp1.mat1.rfi.n21-comp1.mat1.rfi.ki23*comp1.mat1.rfi.ki21+comp1.mat1.rfi.n33*comp1.mat1.rfi.n31-comp1.mat1.rfi.ki33*comp1.mat1.rfi.ki31</str> </arr> <str>material.del.epsilonPrim23</str> <arr> <str>comp1.mat1.rfi.n13*comp1.mat1.rfi.n12-comp1.mat1.rfi.ki13*comp1.mat1.rfi.ki12+comp1.mat1.rfi.n23*comp1.mat1.rfi.n22-comp1.mat1.rfi.ki23*comp1.mat1.rfi.ki22+comp1.mat1.rfi.n33*comp1.mat1.rfi.n32-comp1.mat1.rfi.ki33*comp1.mat1.rfi.ki32</str> </arr> <str>material.del.epsilonPrim33</str> <arr> <str>comp1.mat1.rfi.n13^2-comp1.mat1.rfi.ki13^2+comp1.mat1.rfi.n23^2-comp1.mat1.rfi.ki23^2+comp1.mat1.rfi.n33^2-comp1.mat1.rfi.ki33^2</str> </arr> <str>material.del.epsilonPrim_iso</str> <arr> <str>if(comp1.mat1.rfi.n12*comp1.mat1.rfi.n11-comp1.mat1.rfi.ki12*comp1.mat1.rfi.ki11+comp1.mat1.rfi.n22*comp1.mat1.rfi.n21-comp1.mat1.rfi.ki22*comp1.mat1.rfi.ki21+comp1.mat1.rfi.n32*comp1.mat1.rfi.n31-comp1.mat1.rfi.ki32*comp1.mat1.rfi.ki31==0&amp;&amp;comp1.mat1.rfi.n13*comp1.mat1.rfi.n11-comp1.mat1.rfi.ki13*comp1.mat1.rfi.ki11+comp1.mat1.rfi.n23*comp1.mat1.rfi.n21-comp1.mat1.rfi.ki23*comp1.mat1.rfi.ki21+comp1.mat1.rfi.n33*comp1.mat1.rfi.n31-comp1.mat1.rfi.ki33*comp1.mat1.rfi.ki31==0&amp;&amp;comp1.mat1.rfi.n12*comp1.mat1.rfi.n11-comp1.mat1.rfi.ki12*comp1.mat1.rfi.ki11+comp1.mat1.rfi.n22*comp1.mat1.rfi.n21-comp1.mat1.rfi.ki22*comp1.mat1.rfi.ki21+comp1.mat1.rfi.n32*comp1.mat1.rfi.n31-comp1.mat1.rfi.ki32*comp1.mat1.rfi.ki31==0&amp;&amp;comp1.mat1.rfi.n12^2-comp1.mat1.rfi.ki12^2+comp1.mat1.rfi.n22^2-comp1.mat1.rfi.ki22^2+comp1.mat1.rfi.n32^2-comp1.mat1.rfi.ki32^2==comp1.mat1.rfi.n11^2-comp1.mat1.rfi.ki11^2+comp1.mat1.rfi.n21^2-comp1.mat1.rfi.ki21^2+comp1.mat1.rfi.n31^2-comp1.mat1.rfi.ki31^2&amp;&amp;comp1.mat1.rfi.n13*comp1.mat1.rfi.n12-comp1.mat1.rfi.ki13*comp1.mat1.rfi.ki12+comp1.mat1.rfi.n23*comp1.mat1.rfi.n22-comp1.mat1.rfi.ki23*comp1.mat1.rfi.ki22+comp1.mat1.rfi.n33*comp1.mat1.rfi.n32-comp1.mat1.rfi.ki33*comp1.mat1.rfi.ki32==0&amp;&amp;comp1.mat1.rfi.n13*comp1.mat1.rfi.n11-comp1.mat1.rfi.ki13*comp1.mat1.rfi.ki11+comp1.mat1.rfi.n23*comp1.mat1.rfi.n21-comp1.mat1.rfi.ki23*comp1.mat1.rfi.ki21+comp1.mat1.rfi.n33*comp1.mat1.rfi.n31-comp1.mat1.rfi.ki33*comp1.mat1.rfi.ki31==0&amp;&amp;comp1.mat1.rfi.n13*comp1.mat1.rfi.n12-comp1.mat1.rfi.ki13*comp1.mat1.rfi.ki12+comp1.mat1.rfi.n23*comp1.mat1.rfi.n22-comp1.mat1.rfi.ki23*comp1.mat1.rfi.ki22+comp1.mat1.rfi.n33*comp1.mat1.rfi.n32-comp1.mat1.rfi.ki33*comp1.mat1.rfi.ki32==0&amp;&amp;comp1.mat1.rfi.n13^2-comp1.mat1.rfi.ki13^2+comp1.mat1.rfi.n23^2-comp1.mat1.rfi.ki23^2+comp1.mat1.rfi.n33^2-comp1.mat1.rfi.ki33^2==comp1.mat1.rfi.n11^2-comp1.mat1.rfi.ki11^2+comp1.mat1.rfi.n21^2-comp1.mat1.rfi.ki21^2+comp1.mat1.rfi.n31^2-comp1.mat1.rfi.ki31^2,comp1.mat1.rfi.n11^2-comp1.mat1.rfi.ki11^2+comp1.mat1.rfi.n21^2-comp1.mat1.rfi.ki21^2+comp1.mat1.rfi.n31^2-comp1.mat1.rfi.ki31^2,error('$base64:RmFpbGVkIHRvIGV2YWx1YXRlIGFuIGlzb3Ryb3BpYyB2YWx1ZSBvZiBhbiBhbmlzb3Ryb3BpYyB0ZW5zb3IAAAAAAAA='))</str> </arr> <str>material.del.epsilonPrim_symmetry</str> <arr> <str>79</str> </arr> <str>material.del.epsilonBis11</str> <arr> <str>2*(comp1.mat1.rfi.n11*comp1.mat1.rfi.ki11+comp1.mat1.rfi.n21*comp1.mat1.rfi.ki21+comp1.mat1.rfi.n31*comp1.mat1.rfi.ki31)</str> </arr> <str>material.del.epsilonBis21</str> <arr> <str>comp1.mat1.rfi.n11*comp1.mat1.rfi.ki12+comp1.mat1.rfi.ki11*comp1.mat1.rfi.n12+comp1.mat1.rfi.n21*comp1.mat1.rfi.ki22+comp1.mat1.rfi.ki21*comp1.mat1.rfi.n22+comp1.mat1.rfi.n31*comp1.mat1.rfi.ki32+comp1.mat1.rfi.ki31*comp1.mat1.rfi.n32</str> </arr> <str>material.del.epsilonBis31</str> <arr> <str>comp1.mat1.rfi.n11*comp1.mat1.rfi.ki13+comp1.mat1.rfi.ki11*comp1.mat1.rfi.n13+comp1.mat1.rfi.n21*comp1.mat1.rfi.ki23+comp1.mat1.rfi.ki21*comp1.mat1.rfi.n23+comp1.mat1.rfi.n31*comp1.mat1.rfi.ki33+comp1.mat1.rfi.ki31*comp1.mat1.rfi.n33</str> </arr> <str>material.del.epsilonBis12</str> <arr> <str>comp1.mat1.rfi.n12*comp1.mat1.rfi.ki11+comp1.mat1.rfi.ki12*comp1.mat1.rfi.n11+comp1.mat1.rfi.n22*comp1.mat1.rfi.ki21+comp1.mat1.rfi.ki22*comp1.mat1.rfi.n21+comp1.mat1.rfi.n32*comp1.mat1.rfi.ki31+comp1.mat1.rfi.ki32*comp1.mat1.rfi.n31</str> </arr> <str>material.del.epsilonBis22</str> <arr> <str>2*(comp1.mat1.rfi.n12*comp1.mat1.rfi.ki12+comp1.mat1.rfi.n22*comp1.mat1.rfi.ki22+comp1.mat1.rfi.n32*comp1.mat1.rfi.ki32)</str> </arr> <str>material.del.epsilonBis32</str> <arr> <str>comp1.mat1.rfi.n12*comp1.mat1.rfi.ki13+comp1.mat1.rfi.ki12*comp1.mat1.rfi.n13+comp1.mat1.rfi.n22*comp1.mat1.rfi.ki23+comp1.mat1.rfi.ki22*comp1.mat1.rfi.n23+comp1.mat1.rfi.n32*comp1.mat1.rfi.ki33+comp1.mat1.rfi.ki32*comp1.mat1.rfi.n33</str> </arr> <str>material.del.epsilonBis13</str> <arr> <str>comp1.mat1.rfi.n13*comp1.mat1.rfi.ki11+comp1.mat1.rfi.ki13*comp1.mat1.rfi.n11+comp1.mat1.rfi.n23*comp1.mat1.rfi.ki21+comp1.mat1.rfi.ki23*comp1.mat1.rfi.n21+comp1.mat1.rfi.n33*comp1.mat1.rfi.ki31+comp1.mat1.rfi.ki33*comp1.mat1.rfi.n31</str> </arr> <str>material.del.epsilonBis23</str> <arr> <str>comp1.mat1.rfi.n13*comp1.mat1.rfi.ki12+comp1.mat1.rfi.ki13*comp1.mat1.rfi.n12+comp1.mat1.rfi.n23*comp1.mat1.rfi.ki22+comp1.mat1.rfi.ki23*comp1.mat1.rfi.n22+comp1.mat1.rfi.n33*comp1.mat1.rfi.ki32+comp1.mat1.rfi.ki33*comp1.mat1.rfi.n32</str> </arr> <str>material.del.epsilonBis33</str> <arr> <str>2*(comp1.mat1.rfi.n13*comp1.mat1.rfi.ki13+comp1.mat1.rfi.n23*comp1.mat1.rfi.ki23+comp1.mat1.rfi.n33*comp1.mat1.rfi.ki33)</str> </arr> <str>material.del.epsilonBis_iso</str> <arr> <str>if(comp1.mat1.rfi.n12*comp1.mat1.rfi.ki11+comp1.mat1.rfi.ki12*comp1.mat1.rfi.n11+comp1.mat1.rfi.n22*comp1.mat1.rfi.ki21+comp1.mat1.rfi.ki22*comp1.mat1.rfi.n21+comp1.mat1.rfi.n32*comp1.mat1.rfi.ki31+comp1.mat1.rfi.ki32*comp1.mat1.rfi.n31==0&amp;&amp;comp1.mat1.rfi.n13*comp1.mat1.rfi.ki11+comp1.mat1.rfi.ki13*comp1.mat1.rfi.n11+comp1.mat1.rfi.n23*comp1.mat1.rfi.ki21+comp1.mat1.rfi.ki23*comp1.mat1.rfi.n21+comp1.mat1.rfi.n33*comp1.mat1.rfi.ki31+comp1.mat1.rfi.ki33*comp1.mat1.rfi.n31==0&amp;&amp;comp1.mat1.rfi.n12*comp1.mat1.rfi.ki11+comp1.mat1.rfi.ki12*comp1.mat1.rfi.n11+comp1.mat1.rfi.n22*comp1.mat1.rfi.ki21+comp1.mat1.rfi.ki22*comp1.mat1.rfi.n21+comp1.mat1.rfi.n32*comp1.mat1.rfi.ki31+comp1.mat1.rfi.ki32*comp1.mat1.rfi.n31==0&amp;&amp;2*(comp1.mat1.rfi.n12*comp1.mat1.rfi.ki12+comp1.mat1.rfi.n22*comp1.mat1.rfi.ki22+comp1.mat1.rfi.n32*comp1.mat1.rfi.ki32)==2*(comp1.mat1.rfi.n11*comp1.mat1.rfi.ki11+comp1.mat1.rfi.n21*comp1.mat1.rfi.ki21+comp1.mat1.rfi.n31*comp1.mat1.rfi.ki31)&amp;&amp;comp1.mat1.rfi.n13*comp1.mat1.rfi.ki12+comp1.mat1.rfi.ki13*comp1.mat1.rfi.n12+comp1.mat1.rfi.n23*comp1.mat1.rfi.ki22+comp1.mat1.rfi.ki23*comp1.mat1.rfi.n22+comp1.mat1.rfi.n33*comp1.mat1.rfi.ki32+comp1.mat1.rfi.ki33*comp1.mat1.rfi.n32==0&amp;&amp;comp1.mat1.rfi.n13*comp1.mat1.rfi.ki11+comp1.mat1.rfi.ki13*comp1.mat1.rfi.n11+comp1.mat1.rfi.n23*comp1.mat1.rfi.ki21+comp1.mat1.rfi.ki23*comp1.mat1.rfi.n21+comp1.mat1.rfi.n33*comp1.mat1.rfi.ki31+comp1.mat1.rfi.ki33*comp1.mat1.rfi.n31==0&amp;&amp;comp1.mat1.rfi.n13*comp1.mat1.rfi.ki12+comp1.mat1.rfi.ki13*comp1.mat1.rfi.n12+comp1.mat1.rfi.n23*comp1.mat1.rfi.ki22+comp1.mat1.rfi.ki23*comp1.mat1.rfi.n22+comp1.mat1.rfi.n33*comp1.mat1.rfi.ki32+comp1.mat1.rfi.ki33*comp1.mat1.rfi.n32==0&amp;&amp;2*(comp1.mat1.rfi.n13*comp1.mat1.rfi.ki13+comp1.mat1.rfi.n23*comp1.mat1.rfi.ki23+comp1.mat1.rfi.n33*comp1.mat1.rfi.ki33)==2*(comp1.mat1.rfi.n11*comp1.mat1.rfi.ki11+comp1.mat1.rfi.n21*comp1.mat1.rfi.ki21+comp1.mat1.rfi.n31*comp1.mat1.rfi.ki31),2*(comp1.mat1.rfi.n11*comp1.mat1.rfi.ki11+comp1.mat1.rfi.n21*comp1.mat1.rfi.ki21+comp1.mat1.rfi.n31*comp1.mat1.rfi.ki31),error('$base64:RmFpbGVkIHRvIGV2YWx1YXRlIGFuIGlzb3Ryb3BpYyB2YWx1ZSBvZiBhbiBhbmlzb3Ryb3BpYyB0ZW5zb3IAAAAAAAA='))</str> </arr> <str>material.del.epsilonBis_symmetry</str> <arr> <str>79</str> </arr> </arr> <str>ind</str> <arr> <arr> <str>1</str> </arr> </arr> </rec> </arr> </arr> <str>protected</str> <str>false</str> </rec> v<?xml version="1.0" encoding="UTF-8"?> <rec> <str>elem</str> <str>elvar</str> <str>g</str> <arr> <str>1</str> </arr> <str>geomdim</str> <arr> <arr> <arr> </arr> <arr> </arr> <rec> <str>var</str> <arr> <str>material.rfi.n11</str> <arr> <str>n_Ag</str> </arr> <str>material.rfi.n21</str> <arr> <str>0</str> </arr> <str>material.rfi.n31</str> <arr> <str>0</str> </arr> <str>material.rfi.n12</str> <arr> <str>0</str> </arr> <str>material.rfi.n22</str> <arr> <str>n_Ag</str> </arr> <str>material.rfi.n32</str> <arr> <str>0</str> </arr> <str>material.rfi.n13</str> <arr> <str>0</str> </arr> <str>material.rfi.n23</str> <arr> <str>0</str> </arr> <str>material.rfi.n33</str> <arr> <str>n_Ag</str> </arr> <str>material.rfi.n_symmetry</str> <arr> <str>0</str> </arr> <str>material.rfi.n_iso</str> <arr> <str>n_Ag</str> </arr> <str>material.rfi.ki11</str> <arr> <str>0</str> </arr> <str>material.rfi.ki21</str> <arr> <str>0</str> </arr> <str>material.rfi.ki31</str> <arr> <str>0</str> </arr> <str>material.rfi.ki12</str> <arr> <str>0</str> </arr> <str>material.rfi.ki22</str> <arr> <str>0</str> </arr> <str>material.rfi.ki32</str> <arr> <str>0</str> </arr> <str>material.rfi.ki13</str> <arr> <str>0</str> </arr> <str>material.rfi.ki23</str> <arr> <str>0</str> </arr> <str>material.rfi.ki33</str> <arr> <str>0</str> </arr> <str>material.rfi.ki_symmetry</str> <arr> <str>0</str> </arr> <str>material.rfi.ki_iso</str> <arr> <str>0</str> </arr> <str>material.lst.epsilonPrim11</str> <arr> <str>comp1.mat1.rfi.n_iso^2-comp1.mat1.rfi.ki_iso^2</str> </arr> <str>material.lst.epsilonPrim21</str> <arr> <str>0</str> </arr> <str>material.lst.epsilonPrim31</str> <arr> <str>0</str> </arr> <str>material.lst.epsilonPrim12</str> <arr> <str>0</str> </arr> <str>material.lst.epsilonPrim22</str> <arr> <str>comp1.mat1.rfi.n_iso^2-comp1.mat1.rfi.ki_iso^2</str> </arr> <str>material.lst.epsilonPrim32</str> <arr> <str>0</str> </arr> <str>material.lst.epsilonPrim13</str> <arr> <str>0</str> </arr> <str>material.lst.epsilonPrim23</str> <arr> <str>0</str> </arr> <str>material.lst.epsilonPrim33</str> <arr> <str>comp1.mat1.rfi.n_iso^2-comp1.mat1.rfi.ki_iso^2</str> </arr> <str>material.lst.epsilonPrim_iso</str> <arr> <str>comp1.mat1.rfi.n_iso^2-comp1.mat1.rfi.ki_iso^2</str> </arr> <str>material.lst.epsilonPrim_symmetry</str> <arr> <str>79</str> </arr> <str>material.lst.delta</str> <arr> <str>atan2(2*comp1.mat1.rfi.n_iso*comp1.mat1.rfi.ki_iso,comp1.mat1.rfi.n_iso^2-comp1.mat1.rfi.ki_iso^2)*unit_rad_cf</str> </arr> <str>material.def.epsilonr11</str> <arr> <str>comp1.mat2.rfi.n11^2-comp1.mat2.rfi.ki11^2-2*j*comp1.mat2.rfi.n11*comp1.mat2.rfi.ki11+comp1.mat2.rfi.n21^2-comp1.mat2.rfi.ki21^2-2*j*comp1.mat2.rfi.n21*comp1.mat2.rfi.ki21+comp1.mat2.rfi.n31^2-comp1.mat2.rfi.ki31^2-2*j*comp1.mat2.rfi.n31*comp1.mat2.rfi.ki31</str> </arr> <str>material.def.epsilonr21</str> <arr> <str>comp1.mat2.rfi.n11*comp1.mat2.rfi.n12-comp1.mat2.rfi.ki11*comp1.mat2.rfi.ki12-j*(comp1.mat2.rfi.n11*comp1.mat2.rfi.ki12+comp1.mat2.rfi.ki11*comp1.mat2.rfi.n12)+comp1.mat2.rfi.n21*comp1.mat2.rfi.n22-comp1.mat2.rfi.ki21*comp1.mat2.rfi.ki22-j*(comp1.mat2.rfi.n21*comp1.mat2.rfi.ki22+comp1.mat2.rfi.ki21*comp1.mat2.rfi.n22)+comp1.mat2.rfi.n31*comp1.mat2.rfi.n32-comp1.mat2.rfi.ki31*comp1.mat2.rfi.ki32-j*(comp1.mat2.rfi.n31*comp1.mat2.rfi.ki32+comp1.mat2.rfi.ki31*comp1.mat2.rfi.n32)</str> </arr> <str>material.def.epsilonr31</str> <arr> <str>comp1.mat2.rfi.n11*comp1.mat2.rfi.n13-comp1.mat2.rfi.ki11*comp1.mat2.rfi.ki13-j*(comp1.mat2.rfi.n11*comp1.mat2.rfi.ki13+comp1.mat2.rfi.ki11*comp1.mat2.rfi.n13)+comp1.mat2.rfi.n21*comp1.mat2.rfi.n23-comp1.mat2.rfi.ki21*comp1.mat2.rfi.ki23-j*(comp1.mat2.rfi.n21*comp1.mat2.rfi.ki23+comp1.mat2.rfi.ki21*comp1.mat2.rfi.n23)+comp1.mat2.rfi.n31*comp1.mat2.rfi.n33-comp1.mat2.rfi.ki31*comp1.mat2.rfi.ki33-j*(comp1.mat2.rfi.n31*comp1.mat2.rfi.ki33+comp1.mat2.rfi.ki31*comp1.mat2.rfi.n33)</str> </arr> <str>material.def.epsilonr12</str> <arr> <str>comp1.mat2.rfi.n12*comp1.mat2.rfi.n11-comp1.mat2.rfi.ki12*comp1.mat2.rfi.ki11-j*(comp1.mat2.rfi.n12*comp1.mat2.rfi.ki11+comp1.mat2.rfi.ki12*comp1.mat2.rfi.n11)+comp1.mat2.rfi.n22*comp1.mat2.rfi.n21-comp1.mat2.rfi.ki22*comp1.mat2.rfi.ki21-j*(comp1.mat2.rfi.n22*comp1.mat2.rfi.ki21+comp1.mat2.rfi.ki22*comp1.mat2.rfi.n21)+comp1.mat2.rfi.n32*comp1.mat2.rfi.n31-comp1.mat2.rfi.ki32*comp1.mat2.rfi.ki31-j*(comp1.mat2.rfi.n32*comp1.mat2.rfi.ki31+comp1.mat2.rfi.ki32*comp1.mat2.rfi.n31)</str> </arr> <str>material.def.epsilonr22</str> <arr> <str>comp1.mat2.rfi.n12^2-comp1.mat2.rfi.ki12^2-2*j*comp1.mat2.rfi.n12*comp1.mat2.rfi.ki12+comp1.mat2.rfi.n22^2-comp1.mat2.rfi.ki22^2-2*j*comp1.mat2.rfi.n22*comp1.mat2.rfi.ki22+comp1.mat2.rfi.n32^2-comp1.mat2.rfi.ki32^2-2*j*comp1.mat2.rfi.n32*comp1.mat2.rfi.ki32</str> </arr> <str>material.def.epsilonr32</str> <arr> <str>comp1.mat2.rfi.n12*comp1.mat2.rfi.n13-comp1.mat2.rfi.ki12*comp1.mat2.rfi.ki13-j*(comp1.mat2.rfi.n12*comp1.mat2.rfi.ki13+comp1.mat2.rfi.ki12*comp1.mat2.rfi.n13)+comp1.mat2.rfi.n22*comp1.mat2.rfi.n23-comp1.mat2.rfi.ki22*comp1.mat2.rfi.ki23-j*(comp1.mat2.rfi.n22*comp1.mat2.rfi.ki23+comp1.mat2.rfi.ki22*comp1.mat2.rfi.n23)+comp1.mat2.rfi.n32*comp1.mat2.rfi.n33-comp1.mat2.rfi.ki32*comp1.mat2.rfi.ki33-j*(comp1.mat2.rfi.n32*comp1.mat2.rfi.ki33+comp1.mat2.rfi.ki32*comp1.mat2.rfi.n33)</str> </arr> <str>material.def.epsilonr13</str> <arr> <str>comp1.mat2.rfi.n13*comp1.mat2.rfi.n11-comp1.mat2.rfi.ki13*comp1.mat2.rfi.ki11-j*(comp1.mat2.rfi.n13*comp1.mat2.rfi.ki11+comp1.mat2.rfi.ki13*comp1.mat2.rfi.n11)+comp1.mat2.rfi.n23*comp1.mat2.rfi.n21-comp1.mat2.rfi.ki23*comp1.mat2.rfi.ki21-j*(comp1.mat2.rfi.n23*comp1.mat2.rfi.ki21+comp1.mat2.rfi.ki23*comp1.mat2.rfi.n21)+comp1.mat2.rfi.n33*comp1.mat2.rfi.n31-comp1.mat2.rfi.ki33*comp1.mat2.rfi.ki31-j*(comp1.mat2.rfi.n33*comp1.mat2.rfi.ki31+comp1.mat2.rfi.ki33*comp1.mat2.rfi.n31)</str> </arr> <str>material.def.epsilonr23</str> <arr> <str>comp1.mat2.rfi.n13*comp1.mat2.rfi.n12-comp1.mat2.rfi.ki13*comp1.mat2.rfi.ki12-j*(comp1.mat2.rfi.n13*comp1.mat2.rfi.ki12+comp1.mat2.rfi.ki13*comp1.mat2.rfi.n12)+comp1.mat2.rfi.n23*comp1.mat2.rfi.n22-comp1.mat2.rfi.ki23*comp1.mat2.rfi.ki22-j*(comp1.mat2.rfi.n23*comp1.mat2.rfi.ki22+comp1.mat2.rfi.ki23*comp1.mat2.rfi.n22)+comp1.mat2.rfi.n33*comp1.mat2.rfi.n32-comp1.mat2.rfi.ki33*comp1.mat2.rfi.ki32-j*(comp1.mat2.rfi.n33*comp1.mat2.rfi.ki32+comp1.mat2.rfi.ki33*comp1.mat2.rfi.n32)</str> </arr> <str>material.def.epsilonr33</str> <arr> <str>comp1.mat2.rfi.n13^2-comp1.mat2.rfi.ki13^2-2*j*comp1.mat2.rfi.n13*comp1.mat2.rfi.ki13+comp1.mat2.rfi.n23^2-comp1.mat2.rfi.ki23^2-2*j*comp1.mat2.rfi.n23*comp1.mat2.rfi.ki23+comp1.mat2.rfi.n33^2-comp1.mat2.rfi.ki33^2-2*j*comp1.mat2.rfi.n33*comp1.mat2.rfi.ki33</str> </arr> <str>material.def.epsilonr_iso</str> <arr> <str>if(comp1.mat2.rfi.n12*comp1.mat2.rfi.n11-comp1.mat2.rfi.ki12*comp1.mat2.rfi.ki11-j*(comp1.mat2.rfi.n12*comp1.mat2.rfi.ki11+comp1.mat2.rfi.ki12*comp1.mat2.rfi.n11)+comp1.mat2.rfi.n22*comp1.mat2.rfi.n21-comp1.mat2.rfi.ki22*comp1.mat2.rfi.ki21-j*(comp1.mat2.rfi.n22*comp1.mat2.rfi.ki21+comp1.mat2.rfi.ki22*comp1.mat2.rfi.n21)+comp1.mat2.rfi.n32*comp1.mat2.rfi.n31-comp1.mat2.rfi.ki32*comp1.mat2.rfi.ki31-j*(comp1.mat2.rfi.n32*comp1.mat2.rfi.ki31+comp1.mat2.rfi.ki32*comp1.mat2.rfi.n31)==0&amp;&amp;comp1.mat2.rfi.n13*comp1.mat2.rfi.n11-comp1.mat2.rfi.ki13*comp1.mat2.rfi.ki11-j*(comp1.mat2.rfi.n13*comp1.mat2.rfi.ki11+comp1.mat2.rfi.ki13*comp1.mat2.rfi.n11)+comp1.mat2.rfi.n23*comp1.mat2.rfi.n21-comp1.mat2.rfi.ki23*comp1.mat2.rfi.ki21-j*(comp1.mat2.rfi.n23*comp1.mat2.rfi.ki21+comp1.mat2.rfi.ki23*comp1.mat2.rfi.n21)+comp1.mat2.rfi.n33*comp1.mat2.rfi.n31-comp1.mat2.rfi.ki33*comp1.mat2.rfi.ki31-j*(comp1.mat2.rfi.n33*comp1.mat2.rfi.ki31+comp1.mat2.rfi.ki33*comp1.mat2.rfi.n31)==0&amp;&amp;comp1.mat2.rfi.n12*comp1.mat2.rfi.n11-comp1.mat2.rfi.ki12*comp1.mat2.rfi.ki11-j*(comp1.mat2.rfi.n12*comp1.mat2.rfi.ki11+comp1.mat2.rfi.ki12*comp1.mat2.rfi.n11)+comp1.mat2.rfi.n22*comp1.mat2.rfi.n21-comp1.mat2.rfi.ki22*comp1.mat2.rfi.ki21-j*(comp1.mat2.rfi.n22*comp1.mat2.rfi.ki21+comp1.mat2.rfi.ki22*comp1.mat2.rfi.n21)+comp1.mat2.rfi.n32*comp1.mat2.rfi.n31-comp1.mat2.rfi.ki32*comp1.mat2.rfi.ki31-j*(comp1.mat2.rfi.n32*comp1.mat2.rfi.ki31+comp1.mat2.rfi.ki32*comp1.mat2.rfi.n31)==0&amp;&amp;comp1.mat2.rfi.n12^2-comp1.mat2.rfi.ki12^2-2*j*comp1.mat2.rfi.n12*comp1.mat2.rfi.ki12+comp1.mat2.rfi.n22^2-comp1.mat2.rfi.ki22^2-2*j*comp1.mat2.rfi.n22*comp1.mat2.rfi.ki22+comp1.mat2.rfi.n32^2-comp1.mat2.rfi.ki32^2-2*j*comp1.mat2.rfi.n32*comp1.mat2.rfi.ki32==comp1.mat2.rfi.n11^2-comp1.mat2.rfi.ki11^2-2*j*comp1.mat2.rfi.n11*comp1.mat2.rfi.ki11+comp1.mat2.rfi.n21^2-comp1.mat2.rfi.ki21^2-2*j*comp1.mat2.rfi.n21*comp1.mat2.rfi.ki21+comp1.mat2.rfi.n31^2-comp1.mat2.rfi.ki31^2-2*j*comp1.mat2.rfi.n31*comp1.mat2.rfi.ki31&amp;&amp;comp1.mat2.rfi.n13*comp1.mat2.rfi.n12-comp1.mat2.rfi.ki13*comp1.mat2.rfi.ki12-j*(comp1.mat2.rfi.n13*comp1.mat2.rfi.ki12+comp1.mat2.rfi.ki13*comp1.mat2.rfi.n12)+comp1.mat2.rfi.n23*comp1.mat2.rfi.n22-comp1.mat2.rfi.ki23*comp1.mat2.rfi.ki22-j*(comp1.mat2.rfi.n23*comp1.mat2.rfi.ki22+comp1.mat2.rfi.ki23*comp1.mat2.rfi.n22)+comp1.mat2.rfi.n33*comp1.mat2.rfi.n32-comp1.mat2.rfi.ki33*comp1.mat2.rfi.ki32-j*(comp1.mat2.rfi.n33*comp1.mat2.rfi.ki32+comp1.mat2.rfi.ki33*comp1.mat2.rfi.n32)==0&amp;&amp;comp1.mat2.rfi.n13*comp1.mat2.rfi.n11-comp1.mat2.rfi.ki13*comp1.mat2.rfi.ki11-j*(comp1.mat2.rfi.n13*comp1.mat2.rfi.ki11+comp1.mat2.rfi.ki13*comp1.mat2.rfi.n11)+comp1.mat2.rfi.n23*comp1.mat2.rfi.n21-comp1.mat2.rfi.ki23*comp1.mat2.rfi.ki21-j*(comp1.mat2.rfi.n23*comp1.mat2.rfi.ki21+comp1.mat2.rfi.ki23*comp1.mat2.rfi.n21)+comp1.mat2.rfi.n33*comp1.mat2.rfi.n31-comp1.mat2.rfi.ki33*comp1.mat2.rfi.ki31-j*(comp1.mat2.rfi.n33*comp1.mat2.rfi.ki31+comp1.mat2.rfi.ki33*comp1.mat2.rfi.n31)==0&amp;&amp;comp1.mat2.rfi.n13*comp1.mat2.rfi.n12-comp1.mat2.rfi.ki13*comp1.mat2.rfi.ki12-j*(comp1.mat2.rfi.n13*comp1.mat2.rfi.ki12+comp1.mat2.rfi.ki13*comp1.mat2.rfi.n12)+comp1.mat2.rfi.n23*comp1.mat2.rfi.n22-comp1.mat2.rfi.ki23*comp1.mat2.rfi.ki22-j*(comp1.mat2.rfi.n23*comp1.mat2.rfi.ki22+comp1.mat2.rfi.ki23*comp1.mat2.rfi.n22)+comp1.mat2.rfi.n33*comp1.mat2.rfi.n32-comp1.mat2.rfi.ki33*comp1.mat2.rfi.ki32-j*(comp1.mat2.rfi.n33*comp1.mat2.rfi.ki32+comp1.mat2.rfi.ki33*comp1.mat2.rfi.n32)==0&amp;&amp;comp1.mat2.rfi.n13^2-comp1.mat2.rfi.ki13^2-2*j*comp1.mat2.rfi.n13*comp1.mat2.rfi.ki13+comp1.mat2.rfi.n23^2-comp1.mat2.rfi.ki23^2-2*j*comp1.mat2.rfi.n23*comp1.mat2.rfi.ki23+comp1.mat2.rfi.n33^2-comp1.mat2.rfi.ki33^2-2*j*comp1.mat2.rfi.n33*comp1.mat2.rfi.ki33==comp1.mat2.rfi.n11^2-comp1.mat2.rfi.ki11^2-2*j*comp1.mat2.rfi.n11*comp1.mat2.rfi.ki11+comp1.mat2.rfi.n21^2-comp1.mat2.rfi.ki21^2-2*j*comp1.mat2.rfi.n21*comp1.mat2.rfi.ki21+comp1.mat2.rfi.n31^2-comp1.mat2.rfi.ki31^2-2*j*comp1.mat2.rfi.n31*comp1.mat2.rfi.ki31,comp1.mat2.rfi.n11^2-comp1.mat2.rfi.ki11^2-2*j*comp1.mat2.rfi.n11*comp1.mat2.rfi.ki11+comp1.mat2.rfi.n21^2-comp1.mat2.rfi.ki21^2-2*j*comp1.mat2.rfi.n21*comp1.mat2.rfi.ki21+comp1.mat2.rfi.n31^2-comp1.mat2.rfi.ki31^2-2*j*comp1.mat2.rfi.n31*comp1.mat2.rfi.ki31,error('$base64:RmFpbGVkIHRvIGV2YWx1YXRlIGFuIGlzb3Ryb3BpYyB2YWx1ZSBvZiBhbiBhbmlzb3Ryb3BpYyB0ZW5zb3IAAAAAAAA='))</str> </arr> <str>material.def.epsilonr_symmetry</str> <arr> <str>79</str> </arr> <str>material.epsilonr11</str> <arr> <str>comp1.mat2.rfi.n11^2-comp1.mat2.rfi.ki11^2-2*j*comp1.mat2.rfi.n11*comp1.mat2.rfi.ki11+comp1.mat2.rfi.n21^2-comp1.mat2.rfi.ki21^2-2*j*comp1.mat2.rfi.n21*comp1.mat2.rfi.ki21+comp1.mat2.rfi.n31^2-comp1.mat2.rfi.ki31^2-2*j*comp1.mat2.rfi.n31*comp1.mat2.rfi.ki31</str> </arr> <str>material.epsilonr21</str> <arr> <str>comp1.mat2.rfi.n11*comp1.mat2.rfi.n12-comp1.mat2.rfi.ki11*comp1.mat2.rfi.ki12-j*(comp1.mat2.rfi.n11*comp1.mat2.rfi.ki12+comp1.mat2.rfi.ki11*comp1.mat2.rfi.n12)+comp1.mat2.rfi.n21*comp1.mat2.rfi.n22-comp1.mat2.rfi.ki21*comp1.mat2.rfi.ki22-j*(comp1.mat2.rfi.n21*comp1.mat2.rfi.ki22+comp1.mat2.rfi.ki21*comp1.mat2.rfi.n22)+comp1.mat2.rfi.n31*comp1.mat2.rfi.n32-comp1.mat2.rfi.ki31*comp1.mat2.rfi.ki32-j*(comp1.mat2.rfi.n31*comp1.mat2.rfi.ki32+comp1.mat2.rfi.ki31*comp1.mat2.rfi.n32)</str> </arr> <str>material.epsilonr31</str> <arr> <str>comp1.mat2.rfi.n11*comp1.mat2.rfi.n13-comp1.mat2.rfi.ki11*comp1.mat2.rfi.ki13-j*(comp1.mat2.rfi.n11*comp1.mat2.rfi.ki13+comp1.mat2.rfi.ki11*comp1.mat2.rfi.n13)+comp1.mat2.rfi.n21*comp1.mat2.rfi.n23-comp1.mat2.rfi.ki21*comp1.mat2.rfi.ki23-j*(comp1.mat2.rfi.n21*comp1.mat2.rfi.ki23+comp1.mat2.rfi.ki21*comp1.mat2.rfi.n23)+comp1.mat2.rfi.n31*comp1.mat2.rfi.n33-comp1.mat2.rfi.ki31*comp1.mat2.rfi.ki33-j*(comp1.mat2.rfi.n31*comp1.mat2.rfi.ki33+comp1.mat2.rfi.ki31*comp1.mat2.rfi.n33)</str> </arr> <str>material.epsilonr12</str> <arr> <str>comp1.mat2.rfi.n12*comp1.mat2.rfi.n11-comp1.mat2.rfi.ki12*comp1.mat2.rfi.ki11-j*(comp1.mat2.rfi.n12*comp1.mat2.rfi.ki11+comp1.mat2.rfi.ki12*comp1.mat2.rfi.n11)+comp1.mat2.rfi.n22*comp1.mat2.rfi.n21-comp1.mat2.rfi.ki22*comp1.mat2.rfi.ki21-j*(comp1.mat2.rfi.n22*comp1.mat2.rfi.ki21+comp1.mat2.rfi.ki22*comp1.mat2.rfi.n21)+comp1.mat2.rfi.n32*comp1.mat2.rfi.n31-comp1.mat2.rfi.ki32*comp1.mat2.rfi.ki31-j*(comp1.mat2.rfi.n32*comp1.mat2.rfi.ki31+comp1.mat2.rfi.ki32*comp1.mat2.rfi.n31)</str> </arr> <str>material.epsilonr22</str> <arr> <str>comp1.mat2.rfi.n12^2-comp1.mat2.rfi.ki12^2-2*j*comp1.mat2.rfi.n12*comp1.mat2.rfi.ki12+comp1.mat2.rfi.n22^2-comp1.mat2.rfi.ki22^2-2*j*comp1.mat2.rfi.n22*comp1.mat2.rfi.ki22+comp1.mat2.rfi.n32^2-comp1.mat2.rfi.ki32^2-2*j*comp1.mat2.rfi.n32*comp1.mat2.rfi.ki32</str> </arr> <str>material.epsilonr32</str> <arr> <str>comp1.mat2.rfi.n12*comp1.mat2.rfi.n13-comp1.mat2.rfi.ki12*comp1.mat2.rfi.ki13-j*(comp1.mat2.rfi.n12*comp1.mat2.rfi.ki13+comp1.mat2.rfi.ki12*comp1.mat2.rfi.n13)+comp1.mat2.rfi.n22*comp1.mat2.rfi.n23-comp1.mat2.rfi.ki22*comp1.mat2.rfi.ki23-j*(comp1.mat2.rfi.n22*comp1.mat2.rfi.ki23+comp1.mat2.rfi.ki22*comp1.mat2.rfi.n23)+comp1.mat2.rfi.n32*comp1.mat2.rfi.n33-comp1.mat2.rfi.ki32*comp1.mat2.rfi.ki33-j*(comp1.mat2.rfi.n32*comp1.mat2.rfi.ki33+comp1.mat2.rfi.ki32*comp1.mat2.rfi.n33)</str> </arr> <str>material.epsilonr13</str> <arr> <str>comp1.mat2.rfi.n13*comp1.mat2.rfi.n11-comp1.mat2.rfi.ki13*comp1.mat2.rfi.ki11-j*(comp1.mat2.rfi.n13*comp1.mat2.rfi.ki11+comp1.mat2.rfi.ki13*comp1.mat2.rfi.n11)+comp1.mat2.rfi.n23*comp1.mat2.rfi.n21-comp1.mat2.rfi.ki23*comp1.mat2.rfi.ki21-j*(comp1.mat2.rfi.n23*comp1.mat2.rfi.ki21+comp1.mat2.rfi.ki23*comp1.mat2.rfi.n21)+comp1.mat2.rfi.n33*comp1.mat2.rfi.n31-comp1.mat2.rfi.ki33*comp1.mat2.rfi.ki31-j*(comp1.mat2.rfi.n33*comp1.mat2.rfi.ki31+comp1.mat2.rfi.ki33*comp1.mat2.rfi.n31)</str> </arr> <str>material.epsilonr23</str> <arr> <str>comp1.mat2.rfi.n13*comp1.mat2.rfi.n12-comp1.mat2.rfi.ki13*comp1.mat2.rfi.ki12-j*(comp1.mat2.rfi.n13*comp1.mat2.rfi.ki12+comp1.mat2.rfi.ki13*comp1.mat2.rfi.n12)+comp1.mat2.rfi.n23*comp1.mat2.rfi.n22-comp1.mat2.rfi.ki23*comp1.mat2.rfi.ki22-j*(comp1.mat2.rfi.n23*comp1.mat2.rfi.ki22+comp1.mat2.rfi.ki23*comp1.mat2.rfi.n22)+comp1.mat2.rfi.n33*comp1.mat2.rfi.n32-comp1.mat2.rfi.ki33*comp1.mat2.rfi.ki32-j*(comp1.mat2.rfi.n33*comp1.mat2.rfi.ki32+comp1.mat2.rfi.ki33*comp1.mat2.rfi.n32)</str> </arr> <str>material.epsilonr33</str> <arr> <str>comp1.mat2.rfi.n13^2-comp1.mat2.rfi.ki13^2-2*j*comp1.mat2.rfi.n13*comp1.mat2.rfi.ki13+comp1.mat2.rfi.n23^2-comp1.mat2.rfi.ki23^2-2*j*comp1.mat2.rfi.n23*comp1.mat2.rfi.ki23+comp1.mat2.rfi.n33^2-comp1.mat2.rfi.ki33^2-2*j*comp1.mat2.rfi.n33*comp1.mat2.rfi.ki33</str> </arr> <str>material.epsilonr_iso</str> <arr> <str>if(comp1.mat2.rfi.n12*comp1.mat2.rfi.n11-comp1.mat2.rfi.ki12*comp1.mat2.rfi.ki11-j*(comp1.mat2.rfi.n12*comp1.mat2.rfi.ki11+comp1.mat2.rfi.ki12*comp1.mat2.rfi.n11)+comp1.mat2.rfi.n22*comp1.mat2.rfi.n21-comp1.mat2.rfi.ki22*comp1.mat2.rfi.ki21-j*(comp1.mat2.rfi.n22*comp1.mat2.rfi.ki21+comp1.mat2.rfi.ki22*comp1.mat2.rfi.n21)+comp1.mat2.rfi.n32*comp1.mat2.rfi.n31-comp1.mat2.rfi.ki32*comp1.mat2.rfi.ki31-j*(comp1.mat2.rfi.n32*comp1.mat2.rfi.ki31+comp1.mat2.rfi.ki32*comp1.mat2.rfi.n31)==0&amp;&amp;comp1.mat2.rfi.n13*comp1.mat2.rfi.n11-comp1.mat2.rfi.ki13*comp1.mat2.rfi.ki11-j*(comp1.mat2.rfi.n13*comp1.mat2.rfi.ki11+comp1.mat2.rfi.ki13*comp1.mat2.rfi.n11)+comp1.mat2.rfi.n23*comp1.mat2.rfi.n21-comp1.mat2.rfi.ki23*comp1.mat2.rfi.ki21-j*(comp1.mat2.rfi.n23*comp1.mat2.rfi.ki21+comp1.mat2.rfi.ki23*comp1.mat2.rfi.n21)+comp1.mat2.rfi.n33*comp1.mat2.rfi.n31-comp1.mat2.rfi.ki33*comp1.mat2.rfi.ki31-j*(comp1.mat2.rfi.n33*comp1.mat2.rfi.ki31+comp1.mat2.rfi.ki33*comp1.mat2.rfi.n31)==0&amp;&amp;comp1.mat2.rfi.n12*comp1.mat2.rfi.n11-comp1.mat2.rfi.ki12*comp1.mat2.rfi.ki11-j*(comp1.mat2.rfi.n12*comp1.mat2.rfi.ki11+comp1.mat2.rfi.ki12*comp1.mat2.rfi.n11)+comp1.mat2.rfi.n22*comp1.mat2.rfi.n21-comp1.mat2.rfi.ki22*comp1.mat2.rfi.ki21-j*(comp1.mat2.rfi.n22*comp1.mat2.rfi.ki21+comp1.mat2.rfi.ki22*comp1.mat2.rfi.n21)+comp1.mat2.rfi.n32*comp1.mat2.rfi.n31-comp1.mat2.rfi.ki32*comp1.mat2.rfi.ki31-j*(comp1.mat2.rfi.n32*comp1.mat2.rfi.ki31+comp1.mat2.rfi.ki32*comp1.mat2.rfi.n31)==0&amp;&amp;comp1.mat2.rfi.n12^2-comp1.mat2.rfi.ki12^2-2*j*comp1.mat2.rfi.n12*comp1.mat2.rfi.ki12+comp1.mat2.rfi.n22^2-comp1.mat2.rfi.ki22^2-2*j*comp1.mat2.rfi.n22*comp1.mat2.rfi.ki22+comp1.mat2.rfi.n32^2-comp1.mat2.rfi.ki32^2-2*j*comp1.mat2.rfi.n32*comp1.mat2.rfi.ki32==comp1.mat2.rfi.n11^2-comp1.mat2.rfi.ki11^2-2*j*comp1.mat2.rfi.n11*comp1.mat2.rfi.ki11+comp1.mat2.rfi.n21^2-comp1.mat2.rfi.ki21^2-2*j*comp1.mat2.rfi.n21*comp1.mat2.rfi.ki21+comp1.mat2.rfi.n31^2-comp1.mat2.rfi.ki31^2-2*j*comp1.mat2.rfi.n31*comp1.mat2.rfi.ki31&amp;&amp;comp1.mat2.rfi.n13*comp1.mat2.rfi.n12-comp1.mat2.rfi.ki13*comp1.mat2.rfi.ki12-j*(comp1.mat2.rfi.n13*comp1.mat2.rfi.ki12+comp1.mat2.rfi.ki13*comp1.mat2.rfi.n12)+comp1.mat2.rfi.n23*comp1.mat2.rfi.n22-comp1.mat2.rfi.ki23*comp1.mat2.rfi.ki22-j*(comp1.mat2.rfi.n23*comp1.mat2.rfi.ki22+comp1.mat2.rfi.ki23*comp1.mat2.rfi.n22)+comp1.mat2.rfi.n33*comp1.mat2.rfi.n32-comp1.mat2.rfi.ki33*comp1.mat2.rfi.ki32-j*(comp1.mat2.rfi.n33*comp1.mat2.rfi.ki32+comp1.mat2.rfi.ki33*comp1.mat2.rfi.n32)==0&amp;&amp;comp1.mat2.rfi.n13*comp1.mat2.rfi.n11-comp1.mat2.rfi.ki13*comp1.mat2.rfi.ki11-j*(comp1.mat2.rfi.n13*comp1.mat2.rfi.ki11+comp1.mat2.rfi.ki13*comp1.mat2.rfi.n11)+comp1.mat2.rfi.n23*comp1.mat2.rfi.n21-comp1.mat2.rfi.ki23*comp1.mat2.rfi.ki21-j*(comp1.mat2.rfi.n23*comp1.mat2.rfi.ki21+comp1.mat2.rfi.ki23*comp1.mat2.rfi.n21)+comp1.mat2.rfi.n33*comp1.mat2.rfi.n31-comp1.mat2.rfi.ki33*comp1.mat2.rfi.ki31-j*(comp1.mat2.rfi.n33*comp1.mat2.rfi.ki31+comp1.mat2.rfi.ki33*comp1.mat2.rfi.n31)==0&amp;&amp;comp1.mat2.rfi.n13*comp1.mat2.rfi.n12-comp1.mat2.rfi.ki13*comp1.mat2.rfi.ki12-j*(comp1.mat2.rfi.n13*comp1.mat2.rfi.ki12+comp1.mat2.rfi.ki13*comp1.mat2.rfi.n12)+comp1.mat2.rfi.n23*comp1.mat2.rfi.n22-comp1.mat2.rfi.ki23*comp1.mat2.rfi.ki22-j*(comp1.mat2.rfi.n23*comp1.mat2.rfi.ki22+comp1.mat2.rfi.ki23*comp1.mat2.rfi.n22)+comp1.mat2.rfi.n33*comp1.mat2.rfi.n32-comp1.mat2.rfi.ki33*comp1.mat2.rfi.ki32-j*(comp1.mat2.rfi.n33*comp1.mat2.rfi.ki32+comp1.mat2.rfi.ki33*comp1.mat2.rfi.n32)==0&amp;&amp;comp1.mat2.rfi.n13^2-comp1.mat2.rfi.ki13^2-2*j*comp1.mat2.rfi.n13*comp1.mat2.rfi.ki13+comp1.mat2.rfi.n23^2-comp1.mat2.rfi.ki23^2-2*j*comp1.mat2.rfi.n23*comp1.mat2.rfi.ki23+comp1.mat2.rfi.n33^2-comp1.mat2.rfi.ki33^2-2*j*comp1.mat2.rfi.n33*comp1.mat2.rfi.ki33==comp1.mat2.rfi.n11^2-comp1.mat2.rfi.ki11^2-2*j*comp1.mat2.rfi.n11*comp1.mat2.rfi.ki11+comp1.mat2.rfi.n21^2-comp1.mat2.rfi.ki21^2-2*j*comp1.mat2.rfi.n21*comp1.mat2.rfi.ki21+comp1.mat2.rfi.n31^2-comp1.mat2.rfi.ki31^2-2*j*comp1.mat2.rfi.n31*comp1.mat2.rfi.ki31,comp1.mat2.rfi.n11^2-comp1.mat2.rfi.ki11^2-2*j*comp1.mat2.rfi.n11*comp1.mat2.rfi.ki11+comp1.mat2.rfi.n21^2-comp1.mat2.rfi.ki21^2-2*j*comp1.mat2.rfi.n21*comp1.mat2.rfi.ki21+comp1.mat2.rfi.n31^2-comp1.mat2.rfi.ki31^2-2*j*comp1.mat2.rfi.n31*comp1.mat2.rfi.ki31,error('$base64:RmFpbGVkIHRvIGV2YWx1YXRlIGFuIGlzb3Ryb3BpYyB2YWx1ZSBvZiBhbiBhbmlzb3Ryb3BpYyB0ZW5zb3IAAAAAAAA='))</str> </arr> <str>material.epsilonr_symmetry</str> <arr> <str>79</str> </arr> <str>material.lstdf.tanDelta</str> <arr> <str>2*comp1.mat1.rfi.n_iso*comp1.mat1.rfi.ki_iso/(comp1.mat1.rfi.n_iso^2-comp1.mat1.rfi.ki_iso^2)</str> </arr> <str>material.lstdf.epsilonPrim11</str> <arr> <str>comp1.mat1.rfi.n_iso^2-comp1.mat1.rfi.ki_iso^2</str> </arr> <str>material.lstdf.epsilonPrim21</str> <arr> <str>0</str> </arr> <str>material.lstdf.epsilonPrim31</str> <arr> <str>0</str> </arr> <str>material.lstdf.epsilonPrim12</str> <arr> <str>0</str> </arr> <str>material.lstdf.epsilonPrim22</str> <arr> <str>comp1.mat1.rfi.n_iso^2-comp1.mat1.rfi.ki_iso^2</str> </arr> <str>material.lstdf.epsilonPrim32</str> <arr> <str>0</str> </arr> <str>material.lstdf.epsilonPrim13</str> <arr> <str>0</str> </arr> <str>material.lstdf.epsilonPrim23</str> <arr> <str>0</str> </arr> <str>material.lstdf.epsilonPrim33</str> <arr> <str>comp1.mat1.rfi.n_iso^2-comp1.mat1.rfi.ki_iso^2</str> </arr> <str>material.lstdf.epsilonPrim_iso</str> <arr> <str>comp1.mat1.rfi.n_iso^2-comp1.mat1.rfi.ki_iso^2</str> </arr> <str>material.lstdf.epsilonPrim_symmetry</str> <arr> <str>79</str> </arr> <str>material.del.epsilonPrim11</str> <arr> <str>comp1.mat2.rfi.n11^2-comp1.mat2.rfi.ki11^2+comp1.mat2.rfi.n21^2-comp1.mat2.rfi.ki21^2+comp1.mat2.rfi.n31^2-comp1.mat2.rfi.ki31^2</str> </arr> <str>material.del.epsilonPrim21</str> <arr> <str>comp1.mat2.rfi.n11*comp1.mat2.rfi.n12-comp1.mat2.rfi.ki11*comp1.mat2.rfi.ki12+comp1.mat2.rfi.n21*comp1.mat2.rfi.n22-comp1.mat2.rfi.ki21*comp1.mat2.rfi.ki22+comp1.mat2.rfi.n31*comp1.mat2.rfi.n32-comp1.mat2.rfi.ki31*comp1.mat2.rfi.ki32</str> </arr> <str>material.del.epsilonPrim31</str> <arr> <str>comp1.mat2.rfi.n11*comp1.mat2.rfi.n13-comp1.mat2.rfi.ki11*comp1.mat2.rfi.ki13+comp1.mat2.rfi.n21*comp1.mat2.rfi.n23-comp1.mat2.rfi.ki21*comp1.mat2.rfi.ki23+comp1.mat2.rfi.n31*comp1.mat2.rfi.n33-comp1.mat2.rfi.ki31*comp1.mat2.rfi.ki33</str> </arr> <str>material.del.epsilonPrim12</str> <arr> <str>comp1.mat2.rfi.n12*comp1.mat2.rfi.n11-comp1.mat2.rfi.ki12*comp1.mat2.rfi.ki11+comp1.mat2.rfi.n22*comp1.mat2.rfi.n21-comp1.mat2.rfi.ki22*comp1.mat2.rfi.ki21+comp1.mat2.rfi.n32*comp1.mat2.rfi.n31-comp1.mat2.rfi.ki32*comp1.mat2.rfi.ki31</str> </arr> <str>material.del.epsilonPrim22</str> <arr> <str>comp1.mat2.rfi.n12^2-comp1.mat2.rfi.ki12^2+comp1.mat2.rfi.n22^2-comp1.mat2.rfi.ki22^2+comp1.mat2.rfi.n32^2-comp1.mat2.rfi.ki32^2</str> </arr> <str>material.del.epsilonPrim32</str> <arr> <str>comp1.mat2.rfi.n12*comp1.mat2.rfi.n13-comp1.mat2.rfi.ki12*comp1.mat2.rfi.ki13+comp1.mat2.rfi.n22*comp1.mat2.rfi.n23-comp1.mat2.rfi.ki22*comp1.mat2.rfi.ki23+comp1.mat2.rfi.n32*comp1.mat2.rfi.n33-comp1.mat2.rfi.ki32*comp1.mat2.rfi.ki33</str> </arr> <str>material.del.epsilonPrim13</str> <arr> <str>comp1.mat2.rfi.n13*comp1.mat2.rfi.n11-comp1.mat2.rfi.ki13*comp1.mat2.rfi.ki11+comp1.mat2.rfi.n23*comp1.mat2.rfi.n21-comp1.mat2.rfi.ki23*comp1.mat2.rfi.ki21+comp1.mat2.rfi.n33*comp1.mat2.rfi.n31-comp1.mat2.rfi.ki33*comp1.mat2.rfi.ki31</str> </arr> <str>material.del.epsilonPrim23</str> <arr> <str>comp1.mat2.rfi.n13*comp1.mat2.rfi.n12-comp1.mat2.rfi.ki13*comp1.mat2.rfi.ki12+comp1.mat2.rfi.n23*comp1.mat2.rfi.n22-comp1.mat2.rfi.ki23*comp1.mat2.rfi.ki22+comp1.mat2.rfi.n33*comp1.mat2.rfi.n32-comp1.mat2.rfi.ki33*comp1.mat2.rfi.ki32</str> </arr> <str>material.del.epsilonPrim33</str> <arr> <str>comp1.mat2.rfi.n13^2-comp1.mat2.rfi.ki13^2+comp1.mat2.rfi.n23^2-comp1.mat2.rfi.ki23^2+comp1.mat2.rfi.n33^2-comp1.mat2.rfi.ki33^2</str> </arr> <str>material.del.epsilonPrim_iso</str> <arr> <str>if(comp1.mat2.rfi.n12*comp1.mat2.rfi.n11-comp1.mat2.rfi.ki12*comp1.mat2.rfi.ki11+comp1.mat2.rfi.n22*comp1.mat2.rfi.n21-comp1.mat2.rfi.ki22*comp1.mat2.rfi.ki21+comp1.mat2.rfi.n32*comp1.mat2.rfi.n31-comp1.mat2.rfi.ki32*comp1.mat2.rfi.ki31==0&amp;&amp;comp1.mat2.rfi.n13*comp1.mat2.rfi.n11-comp1.mat2.rfi.ki13*comp1.mat2.rfi.ki11+comp1.mat2.rfi.n23*comp1.mat2.rfi.n21-comp1.mat2.rfi.ki23*comp1.mat2.rfi.ki21+comp1.mat2.rfi.n33*comp1.mat2.rfi.n31-comp1.mat2.rfi.ki33*comp1.mat2.rfi.ki31==0&amp;&amp;comp1.mat2.rfi.n12*comp1.mat2.rfi.n11-comp1.mat2.rfi.ki12*comp1.mat2.rfi.ki11+comp1.mat2.rfi.n22*comp1.mat2.rfi.n21-comp1.mat2.rfi.ki22*comp1.mat2.rfi.ki21+comp1.mat2.rfi.n32*comp1.mat2.rfi.n31-comp1.mat2.rfi.ki32*comp1.mat2.rfi.ki31==0&amp;&amp;comp1.mat2.rfi.n12^2-comp1.mat2.rfi.ki12^2+comp1.mat2.rfi.n22^2-comp1.mat2.rfi.ki22^2+comp1.mat2.rfi.n32^2-comp1.mat2.rfi.ki32^2==comp1.mat2.rfi.n11^2-comp1.mat2.rfi.ki11^2+comp1.mat2.rfi.n21^2-comp1.mat2.rfi.ki21^2+comp1.mat2.rfi.n31^2-comp1.mat2.rfi.ki31^2&amp;&amp;comp1.mat2.rfi.n13*comp1.mat2.rfi.n12-comp1.mat2.rfi.ki13*comp1.mat2.rfi.ki12+comp1.mat2.rfi.n23*comp1.mat2.rfi.n22-comp1.mat2.rfi.ki23*comp1.mat2.rfi.ki22+comp1.mat2.rfi.n33*comp1.mat2.rfi.n32-comp1.mat2.rfi.ki33*comp1.mat2.rfi.ki32==0&amp;&amp;comp1.mat2.rfi.n13*comp1.mat2.rfi.n11-comp1.mat2.rfi.ki13*comp1.mat2.rfi.ki11+comp1.mat2.rfi.n23*comp1.mat2.rfi.n21-comp1.mat2.rfi.ki23*comp1.mat2.rfi.ki21+comp1.mat2.rfi.n33*comp1.mat2.rfi.n31-comp1.mat2.rfi.ki33*comp1.mat2.rfi.ki31==0&amp;&amp;comp1.mat2.rfi.n13*comp1.mat2.rfi.n12-comp1.mat2.rfi.ki13*comp1.mat2.rfi.ki12+comp1.mat2.rfi.n23*comp1.mat2.rfi.n22-comp1.mat2.rfi.ki23*comp1.mat2.rfi.ki22+comp1.mat2.rfi.n33*comp1.mat2.rfi.n32-comp1.mat2.rfi.ki33*comp1.mat2.rfi.ki32==0&amp;&amp;comp1.mat2.rfi.n13^2-comp1.mat2.rfi.ki13^2+comp1.mat2.rfi.n23^2-comp1.mat2.rfi.ki23^2+comp1.mat2.rfi.n33^2-comp1.mat2.rfi.ki33^2==comp1.mat2.rfi.n11^2-comp1.mat2.rfi.ki11^2+comp1.mat2.rfi.n21^2-comp1.mat2.rfi.ki21^2+comp1.mat2.rfi.n31^2-comp1.mat2.rfi.ki31^2,comp1.mat2.rfi.n11^2-comp1.mat2.rfi.ki11^2+comp1.mat2.rfi.n21^2-comp1.mat2.rfi.ki21^2+comp1.mat2.rfi.n31^2-comp1.mat2.rfi.ki31^2,error('$base64:RmFpbGVkIHRvIGV2YWx1YXRlIGFuIGlzb3Ryb3BpYyB2YWx1ZSBvZiBhbiBhbmlzb3Ryb3BpYyB0ZW5zb3IAAAAAAAA='))</str> </arr> <str>material.del.epsilonPrim_symmetry</str> <arr> <str>79</str> </arr> <str>material.del.epsilonBis11</str> <arr> <str>2*(comp1.mat2.rfi.n11*comp1.mat2.rfi.ki11+comp1.mat2.rfi.n21*comp1.mat2.rfi.ki21+comp1.mat2.rfi.n31*comp1.mat2.rfi.ki31)</str> </arr> <str>material.del.epsilonBis21</str> <arr> <str>comp1.mat2.rfi.n11*comp1.mat2.rfi.ki12+comp1.mat2.rfi.ki11*comp1.mat2.rfi.n12+comp1.mat2.rfi.n21*comp1.mat2.rfi.ki22+comp1.mat2.rfi.ki21*comp1.mat2.rfi.n22+comp1.mat2.rfi.n31*comp1.mat2.rfi.ki32+comp1.mat2.rfi.ki31*comp1.mat2.rfi.n32</str> </arr> <str>material.del.epsilonBis31</str> <arr> <str>comp1.mat2.rfi.n11*comp1.mat2.rfi.ki13+comp1.mat2.rfi.ki11*comp1.mat2.rfi.n13+comp1.mat2.rfi.n21*comp1.mat2.rfi.ki23+comp1.mat2.rfi.ki21*comp1.mat2.rfi.n23+comp1.mat2.rfi.n31*comp1.mat2.rfi.ki33+comp1.mat2.rfi.ki31*comp1.mat2.rfi.n33</str> </arr> <str>material.del.epsilonBis12</str> <arr> <str>comp1.mat2.rfi.n12*comp1.mat2.rfi.ki11+comp1.mat2.rfi.ki12*comp1.mat2.rfi.n11+comp1.mat2.rfi.n22*comp1.mat2.rfi.ki21+comp1.mat2.rfi.ki22*comp1.mat2.rfi.n21+comp1.mat2.rfi.n32*comp1.mat2.rfi.ki31+comp1.mat2.rfi.ki32*comp1.mat2.rfi.n31</str> </arr> <str>material.del.epsilonBis22</str> <arr> <str>2*(comp1.mat2.rfi.n12*comp1.mat2.rfi.ki12+comp1.mat2.rfi.n22*comp1.mat2.rfi.ki22+comp1.mat2.rfi.n32*comp1.mat2.rfi.ki32)</str> </arr> <str>material.del.epsilonBis32</str> <arr> <str>comp1.mat2.rfi.n12*comp1.mat2.rfi.ki13+comp1.mat2.rfi.ki12*comp1.mat2.rfi.n13+comp1.mat2.rfi.n22*comp1.mat2.rfi.ki23+comp1.mat2.rfi.ki22*comp1.mat2.rfi.n23+comp1.mat2.rfi.n32*comp1.mat2.rfi.ki33+comp1.mat2.rfi.ki32*comp1.mat2.rfi.n33</str> </arr> <str>material.del.epsilonBis13</str> <arr> <str>comp1.mat2.rfi.n13*comp1.mat2.rfi.ki11+comp1.mat2.rfi.ki13*comp1.mat2.rfi.n11+comp1.mat2.rfi.n23*comp1.mat2.rfi.ki21+comp1.mat2.rfi.ki23*comp1.mat2.rfi.n21+comp1.mat2.rfi.n33*comp1.mat2.rfi.ki31+comp1.mat2.rfi.ki33*comp1.mat2.rfi.n31</str> </arr> <str>material.del.epsilonBis23</str> <arr> <str>comp1.mat2.rfi.n13*comp1.mat2.rfi.ki12+comp1.mat2.rfi.ki13*comp1.mat2.rfi.n12+comp1.mat2.rfi.n23*comp1.mat2.rfi.ki22+comp1.mat2.rfi.ki23*comp1.mat2.rfi.n22+comp1.mat2.rfi.n33*comp1.mat2.rfi.ki32+comp1.mat2.rfi.ki33*comp1.mat2.rfi.n32</str> </arr> <str>material.del.epsilonBis33</str> <arr> <str>2*(comp1.mat2.rfi.n13*comp1.mat2.rfi.ki13+comp1.mat2.rfi.n23*comp1.mat2.rfi.ki23+comp1.mat2.rfi.n33*comp1.mat2.rfi.ki33)</str> </arr> <str>material.del.epsilonBis_iso</str> <arr> <str>if(comp1.mat2.rfi.n12*comp1.mat2.rfi.ki11+comp1.mat2.rfi.ki12*comp1.mat2.rfi.n11+comp1.mat2.rfi.n22*comp1.mat2.rfi.ki21+comp1.mat2.rfi.ki22*comp1.mat2.rfi.n21+comp1.mat2.rfi.n32*comp1.mat2.rfi.ki31+comp1.mat2.rfi.ki32*comp1.mat2.rfi.n31==0&amp;&amp;comp1.mat2.rfi.n13*comp1.mat2.rfi.ki11+comp1.mat2.rfi.ki13*comp1.mat2.rfi.n11+comp1.mat2.rfi.n23*comp1.mat2.rfi.ki21+comp1.mat2.rfi.ki23*comp1.mat2.rfi.n21+comp1.mat2.rfi.n33*comp1.mat2.rfi.ki31+comp1.mat2.rfi.ki33*comp1.mat2.rfi.n31==0&amp;&amp;comp1.mat2.rfi.n12*comp1.mat2.rfi.ki11+comp1.mat2.rfi.ki12*comp1.mat2.rfi.n11+comp1.mat2.rfi.n22*comp1.mat2.rfi.ki21+comp1.mat2.rfi.ki22*comp1.mat2.rfi.n21+comp1.mat2.rfi.n32*comp1.mat2.rfi.ki31+comp1.mat2.rfi.ki32*comp1.mat2.rfi.n31==0&amp;&amp;2*(comp1.mat2.rfi.n12*comp1.mat2.rfi.ki12+comp1.mat2.rfi.n22*comp1.mat2.rfi.ki22+comp1.mat2.rfi.n32*comp1.mat2.rfi.ki32)==2*(comp1.mat2.rfi.n11*comp1.mat2.rfi.ki11+comp1.mat2.rfi.n21*comp1.mat2.rfi.ki21+comp1.mat2.rfi.n31*comp1.mat2.rfi.ki31)&amp;&amp;comp1.mat2.rfi.n13*comp1.mat2.rfi.ki12+comp1.mat2.rfi.ki13*comp1.mat2.rfi.n12+comp1.mat2.rfi.n23*comp1.mat2.rfi.ki22+comp1.mat2.rfi.ki23*comp1.mat2.rfi.n22+comp1.mat2.rfi.n33*comp1.mat2.rfi.ki32+comp1.mat2.rfi.ki33*comp1.mat2.rfi.n32==0&amp;&amp;comp1.mat2.rfi.n13*comp1.mat2.rfi.ki11+comp1.mat2.rfi.ki13*comp1.mat2.rfi.n11+comp1.mat2.rfi.n23*comp1.mat2.rfi.ki21+comp1.mat2.rfi.ki23*comp1.mat2.rfi.n21+comp1.mat2.rfi.n33*comp1.mat2.rfi.ki31+comp1.mat2.rfi.ki33*comp1.mat2.rfi.n31==0&amp;&amp;comp1.mat2.rfi.n13*comp1.mat2.rfi.ki12+comp1.mat2.rfi.ki13*comp1.mat2.rfi.n12+comp1.mat2.rfi.n23*comp1.mat2.rfi.ki22+comp1.mat2.rfi.ki23*comp1.mat2.rfi.n22+comp1.mat2.rfi.n33*comp1.mat2.rfi.ki32+comp1.mat2.rfi.ki33*comp1.mat2.rfi.n32==0&amp;&amp;2*(comp1.mat2.rfi.n13*comp1.mat2.rfi.ki13+comp1.mat2.rfi.n23*comp1.mat2.rfi.ki23+comp1.mat2.rfi.n33*comp1.mat2.rfi.ki33)==2*(comp1.mat2.rfi.n11*comp1.mat2.rfi.ki11+comp1.mat2.rfi.n21*comp1.mat2.rfi.ki21+comp1.mat2.rfi.n31*comp1.mat2.rfi.ki31),2*(comp1.mat2.rfi.n11*comp1.mat2.rfi.ki11+comp1.mat2.rfi.n21*comp1.mat2.rfi.ki21+comp1.mat2.rfi.n31*comp1.mat2.rfi.ki31),error('$base64:RmFpbGVkIHRvIGV2YWx1YXRlIGFuIGlzb3Ryb3BpYyB2YWx1ZSBvZiBhbiBhbmlzb3Ryb3BpYyB0ZW5zb3IAAAAAAAA='))</str> </arr> <str>material.del.epsilonBis_symmetry</str> <arr> <str>79</str> </arr> </arr> <str>ind</str> <arr> <arr> <str>2</str> </arr> </arr> </rec> </arr> </arr> <str>protected</str> <str>false</str> </rec> v<?xml version="1.0" encoding="UTF-8"?> <rec> <str>elem</str> <str>elvar</str> <str>g</str> <arr> <str>1</str> </arr> <str>geomdim</str> <arr> <arr> <arr> </arr> <arr> </arr> <rec> <str>var</str> <arr> <str>material.rfi.n11</str> <arr> <str>n_air</str> </arr> <str>material.rfi.n21</str> <arr> <str>0</str> </arr> <str>material.rfi.n31</str> <arr> <str>0</str> </arr> <str>material.rfi.n12</str> <arr> <str>0</str> </arr> <str>material.rfi.n22</str> <arr> <str>n_air</str> </arr> <str>material.rfi.n32</str> <arr> <str>0</str> </arr> <str>material.rfi.n13</str> <arr> <str>0</str> </arr> <str>material.rfi.n23</str> <arr> <str>0</str> </arr> <str>material.rfi.n33</str> <arr> <str>n_air</str> </arr> <str>material.rfi.n_symmetry</str> <arr> <str>0</str> </arr> <str>material.rfi.n_iso</str> <arr> <str>n_air</str> </arr> <str>material.rfi.ki11</str> <arr> <str>0</str> </arr> <str>material.rfi.ki21</str> <arr> <str>0</str> </arr> <str>material.rfi.ki31</str> <arr> <str>0</str> </arr> <str>material.rfi.ki12</str> <arr> <str>0</str> </arr> <str>material.rfi.ki22</str> <arr> <str>0</str> </arr> <str>material.rfi.ki32</str> <arr> <str>0</str> </arr> <str>material.rfi.ki13</str> <arr> <str>0</str> </arr> <str>material.rfi.ki23</str> <arr> <str>0</str> </arr> <str>material.rfi.ki33</str> <arr> <str>0</str> </arr> <str>material.rfi.ki_symmetry</str> <arr> <str>0</str> </arr> <str>material.rfi.ki_iso</str> <arr> <str>0</str> </arr> <str>material.lst.epsilonPrim11</str> <arr> <str>comp1.mat1.rfi.n_iso^2-comp1.mat1.rfi.ki_iso^2</str> </arr> <str>material.lst.epsilonPrim21</str> <arr> <str>0</str> </arr> <str>material.lst.epsilonPrim31</str> <arr> <str>0</str> </arr> <str>material.lst.epsilonPrim12</str> <arr> <str>0</str> </arr> <str>material.lst.epsilonPrim22</str> <arr> <str>comp1.mat1.rfi.n_iso^2-comp1.mat1.rfi.ki_iso^2</str> </arr> <str>material.lst.epsilonPrim32</str> <arr> <str>0</str> </arr> <str>material.lst.epsilonPrim13</str> <arr> <str>0</str> </arr> <str>material.lst.epsilonPrim23</str> <arr> <str>0</str> </arr> <str>material.lst.epsilonPrim33</str> <arr> <str>comp1.mat1.rfi.n_iso^2-comp1.mat1.rfi.ki_iso^2</str> </arr> <str>material.lst.epsilonPrim_iso</str> <arr> <str>comp1.mat1.rfi.n_iso^2-comp1.mat1.rfi.ki_iso^2</str> </arr> <str>material.lst.epsilonPrim_symmetry</str> <arr> <str>79</str> </arr> <str>material.lst.delta</str> <arr> <str>atan2(2*comp1.mat1.rfi.n_iso*comp1.mat1.rfi.ki_iso,comp1.mat1.rfi.n_iso^2-comp1.mat1.rfi.ki_iso^2)*unit_rad_cf</str> </arr> <str>material.def.epsilonr11</str> <arr> <str>comp1.mat3.rfi.n11^2-comp1.mat3.rfi.ki11^2-2*j*comp1.mat3.rfi.n11*comp1.mat3.rfi.ki11+comp1.mat3.rfi.n21^2-comp1.mat3.rfi.ki21^2-2*j*comp1.mat3.rfi.n21*comp1.mat3.rfi.ki21+comp1.mat3.rfi.n31^2-comp1.mat3.rfi.ki31^2-2*j*comp1.mat3.rfi.n31*comp1.mat3.rfi.ki31</str> </arr> <str>material.def.epsilonr21</str> <arr> <str>comp1.mat3.rfi.n11*comp1.mat3.rfi.n12-comp1.mat3.rfi.ki11*comp1.mat3.rfi.ki12-j*(comp1.mat3.rfi.n11*comp1.mat3.rfi.ki12+comp1.mat3.rfi.ki11*comp1.mat3.rfi.n12)+comp1.mat3.rfi.n21*comp1.mat3.rfi.n22-comp1.mat3.rfi.ki21*comp1.mat3.rfi.ki22-j*(comp1.mat3.rfi.n21*comp1.mat3.rfi.ki22+comp1.mat3.rfi.ki21*comp1.mat3.rfi.n22)+comp1.mat3.rfi.n31*comp1.mat3.rfi.n32-comp1.mat3.rfi.ki31*comp1.mat3.rfi.ki32-j*(comp1.mat3.rfi.n31*comp1.mat3.rfi.ki32+comp1.mat3.rfi.ki31*comp1.mat3.rfi.n32)</str> </arr> <str>material.def.epsilonr31</str> <arr> <str>comp1.mat3.rfi.n11*comp1.mat3.rfi.n13-comp1.mat3.rfi.ki11*comp1.mat3.rfi.ki13-j*(comp1.mat3.rfi.n11*comp1.mat3.rfi.ki13+comp1.mat3.rfi.ki11*comp1.mat3.rfi.n13)+comp1.mat3.rfi.n21*comp1.mat3.rfi.n23-comp1.mat3.rfi.ki21*comp1.mat3.rfi.ki23-j*(comp1.mat3.rfi.n21*comp1.mat3.rfi.ki23+comp1.mat3.rfi.ki21*comp1.mat3.rfi.n23)+comp1.mat3.rfi.n31*comp1.mat3.rfi.n33-comp1.mat3.rfi.ki31*comp1.mat3.rfi.ki33-j*(comp1.mat3.rfi.n31*comp1.mat3.rfi.ki33+comp1.mat3.rfi.ki31*comp1.mat3.rfi.n33)</str> </arr> <str>material.def.epsilonr12</str> <arr> <str>comp1.mat3.rfi.n12*comp1.mat3.rfi.n11-comp1.mat3.rfi.ki12*comp1.mat3.rfi.ki11-j*(comp1.mat3.rfi.n12*comp1.mat3.rfi.ki11+comp1.mat3.rfi.ki12*comp1.mat3.rfi.n11)+comp1.mat3.rfi.n22*comp1.mat3.rfi.n21-comp1.mat3.rfi.ki22*comp1.mat3.rfi.ki21-j*(comp1.mat3.rfi.n22*comp1.mat3.rfi.ki21+comp1.mat3.rfi.ki22*comp1.mat3.rfi.n21)+comp1.mat3.rfi.n32*comp1.mat3.rfi.n31-comp1.mat3.rfi.ki32*comp1.mat3.rfi.ki31-j*(comp1.mat3.rfi.n32*comp1.mat3.rfi.ki31+comp1.mat3.rfi.ki32*comp1.mat3.rfi.n31)</str> </arr> <str>material.def.epsilonr22</str> <arr> <str>comp1.mat3.rfi.n12^2-comp1.mat3.rfi.ki12^2-2*j*comp1.mat3.rfi.n12*comp1.mat3.rfi.ki12+comp1.mat3.rfi.n22^2-comp1.mat3.rfi.ki22^2-2*j*comp1.mat3.rfi.n22*comp1.mat3.rfi.ki22+comp1.mat3.rfi.n32^2-comp1.mat3.rfi.ki32^2-2*j*comp1.mat3.rfi.n32*comp1.mat3.rfi.ki32</str> </arr> <str>material.def.epsilonr32</str> <arr> <str>comp1.mat3.rfi.n12*comp1.mat3.rfi.n13-comp1.mat3.rfi.ki12*comp1.mat3.rfi.ki13-j*(comp1.mat3.rfi.n12*comp1.mat3.rfi.ki13+comp1.mat3.rfi.ki12*comp1.mat3.rfi.n13)+comp1.mat3.rfi.n22*comp1.mat3.rfi.n23-comp1.mat3.rfi.ki22*comp1.mat3.rfi.ki23-j*(comp1.mat3.rfi.n22*comp1.mat3.rfi.ki23+comp1.mat3.rfi.ki22*comp1.mat3.rfi.n23)+comp1.mat3.rfi.n32*comp1.mat3.rfi.n33-comp1.mat3.rfi.ki32*comp1.mat3.rfi.ki33-j*(comp1.mat3.rfi.n32*comp1.mat3.rfi.ki33+comp1.mat3.rfi.ki32*comp1.mat3.rfi.n33)</str> </arr> <str>material.def.epsilonr13</str> <arr> <str>comp1.mat3.rfi.n13*comp1.mat3.rfi.n11-comp1.mat3.rfi.ki13*comp1.mat3.rfi.ki11-j*(comp1.mat3.rfi.n13*comp1.mat3.rfi.ki11+comp1.mat3.rfi.ki13*comp1.mat3.rfi.n11)+comp1.mat3.rfi.n23*comp1.mat3.rfi.n21-comp1.mat3.rfi.ki23*comp1.mat3.rfi.ki21-j*(comp1.mat3.rfi.n23*comp1.mat3.rfi.ki21+comp1.mat3.rfi.ki23*comp1.mat3.rfi.n21)+comp1.mat3.rfi.n33*comp1.mat3.rfi.n31-comp1.mat3.rfi.ki33*comp1.mat3.rfi.ki31-j*(comp1.mat3.rfi.n33*comp1.mat3.rfi.ki31+comp1.mat3.rfi.ki33*comp1.mat3.rfi.n31)</str> </arr> <str>material.def.epsilonr23</str> <arr> <str>comp1.mat3.rfi.n13*comp1.mat3.rfi.n12-comp1.mat3.rfi.ki13*comp1.mat3.rfi.ki12-j*(comp1.mat3.rfi.n13*comp1.mat3.rfi.ki12+comp1.mat3.rfi.ki13*comp1.mat3.rfi.n12)+comp1.mat3.rfi.n23*comp1.mat3.rfi.n22-comp1.mat3.rfi.ki23*comp1.mat3.rfi.ki22-j*(comp1.mat3.rfi.n23*comp1.mat3.rfi.ki22+comp1.mat3.rfi.ki23*comp1.mat3.rfi.n22)+comp1.mat3.rfi.n33*comp1.mat3.rfi.n32-comp1.mat3.rfi.ki33*comp1.mat3.rfi.ki32-j*(comp1.mat3.rfi.n33*comp1.mat3.rfi.ki32+comp1.mat3.rfi.ki33*comp1.mat3.rfi.n32)</str> </arr> <str>material.def.epsilonr33</str> <arr> <str>comp1.mat3.rfi.n13^2-comp1.mat3.rfi.ki13^2-2*j*comp1.mat3.rfi.n13*comp1.mat3.rfi.ki13+comp1.mat3.rfi.n23^2-comp1.mat3.rfi.ki23^2-2*j*comp1.mat3.rfi.n23*comp1.mat3.rfi.ki23+comp1.mat3.rfi.n33^2-comp1.mat3.rfi.ki33^2-2*j*comp1.mat3.rfi.n33*comp1.mat3.rfi.ki33</str> </arr> <str>material.def.epsilonr_iso</str> <arr> <str>if(comp1.mat3.rfi.n12*comp1.mat3.rfi.n11-comp1.mat3.rfi.ki12*comp1.mat3.rfi.ki11-j*(comp1.mat3.rfi.n12*comp1.mat3.rfi.ki11+comp1.mat3.rfi.ki12*comp1.mat3.rfi.n11)+comp1.mat3.rfi.n22*comp1.mat3.rfi.n21-comp1.mat3.rfi.ki22*comp1.mat3.rfi.ki21-j*(comp1.mat3.rfi.n22*comp1.mat3.rfi.ki21+comp1.mat3.rfi.ki22*comp1.mat3.rfi.n21)+comp1.mat3.rfi.n32*comp1.mat3.rfi.n31-comp1.mat3.rfi.ki32*comp1.mat3.rfi.ki31-j*(comp1.mat3.rfi.n32*comp1.mat3.rfi.ki31+comp1.mat3.rfi.ki32*comp1.mat3.rfi.n31)==0&amp;&amp;comp1.mat3.rfi.n13*comp1.mat3.rfi.n11-comp1.mat3.rfi.ki13*comp1.mat3.rfi.ki11-j*(comp1.mat3.rfi.n13*comp1.mat3.rfi.ki11+comp1.mat3.rfi.ki13*comp1.mat3.rfi.n11)+comp1.mat3.rfi.n23*comp1.mat3.rfi.n21-comp1.mat3.rfi.ki23*comp1.mat3.rfi.ki21-j*(comp1.mat3.rfi.n23*comp1.mat3.rfi.ki21+comp1.mat3.rfi.ki23*comp1.mat3.rfi.n21)+comp1.mat3.rfi.n33*comp1.mat3.rfi.n31-comp1.mat3.rfi.ki33*comp1.mat3.rfi.ki31-j*(comp1.mat3.rfi.n33*comp1.mat3.rfi.ki31+comp1.mat3.rfi.ki33*comp1.mat3.rfi.n31)==0&amp;&amp;comp1.mat3.rfi.n12*comp1.mat3.rfi.n11-comp1.mat3.rfi.ki12*comp1.mat3.rfi.ki11-j*(comp1.mat3.rfi.n12*comp1.mat3.rfi.ki11+comp1.mat3.rfi.ki12*comp1.mat3.rfi.n11)+comp1.mat3.rfi.n22*comp1.mat3.rfi.n21-comp1.mat3.rfi.ki22*comp1.mat3.rfi.ki21-j*(comp1.mat3.rfi.n22*comp1.mat3.rfi.ki21+comp1.mat3.rfi.ki22*comp1.mat3.rfi.n21)+comp1.mat3.rfi.n32*comp1.mat3.rfi.n31-comp1.mat3.rfi.ki32*comp1.mat3.rfi.ki31-j*(comp1.mat3.rfi.n32*comp1.mat3.rfi.ki31+comp1.mat3.rfi.ki32*comp1.mat3.rfi.n31)==0&amp;&amp;comp1.mat3.rfi.n12^2-comp1.mat3.rfi.ki12^2-2*j*comp1.mat3.rfi.n12*comp1.mat3.rfi.ki12+comp1.mat3.rfi.n22^2-comp1.mat3.rfi.ki22^2-2*j*comp1.mat3.rfi.n22*comp1.mat3.rfi.ki22+comp1.mat3.rfi.n32^2-comp1.mat3.rfi.ki32^2-2*j*comp1.mat3.rfi.n32*comp1.mat3.rfi.ki32==comp1.mat3.rfi.n11^2-comp1.mat3.rfi.ki11^2-2*j*comp1.mat3.rfi.n11*comp1.mat3.rfi.ki11+comp1.mat3.rfi.n21^2-comp1.mat3.rfi.ki21^2-2*j*comp1.mat3.rfi.n21*comp1.mat3.rfi.ki21+comp1.mat3.rfi.n31^2-comp1.mat3.rfi.ki31^2-2*j*comp1.mat3.rfi.n31*comp1.mat3.rfi.ki31&amp;&amp;comp1.mat3.rfi.n13*comp1.mat3.rfi.n12-comp1.mat3.rfi.ki13*comp1.mat3.rfi.ki12-j*(comp1.mat3.rfi.n13*comp1.mat3.rfi.ki12+comp1.mat3.rfi.ki13*comp1.mat3.rfi.n12)+comp1.mat3.rfi.n23*comp1.mat3.rfi.n22-comp1.mat3.rfi.ki23*comp1.mat3.rfi.ki22-j*(comp1.mat3.rfi.n23*comp1.mat3.rfi.ki22+comp1.mat3.rfi.ki23*comp1.mat3.rfi.n22)+comp1.mat3.rfi.n33*comp1.mat3.rfi.n32-comp1.mat3.rfi.ki33*comp1.mat3.rfi.ki32-j*(comp1.mat3.rfi.n33*comp1.mat3.rfi.ki32+comp1.mat3.rfi.ki33*comp1.mat3.rfi.n32)==0&amp;&amp;comp1.mat3.rfi.n13*comp1.mat3.rfi.n11-comp1.mat3.rfi.ki13*comp1.mat3.rfi.ki11-j*(comp1.mat3.rfi.n13*comp1.mat3.rfi.ki11+comp1.mat3.rfi.ki13*comp1.mat3.rfi.n11)+comp1.mat3.rfi.n23*comp1.mat3.rfi.n21-comp1.mat3.rfi.ki23*comp1.mat3.rfi.ki21-j*(comp1.mat3.rfi.n23*comp1.mat3.rfi.ki21+comp1.mat3.rfi.ki23*comp1.mat3.rfi.n21)+comp1.mat3.rfi.n33*comp1.mat3.rfi.n31-comp1.mat3.rfi.ki33*comp1.mat3.rfi.ki31-j*(comp1.mat3.rfi.n33*comp1.mat3.rfi.ki31+comp1.mat3.rfi.ki33*comp1.mat3.rfi.n31)==0&amp;&amp;comp1.mat3.rfi.n13*comp1.mat3.rfi.n12-comp1.mat3.rfi.ki13*comp1.mat3.rfi.ki12-j*(comp1.mat3.rfi.n13*comp1.mat3.rfi.ki12+comp1.mat3.rfi.ki13*comp1.mat3.rfi.n12)+comp1.mat3.rfi.n23*comp1.mat3.rfi.n22-comp1.mat3.rfi.ki23*comp1.mat3.rfi.ki22-j*(comp1.mat3.rfi.n23*comp1.mat3.rfi.ki22+comp1.mat3.rfi.ki23*comp1.mat3.rfi.n22)+comp1.mat3.rfi.n33*comp1.mat3.rfi.n32-comp1.mat3.rfi.ki33*comp1.mat3.rfi.ki32-j*(comp1.mat3.rfi.n33*comp1.mat3.rfi.ki32+comp1.mat3.rfi.ki33*comp1.mat3.rfi.n32)==0&amp;&amp;comp1.mat3.rfi.n13^2-comp1.mat3.rfi.ki13^2-2*j*comp1.mat3.rfi.n13*comp1.mat3.rfi.ki13+comp1.mat3.rfi.n23^2-comp1.mat3.rfi.ki23^2-2*j*comp1.mat3.rfi.n23*comp1.mat3.rfi.ki23+comp1.mat3.rfi.n33^2-comp1.mat3.rfi.ki33^2-2*j*comp1.mat3.rfi.n33*comp1.mat3.rfi.ki33==comp1.mat3.rfi.n11^2-comp1.mat3.rfi.ki11^2-2*j*comp1.mat3.rfi.n11*comp1.mat3.rfi.ki11+comp1.mat3.rfi.n21^2-comp1.mat3.rfi.ki21^2-2*j*comp1.mat3.rfi.n21*comp1.mat3.rfi.ki21+comp1.mat3.rfi.n31^2-comp1.mat3.rfi.ki31^2-2*j*comp1.mat3.rfi.n31*comp1.mat3.rfi.ki31,comp1.mat3.rfi.n11^2-comp1.mat3.rfi.ki11^2-2*j*comp1.mat3.rfi.n11*comp1.mat3.rfi.ki11+comp1.mat3.rfi.n21^2-comp1.mat3.rfi.ki21^2-2*j*comp1.mat3.rfi.n21*comp1.mat3.rfi.ki21+comp1.mat3.rfi.n31^2-comp1.mat3.rfi.ki31^2-2*j*comp1.mat3.rfi.n31*comp1.mat3.rfi.ki31,error('$base64:RmFpbGVkIHRvIGV2YWx1YXRlIGFuIGlzb3Ryb3BpYyB2YWx1ZSBvZiBhbiBhbmlzb3Ryb3BpYyB0ZW5zb3IAAAAAAAA='))</str> </arr> <str>material.def.epsilonr_symmetry</str> <arr> <str>79</str> </arr> <str>material.epsilonr11</str> <arr> <str>comp1.mat3.rfi.n11^2-comp1.mat3.rfi.ki11^2-2*j*comp1.mat3.rfi.n11*comp1.mat3.rfi.ki11+comp1.mat3.rfi.n21^2-comp1.mat3.rfi.ki21^2-2*j*comp1.mat3.rfi.n21*comp1.mat3.rfi.ki21+comp1.mat3.rfi.n31^2-comp1.mat3.rfi.ki31^2-2*j*comp1.mat3.rfi.n31*comp1.mat3.rfi.ki31</str> </arr> <str>material.epsilonr21</str> <arr> <str>comp1.mat3.rfi.n11*comp1.mat3.rfi.n12-comp1.mat3.rfi.ki11*comp1.mat3.rfi.ki12-j*(comp1.mat3.rfi.n11*comp1.mat3.rfi.ki12+comp1.mat3.rfi.ki11*comp1.mat3.rfi.n12)+comp1.mat3.rfi.n21*comp1.mat3.rfi.n22-comp1.mat3.rfi.ki21*comp1.mat3.rfi.ki22-j*(comp1.mat3.rfi.n21*comp1.mat3.rfi.ki22+comp1.mat3.rfi.ki21*comp1.mat3.rfi.n22)+comp1.mat3.rfi.n31*comp1.mat3.rfi.n32-comp1.mat3.rfi.ki31*comp1.mat3.rfi.ki32-j*(comp1.mat3.rfi.n31*comp1.mat3.rfi.ki32+comp1.mat3.rfi.ki31*comp1.mat3.rfi.n32)</str> </arr> <str>material.epsilonr31</str> <arr> <str>comp1.mat3.rfi.n11*comp1.mat3.rfi.n13-comp1.mat3.rfi.ki11*comp1.mat3.rfi.ki13-j*(comp1.mat3.rfi.n11*comp1.mat3.rfi.ki13+comp1.mat3.rfi.ki11*comp1.mat3.rfi.n13)+comp1.mat3.rfi.n21*comp1.mat3.rfi.n23-comp1.mat3.rfi.ki21*comp1.mat3.rfi.ki23-j*(comp1.mat3.rfi.n21*comp1.mat3.rfi.ki23+comp1.mat3.rfi.ki21*comp1.mat3.rfi.n23)+comp1.mat3.rfi.n31*comp1.mat3.rfi.n33-comp1.mat3.rfi.ki31*comp1.mat3.rfi.ki33-j*(comp1.mat3.rfi.n31*comp1.mat3.rfi.ki33+comp1.mat3.rfi.ki31*comp1.mat3.rfi.n33)</str> </arr> <str>material.epsilonr12</str> <arr> <str>comp1.mat3.rfi.n12*comp1.mat3.rfi.n11-comp1.mat3.rfi.ki12*comp1.mat3.rfi.ki11-j*(comp1.mat3.rfi.n12*comp1.mat3.rfi.ki11+comp1.mat3.rfi.ki12*comp1.mat3.rfi.n11)+comp1.mat3.rfi.n22*comp1.mat3.rfi.n21-comp1.mat3.rfi.ki22*comp1.mat3.rfi.ki21-j*(comp1.mat3.rfi.n22*comp1.mat3.rfi.ki21+comp1.mat3.rfi.ki22*comp1.mat3.rfi.n21)+comp1.mat3.rfi.n32*comp1.mat3.rfi.n31-comp1.mat3.rfi.ki32*comp1.mat3.rfi.ki31-j*(comp1.mat3.rfi.n32*comp1.mat3.rfi.ki31+comp1.mat3.rfi.ki32*comp1.mat3.rfi.n31)</str> </arr> <str>material.epsilonr22</str> <arr> <str>comp1.mat3.rfi.n12^2-comp1.mat3.rfi.ki12^2-2*j*comp1.mat3.rfi.n12*comp1.mat3.rfi.ki12+comp1.mat3.rfi.n22^2-comp1.mat3.rfi.ki22^2-2*j*comp1.mat3.rfi.n22*comp1.mat3.rfi.ki22+comp1.mat3.rfi.n32^2-comp1.mat3.rfi.ki32^2-2*j*comp1.mat3.rfi.n32*comp1.mat3.rfi.ki32</str> </arr> <str>material.epsilonr32</str> <arr> <str>comp1.mat3.rfi.n12*comp1.mat3.rfi.n13-comp1.mat3.rfi.ki12*comp1.mat3.rfi.ki13-j*(comp1.mat3.rfi.n12*comp1.mat3.rfi.ki13+comp1.mat3.rfi.ki12*comp1.mat3.rfi.n13)+comp1.mat3.rfi.n22*comp1.mat3.rfi.n23-comp1.mat3.rfi.ki22*comp1.mat3.rfi.ki23-j*(comp1.mat3.rfi.n22*comp1.mat3.rfi.ki23+comp1.mat3.rfi.ki22*comp1.mat3.rfi.n23)+comp1.mat3.rfi.n32*comp1.mat3.rfi.n33-comp1.mat3.rfi.ki32*comp1.mat3.rfi.ki33-j*(comp1.mat3.rfi.n32*comp1.mat3.rfi.ki33+comp1.mat3.rfi.ki32*comp1.mat3.rfi.n33)</str> </arr> <str>material.epsilonr13</str> <arr> <str>comp1.mat3.rfi.n13*comp1.mat3.rfi.n11-comp1.mat3.rfi.ki13*comp1.mat3.rfi.ki11-j*(comp1.mat3.rfi.n13*comp1.mat3.rfi.ki11+comp1.mat3.rfi.ki13*comp1.mat3.rfi.n11)+comp1.mat3.rfi.n23*comp1.mat3.rfi.n21-comp1.mat3.rfi.ki23*comp1.mat3.rfi.ki21-j*(comp1.mat3.rfi.n23*comp1.mat3.rfi.ki21+comp1.mat3.rfi.ki23*comp1.mat3.rfi.n21)+comp1.mat3.rfi.n33*comp1.mat3.rfi.n31-comp1.mat3.rfi.ki33*comp1.mat3.rfi.ki31-j*(comp1.mat3.rfi.n33*comp1.mat3.rfi.ki31+comp1.mat3.rfi.ki33*comp1.mat3.rfi.n31)</str> </arr> <str>material.epsilonr23</str> <arr> <str>comp1.mat3.rfi.n13*comp1.mat3.rfi.n12-comp1.mat3.rfi.ki13*comp1.mat3.rfi.ki12-j*(comp1.mat3.rfi.n13*comp1.mat3.rfi.ki12+comp1.mat3.rfi.ki13*comp1.mat3.rfi.n12)+comp1.mat3.rfi.n23*comp1.mat3.rfi.n22-comp1.mat3.rfi.ki23*comp1.mat3.rfi.ki22-j*(comp1.mat3.rfi.n23*comp1.mat3.rfi.ki22+comp1.mat3.rfi.ki23*comp1.mat3.rfi.n22)+comp1.mat3.rfi.n33*comp1.mat3.rfi.n32-comp1.mat3.rfi.ki33*comp1.mat3.rfi.ki32-j*(comp1.mat3.rfi.n33*comp1.mat3.rfi.ki32+comp1.mat3.rfi.ki33*comp1.mat3.rfi.n32)</str> </arr> <str>material.epsilonr33</str> <arr> <str>comp1.mat3.rfi.n13^2-comp1.mat3.rfi.ki13^2-2*j*comp1.mat3.rfi.n13*comp1.mat3.rfi.ki13+comp1.mat3.rfi.n23^2-comp1.mat3.rfi.ki23^2-2*j*comp1.mat3.rfi.n23*comp1.mat3.rfi.ki23+comp1.mat3.rfi.n33^2-comp1.mat3.rfi.ki33^2-2*j*comp1.mat3.rfi.n33*comp1.mat3.rfi.ki33</str> </arr> <str>material.epsilonr_iso</str> <arr> <str>if(comp1.mat3.rfi.n12*comp1.mat3.rfi.n11-comp1.mat3.rfi.ki12*comp1.mat3.rfi.ki11-j*(comp1.mat3.rfi.n12*comp1.mat3.rfi.ki11+comp1.mat3.rfi.ki12*comp1.mat3.rfi.n11)+comp1.mat3.rfi.n22*comp1.mat3.rfi.n21-comp1.mat3.rfi.ki22*comp1.mat3.rfi.ki21-j*(comp1.mat3.rfi.n22*comp1.mat3.rfi.ki21+comp1.mat3.rfi.ki22*comp1.mat3.rfi.n21)+comp1.mat3.rfi.n32*comp1.mat3.rfi.n31-comp1.mat3.rfi.ki32*comp1.mat3.rfi.ki31-j*(comp1.mat3.rfi.n32*comp1.mat3.rfi.ki31+comp1.mat3.rfi.ki32*comp1.mat3.rfi.n31)==0&amp;&amp;comp1.mat3.rfi.n13*comp1.mat3.rfi.n11-comp1.mat3.rfi.ki13*comp1.mat3.rfi.ki11-j*(comp1.mat3.rfi.n13*comp1.mat3.rfi.ki11+comp1.mat3.rfi.ki13*comp1.mat3.rfi.n11)+comp1.mat3.rfi.n23*comp1.mat3.rfi.n21-comp1.mat3.rfi.ki23*comp1.mat3.rfi.ki21-j*(comp1.mat3.rfi.n23*comp1.mat3.rfi.ki21+comp1.mat3.rfi.ki23*comp1.mat3.rfi.n21)+comp1.mat3.rfi.n33*comp1.mat3.rfi.n31-comp1.mat3.rfi.ki33*comp1.mat3.rfi.ki31-j*(comp1.mat3.rfi.n33*comp1.mat3.rfi.ki31+comp1.mat3.rfi.ki33*comp1.mat3.rfi.n31)==0&amp;&amp;comp1.mat3.rfi.n12*comp1.mat3.rfi.n11-comp1.mat3.rfi.ki12*comp1.mat3.rfi.ki11-j*(comp1.mat3.rfi.n12*comp1.mat3.rfi.ki11+comp1.mat3.rfi.ki12*comp1.mat3.rfi.n11)+comp1.mat3.rfi.n22*comp1.mat3.rfi.n21-comp1.mat3.rfi.ki22*comp1.mat3.rfi.ki21-j*(comp1.mat3.rfi.n22*comp1.mat3.rfi.ki21+comp1.mat3.rfi.ki22*comp1.mat3.rfi.n21)+comp1.mat3.rfi.n32*comp1.mat3.rfi.n31-comp1.mat3.rfi.ki32*comp1.mat3.rfi.ki31-j*(comp1.mat3.rfi.n32*comp1.mat3.rfi.ki31+comp1.mat3.rfi.ki32*comp1.mat3.rfi.n31)==0&amp;&amp;comp1.mat3.rfi.n12^2-comp1.mat3.rfi.ki12^2-2*j*comp1.mat3.rfi.n12*comp1.mat3.rfi.ki12+comp1.mat3.rfi.n22^2-comp1.mat3.rfi.ki22^2-2*j*comp1.mat3.rfi.n22*comp1.mat3.rfi.ki22+comp1.mat3.rfi.n32^2-comp1.mat3.rfi.ki32^2-2*j*comp1.mat3.rfi.n32*comp1.mat3.rfi.ki32==comp1.mat3.rfi.n11^2-comp1.mat3.rfi.ki11^2-2*j*comp1.mat3.rfi.n11*comp1.mat3.rfi.ki11+comp1.mat3.rfi.n21^2-comp1.mat3.rfi.ki21^2-2*j*comp1.mat3.rfi.n21*comp1.mat3.rfi.ki21+comp1.mat3.rfi.n31^2-comp1.mat3.rfi.ki31^2-2*j*comp1.mat3.rfi.n31*comp1.mat3.rfi.ki31&amp;&amp;comp1.mat3.rfi.n13*comp1.mat3.rfi.n12-comp1.mat3.rfi.ki13*comp1.mat3.rfi.ki12-j*(comp1.mat3.rfi.n13*comp1.mat3.rfi.ki12+comp1.mat3.rfi.ki13*comp1.mat3.rfi.n12)+comp1.mat3.rfi.n23*comp1.mat3.rfi.n22-comp1.mat3.rfi.ki23*comp1.mat3.rfi.ki22-j*(comp1.mat3.rfi.n23*comp1.mat3.rfi.ki22+comp1.mat3.rfi.ki23*comp1.mat3.rfi.n22)+comp1.mat3.rfi.n33*comp1.mat3.rfi.n32-comp1.mat3.rfi.ki33*comp1.mat3.rfi.ki32-j*(comp1.mat3.rfi.n33*comp1.mat3.rfi.ki32+comp1.mat3.rfi.ki33*comp1.mat3.rfi.n32)==0&amp;&amp;comp1.mat3.rfi.n13*comp1.mat3.rfi.n11-comp1.mat3.rfi.ki13*comp1.mat3.rfi.ki11-j*(comp1.mat3.rfi.n13*comp1.mat3.rfi.ki11+comp1.mat3.rfi.ki13*comp1.mat3.rfi.n11)+comp1.mat3.rfi.n23*comp1.mat3.rfi.n21-comp1.mat3.rfi.ki23*comp1.mat3.rfi.ki21-j*(comp1.mat3.rfi.n23*comp1.mat3.rfi.ki21+comp1.mat3.rfi.ki23*comp1.mat3.rfi.n21)+comp1.mat3.rfi.n33*comp1.mat3.rfi.n31-comp1.mat3.rfi.ki33*comp1.mat3.rfi.ki31-j*(comp1.mat3.rfi.n33*comp1.mat3.rfi.ki31+comp1.mat3.rfi.ki33*comp1.mat3.rfi.n31)==0&amp;&amp;comp1.mat3.rfi.n13*comp1.mat3.rfi.n12-comp1.mat3.rfi.ki13*comp1.mat3.rfi.ki12-j*(comp1.mat3.rfi.n13*comp1.mat3.rfi.ki12+comp1.mat3.rfi.ki13*comp1.mat3.rfi.n12)+comp1.mat3.rfi.n23*comp1.mat3.rfi.n22-comp1.mat3.rfi.ki23*comp1.mat3.rfi.ki22-j*(comp1.mat3.rfi.n23*comp1.mat3.rfi.ki22+comp1.mat3.rfi.ki23*comp1.mat3.rfi.n22)+comp1.mat3.rfi.n33*comp1.mat3.rfi.n32-comp1.mat3.rfi.ki33*comp1.mat3.rfi.ki32-j*(comp1.mat3.rfi.n33*comp1.mat3.rfi.ki32+comp1.mat3.rfi.ki33*comp1.mat3.rfi.n32)==0&amp;&amp;comp1.mat3.rfi.n13^2-comp1.mat3.rfi.ki13^2-2*j*comp1.mat3.rfi.n13*comp1.mat3.rfi.ki13+comp1.mat3.rfi.n23^2-comp1.mat3.rfi.ki23^2-2*j*comp1.mat3.rfi.n23*comp1.mat3.rfi.ki23+comp1.mat3.rfi.n33^2-comp1.mat3.rfi.ki33^2-2*j*comp1.mat3.rfi.n33*comp1.mat3.rfi.ki33==comp1.mat3.rfi.n11^2-comp1.mat3.rfi.ki11^2-2*j*comp1.mat3.rfi.n11*comp1.mat3.rfi.ki11+comp1.mat3.rfi.n21^2-comp1.mat3.rfi.ki21^2-2*j*comp1.mat3.rfi.n21*comp1.mat3.rfi.ki21+comp1.mat3.rfi.n31^2-comp1.mat3.rfi.ki31^2-2*j*comp1.mat3.rfi.n31*comp1.mat3.rfi.ki31,comp1.mat3.rfi.n11^2-comp1.mat3.rfi.ki11^2-2*j*comp1.mat3.rfi.n11*comp1.mat3.rfi.ki11+comp1.mat3.rfi.n21^2-comp1.mat3.rfi.ki21^2-2*j*comp1.mat3.rfi.n21*comp1.mat3.rfi.ki21+comp1.mat3.rfi.n31^2-comp1.mat3.rfi.ki31^2-2*j*comp1.mat3.rfi.n31*comp1.mat3.rfi.ki31,error('$base64:RmFpbGVkIHRvIGV2YWx1YXRlIGFuIGlzb3Ryb3BpYyB2YWx1ZSBvZiBhbiBhbmlzb3Ryb3BpYyB0ZW5zb3IAAAAAAAA='))</str> </arr> <str>material.epsilonr_symmetry</str> <arr> <str>79</str> </arr> <str>material.lstdf.tanDelta</str> <arr> <str>2*comp1.mat1.rfi.n_iso*comp1.mat1.rfi.ki_iso/(comp1.mat1.rfi.n_iso^2-comp1.mat1.rfi.ki_iso^2)</str> </arr> <str>material.lstdf.epsilonPrim11</str> <arr> <str>comp1.mat1.rfi.n_iso^2-comp1.mat1.rfi.ki_iso^2</str> </arr> <str>material.lstdf.epsilonPrim21</str> <arr> <str>0</str> </arr> <str>material.lstdf.epsilonPrim31</str> <arr> <str>0</str> </arr> <str>material.lstdf.epsilonPrim12</str> <arr> <str>0</str> </arr> <str>material.lstdf.epsilonPrim22</str> <arr> <str>comp1.mat1.rfi.n_iso^2-comp1.mat1.rfi.ki_iso^2</str> </arr> <str>material.lstdf.epsilonPrim32</str> <arr> <str>0</str> </arr> <str>material.lstdf.epsilonPrim13</str> <arr> <str>0</str> </arr> <str>material.lstdf.epsilonPrim23</str> <arr> <str>0</str> </arr> <str>material.lstdf.epsilonPrim33</str> <arr> <str>comp1.mat1.rfi.n_iso^2-comp1.mat1.rfi.ki_iso^2</str> </arr> <str>material.lstdf.epsilonPrim_iso</str> <arr> <str>comp1.mat1.rfi.n_iso^2-comp1.mat1.rfi.ki_iso^2</str> </arr> <str>material.lstdf.epsilonPrim_symmetry</str> <arr> <str>79</str> </arr> <str>material.del.epsilonPrim11</str> <arr> <str>comp1.mat3.rfi.n11^2-comp1.mat3.rfi.ki11^2+comp1.mat3.rfi.n21^2-comp1.mat3.rfi.ki21^2+comp1.mat3.rfi.n31^2-comp1.mat3.rfi.ki31^2</str> </arr> <str>material.del.epsilonPrim21</str> <arr> <str>comp1.mat3.rfi.n11*comp1.mat3.rfi.n12-comp1.mat3.rfi.ki11*comp1.mat3.rfi.ki12+comp1.mat3.rfi.n21*comp1.mat3.rfi.n22-comp1.mat3.rfi.ki21*comp1.mat3.rfi.ki22+comp1.mat3.rfi.n31*comp1.mat3.rfi.n32-comp1.mat3.rfi.ki31*comp1.mat3.rfi.ki32</str> </arr> <str>material.del.epsilonPrim31</str> <arr> <str>comp1.mat3.rfi.n11*comp1.mat3.rfi.n13-comp1.mat3.rfi.ki11*comp1.mat3.rfi.ki13+comp1.mat3.rfi.n21*comp1.mat3.rfi.n23-comp1.mat3.rfi.ki21*comp1.mat3.rfi.ki23+comp1.mat3.rfi.n31*comp1.mat3.rfi.n33-comp1.mat3.rfi.ki31*comp1.mat3.rfi.ki33</str> </arr> <str>material.del.epsilonPrim12</str> <arr> <str>comp1.mat3.rfi.n12*comp1.mat3.rfi.n11-comp1.mat3.rfi.ki12*comp1.mat3.rfi.ki11+comp1.mat3.rfi.n22*comp1.mat3.rfi.n21-comp1.mat3.rfi.ki22*comp1.mat3.rfi.ki21+comp1.mat3.rfi.n32*comp1.mat3.rfi.n31-comp1.mat3.rfi.ki32*comp1.mat3.rfi.ki31</str> </arr> <str>material.del.epsilonPrim22</str> <arr> <str>comp1.mat3.rfi.n12^2-comp1.mat3.rfi.ki12^2+comp1.mat3.rfi.n22^2-comp1.mat3.rfi.ki22^2+comp1.mat3.rfi.n32^2-comp1.mat3.rfi.ki32^2</str> </arr> <str>material.del.epsilonPrim32</str> <arr> <str>comp1.mat3.rfi.n12*comp1.mat3.rfi.n13-comp1.mat3.rfi.ki12*comp1.mat3.rfi.ki13+comp1.mat3.rfi.n22*comp1.mat3.rfi.n23-comp1.mat3.rfi.ki22*comp1.mat3.rfi.ki23+comp1.mat3.rfi.n32*comp1.mat3.rfi.n33-comp1.mat3.rfi.ki32*comp1.mat3.rfi.ki33</str> </arr> <str>material.del.epsilonPrim13</str> <arr> <str>comp1.mat3.rfi.n13*comp1.mat3.rfi.n11-comp1.mat3.rfi.ki13*comp1.mat3.rfi.ki11+comp1.mat3.rfi.n23*comp1.mat3.rfi.n21-comp1.mat3.rfi.ki23*comp1.mat3.rfi.ki21+comp1.mat3.rfi.n33*comp1.mat3.rfi.n31-comp1.mat3.rfi.ki33*comp1.mat3.rfi.ki31</str> </arr> <str>material.del.epsilonPrim23</str> <arr> <str>comp1.mat3.rfi.n13*comp1.mat3.rfi.n12-comp1.mat3.rfi.ki13*comp1.mat3.rfi.ki12+comp1.mat3.rfi.n23*comp1.mat3.rfi.n22-comp1.mat3.rfi.ki23*comp1.mat3.rfi.ki22+comp1.mat3.rfi.n33*comp1.mat3.rfi.n32-comp1.mat3.rfi.ki33*comp1.mat3.rfi.ki32</str> </arr> <str>material.del.epsilonPrim33</str> <arr> <str>comp1.mat3.rfi.n13^2-comp1.mat3.rfi.ki13^2+comp1.mat3.rfi.n23^2-comp1.mat3.rfi.ki23^2+comp1.mat3.rfi.n33^2-comp1.mat3.rfi.ki33^2</str> </arr> <str>material.del.epsilonPrim_iso</str> <arr> <str>if(comp1.mat3.rfi.n12*comp1.mat3.rfi.n11-comp1.mat3.rfi.ki12*comp1.mat3.rfi.ki11+comp1.mat3.rfi.n22*comp1.mat3.rfi.n21-comp1.mat3.rfi.ki22*comp1.mat3.rfi.ki21+comp1.mat3.rfi.n32*comp1.mat3.rfi.n31-comp1.mat3.rfi.ki32*comp1.mat3.rfi.ki31==0&amp;&amp;comp1.mat3.rfi.n13*comp1.mat3.rfi.n11-comp1.mat3.rfi.ki13*comp1.mat3.rfi.ki11+comp1.mat3.rfi.n23*comp1.mat3.rfi.n21-comp1.mat3.rfi.ki23*comp1.mat3.rfi.ki21+comp1.mat3.rfi.n33*comp1.mat3.rfi.n31-comp1.mat3.rfi.ki33*comp1.mat3.rfi.ki31==0&amp;&amp;comp1.mat3.rfi.n12*comp1.mat3.rfi.n11-comp1.mat3.rfi.ki12*comp1.mat3.rfi.ki11+comp1.mat3.rfi.n22*comp1.mat3.rfi.n21-comp1.mat3.rfi.ki22*comp1.mat3.rfi.ki21+comp1.mat3.rfi.n32*comp1.mat3.rfi.n31-comp1.mat3.rfi.ki32*comp1.mat3.rfi.ki31==0&amp;&amp;comp1.mat3.rfi.n12^2-comp1.mat3.rfi.ki12^2+comp1.mat3.rfi.n22^2-comp1.mat3.rfi.ki22^2+comp1.mat3.rfi.n32^2-comp1.mat3.rfi.ki32^2==comp1.mat3.rfi.n11^2-comp1.mat3.rfi.ki11^2+comp1.mat3.rfi.n21^2-comp1.mat3.rfi.ki21^2+comp1.mat3.rfi.n31^2-comp1.mat3.rfi.ki31^2&amp;&amp;comp1.mat3.rfi.n13*comp1.mat3.rfi.n12-comp1.mat3.rfi.ki13*comp1.mat3.rfi.ki12+comp1.mat3.rfi.n23*comp1.mat3.rfi.n22-comp1.mat3.rfi.ki23*comp1.mat3.rfi.ki22+comp1.mat3.rfi.n33*comp1.mat3.rfi.n32-comp1.mat3.rfi.ki33*comp1.mat3.rfi.ki32==0&amp;&amp;comp1.mat3.rfi.n13*comp1.mat3.rfi.n11-comp1.mat3.rfi.ki13*comp1.mat3.rfi.ki11+comp1.mat3.rfi.n23*comp1.mat3.rfi.n21-comp1.mat3.rfi.ki23*comp1.mat3.rfi.ki21+comp1.mat3.rfi.n33*comp1.mat3.rfi.n31-comp1.mat3.rfi.ki33*comp1.mat3.rfi.ki31==0&amp;&amp;comp1.mat3.rfi.n13*comp1.mat3.rfi.n12-comp1.mat3.rfi.ki13*comp1.mat3.rfi.ki12+comp1.mat3.rfi.n23*comp1.mat3.rfi.n22-comp1.mat3.rfi.ki23*comp1.mat3.rfi.ki22+comp1.mat3.rfi.n33*comp1.mat3.rfi.n32-comp1.mat3.rfi.ki33*comp1.mat3.rfi.ki32==0&amp;&amp;comp1.mat3.rfi.n13^2-comp1.mat3.rfi.ki13^2+comp1.mat3.rfi.n23^2-comp1.mat3.rfi.ki23^2+comp1.mat3.rfi.n33^2-comp1.mat3.rfi.ki33^2==comp1.mat3.rfi.n11^2-comp1.mat3.rfi.ki11^2+comp1.mat3.rfi.n21^2-comp1.mat3.rfi.ki21^2+comp1.mat3.rfi.n31^2-comp1.mat3.rfi.ki31^2,comp1.mat3.rfi.n11^2-comp1.mat3.rfi.ki11^2+comp1.mat3.rfi.n21^2-comp1.mat3.rfi.ki21^2+comp1.mat3.rfi.n31^2-comp1.mat3.rfi.ki31^2,error('$base64:RmFpbGVkIHRvIGV2YWx1YXRlIGFuIGlzb3Ryb3BpYyB2YWx1ZSBvZiBhbiBhbmlzb3Ryb3BpYyB0ZW5zb3IAAAAAAAA='))</str> </arr> <str>material.del.epsilonPrim_symmetry</str> <arr> <str>79</str> </arr> <str>material.del.epsilonBis11</str> <arr> <str>2*(comp1.mat3.rfi.n11*comp1.mat3.rfi.ki11+comp1.mat3.rfi.n21*comp1.mat3.rfi.ki21+comp1.mat3.rfi.n31*comp1.mat3.rfi.ki31)</str> </arr> <str>material.del.epsilonBis21</str> <arr> <str>comp1.mat3.rfi.n11*comp1.mat3.rfi.ki12+comp1.mat3.rfi.ki11*comp1.mat3.rfi.n12+comp1.mat3.rfi.n21*comp1.mat3.rfi.ki22+comp1.mat3.rfi.ki21*comp1.mat3.rfi.n22+comp1.mat3.rfi.n31*comp1.mat3.rfi.ki32+comp1.mat3.rfi.ki31*comp1.mat3.rfi.n32</str> </arr> <str>material.del.epsilonBis31</str> <arr> <str>comp1.mat3.rfi.n11*comp1.mat3.rfi.ki13+comp1.mat3.rfi.ki11*comp1.mat3.rfi.n13+comp1.mat3.rfi.n21*comp1.mat3.rfi.ki23+comp1.mat3.rfi.ki21*comp1.mat3.rfi.n23+comp1.mat3.rfi.n31*comp1.mat3.rfi.ki33+comp1.mat3.rfi.ki31*comp1.mat3.rfi.n33</str> </arr> <str>material.del.epsilonBis12</str> <arr> <str>comp1.mat3.rfi.n12*comp1.mat3.rfi.ki11+comp1.mat3.rfi.ki12*comp1.mat3.rfi.n11+comp1.mat3.rfi.n22*comp1.mat3.rfi.ki21+comp1.mat3.rfi.ki22*comp1.mat3.rfi.n21+comp1.mat3.rfi.n32*comp1.mat3.rfi.ki31+comp1.mat3.rfi.ki32*comp1.mat3.rfi.n31</str> </arr> <str>material.del.epsilonBis22</str> <arr> <str>2*(comp1.mat3.rfi.n12*comp1.mat3.rfi.ki12+comp1.mat3.rfi.n22*comp1.mat3.rfi.ki22+comp1.mat3.rfi.n32*comp1.mat3.rfi.ki32)</str> </arr> <str>material.del.epsilonBis32</str> <arr> <str>comp1.mat3.rfi.n12*comp1.mat3.rfi.ki13+comp1.mat3.rfi.ki12*comp1.mat3.rfi.n13+comp1.mat3.rfi.n22*comp1.mat3.rfi.ki23+comp1.mat3.rfi.ki22*comp1.mat3.rfi.n23+comp1.mat3.rfi.n32*comp1.mat3.rfi.ki33+comp1.mat3.rfi.ki32*comp1.mat3.rfi.n33</str> </arr> <str>material.del.epsilonBis13</str> <arr> <str>comp1.mat3.rfi.n13*comp1.mat3.rfi.ki11+comp1.mat3.rfi.ki13*comp1.mat3.rfi.n11+comp1.mat3.rfi.n23*comp1.mat3.rfi.ki21+comp1.mat3.rfi.ki23*comp1.mat3.rfi.n21+comp1.mat3.rfi.n33*comp1.mat3.rfi.ki31+comp1.mat3.rfi.ki33*comp1.mat3.rfi.n31</str> </arr> <str>material.del.epsilonBis23</str> <arr> <str>comp1.mat3.rfi.n13*comp1.mat3.rfi.ki12+comp1.mat3.rfi.ki13*comp1.mat3.rfi.n12+comp1.mat3.rfi.n23*comp1.mat3.rfi.ki22+comp1.mat3.rfi.ki23*comp1.mat3.rfi.n22+comp1.mat3.rfi.n33*comp1.mat3.rfi.ki32+comp1.mat3.rfi.ki33*comp1.mat3.rfi.n32</str> </arr> <str>material.del.epsilonBis33</str> <arr> <str>2*(comp1.mat3.rfi.n13*comp1.mat3.rfi.ki13+comp1.mat3.rfi.n23*comp1.mat3.rfi.ki23+comp1.mat3.rfi.n33*comp1.mat3.rfi.ki33)</str> </arr> <str>material.del.epsilonBis_iso</str> <arr> <str>if(comp1.mat3.rfi.n12*comp1.mat3.rfi.ki11+comp1.mat3.rfi.ki12*comp1.mat3.rfi.n11+comp1.mat3.rfi.n22*comp1.mat3.rfi.ki21+comp1.mat3.rfi.ki22*comp1.mat3.rfi.n21+comp1.mat3.rfi.n32*comp1.mat3.rfi.ki31+comp1.mat3.rfi.ki32*comp1.mat3.rfi.n31==0&amp;&amp;comp1.mat3.rfi.n13*comp1.mat3.rfi.ki11+comp1.mat3.rfi.ki13*comp1.mat3.rfi.n11+comp1.mat3.rfi.n23*comp1.mat3.rfi.ki21+comp1.mat3.rfi.ki23*comp1.mat3.rfi.n21+comp1.mat3.rfi.n33*comp1.mat3.rfi.ki31+comp1.mat3.rfi.ki33*comp1.mat3.rfi.n31==0&amp;&amp;comp1.mat3.rfi.n12*comp1.mat3.rfi.ki11+comp1.mat3.rfi.ki12*comp1.mat3.rfi.n11+comp1.mat3.rfi.n22*comp1.mat3.rfi.ki21+comp1.mat3.rfi.ki22*comp1.mat3.rfi.n21+comp1.mat3.rfi.n32*comp1.mat3.rfi.ki31+comp1.mat3.rfi.ki32*comp1.mat3.rfi.n31==0&amp;&amp;2*(comp1.mat3.rfi.n12*comp1.mat3.rfi.ki12+comp1.mat3.rfi.n22*comp1.mat3.rfi.ki22+comp1.mat3.rfi.n32*comp1.mat3.rfi.ki32)==2*(comp1.mat3.rfi.n11*comp1.mat3.rfi.ki11+comp1.mat3.rfi.n21*comp1.mat3.rfi.ki21+comp1.mat3.rfi.n31*comp1.mat3.rfi.ki31)&amp;&amp;comp1.mat3.rfi.n13*comp1.mat3.rfi.ki12+comp1.mat3.rfi.ki13*comp1.mat3.rfi.n12+comp1.mat3.rfi.n23*comp1.mat3.rfi.ki22+comp1.mat3.rfi.ki23*comp1.mat3.rfi.n22+comp1.mat3.rfi.n33*comp1.mat3.rfi.ki32+comp1.mat3.rfi.ki33*comp1.mat3.rfi.n32==0&amp;&amp;comp1.mat3.rfi.n13*comp1.mat3.rfi.ki11+comp1.mat3.rfi.ki13*comp1.mat3.rfi.n11+comp1.mat3.rfi.n23*comp1.mat3.rfi.ki21+comp1.mat3.rfi.ki23*comp1.mat3.rfi.n21+comp1.mat3.rfi.n33*comp1.mat3.rfi.ki31+comp1.mat3.rfi.ki33*comp1.mat3.rfi.n31==0&amp;&amp;comp1.mat3.rfi.n13*comp1.mat3.rfi.ki12+comp1.mat3.rfi.ki13*comp1.mat3.rfi.n12+comp1.mat3.rfi.n23*comp1.mat3.rfi.ki22+comp1.mat3.rfi.ki23*comp1.mat3.rfi.n22+comp1.mat3.rfi.n33*comp1.mat3.rfi.ki32+comp1.mat3.rfi.ki33*comp1.mat3.rfi.n32==0&amp;&amp;2*(comp1.mat3.rfi.n13*comp1.mat3.rfi.ki13+comp1.mat3.rfi.n23*comp1.mat3.rfi.ki23+comp1.mat3.rfi.n33*comp1.mat3.rfi.ki33)==2*(comp1.mat3.rfi.n11*comp1.mat3.rfi.ki11+comp1.mat3.rfi.n21*comp1.mat3.rfi.ki21+comp1.mat3.rfi.n31*comp1.mat3.rfi.ki31),2*(comp1.mat3.rfi.n11*comp1.mat3.rfi.ki11+comp1.mat3.rfi.n21*comp1.mat3.rfi.ki21+comp1.mat3.rfi.n31*comp1.mat3.rfi.ki31),error('$base64:RmFpbGVkIHRvIGV2YWx1YXRlIGFuIGlzb3Ryb3BpYyB2YWx1ZSBvZiBhbiBhbmlzb3Ryb3BpYyB0ZW5zb3IAAAAAAAA='))</str> </arr> <str>material.del.epsilonBis_symmetry</str> <arr> <str>79</str> </arr> </arr> <str>ind</str> <arr> <arr> <str>3</str> </arr> </arr> </rec> </arr> </arr> <str>protected</str> <str>false</str> </rec> }<?xml version="1.0" encoding="UTF-8"?> <rec> <str>elem</str> <str>elvar</str> <str>g</str> <arr> <str>1</str> </arr> <str>geomdim</str> <arr> <arr> <arr> </arr> <arr> </arr> <rec> <str>var</str> <arr> <str>material.domain</str> <arr> <str>0</str> </arr> </arr> <str>ind</str> <arr> <arr> <str>1</str> </arr> </arr> </rec> </arr> </arr> <str>protected</str> <str>false</str> </rec> }<?xml version="1.0" encoding="UTF-8"?> <rec> <str>elem</str> <str>elvar</str> <str>g</str> <arr> <str>1</str> </arr> <str>geomdim</str> <arr> <arr> <arr> </arr> <arr> </arr> <rec> <str>var</str> <arr> <str>material.domain</str> <arr> <str>1</str> </arr> </arr> <str>ind</str> <arr> <arr> <str>2</str> </arr> </arr> </rec> </arr> </arr> <str>protected</str> <str>false</str> </rec> }<?xml version="1.0" encoding="UTF-8"?> <rec> <str>elem</str> <str>elvar</str> <str>g</str> <arr> <str>1</str> </arr> <str>geomdim</str> <arr> <arr> <arr> </arr> <arr> </arr> <rec> <str>var</str> <arr> <str>material.domain</str> <arr> <str>2</str> </arr> </arr> <str>ind</str> <arr> <arr> <str>3</str> </arr> </arr> </rec> </arr> </arr> <str>protected</str> <str>false</str> </rec> '<?xml version="1.0" encoding="UTF-8"?> <rec> <str>elem</str> <str>elscalarop</str> <str>opname</str> <str>comp1.gop.gopop1</str> <str>method</str> <str>integration</str> <str>intorder</str> <str>0</str> <str>frame</str> <str>material</str> <str>axisym</str> <str>off</str> <str>cond</str> <str>particleexists</str> <str>dynamicsubset</str> <str>off</str> <str>output</str> <str>standard</str> <str>g</str> <arr> <str>2</str> </arr> <str>geomdim</str> <arr> <arr> <rec> <str>ind</str> <arr> <arr> <str>1</str> </arr> </arr> </rec> </arr> </arr> </rec> +<?xml version="1.0" encoding="UTF-8"?> <rec> <str>elem</str> <str>elscalarop</str> <str>opname</str> <str>comp1.gop.gopmaxop1</str> <str>method</str> <str>integration</str> <str>axisym</str> <str>off</str> <str>intorder</str> <str>0</str> <str>frame</str> <str>$NO$FRAME$</str> <str>cond</str> <str>particleexists</str> <str>dynamicsubset</str> <str>off</str> <str>output</str> <str>maximum</str> <str>g</str> <arr> <str>2</str> </arr> <str>geomdim</str> <arr> <arr> <rec> <str>ind</str> <arr> <arr> <str>1</str> </arr> </arr> </rec> </arr> </arr> </rec> +<?xml version="1.0" encoding="UTF-8"?> <rec> <str>elem</str> <str>elscalarop</str> <str>opname</str> <str>comp1.gop.gopminop1</str> <str>method</str> <str>integration</str> <str>axisym</str> <str>off</str> <str>intorder</str> <str>0</str> <str>frame</str> <str>$NO$FRAME$</str> <str>cond</str> <str>particleexists</str> <str>dynamicsubset</str> <str>off</str> <str>output</str> <str>minimum</str> <str>g</str> <arr> <str>2</str> </arr> <str>geomdim</str> <arr> <arr> <rec> <str>ind</str> <arr> <arr> <str>1</str> </arr> </arr> </rec> </arr> </arr> </rec> )<?xml version="1.0" encoding="UTF-8"?> <rec> <str>elem</str> <str>elscalarop</str> <str>opname</str> <str>comp1.gop.gopaveop1</str> <str>method</str> <str>integration</str> <str>intorder</str> <str>0</str> <str>frame</str> <str>material</str> <str>axisym</str> <str>off</str> <str>cond</str> <str>particleexists</str> <str>dynamicsubset</str> <str>off</str> <str>output</str> <str>average</str> <str>g</str> <arr> <str>2</str> </arr> <str>geomdim</str> <arr> <arr> <rec> <str>ind</str> <arr> <arr> <str>1</str> </arr> </arr> </rec> </arr> </arr> </rec> <?xml version="1.0" encoding="UTF-8"?> <rec> <str>elem</str> <str>elscalarop</str> <str>opname</str> <str>comp1.gop.gopop_all1</str> <str>method</str> <str>integration</str> <str>intorder</str> <str>0</str> <str>frame</str> <str>material</str> <str>axisym</str> <str>off</str> <str>cond</str> <str></str> <str>dynamicsubset</str> <str>off</str> <str>output</str> <str>standard</str> <str>g</str> <arr> <str>2</str> </arr> <str>geomdim</str> <arr> <arr> <rec> <str>ind</str> <arr> <arr> <str>1</str> </arr> </arr> </rec> </arr> </arr> </rec> !<?xml version="1.0" encoding="UTF-8"?> <rec> <str>elem</str> <str>elscalarop</str> <str>opname</str> <str>comp1.gop.gopmaxop_all1</str> <str>method</str> <str>integration</str> <str>axisym</str> <str>off</str> <str>intorder</str> <str>0</str> <str>frame</str> <str>$NO$FRAME$</str> <str>cond</str> <str></str> <str>dynamicsubset</str> <str>off</str> <str>output</str> <str>maximum</str> <str>g</str> <arr> <str>2</str> </arr> <str>geomdim</str> <arr> <arr> <rec> <str>ind</str> <arr> <arr> <str>1</str> </arr> </arr> </rec> </arr> </arr> </rec> !<?xml version="1.0" encoding="UTF-8"?> <rec> <str>elem</str> <str>elscalarop</str> <str>opname</str> <str>comp1.gop.gopminop_all1</str> <str>method</str> <str>integration</str> <str>axisym</str> <str>off</str> <str>intorder</str> <str>0</str> <str>frame</str> <str>$NO$FRAME$</str> <str>cond</str> <str></str> <str>dynamicsubset</str> <str>off</str> <str>output</str> <str>minimum</str> <str>g</str> <arr> <str>2</str> </arr> <str>geomdim</str> <arr> <arr> <rec> <str>ind</str> <arr> <arr> <str>1</str> </arr> </arr> </rec> </arr> </arr> </rec> <?xml version="1.0" encoding="UTF-8"?> <rec> <str>elem</str> <str>elscalarop</str> <str>opname</str> <str>comp1.gop.gopaveop_all1</str> <str>method</str> <str>integration</str> <str>intorder</str> <str>0</str> <str>frame</str> <str>material</str> <str>axisym</str> <str>off</str> <str>cond</str> <str></str> <str>dynamicsubset</str> <str>off</str> <str>output</str> <str>average</str> <str>g</str> <arr> <str>2</str> </arr> <str>geomdim</str> <arr> <arr> <rec> <str>ind</str> <arr> <arr> <str>1</str> </arr> </arr> </rec> </arr> </arr> </rec> $<?xml version="1.0" encoding="UTF-8"?> <rec> <str>elem</str> <str>elscalarop</str> <str>opname</str> <str>comp1.gop.sum</str> <str>method</str> <str>integration</str> <str>intorder</str> <str>0</str> <str>frame</str> <str>material</str> <str>axisym</str> <str>off</str> <str>cond</str> <str>particleexists</str> <str>dynamicsubset</str> <str>off</str> <str>output</str> <str>standard</str> <str>g</str> <arr> <str>2</str> </arr> <str>geomdim</str> <arr> <arr> <rec> <str>ind</str> <arr> <arr> <str>1</str> </arr> </arr> </rec> </arr> </arr> </rec> %<?xml version="1.0" encoding="UTF-8"?> <rec> <str>elem</str> <str>elscalarop</str> <str>opname</str> <str>comp1.gop.max</str> <str>method</str> <str>integration</str> <str>axisym</str> <str>off</str> <str>intorder</str> <str>0</str> <str>frame</str> <str>$NO$FRAME$</str> <str>cond</str> <str>particleexists</str> <str>dynamicsubset</str> <str>off</str> <str>output</str> <str>maximum</str> <str>g</str> <arr> <str>2</str> </arr> <str>geomdim</str> <arr> <arr> <rec> <str>ind</str> <arr> <arr> <str>1</str> </arr> </arr> </rec> </arr> </arr> </rec> %<?xml version="1.0" encoding="UTF-8"?> <rec> <str>elem</str> <str>elscalarop</str> <str>opname</str> <str>comp1.gop.min</str> <str>method</str> <str>integration</str> <str>axisym</str> <str>off</str> <str>intorder</str> <str>0</str> <str>frame</str> <str>$NO$FRAME$</str> <str>cond</str> <str>particleexists</str> <str>dynamicsubset</str> <str>off</str> <str>output</str> <str>minimum</str> <str>g</str> <arr> <str>2</str> </arr> <str>geomdim</str> <arr> <arr> <rec> <str>ind</str> <arr> <arr> <str>1</str> </arr> </arr> </rec> </arr> </arr> </rec> #<?xml version="1.0" encoding="UTF-8"?> <rec> <str>elem</str> <str>elscalarop</str> <str>opname</str> <str>comp1.gop.ave</str> <str>method</str> <str>integration</str> <str>intorder</str> <str>0</str> <str>frame</str> <str>material</str> <str>axisym</str> <str>off</str> <str>cond</str> <str>particleexists</str> <str>dynamicsubset</str> <str>off</str> <str>output</str> <str>average</str> <str>g</str> <arr> <str>2</str> </arr> <str>geomdim</str> <arr> <arr> <rec> <str>ind</str> <arr> <arr> <str>1</str> </arr> </arr> </rec> </arr> </arr> </rec> <?xml version="1.0" encoding="UTF-8"?> <rec> <str>elem</str> <str>elscalarop</str> <str>opname</str> <str>comp1.gop.sum_all</str> <str>method</str> <str>integration</str> <str>intorder</str> <str>0</str> <str>frame</str> <str>material</str> <str>axisym</str> <str>off</str> <str>cond</str> <str></str> <str>dynamicsubset</str> <str>off</str> <str>output</str> <str>standard</str> <str>g</str> <arr> <str>2</str> </arr> <str>geomdim</str> <arr> <arr> <rec> <str>ind</str> <arr> <arr> <str>1</str> </arr> </arr> </rec> </arr> </arr> </rec> <?xml version="1.0" encoding="UTF-8"?> <rec> <str>elem</str> <str>elscalarop</str> <str>opname</str> <str>comp1.gop.max_all</str> <str>method</str> <str>integration</str> <str>axisym</str> <str>off</str> <str>intorder</str> <str>0</str> <str>frame</str> <str>$NO$FRAME$</str> <str>cond</str> <str></str> <str>dynamicsubset</str> <str>off</str> <str>output</str> <str>maximum</str> <str>g</str> <arr> <str>2</str> </arr> <str>geomdim</str> <arr> <arr> <rec> <str>ind</str> <arr> <arr> <str>1</str> </arr> </arr> </rec> </arr> </arr> </rec> <?xml version="1.0" encoding="UTF-8"?> <rec> <str>elem</str> <str>elscalarop</str> <str>opname</str> <str>comp1.gop.min_all</str> <str>method</str> <str>integration</str> <str>axisym</str> <str>off</str> <str>intorder</str> <str>0</str> <str>frame</str> <str>$NO$FRAME$</str> <str>cond</str> <str></str> <str>dynamicsubset</str> <str>off</str> <str>output</str> <str>minimum</str> <str>g</str> <arr> <str>2</str> </arr> <str>geomdim</str> <arr> <arr> <rec> <str>ind</str> <arr> <arr> <str>1</str> </arr> </arr> </rec> </arr> </arr> </rec> <?xml version="1.0" encoding="UTF-8"?> <rec> <str>elem</str> <str>elscalarop</str> <str>opname</str> <str>comp1.gop.ave_all</str> <str>method</str> <str>integration</str> <str>intorder</str> <str>0</str> <str>frame</str> <str>material</str> <str>axisym</str> <str>off</str> <str>cond</str> <str></str> <str>dynamicsubset</str> <str>off</str> <str>output</str> <str>average</str> <str>g</str> <arr> <str>2</str> </arr> <str>geomdim</str> <arr> <arr> <rec> <str>ind</str> <arr> <arr> <str>1</str> </arr> </arr> </rec> </arr> </arr> </rec> <?xml version="1.0" encoding="UTF-8"?> <rec> <str>elem</str> <str>elmesh</str> <str>g</str> <arr> <str>0</str> </arr> <str>frame</str> <str>material</str> <str>geomdim</str> <arr> <arr> <rec> <str>qualname</str> <arr> <str>qualskewness</str> <str>qualmaxangle</str> <str>qual</str> <str>qualvollength</str> <str>qualcondition</str> <str>qualgrowth</str> <str>qualcurvedskewness</str> </arr> <str>sizename</str> <arr> <str>h</str> </arr> <str>sizeinscribedname</str> <arr> <str>hinscribed</str> </arr> <str>dvolname</str> <arr> <str>dvol0</str> </arr> <str>emetric2name</str> <arr> </arr> <str>tremetricname</str> <arr> </arr> <str>emetricinvname</str> <arr> </arr> <str>meshvolname</str> <arr> </arr> <str>detjacname</str> <arr> </arr> <str>reldetjacname</str> <arr> </arr> <str>reldetjacminname</str> <arr> </arr> <str>meshtypename</str> <arr> </arr> <str>meshelemname</str> <arr> </arr> <str>sshape</str> <arr> <arr> <str>vtx</str> <rec> <str>type</str> <str>fixed</str> <str>sorder</str> <str>1</str> </rec> <str>lvtx</str> <rec> <str>type</str> <str>fixed</str> <str>sorder</str> <str>1</str> </rec> </arr> </arr> <str>ind</str> <arr> <arr> <str>1</str> </arr> </arr> </rec> </arr> </arr> </rec> <?xml version="1.0" encoding="UTF-8"?> <rec> <str>elem</str> <str>elglobal</str> <str>numberofdofsname</str> <str>numberofdofs</str> <str>istimesteppingname</str> <str>istimestepping</str> </rec> <?xml version="1.0" encoding="UTF-8"?> <rec> <str>elem</str> <str>elmesh</str> <str>g</str> <arr> <str>1</str> </arr> <str>frame</str> <str>material</str> <str>geomdim</str> <arr> <arr> <rec> <str>qualname</str> <arr> <str>qualskewness</str> <str>qualmaxangle</str> <str>qual</str> <str>qualvollength</str> <str>qualcondition</str> <str>qualgrowth</str> <str>qualcurvedskewness</str> </arr> <str>sizename</str> <arr> <str>h</str> </arr> <str>sizeinscribedname</str> <arr> <str>hinscribed</str> </arr> <str>dvolname</str> <arr> <str>dvol</str> </arr> <str>emetric2name</str> <arr> <str>emetric2</str> </arr> <str>tremetricname</str> <arr> <str>tremetric</str> </arr> <str>emetricinvname</str> <arr> <str>emetricinv</str> </arr> <str>meshvolname</str> <arr> <str>meshvol</str> </arr> <str>detjacname</str> <arr> <str>detjac</str> </arr> <str>reldetjacname</str> <arr> <str>reldetjac</str> </arr> <str>reldetjacminname</str> <arr> <str>reldetjacmin</str> </arr> <str>meshtypename</str> <arr> <str>meshtype</str> </arr> <str>meshelemname</str> <arr> <str>meshelement</str> </arr> <str>sshape</str> <arr> <arr> <str>vtx</str> <rec> <str>type</str> <str>fixed_ref</str> <str>sorder</str> <str>0</str> <str>sdimdofs</str> <arr> <str>X</str> <str>Y</str> </arr> <str>refframe</str> <str>geometry</str> </rec> <str>lvtx</str> <rec> <str>type</str> <str>fixed_ref</str> <str>sorder</str> <str>0</str> <str>sdimdofs</str> <arr> <str>X</str> <str>Y</str> </arr> <str>refframe</str> <str>geometry</str> </rec> </arr> </arr> <str>ind</str> <arr> <arr> <str>1</str> <str>2</str> <str>3</str> <str>4</str> <str>5</str> <str>6</str> <str>7</str> <str>8</str> </arr> </arr> </rec> <rec> <str>qualname</str> <arr> <str>qualskewness</str> <str>qualmaxangle</str> <str>qual</str> <str>qualvollength</str> <str>qualcondition</str> <str>qualgrowth</str> <str>qualcurvedskewness</str> </arr> <str>sizename</str> <arr> <str>h</str> </arr> <str>sizeinscribedname</str> <arr> <str>hinscribed</str> </arr> <str>dvolname</str> <arr> <str>dvol</str> </arr> <str>emetric2name</str> <arr> <str>emetric2</str> </arr> <str>tremetricname</str> <arr> <str>tremetric</str> </arr> <str>emetricinvname</str> <arr> <str>emetricinv</str> </arr> <str>meshvolname</str> <arr> <str>meshvol</str> </arr> <str>detjacname</str> <arr> <str>detjac</str> </arr> <str>reldetjacname</str> <arr> <str>reldetjac</str> </arr> <str>reldetjacminname</str> <arr> <str>reldetjacmin</str> </arr> <str>meshtypename</str> <arr> <str>meshtype</str> </arr> <str>meshelemname</str> <arr> <str>meshelement</str> </arr> <str>sshape</str> <arr> <arr> <str>edg</str> <rec> <str>type</str> <str>fixed_ref</str> <str>sorder</str> <str>0</str> <str>sdimdofs</str> <arr> <str>X</str> <str>Y</str> </arr> <str>refframe</str> <str>geometry</str> </rec> <str>ledg</str> <rec> <str>type</str> <str>fixed_ref</str> <str>sorder</str> <str>0</str> <str>sdimdofs</str> <arr> <str>X</str> <str>Y</str> </arr> <str>refframe</str> <str>geometry</str> </rec> <str>edg2</str> <rec> <str>type</str> <str>fixed_ref</str> <str>sorder</str> <str>0</str> <str>sdimdofs</str> <arr> <str>X</str> <str>Y</str> </arr> <str>refframe</str> <str>geometry</str> </rec> </arr> </arr> <str>ind</str> <arr> <arr> <str>1</str> <str>2</str> <str>3</str> <str>4</str> <str>5</str> <str>6</str> <str>7</str> <str>8</str> <str>9</str> <str>10</str> </arr> </arr> </rec> <rec> <str>qualname</str> <arr> <str>qualskewness</str> <str>qualmaxangle</str> <str>qual</str> <str>qualvollength</str> <str>qualcondition</str> <str>qualgrowth</str> <str>qualcurvedskewness</str> </arr> <str>sizename</str> <arr> <str>h</str> </arr> <str>sizeinscribedname</str> <arr> <str>hinscribed</str> </arr> <str>dvolname</str> <arr> <str>dvol</str> </arr> <str>emetric2name</str> <arr> <str>emetric2</str> </arr> <str>tremetricname</str> <arr> <str>tremetric</str> </arr> <str>emetricinvname</str> <arr> <str>emetricinv</str> </arr> <str>meshvolname</str> <arr> <str>meshvol</str> </arr> <str>detjacname</str> <arr> <str>detjac</str> </arr> <str>reldetjacname</str> <arr> <str>reldetjac</str> </arr> <str>reldetjacminname</str> <arr> <str>reldetjacmin</str> </arr> <str>meshtypename</str> <arr> <str>meshtype</str> </arr> <str>meshelemname</str> <arr> <str>meshelement</str> </arr> <str>sshape</str> <arr> <arr> <str>tri</str> <rec> <str>type</str> <str>fixed_ref</str> <str>sorder</str> <str>0</str> <str>sdimdofs</str> <arr> <str>X</str> <str>Y</str> </arr> <str>refframe</str> <str>geometry</str> </rec> <str>quad</str> <rec> <str>type</str> <str>fixed_ref</str> <str>sorder</str> <str>0</str> <str>sdimdofs</str> <arr> <str>X</str> <str>Y</str> </arr> <str>refframe</str> <str>geometry</str> </rec> <str>ltri</str> <rec> <str>type</str> <str>fixed_ref</str> <str>sorder</str> <str>0</str> <str>sdimdofs</str> <arr> <str>X</str> <str>Y</str> </arr> <str>refframe</str> <str>geometry</str> </rec> <str>lquad</str> <rec> <str>type</str> <str>fixed_ref</str> <str>sorder</str> <str>0</str> <str>sdimdofs</str> <arr> <str>X</str> <str>Y</str> </arr> <str>refframe</str> <str>geometry</str> </rec> <str>tri2</str> <rec> <str>type</str> <str>fixed_ref</str> <str>sorder</str> <str>0</str> <str>sdimdofs</str> <arr> <str>X</str> <str>Y</str> </arr> <str>refframe</str> <str>geometry</str> </rec> <str>quad2</str> <rec> <str>type</str> <str>fixed_ref</str> <str>sorder</str> <str>0</str> <str>sdimdofs</str> <arr> <str>X</str> <str>Y</str> </arr> <str>refframe</str> <str>geometry</str> </rec> </arr> </arr> <str>ind</str> <arr> <arr> <str>1</str> <str>2</str> <str>3</str> </arr> </arr> </rec> </arr> </arr> <str>equivmeshframe</str> <str>on</str> </rec> Y<?xml version="1.0" encoding="UTF-8"?> <rec> <str>elem</str> <str>elvar</str> <str>g</str> <arr> <str>1</str> </arr> <str>geomdim</str> <arr> <arr> <arr> </arr> <rec> <str>ind</str> <arr> <arr> <str>1</str> <str>2</str> <str>3</str> <str>4</str> <str>5</str> <str>6</str> <str>7</str> <str>8</str> <str>9</str> <str>10</str> </arr> </arr> <str>var</str> <arr> <str>nXc</str> <str>nXgc</str> <str>nXcTX</str> <str>nXgcTXg</str> <str>nXcTY</str> <str>nXgcTYg</str> <str>nYc</str> <str>nYgc</str> <str>nYcTX</str> <str>nYgcTXg</str> <str>nYcTY</str> <str>nYgcTYg</str> </arr> </rec> </arr> </arr> </rec> <?xml version="1.0" encoding="UTF-8"?> <rec> <str>elem</str> <str>elmesh</str> <str>g</str> <arr> <str>1</str> </arr> <str>frame</str> <str>spatial</str> <str>geomdim</str> <arr> <arr> <rec> <str>qualname</str> <arr> <str>qualskewness_spatial</str> <str>qualmaxangle_spatial</str> <str>qual_spatial</str> <str>qualvollength_spatial</str> <str>qualcondition_spatial</str> <str>qualgrowth_spatial</str> <str>qualcurvedskewness_spatial</str> </arr> <str>sizename</str> <arr> <str>h_spatial</str> </arr> <str>sizeinscribedname</str> <arr> <str>hinscribed_spatial</str> </arr> <str>dvolname</str> <arr> <str>dvol_spatial</str> </arr> <str>emetric2name</str> <arr> <str>emetric2_spatial</str> </arr> <str>tremetricname</str> <arr> <str>tremetric_spatial</str> </arr> <str>emetricinvname</str> <arr> <str>emetricinv</str> </arr> <str>meshvolname</str> <arr> <str>meshvol_spatial</str> </arr> <str>detjacname</str> <arr> <str>detjac_spatial</str> </arr> <str>reldetjacname</str> <arr> <str>reldetjac_spatial</str> </arr> <str>reldetjacminname</str> <arr> <str>reldetjacmin_spatial</str> </arr> <str>meshtypename</str> <arr> <str>meshtype_spatial</str> </arr> <str>meshelemname</str> <arr> <str>meshelement_spatial</str> </arr> <str>sshape</str> <arr> <arr> <str>vtx</str> <rec> <str>type</str> <str>fixed_ref</str> <str>sorder</str> <str>0</str> <str>sdimdofs</str> <arr> <str>x</str> <str>y</str> </arr> <str>refframe</str> <str>material</str> </rec> <str>lvtx</str> <rec> <str>type</str> <str>fixed_ref</str> <str>sorder</str> <str>0</str> <str>sdimdofs</str> <arr> <str>x</str> <str>y</str> </arr> <str>refframe</str> <str>material</str> </rec> </arr> </arr> <str>ind</str> <arr> <arr> <str>1</str> <str>2</str> <str>3</str> <str>4</str> <str>5</str> <str>6</str> <str>7</str> <str>8</str> </arr> </arr> </rec> <rec> <str>qualname</str> <arr> <str>qualskewness_spatial</str> <str>qualmaxangle_spatial</str> <str>qual_spatial</str> <str>qualvollength_spatial</str> <str>qualcondition_spatial</str> <str>qualgrowth_spatial</str> <str>qualcurvedskewness_spatial</str> </arr> <str>sizename</str> <arr> <str>h_spatial</str> </arr> <str>sizeinscribedname</str> <arr> <str>hinscribed_spatial</str> </arr> <str>dvolname</str> <arr> <str>dvol_spatial</str> </arr> <str>emetric2name</str> <arr> <str>emetric2_spatial</str> </arr> <str>tremetricname</str> <arr> <str>tremetric_spatial</str> </arr> <str>emetricinvname</str> <arr> <str>emetricinv</str> </arr> <str>meshvolname</str> <arr> <str>meshvol_spatial</str> </arr> <str>detjacname</str> <arr> <str>detjac_spatial</str> </arr> <str>reldetjacname</str> <arr> <str>reldetjac_spatial</str> </arr> <str>reldetjacminname</str> <arr> <str>reldetjacmin_spatial</str> </arr> <str>meshtypename</str> <arr> <str>meshtype_spatial</str> </arr> <str>meshelemname</str> <arr> <str>meshelement_spatial</str> </arr> <str>sshape</str> <arr> <arr> <str>edg</str> <rec> <str>type</str> <str>fixed_ref</str> <str>sorder</str> <str>0</str> <str>sdimdofs</str> <arr> <str>x</str> <str>y</str> </arr> <str>refframe</str> <str>material</str> </rec> <str>ledg</str> <rec> <str>type</str> <str>fixed_ref</str> <str>sorder</str> <str>0</str> <str>sdimdofs</str> <arr> <str>x</str> <str>y</str> </arr> <str>refframe</str> <str>material</str> </rec> <str>edg2</str> <rec> <str>type</str> <str>fixed_ref</str> <str>sorder</str> <str>0</str> <str>sdimdofs</str> <arr> <str>x</str> <str>y</str> </arr> <str>refframe</str> <str>material</str> </rec> </arr> </arr> <str>ind</str> <arr> <arr> <str>1</str> <str>2</str> <str>3</str> <str>4</str> <str>5</str> <str>6</str> <str>7</str> <str>8</str> <str>9</str> <str>10</str> </arr> </arr> </rec> <rec> <str>qualname</str> <arr> <str>qualskewness_spatial</str> <str>qualmaxangle_spatial</str> <str>qual_spatial</str> <str>qualvollength_spatial</str> <str>qualcondition_spatial</str> <str>qualgrowth_spatial</str> <str>qualcurvedskewness_spatial</str> </arr> <str>sizename</str> <arr> <str>h_spatial</str> </arr> <str>sizeinscribedname</str> <arr> <str>hinscribed_spatial</str> </arr> <str>dvolname</str> <arr> <str>dvol_spatial</str> </arr> <str>emetric2name</str> <arr> <str>emetric2_spatial</str> </arr> <str>tremetricname</str> <arr> <str>tremetric_spatial</str> </arr> <str>emetricinvname</str> <arr> <str>emetricinv</str> </arr> <str>meshvolname</str> <arr> <str>meshvol_spatial</str> </arr> <str>detjacname</str> <arr> <str>detjac_spatial</str> </arr> <str>reldetjacname</str> <arr> <str>reldetjac_spatial</str> </arr> <str>reldetjacminname</str> <arr> <str>reldetjacmin_spatial</str> </arr> <str>meshtypename</str> <arr> <str>meshtype_spatial</str> </arr> <str>meshelemname</str> <arr> <str>meshelement_spatial</str> </arr> <str>sshape</str> <arr> <arr> <str>tri</str> <rec> <str>type</str> <str>fixed_ref</str> <str>sorder</str> <str>0</str> <str>sdimdofs</str> <arr> <str>x</str> <str>y</str> </arr> <str>refframe</str> <str>material</str> </rec> <str>quad</str> <rec> <str>type</str> <str>fixed_ref</str> <str>sorder</str> <str>0</str> <str>sdimdofs</str> <arr> <str>x</str> <str>y</str> </arr> <str>refframe</str> <str>material</str> </rec> <str>ltri</str> <rec> <str>type</str> <str>fixed_ref</str> <str>sorder</str> <str>0</str> <str>sdimdofs</str> <arr> <str>x</str> <str>y</str> </arr> <str>refframe</str> <str>material</str> </rec> <str>lquad</str> <rec> <str>type</str> <str>fixed_ref</str> <str>sorder</str> <str>0</str> <str>sdimdofs</str> <arr> <str>x</str> <str>y</str> </arr> <str>refframe</str> <str>material</str> </rec> <str>tri2</str> <rec> <str>type</str> <str>fixed_ref</str> <str>sorder</str> <str>0</str> <str>sdimdofs</str> <arr> <str>x</str> <str>y</str> </arr> <str>refframe</str> <str>material</str> </rec> <str>quad2</str> <rec> <str>type</str> <str>fixed_ref</str> <str>sorder</str> <str>0</str> <str>sdimdofs</str> <arr> <str>x</str> <str>y</str> </arr> <str>refframe</str> <str>material</str> </rec> </arr> </arr> <str>ind</str> <arr> <arr> <str>1</str> <str>2</str> <str>3</str> </arr> </arr> </rec> </arr> </arr> <str>equivmeshframe</str> <str>on</str> </rec> O<?xml version="1.0" encoding="UTF-8"?> <rec> <str>elem</str> <str>elvar</str> <str>g</str> <arr> <str>1</str> </arr> <str>geomdim</str> <arr> <arr> <arr> </arr> <rec> <str>ind</str> <arr> <arr> <str>1</str> <str>2</str> <str>3</str> <str>4</str> <str>5</str> <str>6</str> <str>7</str> <str>8</str> <str>9</str> <str>10</str> </arr> </arr> <str>var</str> <arr> <str>nxc</str> <str>nXc</str> <str>nxcTx</str> <str>nXcTX</str> <str>nxcTy</str> <str>nXcTY</str> <str>nyc</str> <str>nYc</str> <str>nycTx</str> <str>nYcTX</str> <str>nycTy</str> <str>nYcTY</str> </arr> </rec> </arr> </arr> </rec> <?xml version="1.0" encoding="UTF-8"?> <rec> <str>elem</str> <str>elmesh</str> <str>g</str> <arr> <str>1</str> </arr> <str>frame</str> <str>geometry</str> <str>geomdim</str> <arr> <arr> <rec> <str>qualname</str> <arr> <str>qualskewness_geometry</str> <str>qualmaxangle_geometry</str> <str>qual_geometry</str> <str>qualvollength_geometry</str> <str>qualcondition_geometry</str> <str>qualgrowth_geometry</str> <str>qualcurvedskewness_geometry</str> </arr> <str>sizename</str> <arr> <str>h_geometry</str> </arr> <str>sizeinscribedname</str> <arr> <str>hinscribed_geometry</str> </arr> <str>dvolname</str> <arr> <str>dvol_geometry</str> </arr> <str>emetric2name</str> <arr> <str>emetric2_geometry</str> </arr> <str>tremetricname</str> <arr> <str>tremetric_geometry</str> </arr> <str>emetricinvname</str> <arr> <str>emetricinv</str> </arr> <str>meshvolname</str> <arr> <str>meshvol_geometry</str> </arr> <str>detjacname</str> <arr> <str>detjac_geometry</str> </arr> <str>reldetjacname</str> <arr> <str>reldetjac_geometry</str> </arr> <str>reldetjacminname</str> <arr> <str>reldetjacmin_geometry</str> </arr> <str>meshtypename</str> <arr> <str>meshtype_geometry</str> </arr> <str>meshelemname</str> <arr> <str>meshelement_geometry</str> </arr> <str>sshape</str> <arr> <arr> <str>vtx</str> <rec> <str>type</str> <str>fixed_ref</str> <str>sorder</str> <str>0</str> <str>sdimdofs</str> <arr> <str>Xg</str> <str>Yg</str> </arr> <str>refframe</str> <str>mesh</str> </rec> <str>lvtx</str> <rec> <str>type</str> <str>fixed_ref</str> <str>sorder</str> <str>0</str> <str>sdimdofs</str> <arr> <str>Xg</str> <str>Yg</str> </arr> <str>refframe</str> <str>mesh</str> </rec> </arr> </arr> <str>ind</str> <arr> <arr> <str>1</str> <str>2</str> <str>3</str> <str>4</str> <str>5</str> <str>6</str> <str>7</str> <str>8</str> </arr> </arr> </rec> <rec> <str>qualname</str> <arr> <str>qualskewness_geometry</str> <str>qualmaxangle_geometry</str> <str>qual_geometry</str> <str>qualvollength_geometry</str> <str>qualcondition_geometry</str> <str>qualgrowth_geometry</str> <str>qualcurvedskewness_geometry</str> </arr> <str>sizename</str> <arr> <str>h_geometry</str> </arr> <str>sizeinscribedname</str> <arr> <str>hinscribed_geometry</str> </arr> <str>dvolname</str> <arr> <str>dvol_geometry</str> </arr> <str>emetric2name</str> <arr> <str>emetric2_geometry</str> </arr> <str>tremetricname</str> <arr> <str>tremetric_geometry</str> </arr> <str>emetricinvname</str> <arr> <str>emetricinv</str> </arr> <str>meshvolname</str> <arr> <str>meshvol_geometry</str> </arr> <str>detjacname</str> <arr> <str>detjac_geometry</str> </arr> <str>reldetjacname</str> <arr> <str>reldetjac_geometry</str> </arr> <str>reldetjacminname</str> <arr> <str>reldetjacmin_geometry</str> </arr> <str>meshtypename</str> <arr> <str>meshtype_geometry</str> </arr> <str>meshelemname</str> <arr> <str>meshelement_geometry</str> </arr> <str>sshape</str> <arr> <arr> <str>edg</str> <rec> <str>type</str> <str>fixed_ref</str> <str>sorder</str> <str>0</str> <str>sdimdofs</str> <arr> <str>Xg</str> <str>Yg</str> </arr> <str>refframe</str> <str>mesh</str> </rec> <str>ledg</str> <rec> <str>type</str> <str>fixed_ref</str> <str>sorder</str> <str>0</str> <str>sdimdofs</str> <arr> <str>Xg</str> <str>Yg</str> </arr> <str>refframe</str> <str>mesh</str> </rec> <str>edg2</str> <rec> <str>type</str> <str>fixed_ref</str> <str>sorder</str> <str>0</str> <str>sdimdofs</str> <arr> <str>Xg</str> <str>Yg</str> </arr> <str>refframe</str> <str>mesh</str> </rec> </arr> </arr> <str>ind</str> <arr> <arr> <str>1</str> <str>2</str> <str>3</str> <str>4</str> <str>5</str> <str>6</str> <str>7</str> <str>8</str> <str>9</str> <str>10</str> </arr> </arr> </rec> <rec> <str>qualname</str> <arr> <str>qualskewness_geometry</str> <str>qualmaxangle_geometry</str> <str>qual_geometry</str> <str>qualvollength_geometry</str> <str>qualcondition_geometry</str> <str>qualgrowth_geometry</str> <str>qualcurvedskewness_geometry</str> </arr> <str>sizename</str> <arr> <str>h_geometry</str> </arr> <str>sizeinscribedname</str> <arr> <str>hinscribed_geometry</str> </arr> <str>dvolname</str> <arr> <str>dvol_geometry</str> </arr> <str>emetric2name</str> <arr> <str>emetric2_geometry</str> </arr> <str>tremetricname</str> <arr> <str>tremetric_geometry</str> </arr> <str>emetricinvname</str> <arr> <str>emetricinv</str> </arr> <str>meshvolname</str> <arr> <str>meshvol_geometry</str> </arr> <str>detjacname</str> <arr> <str>detjac_geometry</str> </arr> <str>reldetjacname</str> <arr> <str>reldetjac_geometry</str> </arr> <str>reldetjacminname</str> <arr> <str>reldetjacmin_geometry</str> </arr> <str>meshtypename</str> <arr> <str>meshtype_geometry</str> </arr> <str>meshelemname</str> <arr> <str>meshelement_geometry</str> </arr> <str>sshape</str> <arr> <arr> <str>tri</str> <rec> <str>type</str> <str>fixed_ref</str> <str>sorder</str> <str>0</str> <str>sdimdofs</str> <arr> <str>Xg</str> <str>Yg</str> </arr> <str>refframe</str> <str>mesh</str> </rec> <str>quad</str> <rec> <str>type</str> <str>fixed_ref</str> <str>sorder</str> <str>0</str> <str>sdimdofs</str> <arr> <str>Xg</str> <str>Yg</str> </arr> <str>refframe</str> <str>mesh</str> </rec> <str>ltri</str> <rec> <str>type</str> <str>fixed_ref</str> <str>sorder</str> <str>0</str> <str>sdimdofs</str> <arr> <str>Xg</str> <str>Yg</str> </arr> <str>refframe</str> <str>mesh</str> </rec> <str>lquad</str> <rec> <str>type</str> <str>fixed_ref</str> <str>sorder</str> <str>0</str> <str>sdimdofs</str> <arr> <str>Xg</str> <str>Yg</str> </arr> <str>refframe</str> <str>mesh</str> </rec> <str>tri2</str> <rec> <str>type</str> <str>fixed_ref</str> <str>sorder</str> <str>0</str> <str>sdimdofs</str> <arr> <str>Xg</str> <str>Yg</str> </arr> <str>refframe</str> <str>mesh</str> </rec> <str>quad2</str> <rec> <str>type</str> <str>fixed_ref</str> <str>sorder</str> <str>0</str> <str>sdimdofs</str> <arr> <str>Xg</str> <str>Yg</str> </arr> <str>refframe</str> <str>mesh</str> </rec> </arr> </arr> <str>ind</str> <arr> <arr> <str>1</str> <str>2</str> <str>3</str> </arr> </arr> </rec> </arr> </arr> <str>equivmeshframe</str> <str>on</str> </rec> c<?xml version="1.0" encoding="UTF-8"?> <rec> <str>elem</str> <str>elvar</str> <str>g</str> <arr> <str>1</str> </arr> <str>geomdim</str> <arr> <arr> <arr> </arr> <rec> <str>ind</str> <arr> <arr> <str>1</str> <str>2</str> <str>3</str> <str>4</str> <str>5</str> <str>6</str> <str>7</str> <str>8</str> <str>9</str> <str>10</str> </arr> </arr> <str>var</str> <arr> <str>nXgc</str> <str>nXmc</str> <str>nXgcTXg</str> <str>nXmcTXm</str> <str>nXgcTYg</str> <str>nXmcTYm</str> <str>nYgc</str> <str>nYmc</str> <str>nYgcTXg</str> <str>nYmcTXm</str> <str>nYgcTYg</str> <str>nYmcTYm</str> </arr> </rec> </arr> </arr> </rec> <?xml version="1.0" encoding="UTF-8"?> <rec> <str>elem</str> <str>elmesh</str> <str>g</str> <arr> <str>1</str> </arr> <str>frame</str> <str>mesh</str> <str>geomdim</str> <arr> <arr> <rec> <str>qualname</str> <arr> <str>qualskewness_mesh</str> <str>qualmaxangle_mesh</str> <str>qual_mesh</str> <str>qualvollength_mesh</str> <str>qualcondition_mesh</str> <str>qualgrowth_mesh</str> <str>qualcurvedskewness_mesh</str> </arr> <str>sizename</str> <arr> <str>h_mesh</str> </arr> <str>sizeinscribedname</str> <arr> <str>hinscribed_mesh</str> </arr> <str>dvolname</str> <arr> <str>dvol_mesh</str> </arr> <str>emetric2name</str> <arr> <str>emetric2_mesh</str> </arr> <str>tremetricname</str> <arr> <str>tremetric_mesh</str> </arr> <str>emetricinvname</str> <arr> <str>emetricinv</str> </arr> <str>meshvolname</str> <arr> <str>meshvol_mesh</str> </arr> <str>detjacname</str> <arr> <str>detjac_mesh</str> </arr> <str>reldetjacname</str> <arr> <str>reldetjac_mesh</str> </arr> <str>reldetjacminname</str> <arr> <str>reldetjacmin_mesh</str> </arr> <str>meshtypename</str> <arr> <str>meshtype_mesh</str> </arr> <str>meshelemname</str> <arr> <str>meshelement_mesh</str> </arr> <str>sshape</str> <arr> <arr> <str>vtx</str> <rec> <str>type</str> <str>fixed</str> <str>sorder</str> <str>2</str> <str>sdimdofs</str> <arr> <str>Xm$2</str> <str>Ym$2</str> </arr> </rec> <str>lvtx</str> <rec> <str>type</str> <str>fixed</str> <str>sorder</str> <str>2</str> <str>sdimdofs</str> <arr> <str>Xm$2</str> <str>Ym$2</str> </arr> </rec> </arr> </arr> <str>ind</str> <arr> <arr> <str>1</str> <str>2</str> <str>3</str> <str>4</str> <str>5</str> <str>6</str> <str>7</str> <str>8</str> </arr> </arr> </rec> <rec> <str>qualname</str> <arr> <str>qualskewness_mesh</str> <str>qualmaxangle_mesh</str> <str>qual_mesh</str> <str>qualvollength_mesh</str> <str>qualcondition_mesh</str> <str>qualgrowth_mesh</str> <str>qualcurvedskewness_mesh</str> </arr> <str>sizename</str> <arr> <str>h_mesh</str> </arr> <str>sizeinscribedname</str> <arr> <str>hinscribed_mesh</str> </arr> <str>dvolname</str> <arr> <str>dvol_mesh</str> </arr> <str>emetric2name</str> <arr> <str>emetric2_mesh</str> </arr> <str>tremetricname</str> <arr> <str>tremetric_mesh</str> </arr> <str>emetricinvname</str> <arr> <str>emetricinv</str> </arr> <str>meshvolname</str> <arr> <str>meshvol_mesh</str> </arr> <str>detjacname</str> <arr> <str>detjac_mesh</str> </arr> <str>reldetjacname</str> <arr> <str>reldetjac_mesh</str> </arr> <str>reldetjacminname</str> <arr> <str>reldetjacmin_mesh</str> </arr> <str>meshtypename</str> <arr> <str>meshtype_mesh</str> </arr> <str>meshelemname</str> <arr> <str>meshelement_mesh</str> </arr> <str>sshape</str> <arr> <arr> <str>edg</str> <rec> <str>type</str> <str>fixed</str> <str>sorder</str> <str>2</str> <str>sdimdofs</str> <arr> <str>Xm$2</str> <str>Ym$2</str> </arr> </rec> <str>ledg</str> <rec> <str>type</str> <str>fixed</str> <str>sorder</str> <str>2</str> <str>sdimdofs</str> <arr> <str>Xm$2</str> <str>Ym$2</str> </arr> </rec> <str>edg2</str> <rec> <str>type</str> <str>fixed</str> <str>sorder</str> <str>2</str> <str>sdimdofs</str> <arr> <str>Xm$2</str> <str>Ym$2</str> </arr> </rec> </arr> </arr> <str>ind</str> <arr> <arr> <str>1</str> <str>2</str> <str>3</str> <str>4</str> <str>5</str> <str>6</str> <str>7</str> <str>8</str> <str>9</str> <str>10</str> </arr> </arr> </rec> <rec> <str>qualname</str> <arr> <str>qualskewness_mesh</str> <str>qualmaxangle_mesh</str> <str>qual_mesh</str> <str>qualvollength_mesh</str> <str>qualcondition_mesh</str> <str>qualgrowth_mesh</str> <str>qualcurvedskewness_mesh</str> </arr> <str>sizename</str> <arr> <str>h_mesh</str> </arr> <str>sizeinscribedname</str> <arr> <str>hinscribed_mesh</str> </arr> <str>dvolname</str> <arr> <str>dvol_mesh</str> </arr> <str>emetric2name</str> <arr> <str>emetric2_mesh</str> </arr> <str>tremetricname</str> <arr> <str>tremetric_mesh</str> </arr> <str>emetricinvname</str> <arr> <str>emetricinv</str> </arr> <str>meshvolname</str> <arr> <str>meshvol_mesh</str> </arr> <str>detjacname</str> <arr> <str>detjac_mesh</str> </arr> <str>reldetjacname</str> <arr> <str>reldetjac_mesh</str> </arr> <str>reldetjacminname</str> <arr> <str>reldetjacmin_mesh</str> </arr> <str>meshtypename</str> <arr> <str>meshtype_mesh</str> </arr> <str>meshelemname</str> <arr> <str>meshelement_mesh</str> </arr> <str>sshape</str> <arr> <arr> <str>tri</str> <rec> <str>type</str> <str>fixed</str> <str>sorder</str> <str>2</str> <str>sdimdofs</str> <arr> <str>Xm$2</str> <str>Ym$2</str> </arr> </rec> <str>quad</str> <rec> <str>type</str> <str>fixed</str> <str>sorder</str> <str>2</str> <str>sdimdofs</str> <arr> <str>Xm$2</str> <str>Ym$2</str> </arr> </rec> <str>ltri</str> <rec> <str>type</str> <str>fixed</str> <str>sorder</str> <str>2</str> <str>sdimdofs</str> <arr> <str>Xm$2</str> <str>Ym$2</str> </arr> </rec> <str>lquad</str> <rec> <str>type</str> <str>fixed</str> <str>sorder</str> <str>2</str> <str>sdimdofs</str> <arr> <str>Xm$2</str> <str>Ym$2</str> </arr> </rec> <str>tri2</str> <rec> <str>type</str> <str>fixed</str> <str>sorder</str> <str>2</str> <str>sdimdofs</str> <arr> <str>Xm$2</str> <str>Ym$2</str> </arr> </rec> <str>quad2</str> <rec> <str>type</str> <str>fixed</str> <str>sorder</str> <str>2</str> <str>sdimdofs</str> <arr> <str>Xm$2</str> <str>Ym$2</str> </arr> </rec> </arr> </arr> <str>ind</str> <arr> <arr> <str>1</str> <str>2</str> <str>3</str> </arr> </arr> </rec> </arr> </arr> <str>equivmeshframe</str> <str>on</str> <str>definelocalcoord</str> <str>on</str> </rec> 6<?xml version="1.0" encoding="UTF-8"?> <rec> <str>elem</str> <str>elcontshapevar</str> <str>g</str> <arr> <str>1</str> </arr> <str>geomdim</str> <arr> <arr> <arr> </arr> <rec> <str>ind</str> <arr> <arr> <str>1</str> <str>2</str> <str>3</str> <str>4</str> <str>5</str> <str>6</str> <str>7</str> <str>8</str> <str>9</str> <str>10</str> </arr> </arr> <str>var</str> <arr> <str>nXmc</str> <arr> <str>nXmmesh</str> </arr> <str>nYmc</str> <arr> <str>nYmmesh</str> </arr> </arr> </rec> </arr> </arr> <str>lagorder</str> <str>2</str> <str>frame</str> <str>mesh</str> </rec> <?xml version="1.0" encoding="UTF-8"?> <rec> <str>elem</str> <str>elmesh</str> <str>g</str> <arr> <str>2</str> </arr> <str>frame</str> <str>material</str> <str>geomdim</str> <arr> <arr> <rec> <str>qualname</str> <arr> </arr> <str>sizename</str> <arr> </arr> <str>sizeinscribedname</str> <arr> </arr> <str>dvolname</str> <arr> <str>1</str> </arr> <str>emetric2name</str> <arr> </arr> <str>tremetricname</str> <arr> </arr> <str>emetricinvname</str> <arr> </arr> <str>meshvolname</str> <arr> </arr> <str>detjacname</str> <arr> </arr> <str>reldetjacname</str> <arr> </arr> <str>reldetjacminname</str> <arr> </arr> <str>meshtypename</str> <arr> </arr> <str>meshelemname</str> <arr> </arr> <str>sshape</str> <arr> <arr> <str>vtx</str> <rec> <str>type</str> <str>fixed</str> <str>sorder</str> <str>2</str> <str>sdimdofs</str> <arr> <str>particleindex$2</str> </arr> </rec> <str>lvtx</str> <rec> <str>type</str> <str>fixed</str> <str>sorder</str> <str>2</str> <str>sdimdofs</str> <arr> <str>particleindex$2</str> </arr> </rec> </arr> </arr> <str>ind</str> <arr> <arr> <str>1</str> </arr> </arr> </rec> </arr> </arr> <str>equivmeshframe</str> <str>on</str> <str>definelocalcoord</str> <str>on</str> </rec> u<?xml version="1.0" encoding="UTF-8"?> <rec> <str>elem</str> <str>elcurvature</str> <str>g</str> <arr> <str>1</str> </arr> <str>frame</str> <str>material</str> <str>geomdim</str> <arr> <arr> <arr> </arr> <rec> <str>ind</str> <arr> <arr> <str>1</str> <str>2</str> <str>3</str> <str>4</str> <str>5</str> <str>6</str> <str>7</str> <str>8</str> <str>9</str> <str>10</str> </arr> </arr> <str>curvnames</str> <arr> <str>curv</str> </arr> <str>tangnames</str> <arr> <arr> <str>tcurvX</str> <str>tcurvY</str> </arr> </arr> <str>normaldir</str> <arr> <str>normal</str> </arr> </rec> </arr> </arr> <str>method</str> <str>auto</str> </rec> |<?xml version="1.0" encoding="UTF-8"?> <rec> <str>elem</str> <str>elcurvature</str> <str>g</str> <arr> <str>1</str> </arr> <str>frame</str> <str>spatial</str> <str>geomdim</str> <arr> <arr> <arr> </arr> <rec> <str>ind</str> <arr> <arr> <str>1</str> <str>2</str> <str>3</str> <str>4</str> <str>5</str> <str>6</str> <str>7</str> <str>8</str> <str>9</str> <str>10</str> </arr> </arr> <str>curvnames</str> <arr> <str>curv_spatial</str> </arr> <str>tangnames</str> <arr> <arr> <str>tcurvx</str> <str>tcurvy</str> </arr> </arr> <str>normaldir</str> <arr> <str>normal</str> </arr> </rec> </arr> </arr> <str>method</str> <str>auto</str> </rec> <?xml version="1.0" encoding="UTF-8"?> <rec> <str>elem</str> <str>elcurvature</str> <str>g</str> <arr> <str>1</str> </arr> <str>frame</str> <str>geometry</str> <str>geomdim</str> <arr> <arr> <arr> </arr> <rec> <str>ind</str> <arr> <arr> <str>1</str> <str>2</str> <str>3</str> <str>4</str> <str>5</str> <str>6</str> <str>7</str> <str>8</str> <str>9</str> <str>10</str> </arr> </arr> <str>curvnames</str> <arr> <str>curv_geometry</str> </arr> <str>tangnames</str> <arr> <arr> <str>tcurvXg</str> <str>tcurvYg</str> </arr> </arr> <str>normaldir</str> <arr> <str>normal</str> </arr> </rec> </arr> </arr> <str>method</str> <str>auto</str> </rec> x<?xml version="1.0" encoding="UTF-8"?> <rec> <str>elem</str> <str>elcurvature</str> <str>g</str> <arr> <str>1</str> </arr> <str>frame</str> <str>mesh</str> <str>geomdim</str> <arr> <arr> <arr> </arr> <rec> <str>ind</str> <arr> <arr> <str>1</str> <str>2</str> <str>3</str> <str>4</str> <str>5</str> <str>6</str> <str>7</str> <str>8</str> <str>9</str> <str>10</str> </arr> </arr> <str>curvnames</str> <arr> <str>curv_mesh</str> </arr> <str>tangnames</str> <arr> <arr> <str>tcurvXm</str> <str>tcurvYm</str> </arr> </arr> <str>normaldir</str> <arr> <str>normal</str> </arr> </rec> </arr> </arr> <str>method</str> <str>auto</str> </rec> <?xml version="1.0" encoding="UTF-8"?> <rec> <str>elem</str> <str>elgeom</str> <str>g</str> <arr> <str>1</str> </arr> <str>frame</str> <str>mesh</str> <str>sorder</str> <str>2</str> <str>method</str> <str>Lenoir</str> </rec> $<?xml version="1.0" encoding="UTF-8"?> <rec> <str>elem</str> <str>elconst</str> <str>var</str> <arr> <str>all_obj_contrib</str> <str>0</str> <str>all_obj_contrib_nolsq</str> <str>0</str> <str>all_obj_sum</str> <str>0</str> <str>all_obj_min</str> <str>Inf</str> <str>all_obj_max</str> <str>-Inf</str> <str>all_obj_scaled_contrib</str> <str>0</str> <str>all_obj_scaled_contrib_nolsq</str> <str>0</str> <str>all_obj_scaled_sum</str> <str>0</str> <str>all_obj_scaled_min</str> <str>Inf</str> <str>all_obj_scaled_max</str> <str>-Inf</str> </arr> </rec> <?xml version="1.0" encoding="UTF-8"?> <rec> <str>elem</str> <str>elcontshapevar</str> <str>frame</str> <str>spatial</str> <str>lagorder</str> <str>2</str> <str>g</str> <arr> <str>1</str> </arr> <str>geomdim</str> <arr> <arr> <arr> </arr> <rec> <str>ind</str> <arr> <arr> <str>1</str> <str>2</str> <str>3</str> <str>4</str> <str>5</str> <str>6</str> <str>7</str> <str>8</str> <str>9</str> <str>10</str> </arr> </arr> <str>var</str> <arr> <str>comp1.sys1.nXc</str> <arr> <str>nX*comp1.sys1.nSign</str> </arr> <str>comp1.sys1.nYc</str> <arr> <str>nY*comp1.sys1.nSign</str> </arr> <str>comp1.sys1.nZc</str> <arr> <str>0</str> </arr> </arr> </rec> </arr> </arr> </rec> s<?xml version="1.0" encoding="UTF-8"?> <rec> <str>elem</str> <str>elconst</str> <str>var</str> <arr> </arr> </rec> <?xml version="1.0" encoding="UTF-8"?> <rec> <str>elem</str> <str>elsvdpolar</str> <str>matdim</str> <str>3</str> <str>rotation</str> <arr> <str>comp1.spatial.R11</str> <str>comp1.spatial.R21</str> <str>comp1.spatial.R31</str> <str>comp1.spatial.R12</str> <str>comp1.spatial.R22</str> <str>comp1.spatial.R32</str> <str>comp1.spatial.R13</str> <str>comp1.spatial.R23</str> <str>comp1.spatial.R33</str> </arr> <str>g</str> <arr> <str>1</str> </arr> <str>geomdim</str> <arr> <arr> <rec> <str>input</str> <arr> <arr> <str>comp1.spatial.F11</str> <str>comp1.spatial.F21</str> <str>comp1.spatial.F31</str> <str>comp1.spatial.F12</str> <str>comp1.spatial.F22</str> <str>comp1.spatial.F32</str> <str>comp1.spatial.F13</str> <str>comp1.spatial.F23</str> <str>comp1.spatial.F33</str> </arr> </arr> <str>ind</str> <arr> <arr> <str>1</str> <str>2</str> <str>3</str> <str>4</str> <str>5</str> <str>6</str> <str>7</str> <str>8</str> </arr> </arr> </rec> </arr> </arr> </rec> <?xml version="1.0" encoding="UTF-8"?> <rec> <str>elem</str> <str>elsvdpolar</str> <str>matdim</str> <str>3</str> <str>rotation</str> <arr> <str>comp1.spatial.R11</str> <str>comp1.spatial.R21</str> <str>comp1.spatial.R31</str> <str>comp1.spatial.R12</str> <str>comp1.spatial.R22</str> <str>comp1.spatial.R32</str> <str>comp1.spatial.R13</str> <str>comp1.spatial.R23</str> <str>comp1.spatial.R33</str> </arr> <str>g</str> <arr> <str>1</str> </arr> <str>geomdim</str> <arr> <arr> <arr> </arr> <rec> <str>input</str> <arr> <arr> <str>comp1.spatial.F11</str> <str>comp1.spatial.F21</str> <str>comp1.spatial.F31</str> <str>comp1.spatial.F12</str> <str>comp1.spatial.F22</str> <str>comp1.spatial.F32</str> <str>comp1.spatial.F13</str> <str>comp1.spatial.F23</str> <str>comp1.spatial.F33</str> </arr> </arr> <str>ind</str> <arr> <arr> <str>1</str> <str>2</str> <str>3</str> <str>4</str> <str>5</str> <str>6</str> <str>7</str> <str>8</str> <str>9</str> <str>10</str> </arr> </arr> </rec> </arr> </arr> </rec> <?xml version="1.0" encoding="UTF-8"?> <rec> <str>elem</str> <str>elsvdpolar</str> <str>matdim</str> <str>3</str> <str>rotation</str> <arr> <str>comp1.spatial.R11</str> <str>comp1.spatial.R21</str> <str>comp1.spatial.R31</str> <str>comp1.spatial.R12</str> <str>comp1.spatial.R22</str> <str>comp1.spatial.R32</str> <str>comp1.spatial.R13</str> <str>comp1.spatial.R23</str> <str>comp1.spatial.R33</str> </arr> <str>g</str> <arr> <str>1</str> </arr> <str>geomdim</str> <arr> <arr> <arr> </arr> <arr> </arr> <rec> <str>input</str> <arr> <arr> <str>comp1.spatial.F11</str> <str>comp1.spatial.F21</str> <str>comp1.spatial.F31</str> <str>comp1.spatial.F12</str> <str>comp1.spatial.F22</str> <str>comp1.spatial.F32</str> <str>comp1.spatial.F13</str> <str>comp1.spatial.F23</str> <str>comp1.spatial.F33</str> </arr> </arr> <str>ind</str> <arr> <arr> <str>1</str> <str>2</str> <str>3</str> </arr> </arr> </rec> </arr> </arr> </rec> <?xml version="1.0" encoding="UTF-8"?> <rec> <str>elem</str> <str>elsvdpolar</str> <str>matdim</str> <str>3</str> <str>rotation</str> <arr> <str>comp1.spatial.invR11</str> <str>comp1.spatial.invR21</str> <str>comp1.spatial.invR31</str> <str>comp1.spatial.invR12</str> <str>comp1.spatial.invR22</str> <str>comp1.spatial.invR32</str> <str>comp1.spatial.invR13</str> <str>comp1.spatial.invR23</str> <str>comp1.spatial.invR33</str> </arr> <str>g</str> <arr> <str>1</str> </arr> <str>geomdim</str> <arr> <arr> <rec> <str>input</str> <arr> <arr> <str>comp1.spatial.invF11</str> <str>comp1.spatial.invF21</str> <str>comp1.spatial.invF31</str> <str>comp1.spatial.invF12</str> <str>comp1.spatial.invF22</str> <str>comp1.spatial.invF32</str> <str>comp1.spatial.invF13</str> <str>comp1.spatial.invF23</str> <str>comp1.spatial.invF33</str> </arr> </arr> <str>ind</str> <arr> <arr> <str>1</str> <str>2</str> <str>3</str> <str>4</str> <str>5</str> <str>6</str> <str>7</str> <str>8</str> </arr> </arr> </rec> </arr> </arr> </rec> <?xml version="1.0" encoding="UTF-8"?> <rec> <str>elem</str> <str>elsvdpolar</str> <str>matdim</str> <str>3</str> <str>rotation</str> <arr> <str>comp1.spatial.invR11</str> <str>comp1.spatial.invR21</str> <str>comp1.spatial.invR31</str> <str>comp1.spatial.invR12</str> <str>comp1.spatial.invR22</str> <str>comp1.spatial.invR32</str> <str>comp1.spatial.invR13</str> <str>comp1.spatial.invR23</str> <str>comp1.spatial.invR33</str> </arr> <str>g</str> <arr> <str>1</str> </arr> <str>geomdim</str> <arr> <arr> <arr> </arr> <rec> <str>input</str> <arr> <arr> <str>comp1.spatial.invF11</str> <str>comp1.spatial.invF21</str> <str>comp1.spatial.invF31</str> <str>comp1.spatial.invF12</str> <str>comp1.spatial.invF22</str> <str>comp1.spatial.invF32</str> <str>comp1.spatial.invF13</str> <str>comp1.spatial.invF23</str> <str>comp1.spatial.invF33</str> </arr> </arr> <str>ind</str> <arr> <arr> <str>1</str> <str>2</str> <str>3</str> <str>4</str> <str>5</str> <str>6</str> <str>7</str> <str>8</str> <str>9</str> <str>10</str> </arr> </arr> </rec> </arr> </arr> </rec> <?xml version="1.0" encoding="UTF-8"?> <rec> <str>elem</str> <str>elsvdpolar</str> <str>matdim</str> <str>3</str> <str>rotation</str> <arr> <str>comp1.spatial.invR11</str> <str>comp1.spatial.invR21</str> <str>comp1.spatial.invR31</str> <str>comp1.spatial.invR12</str> <str>comp1.spatial.invR22</str> <str>comp1.spatial.invR32</str> <str>comp1.spatial.invR13</str> <str>comp1.spatial.invR23</str> <str>comp1.spatial.invR33</str> </arr> <str>g</str> <arr> <str>1</str> </arr> <str>geomdim</str> <arr> <arr> <arr> </arr> <arr> </arr> <rec> <str>input</str> <arr> <arr> <str>comp1.spatial.invF11</str> <str>comp1.spatial.invF21</str> <str>comp1.spatial.invF31</str> <str>comp1.spatial.invF12</str> <str>comp1.spatial.invF22</str> <str>comp1.spatial.invF32</str> <str>comp1.spatial.invF13</str> <str>comp1.spatial.invF23</str> <str>comp1.spatial.invF33</str> </arr> </arr> <str>ind</str> <arr> <arr> <str>1</str> <str>2</str> <str>3</str> </arr> </arr> </rec> </arr> </arr> </rec> x<?xml version="1.0" encoding="UTF-8"?> <rec> <str>elem</str> <str>elsvdpolar</str> <str>matdim</str> <str>3</str> <str>rotation</str> <arr> <str>comp1.material.R11</str> <str>comp1.material.R21</str> <str>comp1.material.R31</str> <str>comp1.material.R12</str> <str>comp1.material.R22</str> <str>comp1.material.R32</str> <str>comp1.material.R13</str> <str>comp1.material.R23</str> <str>comp1.material.R33</str> </arr> <str>g</str> <arr> <str>2</str> </arr> <str>geomdim</str> <arr> <arr> <rec> <str>input</str> <arr> <arr> <str>comp1.material.F11</str> <str>comp1.material.F21</str> <str>comp1.material.F31</str> <str>comp1.material.F12</str> <str>comp1.material.F22</str> <str>comp1.material.F32</str> <str>comp1.material.F13</str> <str>comp1.material.F23</str> <str>comp1.material.F33</str> </arr> </arr> <str>ind</str> <arr> <arr> <str>1</str> </arr> </arr> </rec> </arr> </arr> </rec> x<?xml version="1.0" encoding="UTF-8"?> <rec> <str>elem</str> <str>elsvdpolar</str> <str>matdim</str> <str>3</str> <str>rotation</str> <arr> <str>comp1.material.R11</str> <str>comp1.material.R21</str> <str>comp1.material.R31</str> <str>comp1.material.R12</str> <str>comp1.material.R22</str> <str>comp1.material.R32</str> <str>comp1.material.R13</str> <str>comp1.material.R23</str> <str>comp1.material.R33</str> </arr> <str>g</str> <arr> <str>2</str> </arr> <str>geomdim</str> <arr> <arr> <arr> </arr> <rec> <str>input</str> <arr> <arr> <str>comp1.material.F11</str> <str>comp1.material.F21</str> <str>comp1.material.F31</str> <str>comp1.material.F12</str> <str>comp1.material.F22</str> <str>comp1.material.F32</str> <str>comp1.material.F13</str> <str>comp1.material.F23</str> <str>comp1.material.F33</str> </arr> </arr> <str>ind</str> <arr> <arr> </arr> </arr> </rec> </arr> </arr> </rec> <?xml version="1.0" encoding="UTF-8"?> <rec> <str>elem</str> <str>elsvdpolar</str> <str>matdim</str> <str>3</str> <str>rotation</str> <arr> <str>comp1.material.invR11</str> <str>comp1.material.invR21</str> <str>comp1.material.invR31</str> <str>comp1.material.invR12</str> <str>comp1.material.invR22</str> <str>comp1.material.invR32</str> <str>comp1.material.invR13</str> <str>comp1.material.invR23</str> <str>comp1.material.invR33</str> </arr> <str>g</str> <arr> <str>2</str> </arr> <str>geomdim</str> <arr> <arr> <rec> <str>input</str> <arr> <arr> <str>comp1.material.invF11</str> <str>comp1.material.invF21</str> <str>comp1.material.invF31</str> <str>comp1.material.invF12</str> <str>comp1.material.invF22</str> <str>comp1.material.invF32</str> <str>comp1.material.invF13</str> <str>comp1.material.invF23</str> <str>comp1.material.invF33</str> </arr> </arr> <str>ind</str> <arr> <arr> <str>1</str> </arr> </arr> </rec> </arr> </arr> </rec> <?xml version="1.0" encoding="UTF-8"?> <rec> <str>elem</str> <str>elsvdpolar</str> <str>matdim</str> <str>3</str> <str>rotation</str> <arr> <str>comp1.material.invR11</str> <str>comp1.material.invR21</str> <str>comp1.material.invR31</str> <str>comp1.material.invR12</str> <str>comp1.material.invR22</str> <str>comp1.material.invR32</str> <str>comp1.material.invR13</str> <str>comp1.material.invR23</str> <str>comp1.material.invR33</str> </arr> <str>g</str> <arr> <str>2</str> </arr> <str>geomdim</str> <arr> <arr> <arr> </arr> <rec> <str>input</str> <arr> <arr> <str>comp1.material.invF11</str> <str>comp1.material.invF21</str> <str>comp1.material.invF31</str> <str>comp1.material.invF12</str> <str>comp1.material.invF22</str> <str>comp1.material.invF32</str> <str>comp1.material.invF13</str> <str>comp1.material.invF23</str> <str>comp1.material.invF33</str> </arr> </arr> <str>ind</str> <arr> <arr> </arr> </arr> </rec> </arr> </arr> </rec> M<?xml version="1.0" encoding="UTF-8"?> <rec> <str>elem</str> <str>elparticle</str> <str>bndtype</str> <arr> <rec> <str>entities</str> <arr> <str>1</str> <str>2</str> <str>3</str> <str>4</str> <str>5</str> <str>6</str> <str>7</str> <str>8</str> <str>9</str> <str>10</str> </arr> <str>type</str> <str>refraction</str> <str>refind</str> <str>real(comp1.gop.nref_local)</str> <str>reflectioncond</str> <str>0</str> <str>fallback</str> <str>disappear</str> <str>otherreinit</str> <arr> <str></str> <str>comp1.gop.matd1.r1t</str> <str>comp1.gop.matd1.r1t</str> <str>comp1.gop.matd1.I0t</str> <str>comp1.gop.matd1.snt1</str> <str>comp1.gop.matd1.snt2</str> <str>comp1.gop.matd1.snt3</str> <str>0</str> <str>comp1.gop.matd1.Q0t</str> </arr> <str>other</str> <arr> <str>comp1.gop.lambda0</str> <str>comp1.gop.matd1.r1r</str> <str>comp1.gop.matd1.r1r</str> <str>comp1.gop.matd1.I0r</str> <str>comp1.gop.matd1.snr1</str> <str>comp1.gop.matd1.snr2</str> <str>comp1.gop.matd1.snr3</str> <str>0</str> <str>comp1.gop.matd1.Q0r</str> </arr> </rec> </arr> <str>dominteraction</str> <arr> </arr> <str>release</str> <arr> <rec> <str>other</str> <arr> <rec> <str>type</str> <str>listofvalues</str> <str>otherarray</str> <arr> <str>4.0000000000000003E-7</str> <str>4.040404040404041E-7</str> <str>4.080808080808081E-7</str> <str>4.121212121212122E-7</str> <str>4.161616161616162E-7</str> <str>4.2020202020202026E-7</str> <str>4.2424242424242427E-7</str> <str>4.2828282828282833E-7</str> <str>4.3232323232323235E-7</str> <str>4.363636363636364E-7</str> <str>4.404040404040404E-7</str> <str>4.444444444444445E-7</str> <str>4.484848484848485E-7</str> <str>4.5252525252525257E-7</str> <str>4.565656565656566E-7</str> <str>4.6060606060606064E-7</str> <str>4.646464646464647E-7</str> <str>4.686868686868687E-7</str> <str>4.7272727272727273E-7</str> <str>4.767676767676768E-7</str> <str>4.808080808080809E-7</str> <str>4.848484848484849E-7</str> <str>4.888888888888889E-7</str> <str>4.92929292929293E-7</str> <str>4.96969696969697E-7</str> <str>5.01010101010101E-7</str> <str>5.05050505050505E-7</str> <str>5.090909090909092E-7</str> <str>5.131313131313132E-7</str> <str>5.171717171717172E-7</str> <str>5.212121212121212E-7</str> <str>5.252525252525253E-7</str> <str>5.292929292929293E-7</str> <str>5.333333333333333E-7</str> <str>5.373737373737375E-7</str> <str>5.414141414141415E-7</str> <str>5.454545454545455E-7</str> <str>5.494949494949495E-7</str> <str>5.535353535353535E-7</str> <str>5.575757575757576E-7</str> <str>5.616161616161616E-7</str> <str>5.656565656565658E-7</str> <str>5.696969696969698E-7</str> <str>5.737373737373738E-7</str> <str>5.777777777777778E-7</str> <str>5.818181818181818E-7</str> <str>5.858585858585859E-7</str> <str>5.898989898989899E-7</str> <str>5.93939393939394E-7</str> <str>5.979797979797981E-7</str> <str>6.020202020202021E-7</str> <str>6.060606060606061E-7</str> <str>6.101010101010101E-7</str> <str>6.141414141414141E-7</str> <str>6.181818181818182E-7</str> <str>6.222222222222223E-7</str> <str>6.262626262626264E-7</str> <str>6.303030303030304E-7</str> <str>6.343434343434344E-7</str> <str>6.383838383838384E-7</str> <str>6.424242424242424E-7</str> <str>6.464646464646464E-7</str> <str>6.505050505050506E-7</str> <str>6.545454545454546E-7</str> <str>6.585858585858587E-7</str> <str>6.626262626262627E-7</str> <str>6.666666666666667E-7</str> <str>6.707070707070707E-7</str> <str>6.747474747474747E-7</str> <str>6.787878787878789E-7</str> <str>6.828282828282829E-7</str> <str>6.86868686868687E-7</str> <str>6.90909090909091E-7</str> <str>6.94949494949495E-7</str> <str>6.98989898989899E-7</str> <str>7.03030303030303E-7</str> <str>7.07070707070707E-7</str> <str>7.111111111111112E-7</str> <str>7.151515151515152E-7</str> <str>7.191919191919193E-7</str> <str>7.232323232323233E-7</str> <str>7.272727272727273E-7</str> <str>7.313131313131313E-7</str> <str>7.353535353535353E-7</str> <str>7.393939393939395E-7</str> <str>7.434343434343435E-7</str> <str>7.474747474747476E-7</str> <str>7.515151515151516E-7</str> <str>7.555555555555556E-7</str> <str>7.595959595959596E-7</str> <str>7.636363636363636E-7</str> <str>7.676767676767677E-7</str> <str>7.717171717171718E-7</str> <str>7.757575757575758E-7</str> <str>7.797979797979799E-7</str> <str>7.838383838383839E-7</str> <str>7.878787878787879E-7</str> <str>7.919191919191919E-7</str> <str>7.95959595959596E-7</str> <str>8.000000000000001E-7</str> </arr> <str>assignorder</str> <str>-1</str> </rec> <rec> <str>type</str> <str>expression</str> <str>expression</str> <str>comp1.gop.relg1.r01</str> <str>assignorder</str> <str>3</str> </rec> <rec> <str>type</str> <str>expression</str> <str>expression</str> <str>comp1.gop.relg1.r01</str> <str>assignorder</str> <str>3</str> </rec> <rec> <str>type</str> <str>expression</str> <str>expression</str> <str>comp1.gop.relg1.I0</str> <str>assignorder</str> <str>3</str> </rec> <rec> <str>type</str> <str>expression</str> <str>expression</str> <str>comp1.gop.relg1.sn01</str> <str>assignorder</str> <str>3</str> </rec> <rec> <str>type</str> <str>expression</str> <str>expression</str> <str>comp1.gop.relg1.sn02</str> <str>assignorder</str> <str>3</str> </rec> <rec> <str>type</str> <str>expression</str> <str>expression</str> <str>comp1.gop.relg1.sn03</str> <str>assignorder</str> <str>3</str> </rec> <rec> <str>type</str> <str>expression</str> <str>expression</str> <str>0</str> <str>assignorder</str> <str>2</str> </rec> <rec> <str>type</str> <str>expression</str> <str>expression</str> <str>comp1.gop.relg1.Q0</str> <str>assignorder</str> <str>4</str> </rec> </arr> <str>time</str> <arr> <str>0</str> </arr> <str>posgrid</str> <arr> <arr> <str>0.5</str> </arr> <arr> <str>1.0</str> </arr> </arr> <str>allcombinations</str> <str>on</str> <str>releaseindex</str> <arr> </arr> <str>momentum</str> <arr> <str>comp1.gop.relg1.L0normx*comp1.gop.mp*comp1.gop.k0*real(comp1.gop.nref)</str> <str>comp1.gop.relg1.L0normy*comp1.gop.mp*comp1.gop.k0*real(comp1.gop.nref)</str> </arr> <str>searchdir</str> <arr> <str>comp1.gop.relg1.L0normx</str> <str>comp1.gop.relg1.L0normy</str> </arr> </rec> </arr> <str>domaccumulators</str> <arr> </arr> <str>nonlocalaccumulators</str> <arr> </arr> <str>contactsearches</str> <arr> </arr> <str>posdofs</str> <arr> <str>comp1.qx</str> <str>comp1.qy</str> </arr> <str>momdofs</str> <arr> <str>comp1.kx</str> <str>comp1.ky</str> </arr> <str>otherdofs</str> <arr> <str>comp1.gop.lambda0</str> <str>comp1.gop.r1</str> <str>comp1.gop.r1_init</str> <str>comp1.gop.I0</str> <str>comp1.gop.sn1</str> <str>comp1.gop.sn2</str> <str>comp1.gop.sn3</str> <str>comp1.gop.atten</str> <str>comp1.gop.Q0</str> </arr> <str>posequ</str> <arr> <str>if(particlestatus==1,comp1.gop.vgx,0)</str> <str>if(particlestatus==1,comp1.gop.vgy,0)</str> </arr> <str>momequ</str> <arr> <str>if(particlestatus==1,comp1.gop.dkdtx,0)</str> <str>if(particlestatus==1,comp1.gop.dkdty,0)</str> </arr> <str>otherequ</str> <arr> <str>0</str> <str>-comp1.gop.Vg</str> <str>0</str> <str>0</str> <str>0</str> <str>0</str> <str>0</str> <str>comp1.gop.attenCoeff</str> <str>0</str> </arr> <str>equtype</str> <str>firstorder</str> <str>pgeomtag</str> <str>pgeom_gop</str> <str>accuracyorder</str> <str>2</str> <str>maxsecondary</str> <str>0</str> <str>maxbounce</str> <str>1000</str> <str>treatunmeshedreleaseaserror</str> <str>on</str> <str>usegeometrynormals</str> <str>off</str> <str>usereleaseposoperators</str> <str>on</str> <str>entities</str> <arr> <str>1</str> <str>2</str> <str>3</str> </arr> <str>exteriordomaingroups</str> <arr> <arr> <str>0</str> </arr> </arr> <str>g</str> <arr> <str>1</str> </arr> <str>geomdim</str> <arr> <arr> <arr> </arr> <arr> </arr> <rec> <str>ind</str> <arr> <arr> <str>1</str> <str>2</str> <str>3</str> </arr> </arr> </rec> </arr> </arr> </rec> <?xml version="1.0" encoding="UTF-8"?> <rec> <str>elem</str> <str>elvar</str> <str>g</str> <arr> <str>1</str> </arr> <str>protected</str> <str>false</str> <str>geomdim</str> <arr> <arr> <arr> </arr> <arr> </arr> <rec> <str>ind</str> <arr> <arr> <str>0</str> </arr> </arr> <str>var</str> <arr> <str>comp1.gop.nref_local</str> <arr> <str>comp1.gop.op1.next</str> </arr> </arr> </rec> </arr> </arr> </rec> <?xml version="1.0" encoding="UTF-8"?> <rec> <str>elem</str> <str>elvar</str> <str>g</str> <arr> <str>1</str> </arr> <str>protected</str> <str>false</str> <str>geomdim</str> <arr> <arr> <arr> </arr> <arr> </arr> <rec> <str>ind</str> <arr> <arr> <str>0</str> </arr> </arr> <str>var</str> <arr> <str>comp1.gop.attenExtinction</str> <arr> <str>0</str> </arr> <str>comp1.gop.attenScattering</str> <arr> <str>0</str> </arr> <str>comp1.gop.attenAbsorption</str> <arr> <str>0</str> </arr> </arr> </rec> </arr> </arr> </rec> <?xml version="1.0" encoding="UTF-8"?> <rec> <str>elem</str> <str>elmatent</str> <str>name</str> <str>material.entity</str> <str>g</str> <arr> <str>1</str> </arr> <str>geomdim</str> <arr> <arr> <rec> <str>ind</str> <arr> <arr> <str>1</str> <str>5</str> </arr> <arr> <str>2</str> <str>6</str> </arr> <arr> <str>3</str> <str>7</str> </arr> <arr> <str>4</str> <str>8</str> </arr> </arr> </rec> <rec> <str>ind</str> <arr> <arr> <str>1</str> <str>2</str> <str>8</str> </arr> <arr> <str>3</str> <str>9</str> </arr> <arr> <str>4</str> </arr> <arr> <str>5</str> <str>7</str> <str>10</str> </arr> <arr> <str>6</str> </arr> </arr> </rec> <rec> <str>ind</str> <arr> <arr> <str>1</str> </arr> <arr> <str>2</str> </arr> <arr> <str>3</str> </arr> </arr> </rec> </arr> </arr> </rec> <?xml version="1.0" encoding="UTF-8"?> <rec> <str>elem</str> <str>elshape</str> <str>g</str> <arr> <str>2</str> </arr> <str>tvars</str> <str>on</str> <str>implicitbmtypes</str> <str>on</str> <str>geomdim</str> <arr> <arr> <rec> <str>ind</str> <arr> <arr> <str>1</str> </arr> </arr> <str>use</str> <arr> <str></str> </arr> <str>shelem</str> <rec> <str>default</str> <arr> <arr> <str>shdisc</str> <rec> <str>basename</str> <str>comp1.gop.lambda0</str> <str>mdim</str> <str>0</str> <str>order</str> <str>0</str> <str>frame</str> <arr> <str>material</str> </arr> <str>declare</str> <arr> <str>true</str> </arr> <str>valuetype</str> <str>real</str> </rec> </arr> </arr> <str>case</str> <arr> </arr> <str>mind</str> <arr> </arr> </rec> </rec> </arr> </arr> </rec> <?xml version="1.0" encoding="UTF-8"?> <rec> <str>elem</str> <str>elshape</str> <str>g</str> <arr> <str>2</str> </arr> <str>tvars</str> <str>on</str> <str>implicitbmtypes</str> <str>on</str> <str>geomdim</str> <arr> <arr> <rec> <str>ind</str> <arr> <arr> <str>1</str> </arr> </arr> <str>use</str> <arr> <str></str> </arr> <str>shelem</str> <rec> <str>default</str> <arr> <arr> <str>shdisc</str> <rec> <str>basename</str> <str>comp1.gop.r1</str> <str>mdim</str> <str>0</str> <str>order</str> <str>0</str> <str>frame</str> <arr> <str>material</str> </arr> <str>declare</str> <arr> <str>true</str> </arr> <str>valuetype</str> <str>real</str> </rec> </arr> </arr> <str>case</str> <arr> </arr> <str>mind</str> <arr> </arr> </rec> </rec> </arr> </arr> </rec> <?xml version="1.0" encoding="UTF-8"?> <rec> <str>elem</str> <str>elshape</str> <str>g</str> <arr> <str>2</str> </arr> <str>tvars</str> <str>on</str> <str>implicitbmtypes</str> <str>on</str> <str>geomdim</str> <arr> <arr> <rec> <str>ind</str> <arr> <arr> <str>1</str> </arr> </arr> <str>use</str> <arr> <str></str> </arr> <str>shelem</str> <rec> <str>default</str> <arr> <arr> <str>shdisc</str> <rec> <str>basename</str> <str>comp1.gop.r1_init</str> <str>mdim</str> <str>0</str> <str>order</str> <str>0</str> <str>frame</str> <arr> <str>material</str> </arr> <str>declare</str> <arr> <str>true</str> </arr> <str>valuetype</str> <str>real</str> </rec> </arr> </arr> <str>case</str> <arr> </arr> <str>mind</str> <arr> </arr> </rec> </rec> </arr> </arr> </rec> <?xml version="1.0" encoding="UTF-8"?> <rec> <str>elem</str> <str>elshape</str> <str>g</str> <arr> <str>2</str> </arr> <str>tvars</str> <str>on</str> <str>implicitbmtypes</str> <str>on</str> <str>geomdim</str> <arr> <arr> <rec> <str>ind</str> <arr> <arr> <str>1</str> </arr> </arr> <str>use</str> <arr> <str></str> </arr> <str>shelem</str> <rec> <str>default</str> <arr> <arr> <str>shdisc</str> <rec> <str>basename</str> <str>comp1.gop.I0</str> <str>mdim</str> <str>0</str> <str>order</str> <str>0</str> <str>frame</str> <arr> <str>material</str> </arr> <str>declare</str> <arr> <str>true</str> </arr> <str>valuetype</str> <str>real</str> </rec> </arr> </arr> <str>case</str> <arr> </arr> <str>mind</str> <arr> </arr> </rec> </rec> </arr> </arr> </rec> <?xml version="1.0" encoding="UTF-8"?> <rec> <str>elem</str> <str>elshape</str> <str>g</str> <arr> <str>2</str> </arr> <str>tvars</str> <str>on</str> <str>implicitbmtypes</str> <str>on</str> <str>geomdim</str> <arr> <arr> <rec> <str>ind</str> <arr> <arr> <str>1</str> </arr> </arr> <str>use</str> <arr> <str></str> </arr> <str>shelem</str> <rec> <str>default</str> <arr> <arr> <str>shdisc</str> <rec> <str>basename</str> <str>comp1.gop.sn1</str> <str>mdim</str> <str>0</str> <str>order</str> <str>0</str> <str>frame</str> <arr> <str>material</str> </arr> <str>declare</str> <arr> <str>true</str> </arr> <str>valuetype</str> <str>real</str> </rec> </arr> </arr> <str>case</str> <arr> </arr> <str>mind</str> <arr> </arr> </rec> </rec> </arr> </arr> </rec> <?xml version="1.0" encoding="UTF-8"?> <rec> <str>elem</str> <str>elshape</str> <str>g</str> <arr> <str>2</str> </arr> <str>tvars</str> <str>on</str> <str>implicitbmtypes</str> <str>on</str> <str>geomdim</str> <arr> <arr> <rec> <str>ind</str> <arr> <arr> <str>1</str> </arr> </arr> <str>use</str> <arr> <str></str> </arr> <str>shelem</str> <rec> <str>default</str> <arr> <arr> <str>shdisc</str> <rec> <str>basename</str> <str>comp1.gop.sn2</str> <str>mdim</str> <str>0</str> <str>order</str> <str>0</str> <str>frame</str> <arr> <str>material</str> </arr> <str>declare</str> <arr> <str>true</str> </arr> <str>valuetype</str> <str>real</str> </rec> </arr> </arr> <str>case</str> <arr> </arr> <str>mind</str> <arr> </arr> </rec> </rec> </arr> </arr> </rec> <?xml version="1.0" encoding="UTF-8"?> <rec> <str>elem</str> <str>elshape</str> <str>g</str> <arr> <str>2</str> </arr> <str>tvars</str> <str>on</str> <str>implicitbmtypes</str> <str>on</str> <str>geomdim</str> <arr> <arr> <rec> <str>ind</str> <arr> <arr> <str>1</str> </arr> </arr> <str>use</str> <arr> <str></str> </arr> <str>shelem</str> <rec> <str>default</str> <arr> <arr> <str>shdisc</str> <rec> <str>basename</str> <str>comp1.gop.sn3</str> <str>mdim</str> <str>0</str> <str>order</str> <str>0</str> <str>frame</str> <arr> <str>material</str> </arr> <str>declare</str> <arr> <str>true</str> </arr> <str>valuetype</str> <str>real</str> </rec> </arr> </arr> <str>case</str> <arr> </arr> <str>mind</str> <arr> </arr> </rec> </rec> </arr> </arr> </rec> <?xml version="1.0" encoding="UTF-8"?> <rec> <str>elem</str> <str>elshape</str> <str>g</str> <arr> <str>2</str> </arr> <str>tvars</str> <str>on</str> <str>implicitbmtypes</str> <str>on</str> <str>geomdim</str> <arr> <arr> <rec> <str>ind</str> <arr> <arr> <str>1</str> </arr> </arr> <str>use</str> <arr> <str></str> </arr> <str>shelem</str> <rec> <str>default</str> <arr> <arr> <str>shdisc</str> <rec> <str>basename</str> <str>comp1.gop.atten</str> <str>mdim</str> <str>0</str> <str>order</str> <str>0</str> <str>frame</str> <arr> <str>material</str> </arr> <str>declare</str> <arr> <str>true</str> </arr> <str>valuetype</str> <str>real</str> </rec> </arr> </arr> <str>case</str> <arr> </arr> <str>mind</str> <arr> </arr> </rec> </rec> </arr> </arr> </rec> <?xml version="1.0" encoding="UTF-8"?> <rec> <str>elem</str> <str>elshape</str> <str>g</str> <arr> <str>2</str> </arr> <str>tvars</str> <str>on</str> <str>implicitbmtypes</str> <str>on</str> <str>geomdim</str> <arr> <arr> <rec> <str>ind</str> <arr> <arr> <str>1</str> </arr> </arr> <str>use</str> <arr> <str></str> </arr> <str>shelem</str> <rec> <str>default</str> <arr> <arr> <str>shdisc</str> <rec> <str>basename</str> <str>comp1.gop.Q0</str> <str>mdim</str> <str>0</str> <str>order</str> <str>0</str> <str>frame</str> <arr> <str>material</str> </arr> <str>declare</str> <arr> <str>true</str> </arr> <str>valuetype</str> <str>real</str> </rec> </arr> </arr> <str>case</str> <arr> </arr> <str>mind</str> <arr> </arr> </rec> </rec> </arr> </arr> </rec> <?xml version="1.0" encoding="UTF-8"?> <rec> <str>elem</str> <str>elshape</str> <str>g</str> <arr> <str>2</str> </arr> <str>tvars</str> <str>on</str> <str>implicitbmtypes</str> <str>on</str> <str>geomdim</str> <arr> <arr> <rec> <str>ind</str> <arr> <arr> <str>1</str> </arr> </arr> <str>use</str> <arr> <str></str> </arr> <str>shelem</str> <rec> <str>default</str> <arr> <arr> <str>shdisc</str> <rec> <str>basename</str> <str>comp1.qx</str> <str>mdim</str> <str>0</str> <str>order</str> <str>0</str> <str>frame</str> <arr> <str>material</str> </arr> <str>declare</str> <arr> <str>true</str> </arr> <str>valuetype</str> <str>real</str> </rec> </arr> </arr> <str>case</str> <arr> </arr> <str>mind</str> <arr> </arr> </rec> </rec> </arr> </arr> </rec> <?xml version="1.0" encoding="UTF-8"?> <rec> <str>elem</str> <str>elshape</str> <str>g</str> <arr> <str>2</str> </arr> <str>tvars</str> <str>on</str> <str>implicitbmtypes</str> <str>on</str> <str>geomdim</str> <arr> <arr> <rec> <str>ind</str> <arr> <arr> <str>1</str> </arr> </arr> <str>use</str> <arr> <str></str> </arr> <str>shelem</str> <rec> <str>default</str> <arr> <arr> <str>shdisc</str> <rec> <str>basename</str> <str>comp1.qy</str> <str>mdim</str> <str>0</str> <str>order</str> <str>0</str> <str>frame</str> <arr> <str>material</str> </arr> <str>declare</str> <arr> <str>true</str> </arr> <str>valuetype</str> <str>real</str> </rec> </arr> </arr> <str>case</str> <arr> </arr> <str>mind</str> <arr> </arr> </rec> </rec> </arr> </arr> </rec> <?xml version="1.0" encoding="UTF-8"?> <rec> <str>elem</str> <str>elshape</str> <str>g</str> <arr> <str>2</str> </arr> <str>tvars</str> <str>on</str> <str>implicitbmtypes</str> <str>on</str> <str>geomdim</str> <arr> <arr> <rec> <str>ind</str> <arr> <arr> <str>1</str> </arr> </arr> <str>use</str> <arr> <str></str> </arr> <str>shelem</str> <rec> <str>default</str> <arr> <arr> <str>shdisc</str> <rec> <str>basename</str> <str>comp1.kx</str> <str>mdim</str> <str>0</str> <str>order</str> <str>0</str> <str>frame</str> <arr> <str>material</str> </arr> <str>declare</str> <arr> <str>true</str> </arr> <str>valuetype</str> <str>real</str> </rec> </arr> </arr> <str>case</str> <arr> </arr> <str>mind</str> <arr> </arr> </rec> </rec> </arr> </arr> </rec> <?xml version="1.0" encoding="UTF-8"?> <rec> <str>elem</str> <str>elshape</str> <str>g</str> <arr> <str>2</str> </arr> <str>tvars</str> <str>on</str> <str>implicitbmtypes</str> <str>on</str> <str>geomdim</str> <arr> <arr> <rec> <str>ind</str> <arr> <arr> <str>1</str> </arr> </arr> <str>use</str> <arr> <str></str> </arr> <str>shelem</str> <rec> <str>default</str> <arr> <arr> <str>shdisc</str> <rec> <str>basename</str> <str>comp1.ky</str> <str>mdim</str> <str>0</str> <str>order</str> <str>0</str> <str>frame</str> <arr> <str>material</str> </arr> <str>declare</str> <arr> <str>true</str> </arr> <str>valuetype</str> <str>real</str> </rec> </arr> </arr> <str>case</str> <arr> </arr> <str>mind</str> <arr> </arr> </rec> </rec> </arr> </arr> </rec> c<?xml version="1.0" encoding="UTF-8"?> <rec> <str>elem</str> <str>elgpspec</str> <str>g</str> <arr> <str>1</str> <str>2</str> </arr> <str>geom</str> <arr> <rec> <str>ep</str> <rec> <str>default</str> <arr> <str>1</str> <str>1</str> <str>1</str> <str>1</str> <str>1</str> <str>1</str> <str>1</str> </arr> <str>case</str> <arr> </arr> <str>mind</str> <arr> </arr> </rec> </rec> <rec> <str>ep</str> <rec> <str>default</str> <arr> <str>1</str> <str>1</str> <str>1</str> <str>1</str> <str>1</str> <str>1</str> <str>1</str> </arr> <str>case</str> <arr> </arr> <str>mind</str> <arr> </arr> </rec> </rec> </arr> </rec> <?xml version="1.0" encoding="UTF-8"?> <rec> <str>elem</str> <str>eleqw</str> <str>g</str> <arr> <str>2</str> </arr> <str>geomdim</str> <arr> <arr> <rec> <str>coeff</str> <arr> <arr> <str>test(comp1.gop.lambda0)*comp1.gop.lambda0t</str> </arr> </arr> <str>ipoints</str> <arr> <arr> <str>1</str> </arr> </arr> <str>dvolname</str> <arr> <arr> <str>1</str> </arr> </arr> <str>ind</str> <arr> <arr> <str>1</str> </arr> </arr> </rec> </arr> </arr> <str>assemcase</str> <str>0</str> </rec> 9<?xml version="1.0" encoding="UTF-8"?> <rec> <str>elem</str> <str>eleqw</str> <str>g</str> <arr> <str>2</str> </arr> <str>geomdim</str> <arr> <arr> <rec> <str>coeff</str> <arr> <arr> <str>test(comp1.gop.r1)*(comp1.gop.r1t+comp1.gop.Vg)</str> <str>test(comp1.gop.r1_init)*comp1.gop.r1_initt</str> </arr> </arr> <str>ipoints</str> <arr> <arr> <str>1</str> <str>1</str> </arr> </arr> <str>dvolname</str> <arr> <arr> <str>1</str> <str>1</str> </arr> </arr> <str>ind</str> <arr> <arr> <str>1</str> </arr> </arr> </rec> </arr> </arr> <str>assemcase</str> <str>0</str> </rec> <?xml version="1.0" encoding="UTF-8"?> <rec> <str>elem</str> <str>eleqw</str> <str>g</str> <arr> <str>2</str> </arr> <str>geomdim</str> <arr> <arr> <rec> <str>coeff</str> <arr> <arr> <str>test(comp1.gop.I0)*comp1.gop.I0t</str> </arr> </arr> <str>ipoints</str> <arr> <arr> <str>1</str> </arr> </arr> <str>dvolname</str> <arr> <arr> <str>1</str> </arr> </arr> <str>ind</str> <arr> <arr> <str>1</str> </arr> </arr> </rec> </arr> </arr> <str>assemcase</str> <str>0</str> </rec> l<?xml version="1.0" encoding="UTF-8"?> <rec> <str>elem</str> <str>eleqw</str> <str>g</str> <arr> <str>2</str> </arr> <str>geomdim</str> <arr> <arr> <rec> <str>coeff</str> <arr> <arr> <str>test(comp1.gop.sn1)*comp1.gop.sn1t</str> <str>test(comp1.gop.sn2)*comp1.gop.sn2t</str> <str>test(comp1.gop.sn3)*comp1.gop.sn3t</str> </arr> </arr> <str>ipoints</str> <arr> <arr> <str>1</str> <str>1</str> <str>1</str> </arr> </arr> <str>dvolname</str> <arr> <arr> <str>1</str> <str>1</str> <str>1</str> </arr> </arr> <str>ind</str> <arr> <arr> <str>1</str> </arr> </arr> </rec> </arr> </arr> <str>assemcase</str> <str>0</str> </rec> <?xml version="1.0" encoding="UTF-8"?> <rec> <str>elem</str> <str>eleqw</str> <str>g</str> <arr> <str>2</str> </arr> <str>geomdim</str> <arr> <arr> <rec> <str>coeff</str> <arr> <arr> <str>test(comp1.gop.atten)*(comp1.gop.attent-comp1.gop.attenCoeff)</str> </arr> </arr> <str>ipoints</str> <arr> <arr> <str>1</str> </arr> </arr> <str>dvolname</str> <arr> <arr> <str>1</str> </arr> </arr> <str>ind</str> <arr> <arr> <str>1</str> </arr> </arr> </rec> </arr> </arr> <str>assemcase</str> <str>0</str> </rec> <?xml version="1.0" encoding="UTF-8"?> <rec> <str>elem</str> <str>eleqw</str> <str>g</str> <arr> <str>2</str> </arr> <str>geomdim</str> <arr> <arr> <rec> <str>coeff</str> <arr> <arr> <str>test(comp1.gop.Q0)*comp1.gop.Q0t</str> </arr> </arr> <str>ipoints</str> <arr> <arr> <str>1</str> </arr> </arr> <str>dvolname</str> <arr> <arr> <str>1</str> </arr> </arr> <str>ind</str> <arr> <arr> <str>1</str> </arr> </arr> </rec> </arr> </arr> <str>assemcase</str> <str>0</str> </rec> <?xml version="1.0" encoding="UTF-8"?> <rec> <str>elem</str> <str>eleqw</str> <str>g</str> <arr> <str>2</str> </arr> <str>geomdim</str> <arr> <arr> <rec> <str>coeff</str> <arr> <arr> <str>test(comp1.qx)*(-comp1.qxt+comp1.gop.vgx)</str> <str>test(comp1.qy)*(-comp1.qyt+comp1.gop.vgy)</str> <str>test(comp1.kx)*(-comp1.kxt+comp1.gop.dkdtx)</str> <str>test(comp1.ky)*(-comp1.kyt+comp1.gop.dkdty)</str> </arr> </arr> <str>ipoints</str> <arr> <arr> <str>1</str> <str>1</str> <str>1</str> <str>1</str> </arr> </arr> <str>dvolname</str> <arr> <arr> <str>1</str> <str>1</str> <str>1</str> <str>1</str> </arr> </arr> <str>ind</str> <arr> <arr> <str>1</str> </arr> </arr> </rec> </arr> </arr> <str>assemcase</str> <str>0</str> </rec> Z<?xml version="1.0" encoding="UTF-8"?> <rec> <str>elemaux</str> <str>elevent</str> </rec> <?xml version="1.0" encoding="UTF-8"?> <rec> <str>elem</str> <str>elconst</str> <str>var</str> <arr> <str>unit_s_cf</str> <str>1</str> <str>unit_rad_cf</str> <str>1</str> <str>unit_K_cf</str> <str>1</str> <str>unit_J_cf</str> <str>1</str> <str>unit_m_cf</str> <str>1</str> <str>unit_C_cf</str> <str>1</str> <str>unit_atm_cf</str> <str>101325</str> <str>unit_kg_cf</str> <str>1</str> <str>unit_mol_cf</str> <str>1</str> </arr> </rec> <?xml version="1.0" encoding="UTF-8"?> <rec> <str>elem</str> <str>elconst</str> <str>var</str> <arr> <str>unit_nm_cf</str> <str>1.0E-9</str> </arr> </rec> <?xml version="1.0" encoding="UTF-8"?> <rec> <str>elem</str> <str>elconst</str> <str>var</str> <arr> <str>unit_um_cf</str> <str>1.0E-6</str> <str>unit_W_cf</str> <str>1</str> </arr> </rec> <?xml version="1.0" encoding="UTF-8"?> <rec> <str>elem</str> <str>elinline</str> <str>name</str> <str>sqrteps</str> <str>args</str> <arr> <str>sqrteps__x__internalArgument</str> </arr> <str>expr</str> <str>sqrt(sqrteps__x__internalArgument)</str> <str>dexpr</str> <arr> <str>0.5/sqrt(sqrteps__x__internalArgument+eps)</str> </arr> <str>complex</str> <str>false</str> <str>linear</str> <str>false</str> </rec> <?xml version="1.0" encoding="UTF-8"?> <rec> <str>elem</str> <str>elinline</str> <str>name</str> <str>poweps</str> <str>args</str> <arr> <str>poweps__x__internalArgument</str> <str>poweps__n__internalArgument</str> </arr> <str>expr</str> <str>poweps__x__internalArgument^poweps__n__internalArgument</str> <str>dexpr</str> <arr> <str>if(poweps__n__internalArgument&lt;1, poweps__n__internalArgument*(poweps__x__internalArgument+eps)^(poweps__n__internalArgument-1), poweps__n__internalArgument*poweps__x__internalArgument^(poweps__n__internalArgument-1))</str> <str>log(poweps__x__internalArgument)*poweps__x__internalArgument^poweps__n__internalArgument</str> </arr> <str>complex</str> <str>false</str> <str>linear</str> <str>false</str> </rec> td comp1.gop.lambda0 comp1.gop.r comp1.gop.I0 comp1.gop.scomp1.gop.atten comp1.gop.Q0 comp1.qgop comp1.kgopcomp1.gop.lambda0 comp1.gop.r1comp1.gop.r1_init comp1.gop.I0 comp1.gop.sn1 comp1.gop.sn2 comp1.gop.sn3comp1.gop.atten comp1.gop.Q0comp1.qxcomp1.qycomp1.kxcomp1.ky comp1.gop.I0 comp1.gop.Q0comp1.gop.attencomp1.gop.lambda0 comp1.gop.r1comp1.gop.r1_init comp1.gop.sn1 comp1.gop.sn2 comp1.gop.sn3comp1.kxcomp1.kycomp1.qxcomp1.qy ?ls(0)?ls(2)" +,-./0123456789:;<hipqrstuvwxyz{|}~    CDEFGHIJJKLM;<=>?@ABCDEFGHIJKLMN"#$%&'()*+,-./0123[\^_`abc ^_`a&'()~5 6 h i   / 0 > ? L M Y Z c d i j k l ""?ls(2)"  !"#$%&'(=>?@ABCDEFGHIJKLM\]^_`abcdefgjklmno ghijklmnopqrstuvwxyz3456789:]^_`abcdefghijklmnopOPQRSTUV !Z]vwxy     bcdefghi12349:;<   3 4 f g   - . < = J K W X a b e f g h ""?ls(2)))*NOPQRSTUVWXYZ[ !"#$%&'()*+,-./0123456789:;<=>?@ABKLMNOPQRSTUVWXYZ[\]^_`abcdef{|}~      !"#$%&'()*+,-./012;<=>?@ABCDEFGHINOPQRSTUVWXYZ[\qrstuvwxyz{|}~      !"#$%&'()*+,-./0123456789:WXYZ[\]^_`abcdefghijklmnopqrstuvwxyz{|}~     456789:;<=>?@ABCDEFGHIJKLMNOPQRSTUVWXYZ[\]^_`abcdefghijklmnopqrstuvwxyz{|}~      !"#$%&'()*+,-./0123456789:;<=>?@ABCDEFGHIJKLMNOPQRSTUVWXYdefghijklmnopqrstuvwxyz{|}~     !"#$%&'()*+,-./0123456789:;<=>?@ABCDEFGHIJKLMNOPQRSTUVWXYZ[\]^_`abcdefghijklmnopqrstuz{|}~ !"#$%&'()*+,-./0123456789:;<=>?@ABCDEFGHIJKLMNOPQRSTUVWXYZ[\]jklmnopqrstuvwxyz{|}~      !"#$%*+,-./05678=>?@ABCDEFGHIJKLMNOPQRSTUVWXYZ[\]^_`abcdefghijklmnopqrstuvwxyz{|}                         ! " # $ % & ' ( ) * + , - . / 0 1 2 7 8 9 : ; < = > ? @ A B C D E F G H I J K L M N O P Q R S T U V W X Y Z [ \ ] ^ _ ` a b c d e j k l m n o p q r s t u v w x y z { | } ~                        ! " # $ % & ' ( ) * + , 1 2 3 4 5 6 7 8 9 : ; @ A B C D E F G H I N O P Q R S T U V [ \ ] ^ _ ` ))?ls(1) 0456789:;<=>IJKLMNefghijklmn !"8FGHIUVYZ[\defgmnop|}??comp1.sys1.nXc@ElContShapeVarcomp1.sys1.nXc@ElContShapeVar?comp1.sys1.nXc@ElContShapeVar?comp1.sys1.nYc@ElContShapeVarcomp1.sys1.nYc@ElContShapeVar?comp1.sys1.nYc@ElContShapeVar?comp1.sys1.nZc@ElContShapeVarcomp1.sys1.nZc@ElContShapeVar?comp1.sys1.nZc@ElContShapeVar?nXmc@ElContShapeVarnXmc@ElContShapeVar?nXmc@ElContShapeVar?nYmc@ElContShapeVarnYmc@ElContShapeVar?nYmc@ElContShapeVar?comp1.sys1.nXc@ElContShapeVarcomp1.sys1.nYc@ElContShapeVarcomp1.sys1.nZc@ElContShapeVarnXmc@ElContShapeVarnYmc@ElContShapeVar  !"#$%&'()*+,-./0123456789:;<=>?@ABCDEFGHIJKLMNOPQRSTUVWXYZ[\]^_`abcdefghijklmnopqrstuvwxyz{|}~      !"#$%    !"#$%&'()*+,-./0123456789:;<=>C?ADB@EFGHIJKLMNOPQRSTUVWXYZ[\]^_`abcdefghijklmnopqrstuvwxyz{|}~&'-#<FP_Znx"&0:DNXblv  *$.8BLV`j(2<Fr|R\fp $ . 8 B L V ` j t - 7 A K  ' 1 ; E O Y c m w S u  $.jt~ nx6|0X Hp$Q[e2(AKUdis} '+5?IS]gq{%/)3=GQ[eo-7AK wWaku ) 3 = G Q [ e o y 2 < F P  , 6 @ J T ^ h r | X  z )3oys};5]%Mu)V`j7 o'.$=GQ`[oy#'1;EOYcmw !+%/9CMWak)3=Gs}S]gq % / 9 C M W a k u . 8 B L  ( 2 < F P Z d n x T v %/ku oy7}1Y!Iq%R\f3)BLVejt~ (,6@JT^hr|&0 *4>HR\fp.8BL xXblv * 4 > H R \ f p z 3 = G Q  - 7 A K U _ i s } Y  {  *4pzt~<6^&Nv*Wak8 p'/%>HRa\pz$(2<FPZdnx",&0:DNXbl*4>Ht~T^hr & 0 : D N X b l v / 9 C M  ) 3 = G Q [ e o y U w &0lv pz8~2Z"Jr&S]g4 *CMWfku )-7AKU_is} '1!+5?IS]gq/9CM yYcmw! + 5 ? I S ] g q { 4 > H R  . 8 B L V ` j t ~ Z  | !+5q{u=7_'Ow+Xbl9 q'0&?ISb]q{%)3=GQ[eoy#-'1;EOYcm+5?IuU_is ' 1 ; E O Y c m w 0 : D N  * 4 > H R \ f p z V x '1mw q{93[#Ks'T^h5!+DNXglv  *.8BLV`jt~ (2",6@JT^hr0:DN  zZdnx" , 6 @ J T ^ h r | 5 ? I S  / 9 C M W a k u  [  } ",6r|v>8`(Px,Ycm: r'1'@JTc^r|&*4>HR\fpz$.(2<FPZdn,6@JvV`jt ( 2 < F P Z d n x 1 ; E O  + 5 ? I S ] g q { W  y (2nxr|:4\$Lt(U_i6 ",EOYhmw !+/9CMWaku )3#-7AKU_is1;EO !{[eoy# - 7 A K U _ i s } 6 @ J T  0 : D N X b l v \  ~ #-7s} w?9a)Qy-Zdn;s' ')+-/1357aikmoqsuwy{} -/13DFHJLNQSPV|~ 1579;=?ACEq%'7EQ]iqy  (*,.02468bjlnprtvxz|~ .024EGIKMORTUW} 268:<>@BDFr&(8FR^jrz ?ls(1) ??comp1.sys1.nXc@ElContShapeVarcomp1.sys1.nXc@ElContShapeVar?comp1.sys1.nXc@ElContShapeVar?comp1.sys1.nYc@ElContShapeVarcomp1.sys1.nYc@ElContShapeVar?comp1.sys1.nYc@ElContShapeVar?comp1.sys1.nZc@ElContShapeVarcomp1.sys1.nZc@ElContShapeVar?comp1.sys1.nZc@ElContShapeVar?nXmc@ElContShapeVarnXmc@ElContShapeVar?nXmc@ElContShapeVar?nYmc@ElContShapeVarnYmc@ElContShapeVar?nYmc@ElContShapeVar?comp1.sys1.nXc@ElContShapeVarcomp1.sys1.nYc@ElContShapeVarcomp1.sys1.nZc@ElContShapeVarnXmc@ElContShapeVarnYmc@ElContShapeVarBGLCHMDINEJOFKP %&?ls(1) !"#$*+,-./123UYZ[\]^_`abcopqrst     245679:;<=ESTWX`ahijkstuv~??comp1.sys1.nXc@ElContShapeVarcomp1.sys1.nXc@ElContShapeVar?comp1.sys1.nXc@ElContShapeVar?comp1.sys1.nYc@ElContShapeVarcomp1.sys1.nYc@ElContShapeVar?comp1.sys1.nYc@ElContShapeVar?comp1.sys1.nZc@ElContShapeVarcomp1.sys1.nZc@ElContShapeVar?comp1.sys1.nZc@ElContShapeVar?nXmc@ElContShapeVarnXmc@ElContShapeVar?nXmc@ElContShapeVar?nYmc@ElContShapeVarnYmc@ElContShapeVar?nYmc@ElContShapeVar?comp1.sys1.nXc@ElContShapeVarcomp1.sys1.nYc@ElContShapeVarcomp1.sys1.nZc@ElContShapeVarnXmc@ElContShapeVarnYmc@ElContShapeVar  !"#$%&'()*+,-./0123456789:;<=>?@ABCDEFGHIJKLMNOPQRSTUVWXYZ[\]^_`abcdefghijklmnopqrstuvwxyz{|}~         !"#$%&'()*+,-./0123456789:;<=?DA>BC@EFGHIJKLMNOPQRSTUVWXYZ[\]^_`abcdefghijklmnopqrstuvwxyz{|}~ !,@OJ^6mw !uy_is}'1;E?IS]  Z d n x   "  0 : D N b l v f p =GQ[#-7'EO+S{Ck31;ETYchr|pt~Zdnx",6@:DNX %z~ U _ i s }   + 5 ? I ] g q { a k 8BLV(2"@J&Nv>f.8=!-APK_7nx"vz`jt~(2<F@JT^! [ e o y   #  1 ; E O c m w g q >HR\$.8(FP,T|Dl 42<FUZdis} qu[eoy#-7A;EOY &{ V ` j t ~   , 6 @ J ^ h r | b l 9CMW)3#AK'Ow?g/9>!.BQL`8oy#w{aku)3=GAKU_ " \ f p z   $  2 < F P d n x h r ?IS]%/9)GQ-U}Em!53=GV[ejt~ rv\fpz$.8B<FPZ'| W a k u     - 7 A K _ i s } c m :DNX *4$BL(Px@h0:?!/CRMa9pz$x|blv*4>HBLV` # ] g q {   %  3 = G Q e o y i s @JT^&0: *HR.V~Fn"64>HW\fku sw]gq{%/9C=GQ[(} X b l v   . 8 B L ` j t ~ d n ;EOY!+5%CM)QyAi1;@!0DSNb:q{%y}cmw+5?ICMWa $ ^ h r |   & 4 > H R f p z j t AKU_'1;!+IS/WGo#75?IX]glv  tx^hr|&0:D>HR\)~ Y c m w  !  / 9 C M a k u  e o <FPZ",6&DN*RzBj2<A!  "9$=@?C;FHJVXZ\^`dfh 68:<moqs ,.04fjlnptvxz|*,24:<JLV\hpx!#:<>ABDEGIUWY[]_ceg 579;lnpr  +-/3eikmosuwy{)+139;IKU[gow?ls(1)9)Hd-.>?OPQ]l{$ 9??comp1.sys1.nXc@ElContShapeVarcomp1.sys1.nXc@ElContShapeVar?comp1.sys1.nXc@ElContShapeVar?comp1.sys1.nYc@ElContShapeVarcomp1.sys1.nYc@ElContShapeVar?comp1.sys1.nYc@ElContShapeVar?comp1.sys1.nZc@ElContShapeVarcomp1.sys1.nZc@ElContShapeVar?comp1.sys1.nZc@ElContShapeVar?nXmc@ElContShapeVarnXmc@ElContShapeVar?nXmc@ElContShapeVar?nYmc@ElContShapeVarnYmc@ElContShapeVar?nYmc@ElContShapeVar?comp1.sys1.nXc@ElContShapeVarcomp1.sys1.nYc@ElContShapeVarcomp1.sys1.nZc@ElContShapeVarnXmc@ElContShapeVarnYmc@ElContShapeVar99  !"#$%&'()*+,-./01234567899:;<=>?@ABCDEFGHIJKLMNOPQRSTUVWXYZ[\]^_`abcdefghijklmnopq9r     !"#s%&'()*+,-./012345678tu UcO   T^ ( > H ei1?g/WPJh  Y # 9 C M `d,:b*RzmR u VdP   U_ ) ? I fj2@h0XQKi   Z $ : D N ae-;c+S{nS u WeQ   V` * @ J gk3Ai 1YRLj   [ % ; E O bf.<d,T|oT uXfR   Wa! + A K hl4Bj 2Z SMk   \ & < F P cg/=e-U}pU uYgS  Xb" , B L im5Ck 3[ TNl    ] ' = G Q dh0>f.V~qV u&T B>?A(*\^~$6HT`lt|S =C@')[]} #5GS_ks{??ls(1)%&'(?@ABCDEFGOPQRSTVWXuvwxyz{|}~#$%&'()*+,/013@ABCDJKLMNR^_bcqrwxyz??comp1.sys1.nXc@ElContShapeVarcomp1.sys1.nXc@ElContShapeVar?comp1.sys1.nXc@ElContShapeVar?comp1.sys1.nYc@ElContShapeVarcomp1.sys1.nYc@ElContShapeVar?comp1.sys1.nYc@ElContShapeVar?comp1.sys1.nZc@ElContShapeVarcomp1.sys1.nZc@ElContShapeVar?comp1.sys1.nZc@ElContShapeVar?nXmc@ElContShapeVarnXmc@ElContShapeVar?nXmc@ElContShapeVar?nYmc@ElContShapeVarnYmc@ElContShapeVar?nYmc@ElContShapeVar?comp1.sys1.nXc@ElContShapeVarcomp1.sys1.nYc@ElContShapeVarcomp1.sys1.nZc@ElContShapeVarnXmc@ElContShapeVarnYmc@ElContShapeVar  !"#$%&'()*+,-./0123456789:;<=>?@ABCDEFGHIJKLMNOPQRSTUVWXYZ[\]^_`abcdefghijklmnopqrstuvwxyz{|}~         !"#$%&'()*+,-/201.3456789:;<=@D>B?CAEFGHIJKLMNOPQRSTUVWXYZ[\]^_`abcdefghijklmnopqrstuvwxyz{|}~ !9CMWak# &0gq{/9CM     &  * 4 \  AKU_ Ycmw !Iq9a4>HR\fz !+5blv*4>H   !    % / W <FPZT^hrDl 4\ !:DNXbl$'1hr|0:DN    '  ! + 5 ]  BLV` Zdnx"Jr:b5?IS]g{  ",6cmw+5?I    "    & 0 X =GQ[U_is Em 5] !;EOYcm%(2is}1;EO    (   " , 6 ^  CMWa [eoy#Ks;c6@JT^h|   #-7dnx,6@J    #   ' 1 Y >HR\V`jt Fn6^ !<FPZdn&)3jt~2<FP     )   # - 7 _ DNXb \fpz$Lt<d7AKU_i} ! $.8eoy-7AK     $   ( 2 Z ?IS]Waku Go7_ !=GQ[eo '*4 ku3=GQ     *   $ . 8 ` EOYc ]gq{%Mu=e8BLV`j~" %/9fpz.8BL     %   ) 3 [  @JT^Xblv  Hp8` !&LNPR"$&(*,Y[]_adchjfuwy{ "$&HJLNPRTVXZ`bdh   ".0>@BDNPXZbdfnv~KMOQ!#%')+XZ\^`begiktvxz!#%GIKMOQSUWY_acg  !-/=?ACMOWYacemu}?ls(0)?ls(0)?ls(0)?ls(0)?ls(0)d  !"#$%&'()*+,-./0123456789:;<=>?@ABCDEFGHIJKLMNOPQRSTUVWXYZ[\]^_`abcd comp1.gop.I0 comp1.gop.Q0comp1.gop.attencomp1.gop.lambda0 comp1.gop.r1comp1.gop.r1_init comp1.gop.sn1 comp1.gop.sn2 comp1.gop.sn3comp1.kx comp1.ky comp1.qx comp1.qy  comp1.gop.I0 comp1.gop.Q0comp1.gop.attencomp1.gop.lambda0 comp1.gop.r1comp1.gop.r1_init comp1.gop.sn1 comp1.gop.sn2 comp1.gop.sn3comp1.kxcomp1.kycomp1.qxcomp1.qy d  d  !"#$%&'()*+,-./0123456789:;<=>?@ABCDEFGHIJKLMNOPQRSTUVWXYZ[\]^_`abc d '4AN[hu+8ER_ly"/<IVcp} &3@MZgt*7DQ^kxd(5BO\iv,9FS`mz #0=JWdq~ '4AN[hu+8ER_lyd)6CP]jw -:GTan{ $1>KXer(5BO\iv,9FS`mz d*7DQ^kx!.;HUbo| %2?LYfs)6CP]jw -:GTan{ d+8ER_ly"/<IVcp} &3@MZgt*7DQ^kx!.;HUbo| d,9FS`mz #0=JWdq~ '4AN[hu+8ER_ly"/<IVcp} d -:GTan{ $1>KXer(5BO\iv,9FS`mz #0=JWdq~ d!.;HUbo| %2?LYfs)6CP]jw -:GTan{ $1>KXerd"/<IVcp} &3@MZgt*7DQ^kx!.;HUbo| %2?LYfsd #0=JWdq~ '4AN[hu+8ER_ly"/<IVcp} &3@MZgtd $1>KXer(5BO\iv,9FS`mz #0=JWdq~ '4AN[hud %2?LYfs)6CP]jw -:GTan{ $1>KXer(5BO\ivd &3@MZgt*7DQ^kx!.;HUbo| %2?LYfs)6CP]jw d  !"#$%&'()*+,-./0123456789:;<=>?@ABCDEFGHIJKLMNOPQRSTUVWXYZ[\]^_`abctePK03fePK"nXgeommanager1.mphbinoR0obj GeomManagervu{| 1vfvu{| d  !&1vf h  PK gPK"nXsolution1.mphbin s SOLUTION:4[0]objSolutiontnstody=dy=p ~=dy=|=p ~=8J==dy=(/=|=N֏<=p ~=2=8J==La㧝=dy=W]=(/=r'=|=T׷=N֏<=g=p ~=& .=2=l>=8J=='V=La㧝=qmM=dy=/k=W]=ƜC =(/=M\m=r'==|=,=T׷=)֣=N֏<=s{=g=%)&>p ~>>& .>'>2>L5>l>>qR>8J=>ŕ>'V>E>La㧝>߳>qmM>ብ>dy>(JuU>/k>M a>W]>rM>ƜC >"9e>(/>v.% >M\m >A: >r' > Ft > >)Q$ >| >N] >, >sni >T׷ >9u׭4 >)֣ >֙ >N֏<>όՅ>s{>qD>g>*f]>%)&>X$R>p ~>9>>c>& .>^Z>'>o>2> >L5>z{a>l>>_޹>qR>oo  !"#$%&'()*+,-./0123456789:;<=>?@ABCDEFGHIJKLMNOPQRSTUVWXYZ[\]^_`abcdefghijklmn$solblock0_3447524099990751232.mphbin"solution8372993959906036974.mphbin)solutionstatic12599438256788503707.mphbin  Time PKG: PK"nXsolutionstatic1.mphbinLSOLUTIONSTATIC:4[0]objSolutionStatic   !"#$%&'()*+,-./0123456789:;<=>?@ABCDEFGHIJKLMNOPQRSTUVWXYZ[\]^_`abcdefghijklmnopqrstuvwxyz{|}~      !"#$%&'()*+,-./0123456789:;<=>?@ABCDEFGHIJKLMNOPQRSTUVWXYZ[\]^_`abcdefghijklmnopqrstuvwxyz{|}~      !"#$%&'()*+,-./0123456789:;<=>?@ABCDEFGHIJKLMNOPQRSTUVWXYZ[\]^_`abcdefghijklmnopqrstuvwxyz{|}~      !"#$%&'()*+,-./0123456789:;<=>?@ABCDEFGHIJKLMNOPQRSTUVWXYZ[\]^_`abcdefghijklmnopqrstuvwxyz{|}~      !"#$%&'()*+,-./0123456789:;<=>?@ABCDEFGHIJKLMNOPQRSTUVWXYZ[\]^_`abcdefghijklmnopqrstuvwxyz{|}~     PKWPK"nXsolutionblock1.mphbinobj SolutionBlock oo@@{Gz?Iך>yX۠AyX۠A hm??@@{Gz?&E}\>yX۠AyX۠A Tt4m??@@{Gz?m_b>yX۠AyX۠AO^m??@@{Gz?UB0>yX۠AyX۠A/M%Qm??@@{Gz?*$>yX۠AyX۠A( l??@@{Gz?f3>yX۠AyX۠A3=(l??@@{Gz?tmx>yX۠AyX۠Aս?l??@@{Gz?QGw׽>yX۠AyX۠A2 fk??@@{Gz?-A>yX۠AyX۠Artk??@@{Gz? H>yX۠AyX۠AȆʾvk??@@{Gz?ct>yX۠AyX۠A 7>6k??@@{Gz?˜Vӝ>yX۠AyX۠A#j??@@{Gz?!!9>yX۠AyX۠AMuj??@@{Gz?|S^>yX۠AyX۠A{j??@@{Gz?X1>yX۠AyX۠A}?j??@@{Gz?5>&>yX۠AyX۠A޿j??@@{Gz?BÐ.>yX۠AyX۠A'Ipi??@@{Gz?ʥs>yX۠AyX۠Acݑi??@@{Gz?ZSd>yX۠AyX۠A1Yi??@@{Gz?j>yX۠AyX۠Aם>^"i??@@{Gz?B &">yX۠AyX۠A.h??@@{Gz?;D>yX۠AyX۠A5Fh??@@{Gz?k: g>yX۠AyX۠A I>`h??@@{Gz?~:>yX۠AyX۠A+=Oh??@@{Gz?ﬠ>yX۠AyX۠AiZVh??@@{Gz?iݤϠ>yX۠AyX۠AKfg??@@{Gz?(KY>yX۠AyX۠A]g??@@{Gz?FX>yX۠AyX۠AsdZg??@@{Gz?Ӱ7>yX۠AyX۠ArZg??@@{Gz?"xZ>yX۠AyX۠A0,g??@@{Gz?[-}>yX۠AyX۠A=4f??@@{Gz?⟡>yX۠AyX۠ADEf??@@{Gz?mEu¡>yX۠AyX۠A^[:Vf??@@{Gz?t(gL>yX۠AyX۠AHGnmxf??@@{Gz?JlX>yX۠AyX۠AJ6-Mf??@@{Gz?ӰI*>yX۠AyX۠AQ!"f??@@{Gz?&:kM>yX۠AyX۠Ame??@@{Gz?29, p>yX۠AyX۠A[(=e??@@{Gz?b}Ւ>yX۠AyX۠A|>|e??@@{Gz?q>yX۠AyX۠ADyX۠AyX۠Ay1¼Ve??@@{Gz?NI>yX۠AyX۠Av`/e??@@{Gz?>yX۠AyX۠A]o@ e??@@{Gz?*O]@>yX۠AyX۠AQfSd??@@{Gz?~c>yX۠AyX۠AVߠd??@@{Gz?ZDž>yX۠AyX۠Ad??@@{Gz?uݞ|>yX۠AyX۠Ajtd??@@{Gz? 1ˣ>yX۠AyX۠A](EPd??@@{Gz?Q<'>yX۠AyX۠AO r-d??@@{Gz?kk{>yX۠AyX۠Ab9 d??@@{Gz?.lP3>yX۠AyX۠ATc??@@{Gz?]V>yX۠AyX۠A8"c??@@{Gz? 7Ox>yX۠AyX۠A͜c??@@{Gz?x)|@o>yX۠AyX۠AF揇c??@@{Gz?X1$>yX۠AyX۠Au3nbc??@@{Gz?U#>yX۠AyX۠A>^ Bc??@@{Gz?ķH>yX۠AyX۠Aoۄ"c??@@{Gz?2C&>yX۠AyX۠Adwdpc??@@{Gz?H>yX۠AyX۠ADob??@@{Gz?Fk>yX۠AyX۠ArEmb??@@{Gz?|uYa>yX۠AyX۠A~b??@@{Gz?ꤝ>yX۠AyX۠Aib??@@{Gz?Yӥ>yX۠AyX۠A;Flb??@@{Gz?&>yX۠AyX۠ADY)Ob??@@{Gz?63j5>yX۠AyX۠AB}mh2b??@@{Gz?b;>yX۠AyX۠Aeb??@@{Gz?^>yX۠AyX۠Am>a??@@{Gz?6rT>yX۠AyX۠AF8a??@@{Gz?zc >yX۠AyX۠A"Ka??@@{Gz?] TƦ>yX۠AyX۠AVça??@@{Gz?OFs>yX۠AyX۠A`Ia??@@{Gz?:G7( >yX۠AyX۠A|Sra??@@{Gz?(.>yX۠AyX۠AvVxXa??@@{Gz?Q>yX۠AyX۠AƭNm>a??@@{Gz?  Gt>yX۠AyX۠AA"%a??@@{Gz?yX۠AyX۠AB. a??@@{Gz?`l>yX۠AyX۠A` g`??@@{Gz?ϛeܧ>yX۠AyX۠Av*R`??@@{Gz?=$>yX۠AyX۠A:i>`??@@{Gz?h!>yX۠AyX۠AZ)`oة`??@@{Gz?*D>yX۠AyX۠Aٳ`??@@{Gz?Y9g>yX۠AyX۠A$yrz`??@@{Gz?5>yX۠AyX۠ASZ $c`??@@{Gz?dy>yX۠AyX۠A 1L`??@@{Gz?wXϨ>yX۠AyX۠As J5`??@@{Gz?Ai >yX۠AyX۠A-`??@@{Gz?FFZ>yX۠AyX۠Ayao`??@@{Gz?vKw7>yX۠AyX۠A,e_??@@{Gz?<,Z>yX۠AyX۠An#_??@@{Gz?.|>yX۠AyX۠A T_??@@{Gz?hW>yX۠AyX۠A, 0#c_??@@{Gz?3K©>yX۠AyX۠A=8_??@@{Gz?Ec>yX۠AyX۠A#_??@@{Gz?#>yX۠AyX۠Aף^??@@{Gz?"gi*>yX۠AyX۠AI*^??@@{Gz?M>yX۠AyX۠A2n ^??@@{Gz? o>yX۠AyX۠Ak^??@@{Gz?lP4>yX۠AyX۠Ao+D^??@@{Gz?x=>yX۠AyX۠AV@c^??@@{Gz?Iת>yX۠AyX۠A h]??@@yGz?Iך>wX۠AyX۠A hm?#p?@@yGz?%E}\>wX۠AyX۠A Tt4m?#p?@@yGz?m_b>wX۠AyX۠AO^m?#p?@@yGz?UB0>wX۠AyX۠A.M%Qm?#p?@@yGz?*$>wX۠AyX۠A( l?#p?@@yGz?f3>wX۠AyX۠A3=(l?#p?@@yGz?tmx>wX۠AyX۠Aս?l?#p?@@yGz?KGw׽>wX۠AyX۠A2 fk?#p?@@yGz?*A>wX۠AyX۠Artk?#p?@@yGz? H>wX۠AyX۠AȆʾvk?#p?@@yGz?ct>wX۠AyX۠A 7>6k?#p?@@yGz?˜Vӝ>wX۠AyX۠A#j?#p?@@yGz?!!9>wX۠AyX۠AMuj?#p?@@yGz?zS^>wX۠AyX۠A{j?#p?@@yGz?X1>wX۠AyX۠A}?j?#p?@@yGz?5>&>wX۠AyX۠A޿j?#p?@@yGz?BÐ.>wX۠AyX۠A'Ipi?#p?@@yGz?ʥs>wX۠AyX۠Acݑi?#p?@@yGz?ZSd>wX۠AyX۠A1Yi?#p?@@yGz?j>wX۠AyX۠Aם>^"i?#p?@@yGz?B &">wX۠AyX۠A.h?#p?@@yGz?;D>wX۠AyX۠A5Fh?#p?@@yGz?k: g>wX۠AyX۠AI>`h?#p?@@yGz?~:>wX۠AyX۠A+=Oh?#p?@@yGz?ﬠ>wX۠AyX۠AiZVh?#p?@@yGz?iݤϠ>wX۠AyX۠AKfg?#p?@@yGz?(KY>wX۠AyX۠A]g?#p?@@yGz?FX>wX۠AyX۠AsdZg?#p?@@yGz?Ӱ7>wX۠AyX۠ArZg?#p?@@yGz?"xZ>wX۠AyX۠A0,g?#p?@@yGz?[-}>wX۠AyX۠A=4f?#p?@@yGz?⟡>wX۠AyX۠ADEf?#p?@@yGz?mEu¡>wX۠AyX۠A^[:Vf?#p?@@yGz?t(gL>wX۠AyX۠AHGnmxf?#p?@@yGz?JlX>wX۠AyX۠AJ6-Mf?#p?@@yGz?ӰI*>wX۠AyX۠AQ!"f?#p?@@yGz?&:kM>wX۠AyX۠Ame?#p?@@yGz?29, p>wX۠AyX۠A[(=e?#p?@@yGz?b}Ւ>wX۠AyX۠A|>|e?#p?@@yGz?q>wX۠AyX۠ADwX۠AyX۠Ay1¼Ve?#p?@@yGz?NI>wX۠AyX۠Av`/e?#p?@@yGz?>wX۠AyX۠A]o@ e?#p?@@yGz?*O]@>wX۠AyX۠AQfSd?#p?@@yGz?~c>wX۠AyX۠AVߠd?#p?@@yGz?ZDž>wX۠AyX۠Ad?#p?@@yGz?uݞ|>wX۠AyX۠Ajtd?#p?@@yGz? 1ˣ>wX۠AyX۠A](EPd?#p?@@yGz?Q<'>wX۠AyX۠AO r-d?#p?@@yGz?kk{>wX۠AyX۠Ab9 d?#p?@@yGz?.lP3>wX۠AyX۠ATc?#p?@@yGz?]V>wX۠AyX۠A8"c?#p?@@yGz? 7Ox>wX۠AyX۠A͜c?#p?@@yGz?x)|@o>wX۠AyX۠AF揇c?#p?@@yGz?X1$>wX۠AyX۠Aw3nbc?#p?@@yGz?U#>wX۠AyX۠A>^ Bc?#p?@@yGz?ķH>wX۠AyX۠Aoۄ"c?#p?@@yGz?2C&>wX۠AyX۠Adwdpc?#p?@@yGz?H>wX۠AyX۠ADob?#p?@@yGz?Fk>wX۠AyX۠ArEmb?#p?@@yGz?xuYa>wX۠AyX۠A~b?#p?@@yGz?ꤝ>wX۠AyX۠Akb?#p?@@yGz?Yӥ>wX۠AyX۠A;Flb?#p?@@yGz?&>wX۠AyX۠ABY)Ob?#p?@@yGz?63j5>wX۠AyX۠AB}mh2b?#p?@@yGz?b;>wX۠AyX۠Aeb?#p?@@yGz?^>wX۠AyX۠Am>a?#p?@@yGz?6rT>wX۠AyX۠AF8a?#p?@@yGz?zc >wX۠AyX۠A"Ka?#p?@@yGz?[ TƦ>wX۠AyX۠AVça?#p?@@yGz?OFs>wX۠AyX۠A`Ia?#p?@@yGz?:G7( >wX۠AyX۠A|Sra?#p?@@yGz?(.>wX۠AyX۠AvVxXa?#p?@@yGz?Q>wX۠AyX۠AƭNm>a?#p?@@yGz?  Gt>wX۠AyX۠AA"%a?#p?@@yGz?wX۠AyX۠AB. a?#p?@@yGz?`l>wX۠AyX۠A` g`?#p?@@yGz?̛eܧ>wX۠AyX۠Av*R`?#p?@@yGz?:$>wX۠AyX۠A:i>`?#p?@@yGz?h!>wX۠AyX۠AZ)`oة`?#p?@@yGz?*D>wX۠AyX۠Aٳ`?#p?@@yGz?Y9g>wX۠AyX۠A$yrz`?#p?@@yGz?5>wX۠AyX۠ASZ $c`?#p?@@yGz?by>wX۠AyX۠A 1L`?#p?@@yGz?wXϨ>wX۠AyX۠As J5`?#p?@@yGz?Ai >wX۠AyX۠A-`?#p?@@yGz?FFZ>wX۠AyX۠Ayao`?#p?@@yGz?vKw7>wX۠AyX۠A*e_?#p?@@yGz?<,Z>wX۠AyX۠An#_?#p?@@yGz?.|>wX۠AyX۠A T_?#p?@@yGz?hW>wX۠AyX۠A, 0#c_?#p?@@yGz?3K©>wX۠AyX۠A=8_?#p?@@yGz?Ec>wX۠AyX۠A#_?#p?@@yGz?#>wX۠AyX۠Aף^?#p?@@yGz?"gi*>wX۠AyX۠AI*^?#p?@@yGz?M>wX۠AyX۠A0n ^?#p?@@yGz? o>wX۠AyX۠Ak^?#p?@@yGz?lP4>wX۠AyX۠Ao+D^?#p?@@yGz?x=>wX۠AyX۠AV@c^?#p?@@yGz?Iת>wX۠AyX۠A h]?#p?@@yGz?Iך>nvX۠AyX۠A hm?F?@@yGz?%E}\>nvX۠AyX۠A Tt4m?F?@@yGz?m_b>nvX۠AyX۠AO^m?F?@@yGz?UB0>nvX۠AyX۠A.M%Qm?F?@@yGz?*$>nvX۠AyX۠A( l?F?@@yGz?f3>nvX۠AyX۠A3=(l?F?@@yGz?tmx>nvX۠AyX۠Aս?l?F?@@yGz?KGw׽>nvX۠AyX۠A2 fk?F?@@yGz?*A>nvX۠AyX۠Artk?F?@@yGz? H>nvX۠AyX۠AȆʾvk?F?@@yGz?ct>nvX۠AyX۠A 7>6k?F?@@yGz?˜Vӝ>nvX۠AyX۠A#j?F?@@yGz?!!9>nvX۠AyX۠AMuj?F?@@yGz?zS^>nvX۠AyX۠A{j?F?@@yGz?X1>nvX۠AyX۠A}?j?F?@@yGz?5>&>nvX۠AyX۠A޿j?F?@@yGz?BÐ.>nvX۠AyX۠A'Ipi?F?@@yGz?ʥs>nvX۠AyX۠Acݑi?F?@@yGz?ZSd>nvX۠AyX۠A1Yi?F?@@yGz?j>nvX۠AyX۠Aם>^"i?F?@@yGz?B &">nvX۠AyX۠A.h?F?@@yGz?;D>nvX۠AyX۠A5Fh?F?@@yGz?k: g>nvX۠AyX۠AI>`h?F?@@yGz?~:>nvX۠AyX۠A+=Oh?F?@@yGz?ﬠ>nvX۠AyX۠AiZVh?F?@@yGz?iݤϠ>nvX۠AyX۠AKfg?F?@@yGz?(KY>nvX۠AyX۠A]g?F?@@yGz?FX>nvX۠AyX۠AsdZg?F?@@yGz?Ӱ7>nvX۠AyX۠ArZg?F?@@yGz?"xZ>nvX۠AyX۠A0,g?F?@@yGz?[-}>nvX۠AyX۠A=4f?F?@@yGz?⟡>nvX۠AyX۠ADEf?F?@@yGz?mEu¡>nvX۠AyX۠A^[:Vf?F?@@yGz?t(gL>nvX۠AyX۠AHGnmxf?F?@@yGz?JlX>nvX۠AyX۠AJ6-Mf?F?@@yGz?ӰI*>nvX۠AyX۠AQ!"f?F?@@yGz?&:kM>nvX۠AyX۠Ame?F?@@yGz?29, p>nvX۠AyX۠A[(=e?F?@@yGz?b}Ւ>nvX۠AyX۠A|>|e?F?@@yGz?q>nvX۠AyX۠ADnvX۠AyX۠Ay1¼Ve?F?@@yGz?NI>nvX۠AyX۠Av`/e?F?@@yGz?>nvX۠AyX۠A]o@ e?F?@@yGz?*O]@>nvX۠AyX۠AQfSd?F?@@yGz?~c>nvX۠AyX۠AVߠd?F?@@yGz?ZDž>nvX۠AyX۠Ad?F?@@yGz?uݞ|>nvX۠AyX۠Ajtd?F?@@yGz? 1ˣ>nvX۠AyX۠A](EPd?F?@@yGz?Q<'>nvX۠AyX۠AO r-d?F?@@yGz?kk{>nvX۠AyX۠Ab9 d?F?@@yGz?.lP3>nvX۠AyX۠ATc?F?@@yGz?]V>nvX۠AyX۠A8"c?F?@@yGz? 7Ox>nvX۠AyX۠A͜c?F?@@yGz?x)|@o>nvX۠AyX۠AF揇c?F?@@yGz?X1$>nvX۠AyX۠Aw3nbc?F?@@yGz?U#>nvX۠AyX۠A>^ Bc?F?@@yGz?ķH>nvX۠AyX۠Aoۄ"c?F?@@yGz?2C&>nvX۠AyX۠Adwdpc?F?@@yGz?H>nvX۠AyX۠ADob?F?@@yGz?Fk>nvX۠AyX۠ArEmb?F?@@yGz?xuYa>nvX۠AyX۠A~b?F?@@yGz?ꤝ>nvX۠AyX۠Akb?F?@@yGz?Yӥ>nvX۠AyX۠A;Flb?F?@@yGz?&>nvX۠AyX۠ABY)Ob?F?@@yGz?63j5>nvX۠AyX۠AB}mh2b?F?@@yGz?b;>nvX۠AyX۠Aeb?F?@@yGz?^>nvX۠AyX۠Am>a?F?@@yGz?6rT>nvX۠AyX۠AF8a?F?@@yGz?zc >nvX۠AyX۠A"Ka?F?@@yGz?[ TƦ>nvX۠AyX۠AVça?F?@@yGz?OFs>nvX۠AyX۠A`Ia?F?@@yGz?:G7( >nvX۠AyX۠A|Sra?F?@@yGz?(.>nvX۠AyX۠AvVxXa?F?@@yGz?Q>nvX۠AyX۠AƭNm>a?F?@@yGz?  Gt>nvX۠AyX۠AA"%a?F?@@yGz?nvX۠AyX۠AB. a?F?@@yGz?`l>nvX۠AyX۠A` g`?F?@@yGz?̛eܧ>nvX۠AyX۠Av*R`?F?@@yGz?:$>nvX۠AyX۠A:i>`?F?@@yGz?h!>nvX۠AyX۠AZ)`oة`?F?@@yGz?*D>nvX۠AyX۠Aٳ`?F?@@yGz?Y9g>nvX۠AyX۠A$yrz`?F?@@yGz?5>nvX۠AyX۠ASZ $c`?F?@@yGz?by>nvX۠AyX۠A 1L`?F?@@yGz?wXϨ>nvX۠AyX۠As J5`?F?@@yGz?Ai >nvX۠AyX۠A-`?F?@@yGz?FFZ>nvX۠AyX۠Ayao`?F?@@yGz?vKw7>nvX۠AyX۠A*e_?F?@@yGz?<,Z>nvX۠AyX۠An#_?F?@@yGz?.|>nvX۠AyX۠A T_?F?@@yGz?hW>nvX۠AyX۠A, 0#c_?F?@@yGz?3K©>nvX۠AyX۠A=8_?F?@@yGz?Ec>nvX۠AyX۠A#_?F?@@yGz?#>nvX۠AyX۠Aף^?F?@@yGz?"gi*>nvX۠AyX۠AI*^?F?@@yGz?M>nvX۠AyX۠A0n ^?F?@@yGz? o>nvX۠AyX۠Ak^?F?@@yGz?lP4>nvX۠AyX۠Ao+D^?F?@@yGz?x=>nvX۠AyX۠AV@c^?F?@@yGz?Iת>nvX۠AyX۠A h]?F?@@yGz?Iך>tX۠AyX۠A hm?i}R?@@yGz?$E}\>tX۠AyX۠A Tt4m?i}R?@@yGz?m_b>tX۠AyX۠AO^m?i}R?@@yGz?UB0>tX۠AyX۠A.M%Qm?i}R?@@yGz?*$>tX۠AyX۠A( l?i}R?@@yGz?f3>tX۠AyX۠A3=(l?i}R?@@yGz?umx>tX۠AyX۠Aս?l?i}R?@@yGz?LGw׽>tX۠AyX۠A2 fk?i}R?@@yGz?*A>tX۠AyX۠Artk?i}R?@@yGz? H>tX۠AyX۠AȆʾvk?i}R?@@yGz?ct>tX۠AyX۠A 7>6k?i}R?@@yGz?˜Vӝ>tX۠AyX۠A#j?i}R?@@yGz?!!9>tX۠AyX۠AMuj?i}R?@@yGz?zS^>tX۠AyX۠A{j?i}R?@@yGz?X1>tX۠AyX۠A}?j?i}R?@@yGz?4>&>tX۠AyX۠A޿j?i}R?@@yGz?BÐ.>tX۠AyX۠A'Ipi?i}R?@@yGz?ʥs>tX۠AyX۠Acݑi?i}R?@@yGz?ZSd>tX۠AyX۠A1Yi?i}R?@@yGz?j>tX۠AyX۠A֝>^"i?i}R?@@yGz?B &">tX۠AyX۠A.h?i}R?@@yGz?;D>tX۠AyX۠A5Fh?i}R?@@yGz?k: g>tX۠AyX۠AI>`h?i}R?@@yGz?~:>tX۠AyX۠A*=Oh?i}R?@@yGz?ﬠ>tX۠AyX۠AiZVh?i}R?@@yGz?iݤϠ>tX۠AyX۠AKfg?i}R?@@yGz?(KY>tX۠AyX۠A]g?i}R?@@yGz?FX>tX۠AyX۠AsdZg?i}R?@@yGz?Ӱ7>tX۠AyX۠ArZg?i}R?@@yGz?"xZ>tX۠AyX۠A~0,g?i}R?@@yGz?[-}>tX۠AyX۠A =4f?i}R?@@yGz?⟡>tX۠AyX۠ADEf?i}R?@@yGz?mEu¡>tX۠AyX۠A^[:Vf?i}R?@@yGz?t(gL>tX۠AyX۠AHGnmxf?i}R?@@yGz?JlX>tX۠AyX۠AJ6-Mf?i}R?@@yGz?ӰI*>tX۠AyX۠AQ!"f?i}R?@@yGz?&:kM>tX۠AyX۠Ame?i}R?@@yGz?29, p>tX۠AyX۠A[(=e?i}R?@@yGz?b}Ւ>tX۠AyX۠A|>|e?i}R?@@yGz?q>tX۠AyX۠ADtX۠AyX۠Ay1¼Ve?i}R?@@yGz?NI>tX۠AyX۠Aw`/e?i}R?@@yGz?>tX۠AyX۠A]o@ e?i}R?@@yGz?*O]@>tX۠AyX۠APfSd?i}R?@@yGz?~c>tX۠AyX۠AVߠd?i}R?@@yGz?ZDž>tX۠AyX۠Ad?i}R?@@yGz?tݞ|>tX۠AyX۠Ajtd?i}R?@@yGz? 1ˣ>tX۠AyX۠A](EPd?i}R?@@yGz?Q<'>tX۠AyX۠AO r-d?i}R?@@yGz?kk{>tX۠AyX۠Ab9 d?i}R?@@yGz?.lP3>tX۠AyX۠ATc?i}R?@@yGz?]V>tX۠AyX۠A8"c?i}R?@@yGz? 7Ox>tX۠AyX۠A͜c?i}R?@@yGz?x)|@o>tX۠AyX۠AG揇c?i}R?@@yGz?X1$>tX۠AyX۠Av3nbc?i}R?@@yGz?T#>tX۠AyX۠A?^ Bc?i}R?@@yGz?ŷH>tX۠AyX۠Aoۄ"c?i}R?@@yGz?2C&>tX۠AyX۠Adwdpc?i}R?@@yGz?H>tX۠AyX۠ADob?i}R?@@yGz?Fk>tX۠AyX۠ArEmb?i}R?@@yGz?xuYa>tX۠AyX۠A~b?i}R?@@yGz?ꤝ>tX۠AyX۠Ajb?i}R?@@yGz?Yӥ>tX۠AyX۠A:Flb?i}R?@@yGz?&>tX۠AyX۠ACY)Ob?i}R?@@yGz?63j5>tX۠AyX۠AB}mh2b?i}R?@@yGz?b;>tX۠AyX۠Aeb?i}R?@@yGz?^>tX۠AyX۠Am>a?i}R?@@yGz?6rT>tX۠AyX۠AF8a?i}R?@@yGz?zc >tX۠AyX۠A"Ka?i}R?@@yGz?\ TƦ>tX۠AyX۠AVça?i}R?@@yGz?OFs>tX۠AyX۠A`Ia?i}R?@@yGz?:G7( >tX۠AyX۠A|Sra?i}R?@@yGz?(.>tX۠AyX۠AvVxXa?i}R?@@yGz?Q>tX۠AyX۠AƭNm>a?i}R?@@yGz?  Gt>tX۠AyX۠AA"%a?i}R?@@yGz?tX۠AyX۠AB. a?i}R?@@yGz?`l>tX۠AyX۠A` g`?i}R?@@yGz?˛eܧ>tX۠AyX۠Av*R`?i}R?@@yGz?:$>tX۠AyX۠A:i>`?i}R?@@yGz?h!>tX۠AyX۠AZ)`oة`?i}R?@@yGz?*D>tX۠AyX۠Aٳ`?i}R?@@yGz?Y9g>tX۠AyX۠A$yrz`?i}R?@@yGz?5>tX۠AyX۠ASZ $c`?i}R?@@yGz?by>tX۠AyX۠A 1L`?i}R?@@yGz?wXϨ>tX۠AyX۠As J5`?i}R?@@yGz?Ai >tX۠AyX۠A-`?i}R?@@yGz?FFZ>tX۠AyX۠Ayao`?i}R?@@yGz?vKw7>tX۠AyX۠A*e_?i}R?@@yGz?<,Z>tX۠AyX۠An#_?i}R?@@yGz?.|>tX۠AyX۠A T_?i}R?@@yGz?hW>tX۠AyX۠A, 0#c_?i}R?@@yGz?3K©>tX۠AyX۠A=8_?i}R?@@yGz?Dc>tX۠AyX۠A#_?i}R?@@yGz?#>tX۠AyX۠Aף^?i}R?@@yGz?"gi*>tX۠AyX۠AI*^?i}R?@@yGz?M>tX۠AyX۠A0n ^?i}R?@@yGz? o>tX۠AyX۠Ak^?i}R?@@yGz?kP4>tX۠AyX۠Ao+D^?i}R?@@yGz?x=>tX۠AyX۠AV@c^?i}R?@@yGz?Iת>tX۠AyX۠A h]?i}R?@@yGz?Iך>\sX۠AyX۠A hm?Ý?@@yGz?%E}\>\sX۠AyX۠A Tt4m?Ý?@@yGz?m_b>\sX۠AyX۠AO^m?Ý?@@yGz?UB0>\sX۠AyX۠A.M%Qm?Ý?@@yGz?*$>\sX۠AyX۠A( l?Ý?@@yGz?f3>\sX۠AyX۠A3=(l?Ý?@@yGz?tmx>\sX۠AyX۠Aս?l?Ý?@@yGz?KGw׽>\sX۠AyX۠A2 fk?Ý?@@yGz?*A>\sX۠AyX۠Artk?Ý?@@yGz? H>\sX۠AyX۠AȆʾvk?Ý?@@yGz?ct>\sX۠AyX۠A 7>6k?Ý?@@yGz?˜Vӝ>\sX۠AyX۠A#j?Ý?@@yGz?!!9>\sX۠AyX۠AMuj?Ý?@@yGz?zS^>\sX۠AyX۠A{j?Ý?@@yGz?X1>\sX۠AyX۠A}?j?Ý?@@yGz?5>&>\sX۠AyX۠A޿j?Ý?@@yGz?BÐ.>\sX۠AyX۠A'Ipi?Ý?@@yGz?ʥs>\sX۠AyX۠Acݑi?Ý?@@yGz?ZSd>\sX۠AyX۠A1Yi?Ý?@@yGz?j>\sX۠AyX۠Aם>^"i?Ý?@@yGz?B &">\sX۠AyX۠A.h?Ý?@@yGz?;D>\sX۠AyX۠A5Fh?Ý?@@yGz?k: g>\sX۠AyX۠AI>`h?Ý?@@yGz?~:>\sX۠AyX۠A+=Oh?Ý?@@yGz?ﬠ>\sX۠AyX۠AiZVh?Ý?@@yGz?iݤϠ>\sX۠AyX۠AKfg?Ý?@@yGz?(KY>\sX۠AyX۠A]g?Ý?@@yGz?FX>\sX۠AyX۠AsdZg?Ý?@@yGz?Ӱ7>\sX۠AyX۠ArZg?Ý?@@yGz?"xZ>\sX۠AyX۠A0,g?Ý?@@yGz?[-}>\sX۠AyX۠A=4f?Ý?@@yGz?⟡>\sX۠AyX۠ADEf?Ý?@@yGz?mEu¡>\sX۠AyX۠A^[:Vf?Ý?@@yGz?t(gL>\sX۠AyX۠AHGnmxf?Ý?@@yGz?JlX>\sX۠AyX۠AJ6-Mf?Ý?@@yGz?ӰI*>\sX۠AyX۠AQ!"f?Ý?@@yGz?&:kM>\sX۠AyX۠Ame?Ý?@@yGz?29, p>\sX۠AyX۠A[(=e?Ý?@@yGz?b}Ւ>\sX۠AyX۠A|>|e?Ý?@@yGz?q>\sX۠AyX۠AD\sX۠AyX۠Ay1¼Ve?Ý?@@yGz?NI>\sX۠AyX۠Av`/e?Ý?@@yGz?>\sX۠AyX۠A]o@ e?Ý?@@yGz?*O]@>\sX۠AyX۠AQfSd?Ý?@@yGz?~c>\sX۠AyX۠AVߠd?Ý?@@yGz?ZDž>\sX۠AyX۠Ad?Ý?@@yGz?uݞ|>\sX۠AyX۠Ajtd?Ý?@@yGz? 1ˣ>\sX۠AyX۠A](EPd?Ý?@@yGz?Q<'>\sX۠AyX۠AO r-d?Ý?@@yGz?kk{>\sX۠AyX۠Ab9 d?Ý?@@yGz?.lP3>\sX۠AyX۠ATc?Ý?@@yGz?]V>\sX۠AyX۠A8"c?Ý?@@yGz? 7Ox>\sX۠AyX۠A͜c?Ý?@@yGz?x)|@o>\sX۠AyX۠AF揇c?Ý?@@yGz?X1$>\sX۠AyX۠Aw3nbc?Ý?@@yGz?U#>\sX۠AyX۠A>^ Bc?Ý?@@yGz?ķH>\sX۠AyX۠Aoۄ"c?Ý?@@yGz?2C&>\sX۠AyX۠Adwdpc?Ý?@@yGz?H>\sX۠AyX۠ADob?Ý?@@yGz?Fk>\sX۠AyX۠ArEmb?Ý?@@yGz?xuYa>\sX۠AyX۠A~b?Ý?@@yGz?ꤝ>\sX۠AyX۠Akb?Ý?@@yGz?Yӥ>\sX۠AyX۠A;Flb?Ý?@@yGz?&>\sX۠AyX۠ABY)Ob?Ý?@@yGz?63j5>\sX۠AyX۠AB}mh2b?Ý?@@yGz?b;>\sX۠AyX۠Aeb?Ý?@@yGz?^>\sX۠AyX۠Am>a?Ý?@@yGz?6rT>\sX۠AyX۠AF8a?Ý?@@yGz?zc >\sX۠AyX۠A"Ka?Ý?@@yGz?[ TƦ>\sX۠AyX۠AVça?Ý?@@yGz?OFs>\sX۠AyX۠A`Ia?Ý?@@yGz?:G7( >\sX۠AyX۠A|Sra?Ý?@@yGz?(.>\sX۠AyX۠AvVxXa?Ý?@@yGz?Q>\sX۠AyX۠AƭNm>a?Ý?@@yGz?  Gt>\sX۠AyX۠AA"%a?Ý?@@yGz?\sX۠AyX۠AB. a?Ý?@@yGz?`l>\sX۠AyX۠A` g`?Ý?@@yGz?̛eܧ>\sX۠AyX۠Av*R`?Ý?@@yGz?:$>\sX۠AyX۠A:i>`?Ý?@@yGz?h!>\sX۠AyX۠AZ)`oة`?Ý?@@yGz?*D>\sX۠AyX۠Aٳ`?Ý?@@yGz?Y9g>\sX۠AyX۠A$yrz`?Ý?@@yGz?5>\sX۠AyX۠ASZ $c`?Ý?@@yGz?by>\sX۠AyX۠A 1L`?Ý?@@yGz?wXϨ>\sX۠AyX۠As J5`?Ý?@@yGz?Ai >\sX۠AyX۠A-`?Ý?@@yGz?FFZ>\sX۠AyX۠Ayao`?Ý?@@yGz?vKw7>\sX۠AyX۠A*e_?Ý?@@yGz?<,Z>\sX۠AyX۠An#_?Ý?@@yGz?.|>\sX۠AyX۠A T_?Ý?@@yGz?hW>\sX۠AyX۠A, 0#c_?Ý?@@yGz?3K©>\sX۠AyX۠A=8_?Ý?@@yGz?Ec>\sX۠AyX۠A#_?Ý?@@yGz?#>\sX۠AyX۠Aף^?Ý?@@yGz?"gi*>\sX۠AyX۠AI*^?Ý?@@yGz?M>\sX۠AyX۠A0n ^?Ý?@@yGz? o>\sX۠AyX۠Ak^?Ý?@@yGz?lP4>\sX۠AyX۠Ao+D^?Ý?@@yGz?x=>\sX۠AyX۠AV@c^?Ý?@@yGz?Iת>\sX۠AyX۠A h]?Ý?@@yGz?Iך>qX۠AyX۠A hm?{{4?@@yGz?$E}\>qX۠AyX۠A Tt4m?{{4?@@yGz?m_b>qX۠AyX۠AO^m?{{4?@@yGz?UB0>qX۠AyX۠A.M%Qm?{{4?@@yGz?*$>qX۠AyX۠A( l?{{4?@@yGz?f3>qX۠AyX۠A3=(l?{{4?@@yGz?umx>qX۠AyX۠Aս?l?{{4?@@yGz?LGw׽>qX۠AyX۠A2 fk?{{4?@@yGz?*A>qX۠AyX۠Artk?{{4?@@yGz? H>qX۠AyX۠AȆʾvk?{{4?@@yGz?ct>qX۠AyX۠A 7>6k?{{4?@@yGz?˜Vӝ>qX۠AyX۠A#j?{{4?@@yGz?!!9>qX۠AyX۠AMuj?{{4?@@yGz?zS^>qX۠AyX۠A{j?{{4?@@yGz?X1>qX۠AyX۠A}?j?{{4?@@yGz?4>&>qX۠AyX۠A޿j?{{4?@@yGz?BÐ.>qX۠AyX۠A'Ipi?{{4?@@yGz?ʥs>qX۠AyX۠Acݑi?{{4?@@yGz?ZSd>qX۠AyX۠A1Yi?{{4?@@yGz?j>qX۠AyX۠A֝>^"i?{{4?@@yGz?B &">qX۠AyX۠A.h?{{4?@@yGz?;D>qX۠AyX۠A5Fh?{{4?@@yGz?k: g>qX۠AyX۠AI>`h?{{4?@@yGz?~:>qX۠AyX۠A*=Oh?{{4?@@yGz?ﬠ>qX۠AyX۠AiZVh?{{4?@@yGz?iݤϠ>qX۠AyX۠AKfg?{{4?@@yGz?(KY>qX۠AyX۠A]g?{{4?@@yGz?FX>qX۠AyX۠AsdZg?{{4?@@yGz?Ӱ7>qX۠AyX۠ArZg?{{4?@@yGz?"xZ>qX۠AyX۠A~0,g?{{4?@@yGz?[-}>qX۠AyX۠A =4f?{{4?@@yGz?⟡>qX۠AyX۠ADEf?{{4?@@yGz?mEu¡>qX۠AyX۠A^[:Vf?{{4?@@yGz?t(gL>qX۠AyX۠AHGnmxf?{{4?@@yGz?JlX>qX۠AyX۠AJ6-Mf?{{4?@@yGz?ӰI*>qX۠AyX۠AQ!"f?{{4?@@yGz?&:kM>qX۠AyX۠Ame?{{4?@@yGz?29, p>qX۠AyX۠A[(=e?{{4?@@yGz?b}Ւ>qX۠AyX۠A|>|e?{{4?@@yGz?q>qX۠AyX۠ADqX۠AyX۠Ay1¼Ve?{{4?@@yGz?NI>qX۠AyX۠Aw`/e?{{4?@@yGz?>qX۠AyX۠A]o@ e?{{4?@@yGz?*O]@>qX۠AyX۠APfSd?{{4?@@yGz?~c>qX۠AyX۠AVߠd?{{4?@@yGz?ZDž>qX۠AyX۠Ad?{{4?@@yGz?tݞ|>qX۠AyX۠Ajtd?{{4?@@yGz? 1ˣ>qX۠AyX۠A](EPd?{{4?@@yGz?Q<'>qX۠AyX۠AO r-d?{{4?@@yGz?kk{>qX۠AyX۠Ab9 d?{{4?@@yGz?.lP3>qX۠AyX۠ATc?{{4?@@yGz?]V>qX۠AyX۠A8"c?{{4?@@yGz? 7Ox>qX۠AyX۠A͜c?{{4?@@yGz?x)|@o>qX۠AyX۠AG揇c?{{4?@@yGz?X1$>qX۠AyX۠Av3nbc?{{4?@@yGz?T#>qX۠AyX۠A?^ Bc?{{4?@@yGz?ŷH>qX۠AyX۠Aoۄ"c?{{4?@@yGz?2C&>qX۠AyX۠Adwdpc?{{4?@@yGz?H>qX۠AyX۠ADob?{{4?@@yGz?Fk>qX۠AyX۠ArEmb?{{4?@@yGz?xuYa>qX۠AyX۠A~b?{{4?@@yGz?ꤝ>qX۠AyX۠Ajb?{{4?@@yGz?Yӥ>qX۠AyX۠A:Flb?{{4?@@yGz?&>qX۠AyX۠ACY)Ob?{{4?@@yGz?63j5>qX۠AyX۠AB}mh2b?{{4?@@yGz?b;>qX۠AyX۠Aeb?{{4?@@yGz?^>qX۠AyX۠Am>a?{{4?@@yGz?6rT>qX۠AyX۠AF8a?{{4?@@yGz?zc >qX۠AyX۠A"Ka?{{4?@@yGz?\ TƦ>qX۠AyX۠AVça?{{4?@@yGz?OFs>qX۠AyX۠A`Ia?{{4?@@yGz?:G7( >qX۠AyX۠A|Sra?{{4?@@yGz?(.>qX۠AyX۠AvVxXa?{{4?@@yGz?Q>qX۠AyX۠AƭNm>a?{{4?@@yGz?  Gt>qX۠AyX۠AA"%a?{{4?@@yGz?qX۠AyX۠AB. a?{{4?@@yGz?`l>qX۠AyX۠A` g`?{{4?@@yGz?˛eܧ>qX۠AyX۠Av*R`?{{4?@@yGz?:$>qX۠AyX۠A:i>`?{{4?@@yGz?h!>qX۠AyX۠AZ)`oة`?{{4?@@yGz?*D>qX۠AyX۠Aٳ`?{{4?@@yGz?Y9g>qX۠AyX۠A$yrz`?{{4?@@yGz?5>qX۠AyX۠ASZ $c`?{{4?@@yGz?by>qX۠AyX۠A 1L`?{{4?@@yGz?wXϨ>qX۠AyX۠As J5`?{{4?@@yGz?Ai >qX۠AyX۠A-`?{{4?@@yGz?FFZ>qX۠AyX۠Ayao`?{{4?@@yGz?vKw7>qX۠AyX۠A*e_?{{4?@@yGz?<,Z>qX۠AyX۠An#_?{{4?@@yGz?.|>qX۠AyX۠A T_?{{4?@@yGz?hW>qX۠AyX۠A, 0#c_?{{4?@@yGz?3K©>qX۠AyX۠A=8_?{{4?@@yGz?Dc>qX۠AyX۠A#_?{{4?@@yGz?#>qX۠AyX۠Aף^?{{4?@@yGz?"gi*>qX۠AyX۠AI*^?{{4?@@yGz?M>qX۠AyX۠A0n ^?{{4?@@yGz? o>qX۠AyX۠Ak^?{{4?@@yGz?kP4>qX۠AyX۠Ao+D^?{{4?@@yGz?x=>qX۠AyX۠AV@c^?{{4?@@yGz?Iת>qX۠AyX۠A h]?{{4?@@yGz?Iך>JpX۠AyX۠A hm?"`l?@@yGz?%E}\>JpX۠AyX۠A Tt4m?"`l?@@yGz?m_b>JpX۠AyX۠AO^m?"`l?@@yGz?UB0>JpX۠AyX۠A.M%Qm?"`l?@@yGz?*$>JpX۠AyX۠A( l?"`l?@@yGz?f3>JpX۠AyX۠A3=(l?"`l?@@yGz?tmx>JpX۠AyX۠Aս?l?"`l?@@yGz?KGw׽>JpX۠AyX۠A2 fk?"`l?@@yGz?*A>JpX۠AyX۠Artk?"`l?@@yGz? H>JpX۠AyX۠AȆʾvk?"`l?@@yGz?ct>JpX۠AyX۠A 7>6k?"`l?@@yGz?˜Vӝ>JpX۠AyX۠A#j?"`l?@@yGz?!!9>JpX۠AyX۠AMuj?"`l?@@yGz?zS^>JpX۠AyX۠A{j?"`l?@@yGz?X1>JpX۠AyX۠A}?j?"`l?@@yGz?5>&>JpX۠AyX۠A޿j?"`l?@@yGz?BÐ.>JpX۠AyX۠A'Ipi?"`l?@@yGz?ʥs>JpX۠AyX۠Acݑi?"`l?@@yGz?ZSd>JpX۠AyX۠A1Yi?"`l?@@yGz?j>JpX۠AyX۠Aם>^"i?"`l?@@yGz?B &">JpX۠AyX۠A.h?"`l?@@yGz?;D>JpX۠AyX۠A5Fh?"`l?@@yGz?k: g>JpX۠AyX۠AI>`h?"`l?@@yGz?~:>JpX۠AyX۠A+=Oh?"`l?@@yGz?ﬠ>JpX۠AyX۠AiZVh?"`l?@@yGz?iݤϠ>JpX۠AyX۠AKfg?"`l?@@yGz?(KY>JpX۠AyX۠A]g?"`l?@@yGz?FX>JpX۠AyX۠AsdZg?"`l?@@yGz?Ӱ7>JpX۠AyX۠ArZg?"`l?@@yGz?"xZ>JpX۠AyX۠A0,g?"`l?@@yGz?[-}>JpX۠AyX۠A=4f?"`l?@@yGz?⟡>JpX۠AyX۠ADEf?"`l?@@yGz?mEu¡>JpX۠AyX۠A^[:Vf?"`l?@@yGz?t(gL>JpX۠AyX۠AHGnmxf?"`l?@@yGz?JlX>JpX۠AyX۠AJ6-Mf?"`l?@@yGz?ӰI*>JpX۠AyX۠AQ!"f?"`l?@@yGz?&:kM>JpX۠AyX۠Ame?"`l?@@yGz?29, p>JpX۠AyX۠A[(=e?"`l?@@yGz?b}Ւ>JpX۠AyX۠A|>|e?"`l?@@yGz?q>JpX۠AyX۠ADJpX۠AyX۠Ay1¼Ve?"`l?@@yGz?NI>JpX۠AyX۠Av`/e?"`l?@@yGz?>JpX۠AyX۠A]o@ e?"`l?@@yGz?*O]@>JpX۠AyX۠AQfSd?"`l?@@yGz?~c>JpX۠AyX۠AVߠd?"`l?@@yGz?ZDž>JpX۠AyX۠Ad?"`l?@@yGz?uݞ|>JpX۠AyX۠Ajtd?"`l?@@yGz? 1ˣ>JpX۠AyX۠A](EPd?"`l?@@yGz?Q<'>JpX۠AyX۠AO r-d?"`l?@@yGz?kk{>JpX۠AyX۠Ab9 d?"`l?@@yGz?.lP3>JpX۠AyX۠ATc?"`l?@@yGz?]V>JpX۠AyX۠A8"c?"`l?@@yGz? 7Ox>JpX۠AyX۠A͜c?"`l?@@yGz?x)|@o>JpX۠AyX۠AF揇c?"`l?@@yGz?X1$>JpX۠AyX۠Aw3nbc?"`l?@@yGz?U#>JpX۠AyX۠A>^ Bc?"`l?@@yGz?ķH>JpX۠AyX۠Aoۄ"c?"`l?@@yGz?2C&>JpX۠AyX۠Adwdpc?"`l?@@yGz?H>JpX۠AyX۠ADob?"`l?@@yGz?Fk>JpX۠AyX۠ArEmb?"`l?@@yGz?xuYa>JpX۠AyX۠A~b?"`l?@@yGz?ꤝ>JpX۠AyX۠Akb?"`l?@@yGz?Yӥ>JpX۠AyX۠A;Flb?"`l?@@yGz?&>JpX۠AyX۠ABY)Ob?"`l?@@yGz?63j5>JpX۠AyX۠AB}mh2b?"`l?@@yGz?b;>JpX۠AyX۠Aeb?"`l?@@yGz?^>JpX۠AyX۠Am>a?"`l?@@yGz?6rT>JpX۠AyX۠AF8a?"`l?@@yGz?zc >JpX۠AyX۠A"Ka?"`l?@@yGz?[ TƦ>JpX۠AyX۠AVça?"`l?@@yGz?OFs>JpX۠AyX۠A`Ia?"`l?@@yGz?:G7( >JpX۠AyX۠A|Sra?"`l?@@yGz?(.>JpX۠AyX۠AvVxXa?"`l?@@yGz?Q>JpX۠AyX۠AƭNm>a?"`l?@@yGz?  Gt>JpX۠AyX۠AA"%a?"`l?@@yGz?JpX۠AyX۠AB. a?"`l?@@yGz?`l>JpX۠AyX۠A` g`?"`l?@@yGz?̛eܧ>JpX۠AyX۠Av*R`?"`l?@@yGz?:$>JpX۠AyX۠A:i>`?"`l?@@yGz?h!>JpX۠AyX۠AZ)`oة`?"`l?@@yGz?*D>JpX۠AyX۠Aٳ`?"`l?@@yGz?Y9g>JpX۠AyX۠A$yrz`?"`l?@@yGz?5>JpX۠AyX۠ASZ $c`?"`l?@@yGz?by>JpX۠AyX۠A 1L`?"`l?@@yGz?wXϨ>JpX۠AyX۠As J5`?"`l?@@yGz?Ai >JpX۠AyX۠A-`?"`l?@@yGz?FFZ>JpX۠AyX۠Ayao`?"`l?@@yGz?vKw7>JpX۠AyX۠A*e_?"`l?@@yGz?<,Z>JpX۠AyX۠An#_?"`l?@@yGz?.|>JpX۠AyX۠A T_?"`l?@@yGz?hW>JpX۠AyX۠A, 0#c_?"`l?@@yGz?3K©>JpX۠AyX۠A=8_?"`l?@@yGz?Ec>JpX۠AyX۠A#_?"`l?@@yGz?#>JpX۠AyX۠Aף^?"`l?@@yGz?"gi*>JpX۠AyX۠AI*^?"`l?@@yGz?M>JpX۠AyX۠A0n ^?"`l?@@yGz? o>JpX۠AyX۠Ak^?"`l?@@yGz?lP4>JpX۠AyX۠Ao+D^?"`l?@@yGz?x=>JpX۠AyX۠AV@c^?"`l?@@yGz?Iת>JpX۠AyX۠A h]?"`l?@@yGz?Iך>nX۠AyX۠A hm?)yFT?@@yGz?$E}\>nX۠AyX۠A Tt4m?)yFT?@@yGz?m_b>nX۠AyX۠AO^m?)yFT?@@yGz?UB0>nX۠AyX۠A.M%Qm?)yFT?@@yGz?*$>nX۠AyX۠A( l?)yFT?@@yGz?f3>nX۠AyX۠A3=(l?)yFT?@@yGz?umx>nX۠AyX۠Aս?l?)yFT?@@yGz?LGw׽>nX۠AyX۠A2 fk?)yFT?@@yGz?*A>nX۠AyX۠Artk?)yFT?@@yGz? H>nX۠AyX۠AȆʾvk?)yFT?@@yGz?ct>nX۠AyX۠A 7>6k?)yFT?@@yGz?˜Vӝ>nX۠AyX۠A#j?)yFT?@@yGz?!!9>nX۠AyX۠AMuj?)yFT?@@yGz?zS^>nX۠AyX۠A{j?)yFT?@@yGz?X1>nX۠AyX۠A}?j?)yFT?@@yGz?4>&>nX۠AyX۠A޿j?)yFT?@@yGz?BÐ.>nX۠AyX۠A'Ipi?)yFT?@@yGz?ʥs>nX۠AyX۠Acݑi?)yFT?@@yGz?ZSd>nX۠AyX۠A1Yi?)yFT?@@yGz?j>nX۠AyX۠A֝>^"i?)yFT?@@yGz?B &">nX۠AyX۠A.h?)yFT?@@yGz?;D>nX۠AyX۠A5Fh?)yFT?@@yGz?k: g>nX۠AyX۠AI>`h?)yFT?@@yGz?~:>nX۠AyX۠A*=Oh?)yFT?@@yGz?ﬠ>nX۠AyX۠AiZVh?)yFT?@@yGz?iݤϠ>nX۠AyX۠AKfg?)yFT?@@yGz?(KY>nX۠AyX۠A]g?)yFT?@@yGz?FX>nX۠AyX۠AsdZg?)yFT?@@yGz?Ӱ7>nX۠AyX۠ArZg?)yFT?@@yGz?"xZ>nX۠AyX۠A~0,g?)yFT?@@yGz?[-}>nX۠AyX۠A =4f?)yFT?@@yGz?⟡>nX۠AyX۠ADEf?)yFT?@@yGz?mEu¡>nX۠AyX۠A^[:Vf?)yFT?@@yGz?t(gL>nX۠AyX۠AHGnmxf?)yFT?@@yGz?JlX>nX۠AyX۠AJ6-Mf?)yFT?@@yGz?ӰI*>nX۠AyX۠AQ!"f?)yFT?@@yGz?&:kM>nX۠AyX۠Ame?)yFT?@@yGz?29, p>nX۠AyX۠A[(=e?)yFT?@@yGz?b}Ւ>nX۠AyX۠A|>|e?)yFT?@@yGz?q>nX۠AyX۠ADnX۠AyX۠Ay1¼Ve?)yFT?@@yGz?NI>nX۠AyX۠Aw`/e?)yFT?@@yGz?>nX۠AyX۠A]o@ e?)yFT?@@yGz?*O]@>nX۠AyX۠APfSd?)yFT?@@yGz?~c>nX۠AyX۠AVߠd?)yFT?@@yGz?ZDž>nX۠AyX۠Ad?)yFT?@@yGz?tݞ|>nX۠AyX۠Ajtd?)yFT?@@yGz? 1ˣ>nX۠AyX۠A](EPd?)yFT?@@yGz?Q<'>nX۠AyX۠AO r-d?)yFT?@@yGz?kk{>nX۠AyX۠Ab9 d?)yFT?@@yGz?.lP3>nX۠AyX۠ATc?)yFT?@@yGz?]V>nX۠AyX۠A8"c?)yFT?@@yGz? 7Ox>nX۠AyX۠A͜c?)yFT?@@yGz?x)|@o>nX۠AyX۠AG揇c?)yFT?@@yGz?X1$>nX۠AyX۠Av3nbc?)yFT?@@yGz?T#>nX۠AyX۠A?^ Bc?)yFT?@@yGz?ŷH>nX۠AyX۠Aoۄ"c?)yFT?@@yGz?2C&>nX۠AyX۠Adwdpc?)yFT?@@yGz?H>nX۠AyX۠ADob?)yFT?@@yGz?Fk>nX۠AyX۠ArEmb?)yFT?@@yGz?xuYa>nX۠AyX۠A~b?)yFT?@@yGz?ꤝ>nX۠AyX۠Ajb?)yFT?@@yGz?Yӥ>nX۠AyX۠A:Flb?)yFT?@@yGz?&>nX۠AyX۠ACY)Ob?)yFT?@@yGz?63j5>nX۠AyX۠AB}mh2b?)yFT?@@yGz?b;>nX۠AyX۠Aeb?)yFT?@@yGz?^>nX۠AyX۠Am>a?)yFT?@@yGz?6rT>nX۠AyX۠AF8a?)yFT?@@yGz?zc >nX۠AyX۠A"Ka?)yFT?@@yGz?\ TƦ>nX۠AyX۠AVça?)yFT?@@yGz?OFs>nX۠AyX۠A`Ia?)yFT?@@yGz?:G7( >nX۠AyX۠A|Sra?)yFT?@@yGz?(.>nX۠AyX۠AvVxXa?)yFT?@@yGz?Q>nX۠AyX۠AƭNm>a?)yFT?@@yGz?  Gt>nX۠AyX۠AA"%a?)yFT?@@yGz?nX۠AyX۠AB. a?)yFT?@@yGz?`l>nX۠AyX۠A` g`?)yFT?@@yGz?˛eܧ>nX۠AyX۠Av*R`?)yFT?@@yGz?:$>nX۠AyX۠A:i>`?)yFT?@@yGz?h!>nX۠AyX۠AZ)`oة`?)yFT?@@yGz?*D>nX۠AyX۠Aٳ`?)yFT?@@yGz?Y9g>nX۠AyX۠A$yrz`?)yFT?@@yGz?5>nX۠AyX۠ASZ $c`?)yFT?@@yGz?by>nX۠AyX۠A 1L`?)yFT?@@yGz?wXϨ>nX۠AyX۠As J5`?)yFT?@@yGz?Ai >nX۠AyX۠A-`?)yFT?@@yGz?FFZ>nX۠AyX۠Ayao`?)yFT?@@yGz?vKw7>nX۠AyX۠A*e_?)yFT?@@yGz?<,Z>nX۠AyX۠An#_?)yFT?@@yGz?.|>nX۠AyX۠A T_?)yFT?@@yGz?hW>nX۠AyX۠A, 0#c_?)yFT?@@yGz?3K©>nX۠AyX۠A=8_?)yFT?@@yGz?Dc>nX۠AyX۠A#_?)yFT?@@yGz?#>nX۠AyX۠Aף^?)yFT?@@yGz?"gi*>nX۠AyX۠AI*^?)yFT?@@yGz?M>nX۠AyX۠A0n ^?)yFT?@@yGz? o>nX۠AyX۠Ak^?)yFT?@@yGz?kP4>nX۠AyX۠Ao+D^?)yFT?@@yGz?x=>nX۠AyX۠AV@c^?)yFT?@@yGz?Iת>nX۠AyX۠A h]?)yFT?@@yGz?Iך>9mX۠AyX۠A hm?.+;?@@yGz?%E}\>9mX۠AyX۠A Tt4m?.+;?@@yGz?m_b>9mX۠AyX۠AO^m?.+;?@@yGz?UB0>9mX۠AyX۠A.M%Qm?.+;?@@yGz?*$>9mX۠AyX۠A( l?.+;?@@yGz?f3>9mX۠AyX۠A3=(l?.+;?@@yGz?tmx>9mX۠AyX۠Aս?l?.+;?@@yGz?KGw׽>9mX۠AyX۠A2 fk?.+;?@@yGz?*A>9mX۠AyX۠Artk?.+;?@@yGz? H>9mX۠AyX۠AȆʾvk?.+;?@@yGz?ct>9mX۠AyX۠A 7>6k?.+;?@@yGz?˜Vӝ>9mX۠AyX۠A#j?.+;?@@yGz?!!9>9mX۠AyX۠AMuj?.+;?@@yGz?zS^>9mX۠AyX۠A{j?.+;?@@yGz?X1>9mX۠AyX۠A}?j?.+;?@@yGz?5>&>9mX۠AyX۠A޿j?.+;?@@yGz?BÐ.>9mX۠AyX۠A'Ipi?.+;?@@yGz?ʥs>9mX۠AyX۠Acݑi?.+;?@@yGz?ZSd>9mX۠AyX۠A1Yi?.+;?@@yGz?j>9mX۠AyX۠Aם>^"i?.+;?@@yGz?B &">9mX۠AyX۠A.h?.+;?@@yGz?;D>9mX۠AyX۠A5Fh?.+;?@@yGz?k: g>9mX۠AyX۠AI>`h?.+;?@@yGz?~:>9mX۠AyX۠A+=Oh?.+;?@@yGz?ﬠ>9mX۠AyX۠AiZVh?.+;?@@yGz?iݤϠ>9mX۠AyX۠AKfg?.+;?@@yGz?(KY>9mX۠AyX۠A]g?.+;?@@yGz?FX>9mX۠AyX۠AsdZg?.+;?@@yGz?Ӱ7>9mX۠AyX۠ArZg?.+;?@@yGz?"xZ>9mX۠AyX۠A0,g?.+;?@@yGz?[-}>9mX۠AyX۠A=4f?.+;?@@yGz?⟡>9mX۠AyX۠ADEf?.+;?@@yGz?mEu¡>9mX۠AyX۠A^[:Vf?.+;?@@yGz?t(gL>9mX۠AyX۠AHGnmxf?.+;?@@yGz?JlX>9mX۠AyX۠AJ6-Mf?.+;?@@yGz?ӰI*>9mX۠AyX۠AQ!"f?.+;?@@yGz?&:kM>9mX۠AyX۠Ame?.+;?@@yGz?29, p>9mX۠AyX۠A[(=e?.+;?@@yGz?b}Ւ>9mX۠AyX۠A|>|e?.+;?@@yGz?q>9mX۠AyX۠AD9mX۠AyX۠Ay1¼Ve?.+;?@@yGz?NI>9mX۠AyX۠Av`/e?.+;?@@yGz?>9mX۠AyX۠A]o@ e?.+;?@@yGz?*O]@>9mX۠AyX۠AQfSd?.+;?@@yGz?~c>9mX۠AyX۠AVߠd?.+;?@@yGz?ZDž>9mX۠AyX۠Ad?.+;?@@yGz?uݞ|>9mX۠AyX۠Ajtd?.+;?@@yGz? 1ˣ>9mX۠AyX۠A](EPd?.+;?@@yGz?Q<'>9mX۠AyX۠AO r-d?.+;?@@yGz?kk{>9mX۠AyX۠Ab9 d?.+;?@@yGz?.lP3>9mX۠AyX۠ATc?.+;?@@yGz?]V>9mX۠AyX۠A8"c?.+;?@@yGz? 7Ox>9mX۠AyX۠A͜c?.+;?@@yGz?x)|@o>9mX۠AyX۠AF揇c?.+;?@@yGz?X1$>9mX۠AyX۠Aw3nbc?.+;?@@yGz?U#>9mX۠AyX۠A>^ Bc?.+;?@@yGz?ķH>9mX۠AyX۠Aoۄ"c?.+;?@@yGz?2C&>9mX۠AyX۠Adwdpc?.+;?@@yGz?H>9mX۠AyX۠ADob?.+;?@@yGz?Fk>9mX۠AyX۠ArEmb?.+;?@@yGz?xuYa>9mX۠AyX۠A~b?.+;?@@yGz?ꤝ>9mX۠AyX۠Akb?.+;?@@yGz?Yӥ>9mX۠AyX۠A;Flb?.+;?@@yGz?&>9mX۠AyX۠ABY)Ob?.+;?@@yGz?63j5>9mX۠AyX۠AB}mh2b?.+;?@@yGz?b;>9mX۠AyX۠Aeb?.+;?@@yGz?^>9mX۠AyX۠Am>a?.+;?@@yGz?6rT>9mX۠AyX۠AF8a?.+;?@@yGz?zc >9mX۠AyX۠A"Ka?.+;?@@yGz?[ TƦ>9mX۠AyX۠AVça?.+;?@@yGz?OFs>9mX۠AyX۠A`Ia?.+;?@@yGz?:G7( >9mX۠AyX۠A|Sra?.+;?@@yGz?(.>9mX۠AyX۠AvVxXa?.+;?@@yGz?Q>9mX۠AyX۠AƭNm>a?.+;?@@yGz?  Gt>9mX۠AyX۠AA"%a?.+;?@@yGz?9mX۠AyX۠AB. a?.+;?@@yGz?`l>9mX۠AyX۠A` g`?.+;?@@yGz?̛eܧ>9mX۠AyX۠Av*R`?.+;?@@yGz?:$>9mX۠AyX۠A:i>`?.+;?@@yGz?h!>9mX۠AyX۠AZ)`oة`?.+;?@@yGz?*D>9mX۠AyX۠Aٳ`?.+;?@@yGz?Y9g>9mX۠AyX۠A$yrz`?.+;?@@yGz?5>9mX۠AyX۠ASZ $c`?.+;?@@yGz?by>9mX۠AyX۠A 1L`?.+;?@@yGz?wXϨ>9mX۠AyX۠As J5`?.+;?@@yGz?Ai >9mX۠AyX۠A-`?.+;?@@yGz?FFZ>9mX۠AyX۠Ayao`?.+;?@@yGz?vKw7>9mX۠AyX۠A*e_?.+;?@@yGz?<,Z>9mX۠AyX۠An#_?.+;?@@yGz?.|>9mX۠AyX۠A T_?.+;?@@yGz?hW>9mX۠AyX۠A, 0#c_?.+;?@@yGz?3K©>9mX۠AyX۠A=8_?.+;?@@yGz?Ec>9mX۠AyX۠A#_?.+;?@@yGz?#>9mX۠AyX۠Aף^?.+;?@@yGz?"gi*>9mX۠AyX۠AI*^?.+;?@@yGz?M>9mX۠AyX۠A0n ^?.+;?@@yGz? o>9mX۠AyX۠Ak^?.+;?@@yGz?lP4>9mX۠AyX۠Ao+D^?.+;?@@yGz?x=>9mX۠AyX۠AV@c^?.+;?@@yGz?Iת>9mX۠AyX۠A h]?.+;?@@yGz?Iך>kX۠AyX۠A hm?5;x"?@@yGz?$E}\>kX۠AyX۠A Tt4m?5;x"?@@yGz?m_b>kX۠AyX۠AO^m?5;x"?@@yGz?UB0>kX۠AyX۠A.M%Qm?5;x"?@@yGz?*$>kX۠AyX۠A( l?5;x"?@@yGz?f3>kX۠AyX۠A3=(l?5;x"?@@yGz?umx>kX۠AyX۠Aս?l?5;x"?@@yGz?LGw׽>kX۠AyX۠A2 fk?5;x"?@@yGz?*A>kX۠AyX۠Artk?5;x"?@@yGz? H>kX۠AyX۠AȆʾvk?5;x"?@@yGz?ct>kX۠AyX۠A 7>6k?5;x"?@@yGz?˜Vӝ>kX۠AyX۠A#j?5;x"?@@yGz?!!9>kX۠AyX۠AMuj?5;x"?@@yGz?zS^>kX۠AyX۠A{j?5;x"?@@yGz?X1>kX۠AyX۠A}?j?5;x"?@@yGz?4>&>kX۠AyX۠A޿j?5;x"?@@yGz?BÐ.>kX۠AyX۠A'Ipi?5;x"?@@yGz?ʥs>kX۠AyX۠Acݑi?5;x"?@@yGz?ZSd>kX۠AyX۠A1Yi?5;x"?@@yGz?j>kX۠AyX۠A֝>^"i?5;x"?@@yGz?B &">kX۠AyX۠A.h?5;x"?@@yGz?;D>kX۠AyX۠A5Fh?5;x"?@@yGz?k: g>kX۠AyX۠AI>`h?5;x"?@@yGz?~:>kX۠AyX۠A*=Oh?5;x"?@@yGz?ﬠ>kX۠AyX۠AiZVh?5;x"?@@yGz?iݤϠ>kX۠AyX۠AKfg?5;x"?@@yGz?(KY>kX۠AyX۠A]g?5;x"?@@yGz?FX>kX۠AyX۠AsdZg?5;x"?@@yGz?Ӱ7>kX۠AyX۠ArZg?5;x"?@@yGz?"xZ>kX۠AyX۠A~0,g?5;x"?@@yGz?[-}>kX۠AyX۠A =4f?5;x"?@@yGz?⟡>kX۠AyX۠ADEf?5;x"?@@yGz?mEu¡>kX۠AyX۠A^[:Vf?5;x"?@@yGz?t(gL>kX۠AyX۠AHGnmxf?5;x"?@@yGz?JlX>kX۠AyX۠AJ6-Mf?5;x"?@@yGz?ӰI*>kX۠AyX۠AQ!"f?5;x"?@@yGz?&:kM>kX۠AyX۠Ame?5;x"?@@yGz?29, p>kX۠AyX۠A[(=e?5;x"?@@yGz?b}Ւ>kX۠AyX۠A|>|e?5;x"?@@yGz?q>kX۠AyX۠ADkX۠AyX۠Ay1¼Ve?5;x"?@@yGz?NI>kX۠AyX۠Aw`/e?5;x"?@@yGz?>kX۠AyX۠A]o@ e?5;x"?@@yGz?*O]@>kX۠AyX۠APfSd?5;x"?@@yGz?~c>kX۠AyX۠AVߠd?5;x"?@@yGz?ZDž>kX۠AyX۠Ad?5;x"?@@yGz?tݞ|>kX۠AyX۠Ajtd?5;x"?@@yGz? 1ˣ>kX۠AyX۠A](EPd?5;x"?@@yGz?Q<'>kX۠AyX۠AO r-d?5;x"?@@yGz?kk{>kX۠AyX۠Ab9 d?5;x"?@@yGz?.lP3>kX۠AyX۠ATc?5;x"?@@yGz?]V>kX۠AyX۠A8"c?5;x"?@@yGz? 7Ox>kX۠AyX۠A͜c?5;x"?@@yGz?x)|@o>kX۠AyX۠AG揇c?5;x"?@@yGz?X1$>kX۠AyX۠Av3nbc?5;x"?@@yGz?T#>kX۠AyX۠A?^ Bc?5;x"?@@yGz?ŷH>kX۠AyX۠Aoۄ"c?5;x"?@@yGz?2C&>kX۠AyX۠Adwdpc?5;x"?@@yGz?H>kX۠AyX۠ADob?5;x"?@@yGz?Fk>kX۠AyX۠ArEmb?5;x"?@@yGz?xuYa>kX۠AyX۠A~b?5;x"?@@yGz?ꤝ>kX۠AyX۠Ajb?5;x"?@@yGz?Yӥ>kX۠AyX۠A:Flb?5;x"?@@yGz?&>kX۠AyX۠ACY)Ob?5;x"?@@yGz?63j5>kX۠AyX۠AB}mh2b?5;x"?@@yGz?b;>kX۠AyX۠Aeb?5;x"?@@yGz?^>kX۠AyX۠Am>a?5;x"?@@yGz?6rT>kX۠AyX۠AF8a?5;x"?@@yGz?zc >kX۠AyX۠A"Ka?5;x"?@@yGz?\ TƦ>kX۠AyX۠AVça?5;x"?@@yGz?OFs>kX۠AyX۠A`Ia?5;x"?@@yGz?:G7( >kX۠AyX۠A|Sra?5;x"?@@yGz?(.>kX۠AyX۠AvVxXa?5;x"?@@yGz?Q>kX۠AyX۠AƭNm>a?5;x"?@@yGz?  Gt>kX۠AyX۠AA"%a?5;x"?@@yGz?kX۠AyX۠AB. a?5;x"?@@yGz?`l>kX۠AyX۠A` g`?5;x"?@@yGz?˛eܧ>kX۠AyX۠Av*R`?5;x"?@@yGz?:$>kX۠AyX۠A:i>`?5;x"?@@yGz?h!>kX۠AyX۠AZ)`oة`?5;x"?@@yGz?*D>kX۠AyX۠Aٳ`?5;x"?@@yGz?Y9g>kX۠AyX۠A$yrz`?5;x"?@@yGz?5>kX۠AyX۠ASZ $c`?5;x"?@@yGz?by>kX۠AyX۠A 1L`?5;x"?@@yGz?wXϨ>kX۠AyX۠As J5`?5;x"?@@yGz?Ai >kX۠AyX۠A-`?5;x"?@@yGz?FFZ>kX۠AyX۠Ayao`?5;x"?@@yGz?vKw7>kX۠AyX۠A*e_?5;x"?@@yGz?<,Z>kX۠AyX۠An#_?5;x"?@@yGz?.|>kX۠AyX۠A T_?5;x"?@@yGz?hW>kX۠AyX۠A, 0#c_?5;x"?@@yGz?3K©>kX۠AyX۠A=8_?5;x"?@@yGz?Dc>kX۠AyX۠A#_?5;x"?@@yGz?#>kX۠AyX۠Aף^?5;x"?@@yGz?"gi*>kX۠AyX۠AI*^?5;x"?@@yGz?M>kX۠AyX۠A0n ^?5;x"?@@yGz? o>kX۠AyX۠Ak^?5;x"?@@yGz?kP4>kX۠AyX۠Ao+D^?5;x"?@@yGz?x=>kX۠AyX۠AV@c^?5;x"?@@yGz?Iת>kX۠AyX۠A h]?5;x"?@@yGz?Iך>!'jX۠AyX۠A hm?<^h ?@@yGz?%E}\>!'jX۠AyX۠A Tt4m?<^h ?@@yGz?m_b>!'jX۠AyX۠AO^m?<^h ?@@yGz?UB0>!'jX۠AyX۠A.M%Qm?<^h ?@@yGz?*$>!'jX۠AyX۠A( l?<^h ?@@yGz?f3>!'jX۠AyX۠A3=(l?<^h ?@@yGz?tmx>!'jX۠AyX۠Aս?l?<^h ?@@yGz?KGw׽>!'jX۠AyX۠A2 fk?<^h ?@@yGz?*A>!'jX۠AyX۠Artk?<^h ?@@yGz? H>!'jX۠AyX۠AȆʾvk?<^h ?@@yGz?ct>!'jX۠AyX۠A 7>6k?<^h ?@@yGz?˜Vӝ>!'jX۠AyX۠A#j?<^h ?@@yGz?!!9>!'jX۠AyX۠AMuj?<^h ?@@yGz?zS^>!'jX۠AyX۠A{j?<^h ?@@yGz?X1>!'jX۠AyX۠A}?j?<^h ?@@yGz?5>&>!'jX۠AyX۠A޿j?<^h ?@@yGz?BÐ.>!'jX۠AyX۠A'Ipi?<^h ?@@yGz?ʥs>!'jX۠AyX۠Acݑi?<^h ?@@yGz?ZSd>!'jX۠AyX۠A1Yi?<^h ?@@yGz?j>!'jX۠AyX۠Aם>^"i?<^h ?@@yGz?B &">!'jX۠AyX۠A.h?<^h ?@@yGz?;D>!'jX۠AyX۠A5Fh?<^h ?@@yGz?k: g>!'jX۠AyX۠AI>`h?<^h ?@@yGz?~:>!'jX۠AyX۠A+=Oh?<^h ?@@yGz?ﬠ>!'jX۠AyX۠AiZVh?<^h ?@@yGz?iݤϠ>!'jX۠AyX۠AKfg?<^h ?@@yGz?(KY>!'jX۠AyX۠A]g?<^h ?@@yGz?FX>!'jX۠AyX۠AsdZg?<^h ?@@yGz?Ӱ7>!'jX۠AyX۠ArZg?<^h ?@@yGz?"xZ>!'jX۠AyX۠A0,g?<^h ?@@yGz?[-}>!'jX۠AyX۠A=4f?<^h ?@@yGz?⟡>!'jX۠AyX۠ADEf?<^h ?@@yGz?mEu¡>!'jX۠AyX۠A^[:Vf?<^h ?@@yGz?t(gL>!'jX۠AyX۠AHGnmxf?<^h ?@@yGz?JlX>!'jX۠AyX۠AJ6-Mf?<^h ?@@yGz?ӰI*>!'jX۠AyX۠AQ!"f?<^h ?@@yGz?&:kM>!'jX۠AyX۠Ame?<^h ?@@yGz?29, p>!'jX۠AyX۠A[(=e?<^h ?@@yGz?b}Ւ>!'jX۠AyX۠A|>|e?<^h ?@@yGz?q>!'jX۠AyX۠AD!'jX۠AyX۠Ay1¼Ve?<^h ?@@yGz?NI>!'jX۠AyX۠Av`/e?<^h ?@@yGz?>!'jX۠AyX۠A]o@ e?<^h ?@@yGz?*O]@>!'jX۠AyX۠AQfSd?<^h ?@@yGz?~c>!'jX۠AyX۠AVߠd?<^h ?@@yGz?ZDž>!'jX۠AyX۠Ad?<^h ?@@yGz?uݞ|>!'jX۠AyX۠Ajtd?<^h ?@@yGz? 1ˣ>!'jX۠AyX۠A](EPd?<^h ?@@yGz?Q<'>!'jX۠AyX۠AO r-d?<^h ?@@yGz?kk{>!'jX۠AyX۠Ab9 d?<^h ?@@yGz?.lP3>!'jX۠AyX۠ATc?<^h ?@@yGz?]V>!'jX۠AyX۠A8"c?<^h ?@@yGz? 7Ox>!'jX۠AyX۠A͜c?<^h ?@@yGz?x)|@o>!'jX۠AyX۠AF揇c?<^h ?@@yGz?X1$>!'jX۠AyX۠Aw3nbc?<^h ?@@yGz?U#>!'jX۠AyX۠A>^ Bc?<^h ?@@yGz?ķH>!'jX۠AyX۠Aoۄ"c?<^h ?@@yGz?2C&>!'jX۠AyX۠Adwdpc?<^h ?@@yGz?H>!'jX۠AyX۠ADob?<^h ?@@yGz?Fk>!'jX۠AyX۠ArEmb?<^h ?@@yGz?xuYa>!'jX۠AyX۠A~b?<^h ?@@yGz?ꤝ>!'jX۠AyX۠Akb?<^h ?@@yGz?Yӥ>!'jX۠AyX۠A;Flb?<^h ?@@yGz?&>!'jX۠AyX۠ABY)Ob?<^h ?@@yGz?63j5>!'jX۠AyX۠AB}mh2b?<^h ?@@yGz?b;>!'jX۠AyX۠Aeb?<^h ?@@yGz?^>!'jX۠AyX۠Am>a?<^h ?@@yGz?6rT>!'jX۠AyX۠AF8a?<^h ?@@yGz?zc >!'jX۠AyX۠A"Ka?<^h ?@@yGz?[ TƦ>!'jX۠AyX۠AVça?<^h ?@@yGz?OFs>!'jX۠AyX۠A`Ia?<^h ?@@yGz?:G7( >!'jX۠AyX۠A|Sra?<^h ?@@yGz?(.>!'jX۠AyX۠AvVxXa?<^h ?@@yGz?Q>!'jX۠AyX۠AƭNm>a?<^h ?@@yGz?  Gt>!'jX۠AyX۠AA"%a?<^h ?@@yGz?!'jX۠AyX۠AB. a?<^h ?@@yGz?`l>!'jX۠AyX۠A` g`?<^h ?@@yGz?̛eܧ>!'jX۠AyX۠Av*R`?<^h ?@@yGz?:$>!'jX۠AyX۠A:i>`?<^h ?@@yGz?h!>!'jX۠AyX۠AZ)`oة`?<^h ?@@yGz?*D>!'jX۠AyX۠Aٳ`?<^h ?@@yGz?Y9g>!'jX۠AyX۠A$yrz`?<^h ?@@yGz?5>!'jX۠AyX۠ASZ $c`?<^h ?@@yGz?by>!'jX۠AyX۠A 1L`?<^h ?@@yGz?wXϨ>!'jX۠AyX۠As J5`?<^h ?@@yGz?Ai >!'jX۠AyX۠A-`?<^h ?@@yGz?FFZ>!'jX۠AyX۠Ayao`?<^h ?@@yGz?vKw7>!'jX۠AyX۠A*e_?<^h ?@@yGz?<,Z>!'jX۠AyX۠An#_?<^h ?@@yGz?.|>!'jX۠AyX۠A T_?<^h ?@@yGz?hW>!'jX۠AyX۠A, 0#c_?<^h ?@@yGz?3K©>!'jX۠AyX۠A=8_?<^h ?@@yGz?Ec>!'jX۠AyX۠A#_?<^h ?@@yGz?#>!'jX۠AyX۠Aף^?<^h ?@@yGz?"gi*>!'jX۠AyX۠AI*^?<^h ?@@yGz?M>!'jX۠AyX۠A0n ^?<^h ?@@yGz? o>!'jX۠AyX۠Ak^?<^h ?@@yGz?lP4>!'jX۠AyX۠Ao+D^?<^h ?@@yGz?x=>!'jX۠AyX۠AV@c^?<^h ?@@yGz?Iת>!'jX۠AyX۠A h]?<^h ?@@yGz?Iך>/hX۠AyX۠A hm?Av?@@yGz?$E}\>/hX۠AyX۠A Tt4m?Av?@@yGz?m_b>/hX۠AyX۠AO^m?Av?@@yGz?UB0>/hX۠AyX۠A.M%Qm?Av?@@yGz?*$>/hX۠AyX۠A( l?Av?@@yGz?f3>/hX۠AyX۠A3=(l?Av?@@yGz?umx>/hX۠AyX۠Aս?l?Av?@@yGz?LGw׽>/hX۠AyX۠A2 fk?Av?@@yGz?*A>/hX۠AyX۠Artk?Av?@@yGz? H>/hX۠AyX۠AȆʾvk?Av?@@yGz?ct>/hX۠AyX۠A 7>6k?Av?@@yGz?˜Vӝ>/hX۠AyX۠A#j?Av?@@yGz?!!9>/hX۠AyX۠AMuj?Av?@@yGz?zS^>/hX۠AyX۠A{j?Av?@@yGz?X1>/hX۠AyX۠A}?j?Av?@@yGz?4>&>/hX۠AyX۠A޿j?Av?@@yGz?BÐ.>/hX۠AyX۠A'Ipi?Av?@@yGz?ʥs>/hX۠AyX۠Acݑi?Av?@@yGz?ZSd>/hX۠AyX۠A1Yi?Av?@@yGz?j>/hX۠AyX۠A֝>^"i?Av?@@yGz?B &">/hX۠AyX۠A.h?Av?@@yGz?;D>/hX۠AyX۠A5Fh?Av?@@yGz?k: g>/hX۠AyX۠AI>`h?Av?@@yGz?~:>/hX۠AyX۠A*=Oh?Av?@@yGz?ﬠ>/hX۠AyX۠AiZVh?Av?@@yGz?iݤϠ>/hX۠AyX۠AKfg?Av?@@yGz?(KY>/hX۠AyX۠A]g?Av?@@yGz?FX>/hX۠AyX۠AsdZg?Av?@@yGz?Ӱ7>/hX۠AyX۠ArZg?Av?@@yGz?"xZ>/hX۠AyX۠A~0,g?Av?@@yGz?[-}>/hX۠AyX۠A =4f?Av?@@yGz?⟡>/hX۠AyX۠ADEf?Av?@@yGz?mEu¡>/hX۠AyX۠A^[:Vf?Av?@@yGz?t(gL>/hX۠AyX۠AHGnmxf?Av?@@yGz?JlX>/hX۠AyX۠AJ6-Mf?Av?@@yGz?ӰI*>/hX۠AyX۠AQ!"f?Av?@@yGz?&:kM>/hX۠AyX۠Ame?Av?@@yGz?29, p>/hX۠AyX۠A[(=e?Av?@@yGz?b}Ւ>/hX۠AyX۠A|>|e?Av?@@yGz?q>/hX۠AyX۠AD/hX۠AyX۠Ay1¼Ve?Av?@@yGz?NI>/hX۠AyX۠Aw`/e?Av?@@yGz?>/hX۠AyX۠A]o@ e?Av?@@yGz?*O]@>/hX۠AyX۠APfSd?Av?@@yGz?~c>/hX۠AyX۠AVߠd?Av?@@yGz?ZDž>/hX۠AyX۠Ad?Av?@@yGz?tݞ|>/hX۠AyX۠Ajtd?Av?@@yGz? 1ˣ>/hX۠AyX۠A](EPd?Av?@@yGz?Q<'>/hX۠AyX۠AO r-d?Av?@@yGz?kk{>/hX۠AyX۠Ab9 d?Av?@@yGz?.lP3>/hX۠AyX۠ATc?Av?@@yGz?]V>/hX۠AyX۠A8"c?Av?@@yGz? 7Ox>/hX۠AyX۠A͜c?Av?@@yGz?x)|@o>/hX۠AyX۠AG揇c?Av?@@yGz?X1$>/hX۠AyX۠Av3nbc?Av?@@yGz?T#>/hX۠AyX۠A?^ Bc?Av?@@yGz?ŷH>/hX۠AyX۠Aoۄ"c?Av?@@yGz?2C&>/hX۠AyX۠Adwdpc?Av?@@yGz?H>/hX۠AyX۠ADob?Av?@@yGz?Fk>/hX۠AyX۠ArEmb?Av?@@yGz?xuYa>/hX۠AyX۠A~b?Av?@@yGz?ꤝ>/hX۠AyX۠Ajb?Av?@@yGz?Yӥ>/hX۠AyX۠A:Flb?Av?@@yGz?&>/hX۠AyX۠ACY)Ob?Av?@@yGz?63j5>/hX۠AyX۠AB}mh2b?Av?@@yGz?b;>/hX۠AyX۠Aeb?Av?@@yGz?^>/hX۠AyX۠Am>a?Av?@@yGz?6rT>/hX۠AyX۠AF8a?Av?@@yGz?zc >/hX۠AyX۠A"Ka?Av?@@yGz?\ TƦ>/hX۠AyX۠AVça?Av?@@yGz?OFs>/hX۠AyX۠A`Ia?Av?@@yGz?:G7( >/hX۠AyX۠A|Sra?Av?@@yGz?(.>/hX۠AyX۠AvVxXa?Av?@@yGz?Q>/hX۠AyX۠AƭNm>a?Av?@@yGz?  Gt>/hX۠AyX۠AA"%a?Av?@@yGz?/hX۠AyX۠AB. a?Av?@@yGz?`l>/hX۠AyX۠A` g`?Av?@@yGz?˛eܧ>/hX۠AyX۠Av*R`?Av?@@yGz?:$>/hX۠AyX۠A:i>`?Av?@@yGz?h!>/hX۠AyX۠AZ)`oة`?Av?@@yGz?*D>/hX۠AyX۠Aٳ`?Av?@@yGz?Y9g>/hX۠AyX۠A$yrz`?Av?@@yGz?5>/hX۠AyX۠ASZ $c`?Av?@@yGz?by>/hX۠AyX۠A 1L`?Av?@@yGz?wXϨ>/hX۠AyX۠As J5`?Av?@@yGz?Ai >/hX۠AyX۠A-`?Av?@@yGz?FFZ>/hX۠AyX۠Ayao`?Av?@@yGz?vKw7>/hX۠AyX۠A*e_?Av?@@yGz?<,Z>/hX۠AyX۠An#_?Av?@@yGz?.|>/hX۠AyX۠A T_?Av?@@yGz?hW>/hX۠AyX۠A, 0#c_?Av?@@yGz?3K©>/hX۠AyX۠A=8_?Av?@@yGz?Dc>/hX۠AyX۠A#_?Av?@@yGz?#>/hX۠AyX۠Aף^?Av?@@yGz?"gi*>/hX۠AyX۠AI*^?Av?@@yGz?M>/hX۠AyX۠A0n ^?Av?@@yGz? o>/hX۠AyX۠Ak^?Av?@@yGz?kP4>/hX۠AyX۠Ao+D^?Av?@@yGz?x=>/hX۠AyX۠AV@c^?Av?@@yGz?Iת>/hX۠AyX۠A h]?Av?@@yGz?Iך><gX۠AyX۠A hm?HJ?@@yGz?%E}\><gX۠AyX۠A Tt4m?HJ?@@yGz?m_b><gX۠AyX۠AO^m?HJ?@@yGz?UB0><gX۠AyX۠A.M%Qm?HJ?@@yGz?*$><gX۠AyX۠A( l?HJ?@@yGz?f3><gX۠AyX۠A3=(l?HJ?@@yGz?tmx><gX۠AyX۠Aս?l?HJ?@@yGz?KGw׽><gX۠AyX۠A2 fk?HJ?@@yGz?*A><gX۠AyX۠Artk?HJ?@@yGz? H><gX۠AyX۠AȆʾvk?HJ?@@yGz?ct><gX۠AyX۠A 7>6k?HJ?@@yGz?˜Vӝ><gX۠AyX۠A#j?HJ?@@yGz?!!9><gX۠AyX۠AMuj?HJ?@@yGz?zS^><gX۠AyX۠A{j?HJ?@@yGz?X1><gX۠AyX۠A}?j?HJ?@@yGz?5>&><gX۠AyX۠A޿j?HJ?@@yGz?BÐ.><gX۠AyX۠A'Ipi?HJ?@@yGz?ʥs><gX۠AyX۠Acݑi?HJ?@@yGz?ZSd><gX۠AyX۠A1Yi?HJ?@@yGz?j><gX۠AyX۠Aם>^"i?HJ?@@yGz?B &"><gX۠AyX۠A.h?HJ?@@yGz?;D><gX۠AyX۠A5Fh?HJ?@@yGz?k: g><gX۠AyX۠AI>`h?HJ?@@yGz?~:><gX۠AyX۠A+=Oh?HJ?@@yGz?ﬠ><gX۠AyX۠AiZVh?HJ?@@yGz?iݤϠ><gX۠AyX۠AKfg?HJ?@@yGz?(KY><gX۠AyX۠A]g?HJ?@@yGz?FX><gX۠AyX۠AsdZg?HJ?@@yGz?Ӱ7><gX۠AyX۠ArZg?HJ?@@yGz?"xZ><gX۠AyX۠A0,g?HJ?@@yGz?[-}><gX۠AyX۠A=4f?HJ?@@yGz?⟡><gX۠AyX۠ADEf?HJ?@@yGz?mEu¡><gX۠AyX۠A^[:Vf?HJ?@@yGz?t(gL><gX۠AyX۠AHGnmxf?HJ?@@yGz?JlX><gX۠AyX۠AJ6-Mf?HJ?@@yGz?ӰI*><gX۠AyX۠AQ!"f?HJ?@@yGz?&:kM><gX۠AyX۠Ame?HJ?@@yGz?29, p><gX۠AyX۠A[(=e?HJ?@@yGz?b}Ւ><gX۠AyX۠A|>|e?HJ?@@yGz?q><gX۠AyX۠AD<gX۠AyX۠Ay1¼Ve?HJ?@@yGz?NI><gX۠AyX۠Av`/e?HJ?@@yGz?><gX۠AyX۠A]o@ e?HJ?@@yGz?*O]@><gX۠AyX۠AQfSd?HJ?@@yGz?~c><gX۠AyX۠AVߠd?HJ?@@yGz?ZDž><gX۠AyX۠Ad?HJ?@@yGz?uݞ|><gX۠AyX۠Ajtd?HJ?@@yGz? 1ˣ><gX۠AyX۠A](EPd?HJ?@@yGz?Q<'><gX۠AyX۠AO r-d?HJ?@@yGz?kk{><gX۠AyX۠Ab9 d?HJ?@@yGz?.lP3><gX۠AyX۠ATc?HJ?@@yGz?]V><gX۠AyX۠A8"c?HJ?@@yGz? 7Ox><gX۠AyX۠A͜c?HJ?@@yGz?x)|@o><gX۠AyX۠AF揇c?HJ?@@yGz?X1$><gX۠AyX۠Aw3nbc?HJ?@@yGz?U#><gX۠AyX۠A>^ Bc?HJ?@@yGz?ķH><gX۠AyX۠Aoۄ"c?HJ?@@yGz?2C&><gX۠AyX۠Adwdpc?HJ?@@yGz?H><gX۠AyX۠ADob?HJ?@@yGz?Fk><gX۠AyX۠ArEmb?HJ?@@yGz?xuYa><gX۠AyX۠A~b?HJ?@@yGz?ꤝ><gX۠AyX۠Akb?HJ?@@yGz?Yӥ><gX۠AyX۠A;Flb?HJ?@@yGz?&><gX۠AyX۠ABY)Ob?HJ?@@yGz?63j5><gX۠AyX۠AB}mh2b?HJ?@@yGz?b;><gX۠AyX۠Aeb?HJ?@@yGz?^><gX۠AyX۠Am>a?HJ?@@yGz?6rT><gX۠AyX۠AF8a?HJ?@@yGz?zc ><gX۠AyX۠A"Ka?HJ?@@yGz?[ TƦ><gX۠AyX۠AVça?HJ?@@yGz?OFs><gX۠AyX۠A`Ia?HJ?@@yGz?:G7( ><gX۠AyX۠A|Sra?HJ?@@yGz?(.><gX۠AyX۠AvVxXa?HJ?@@yGz?Q><gX۠AyX۠AƭNm>a?HJ?@@yGz?  Gt><gX۠AyX۠AA"%a?HJ?@@yGz?<gX۠AyX۠AB. a?HJ?@@yGz?`l><gX۠AyX۠A` g`?HJ?@@yGz?̛eܧ><gX۠AyX۠Av*R`?HJ?@@yGz?:$><gX۠AyX۠A:i>`?HJ?@@yGz?h!><gX۠AyX۠AZ)`oة`?HJ?@@yGz?*D><gX۠AyX۠Aٳ`?HJ?@@yGz?Y9g><gX۠AyX۠A$yrz`?HJ?@@yGz?5><gX۠AyX۠ASZ $c`?HJ?@@yGz?by><gX۠AyX۠A 1L`?HJ?@@yGz?wXϨ><gX۠AyX۠As J5`?HJ?@@yGz?Ai ><gX۠AyX۠A-`?HJ?@@yGz?FFZ><gX۠AyX۠Ayao`?HJ?@@yGz?vKw7><gX۠AyX۠A*e_?HJ?@@yGz?<,Z><gX۠AyX۠An#_?HJ?@@yGz?.|><gX۠AyX۠A T_?HJ?@@yGz?hW><gX۠AyX۠A, 0#c_?HJ?@@yGz?3K©><gX۠AyX۠A=8_?HJ?@@yGz?Ec><gX۠AyX۠A#_?HJ?@@yGz?#><gX۠AyX۠Aף^?HJ?@@yGz?"gi*><gX۠AyX۠AI*^?HJ?@@yGz?M><gX۠AyX۠A0n ^?HJ?@@yGz? o><gX۠AyX۠Ak^?HJ?@@yGz?lP4><gX۠AyX۠Ao+D^?HJ?@@yGz?x=><gX۠AyX۠AV@c^?HJ?@@yGz?Iת><gX۠AyX۠A h]?HJ?@@yGz?Iך>IeX۠AyX۠A hm?Mt?@@yGz?$E}\>IeX۠AyX۠A Tt4m?Mt?@@yGz?m_b>IeX۠AyX۠AO^m?Mt?@@yGz?UB0>IeX۠AyX۠A.M%Qm?Mt?@@yGz?*$>IeX۠AyX۠A( l?Mt?@@yGz?f3>IeX۠AyX۠A3=(l?Mt?@@yGz?umx>IeX۠AyX۠Aս?l?Mt?@@yGz?LGw׽>IeX۠AyX۠A2 fk?Mt?@@yGz?*A>IeX۠AyX۠Artk?Mt?@@yGz? H>IeX۠AyX۠AȆʾvk?Mt?@@yGz?ct>IeX۠AyX۠A 7>6k?Mt?@@yGz?˜Vӝ>IeX۠AyX۠A#j?Mt?@@yGz?!!9>IeX۠AyX۠AMuj?Mt?@@yGz?zS^>IeX۠AyX۠A{j?Mt?@@yGz?X1>IeX۠AyX۠A}?j?Mt?@@yGz?4>&>IeX۠AyX۠A޿j?Mt?@@yGz?BÐ.>IeX۠AyX۠A'Ipi?Mt?@@yGz?ʥs>IeX۠AyX۠Acݑi?Mt?@@yGz?ZSd>IeX۠AyX۠A1Yi?Mt?@@yGz?j>IeX۠AyX۠A֝>^"i?Mt?@@yGz?B &">IeX۠AyX۠A.h?Mt?@@yGz?;D>IeX۠AyX۠A5Fh?Mt?@@yGz?k: g>IeX۠AyX۠AI>`h?Mt?@@yGz?~:>IeX۠AyX۠A*=Oh?Mt?@@yGz?ﬠ>IeX۠AyX۠AiZVh?Mt?@@yGz?iݤϠ>IeX۠AyX۠AKfg?Mt?@@yGz?(KY>IeX۠AyX۠A]g?Mt?@@yGz?FX>IeX۠AyX۠AsdZg?Mt?@@yGz?Ӱ7>IeX۠AyX۠ArZg?Mt?@@yGz?"xZ>IeX۠AyX۠A~0,g?Mt?@@yGz?[-}>IeX۠AyX۠A =4f?Mt?@@yGz?⟡>IeX۠AyX۠ADEf?Mt?@@yGz?mEu¡>IeX۠AyX۠A^[:Vf?Mt?@@yGz?t(gL>IeX۠AyX۠AHGnmxf?Mt?@@yGz?JlX>IeX۠AyX۠AJ6-Mf?Mt?@@yGz?ӰI*>IeX۠AyX۠AQ!"f?Mt?@@yGz?&:kM>IeX۠AyX۠Ame?Mt?@@yGz?29, p>IeX۠AyX۠A[(=e?Mt?@@yGz?b}Ւ>IeX۠AyX۠A|>|e?Mt?@@yGz?q>IeX۠AyX۠ADIeX۠AyX۠Ay1¼Ve?Mt?@@yGz?NI>IeX۠AyX۠Aw`/e?Mt?@@yGz?>IeX۠AyX۠A]o@ e?Mt?@@yGz?*O]@>IeX۠AyX۠APfSd?Mt?@@yGz?~c>IeX۠AyX۠AVߠd?Mt?@@yGz?ZDž>IeX۠AyX۠Ad?Mt?@@yGz?tݞ|>IeX۠AyX۠Ajtd?Mt?@@yGz? 1ˣ>IeX۠AyX۠A](EPd?Mt?@@yGz?Q<'>IeX۠AyX۠AO r-d?Mt?@@yGz?kk{>IeX۠AyX۠Ab9 d?Mt?@@yGz?.lP3>IeX۠AyX۠ATc?Mt?@@yGz?]V>IeX۠AyX۠A8"c?Mt?@@yGz? 7Ox>IeX۠AyX۠A͜c?Mt?@@yGz?x)|@o>IeX۠AyX۠AG揇c?Mt?@@yGz?X1$>IeX۠AyX۠Av3nbc?Mt?@@yGz?T#>IeX۠AyX۠A?^ Bc?Mt?@@yGz?ŷH>IeX۠AyX۠Aoۄ"c?Mt?@@yGz?2C&>IeX۠AyX۠Adwdpc?Mt?@@yGz?H>IeX۠AyX۠ADob?Mt?@@yGz?Fk>IeX۠AyX۠ArEmb?Mt?@@yGz?xuYa>IeX۠AyX۠A~b?Mt?@@yGz?ꤝ>IeX۠AyX۠Ajb?Mt?@@yGz?Yӥ>IeX۠AyX۠A:Flb?Mt?@@yGz?&>IeX۠AyX۠ACY)Ob?Mt?@@yGz?63j5>IeX۠AyX۠AB}mh2b?Mt?@@yGz?b;>IeX۠AyX۠Aeb?Mt?@@yGz?^>IeX۠AyX۠Am>a?Mt?@@yGz?6rT>IeX۠AyX۠AF8a?Mt?@@yGz?zc >IeX۠AyX۠A"Ka?Mt?@@yGz?\ TƦ>IeX۠AyX۠AVça?Mt?@@yGz?OFs>IeX۠AyX۠A`Ia?Mt?@@yGz?:G7( >IeX۠AyX۠A|Sra?Mt?@@yGz?(.>IeX۠AyX۠AvVxXa?Mt?@@yGz?Q>IeX۠AyX۠AƭNm>a?Mt?@@yGz?  Gt>IeX۠AyX۠AA"%a?Mt?@@yGz?IeX۠AyX۠AB. a?Mt?@@yGz?`l>IeX۠AyX۠A` g`?Mt?@@yGz?˛eܧ>IeX۠AyX۠Av*R`?Mt?@@yGz?:$>IeX۠AyX۠A:i>`?Mt?@@yGz?h!>IeX۠AyX۠AZ)`oة`?Mt?@@yGz?*D>IeX۠AyX۠Aٳ`?Mt?@@yGz?Y9g>IeX۠AyX۠A$yrz`?Mt?@@yGz?5>IeX۠AyX۠ASZ $c`?Mt?@@yGz?by>IeX۠AyX۠A 1L`?Mt?@@yGz?wXϨ>IeX۠AyX۠As J5`?Mt?@@yGz?Ai >IeX۠AyX۠A-`?Mt?@@yGz?FFZ>IeX۠AyX۠Ayao`?Mt?@@yGz?vKw7>IeX۠AyX۠A*e_?Mt?@@yGz?<,Z>IeX۠AyX۠An#_?Mt?@@yGz?.|>IeX۠AyX۠A T_?Mt?@@yGz?hW>IeX۠AyX۠A, 0#c_?Mt?@@yGz?3K©>IeX۠AyX۠A=8_?Mt?@@yGz?Dc>IeX۠AyX۠A#_?Mt?@@yGz?#>IeX۠AyX۠Aף^?Mt?@@yGz?"gi*>IeX۠AyX۠AI*^?Mt?@@yGz?M>IeX۠AyX۠A0n ^?Mt?@@yGz? o>IeX۠AyX۠Ak^?Mt?@@yGz?kP4>IeX۠AyX۠Ao+D^?Mt?@@yGz?x=>IeX۠AyX۠AV@c^?Mt?@@yGz?Iת>IeX۠AyX۠A h]?Mt?@@yGz?Iך>WdX۠AyX۠A hm?R,?@@yGz?%E}\>WdX۠AyX۠A Tt4m?R,?@@yGz?m_b>WdX۠AyX۠AO^m?R,?@@yGz?UB0>WdX۠AyX۠A.M%Qm?R,?@@yGz?*$>WdX۠AyX۠A( l?R,?@@yGz?f3>WdX۠AyX۠A3=(l?R,?@@yGz?tmx>WdX۠AyX۠Aս?l?R,?@@yGz?KGw׽>WdX۠AyX۠A2 fk?R,?@@yGz?*A>WdX۠AyX۠Artk?R,?@@yGz? H>WdX۠AyX۠AȆʾvk?R,?@@yGz?ct>WdX۠AyX۠A 7>6k?R,?@@yGz?˜Vӝ>WdX۠AyX۠A#j?R,?@@yGz?!!9>WdX۠AyX۠AMuj?R,?@@yGz?zS^>WdX۠AyX۠A{j?R,?@@yGz?X1>WdX۠AyX۠A}?j?R,?@@yGz?5>&>WdX۠AyX۠A޿j?R,?@@yGz?BÐ.>WdX۠AyX۠A'Ipi?R,?@@yGz?ʥs>WdX۠AyX۠Acݑi?R,?@@yGz?ZSd>WdX۠AyX۠A1Yi?R,?@@yGz?j>WdX۠AyX۠Aם>^"i?R,?@@yGz?B &">WdX۠AyX۠A.h?R,?@@yGz?;D>WdX۠AyX۠A5Fh?R,?@@yGz?k: g>WdX۠AyX۠AI>`h?R,?@@yGz?~:>WdX۠AyX۠A+=Oh?R,?@@yGz?ﬠ>WdX۠AyX۠AiZVh?R,?@@yGz?iݤϠ>WdX۠AyX۠AKfg?R,?@@yGz?(KY>WdX۠AyX۠A]g?R,?@@yGz?FX>WdX۠AyX۠AsdZg?R,?@@yGz?Ӱ7>WdX۠AyX۠ArZg?R,?@@yGz?"xZ>WdX۠AyX۠A0,g?R,?@@yGz?[-}>WdX۠AyX۠A=4f?R,?@@yGz?⟡>WdX۠AyX۠ADEf?R,?@@yGz?mEu¡>WdX۠AyX۠A^[:Vf?R,?@@yGz?t(gL>WdX۠AyX۠AHGnmxf?R,?@@yGz?JlX>WdX۠AyX۠AJ6-Mf?R,?@@yGz?ӰI*>WdX۠AyX۠AQ!"f?R,?@@yGz?&:kM>WdX۠AyX۠Ame?R,?@@yGz?29, p>WdX۠AyX۠A[(=e?R,?@@yGz?b}Ւ>WdX۠AyX۠A|>|e?R,?@@yGz?q>WdX۠AyX۠ADWdX۠AyX۠Ay1¼Ve?R,?@@yGz?NI>WdX۠AyX۠Av`/e?R,?@@yGz?>WdX۠AyX۠A]o@ e?R,?@@yGz?*O]@>WdX۠AyX۠AQfSd?R,?@@yGz?~c>WdX۠AyX۠AVߠd?R,?@@yGz?ZDž>WdX۠AyX۠Ad?R,?@@yGz?uݞ|>WdX۠AyX۠Ajtd?R,?@@yGz? 1ˣ>WdX۠AyX۠A](EPd?R,?@@yGz?Q<'>WdX۠AyX۠AO r-d?R,?@@yGz?kk{>WdX۠AyX۠Ab9 d?R,?@@yGz?.lP3>WdX۠AyX۠ATc?R,?@@yGz?]V>WdX۠AyX۠A8"c?R,?@@yGz? 7Ox>WdX۠AyX۠A͜c?R,?@@yGz?x)|@o>WdX۠AyX۠AF揇c?R,?@@yGz?X1$>WdX۠AyX۠Aw3nbc?R,?@@yGz?U#>WdX۠AyX۠A>^ Bc?R,?@@yGz?ķH>WdX۠AyX۠Aoۄ"c?R,?@@yGz?2C&>WdX۠AyX۠Adwdpc?R,?@@yGz?H>WdX۠AyX۠ADob?R,?@@yGz?Fk>WdX۠AyX۠ArEmb?R,?@@yGz?xuYa>WdX۠AyX۠A~b?R,?@@yGz?ꤝ>WdX۠AyX۠Akb?R,?@@yGz?Yӥ>WdX۠AyX۠A;Flb?R,?@@yGz?&>WdX۠AyX۠ABY)Ob?R,?@@yGz?63j5>WdX۠AyX۠AB}mh2b?R,?@@yGz?b;>WdX۠AyX۠Aeb?R,?@@yGz?^>WdX۠AyX۠Am>a?R,?@@yGz?6rT>WdX۠AyX۠AF8a?R,?@@yGz?zc >WdX۠AyX۠A"Ka?R,?@@yGz?[ TƦ>WdX۠AyX۠AVça?R,?@@yGz?OFs>WdX۠AyX۠A`Ia?R,?@@yGz?:G7( >WdX۠AyX۠A|Sra?R,?@@yGz?(.>WdX۠AyX۠AvVxXa?R,?@@yGz?Q>WdX۠AyX۠AƭNm>a?R,?@@yGz?  Gt>WdX۠AyX۠AA"%a?R,?@@yGz?WdX۠AyX۠AB. a?R,?@@yGz?`l>WdX۠AyX۠A` g`?R,?@@yGz?̛eܧ>WdX۠AyX۠Av*R`?R,?@@yGz?:$>WdX۠AyX۠A:i>`?R,?@@yGz?h!>WdX۠AyX۠AZ)`oة`?R,?@@yGz?*D>WdX۠AyX۠Aٳ`?R,?@@yGz?Y9g>WdX۠AyX۠A$yrz`?R,?@@yGz?5>WdX۠AyX۠ASZ $c`?R,?@@yGz?by>WdX۠AyX۠A 1L`?R,?@@yGz?wXϨ>WdX۠AyX۠As J5`?R,?@@yGz?Ai >WdX۠AyX۠A-`?R,?@@yGz?FFZ>WdX۠AyX۠Ayao`?R,?@@yGz?vKw7>WdX۠AyX۠A*e_?R,?@@yGz?<,Z>WdX۠AyX۠An#_?R,?@@yGz?.|>WdX۠AyX۠A T_?R,?@@yGz?hW>WdX۠AyX۠A, 0#c_?R,?@@yGz?3K©>WdX۠AyX۠A=8_?R,?@@yGz?Ec>WdX۠AyX۠A#_?R,?@@yGz?#>WdX۠AyX۠Aף^?R,?@@yGz?"gi*>WdX۠AyX۠AI*^?R,?@@yGz?M>WdX۠AyX۠A0n ^?R,?@@yGz? o>WdX۠AyX۠Ak^?R,?@@yGz?lP4>WdX۠AyX۠Ao+D^?R,?@@yGz?x=>WdX۠AyX۠AV@c^?R,?@@yGz?Iת>WdX۠AyX۠A h]?R,?@@yGz?Iך>dzbX۠AyX۠A hm?Y sr?@@yGz?$E}\>dzbX۠AyX۠A Tt4m?Y sr?@@yGz?m_b>dzbX۠AyX۠AO^m?Y sr?@@yGz?UB0>dzbX۠AyX۠A.M%Qm?Y sr?@@yGz?*$>dzbX۠AyX۠A( l?Y sr?@@yGz?f3>dzbX۠AyX۠A3=(l?Y sr?@@yGz?umx>dzbX۠AyX۠Aս?l?Y sr?@@yGz?LGw׽>dzbX۠AyX۠A2 fk?Y sr?@@yGz?*A>dzbX۠AyX۠Artk?Y sr?@@yGz? H>dzbX۠AyX۠AȆʾvk?Y sr?@@yGz?ct>dzbX۠AyX۠A 7>6k?Y sr?@@yGz?˜Vӝ>dzbX۠AyX۠A#j?Y sr?@@yGz?!!9>dzbX۠AyX۠AMuj?Y sr?@@yGz?zS^>dzbX۠AyX۠A{j?Y sr?@@yGz?X1>dzbX۠AyX۠A}?j?Y sr?@@yGz?4>&>dzbX۠AyX۠A޿j?Y sr?@@yGz?BÐ.>dzbX۠AyX۠A'Ipi?Y sr?@@yGz?ʥs>dzbX۠AyX۠Acݑi?Y sr?@@yGz?ZSd>dzbX۠AyX۠A1Yi?Y sr?@@yGz?j>dzbX۠AyX۠A֝>^"i?Y sr?@@yGz?B &">dzbX۠AyX۠A.h?Y sr?@@yGz?;D>dzbX۠AyX۠A5Fh?Y sr?@@yGz?k: g>dzbX۠AyX۠AI>`h?Y sr?@@yGz?~:>dzbX۠AyX۠A*=Oh?Y sr?@@yGz?ﬠ>dzbX۠AyX۠AiZVh?Y sr?@@yGz?iݤϠ>dzbX۠AyX۠AKfg?Y sr?@@yGz?(KY>dzbX۠AyX۠A]g?Y sr?@@yGz?FX>dzbX۠AyX۠AsdZg?Y sr?@@yGz?Ӱ7>dzbX۠AyX۠ArZg?Y sr?@@yGz?"xZ>dzbX۠AyX۠A~0,g?Y sr?@@yGz?[-}>dzbX۠AyX۠A =4f?Y sr?@@yGz?⟡>dzbX۠AyX۠ADEf?Y sr?@@yGz?mEu¡>dzbX۠AyX۠A^[:Vf?Y sr?@@yGz?t(gL>dzbX۠AyX۠AHGnmxf?Y sr?@@yGz?JlX>dzbX۠AyX۠AJ6-Mf?Y sr?@@yGz?ӰI*>dzbX۠AyX۠AQ!"f?Y sr?@@yGz?&:kM>dzbX۠AyX۠Ame?Y sr?@@yGz?29, p>dzbX۠AyX۠A[(=e?Y sr?@@yGz?b}Ւ>dzbX۠AyX۠A|>|e?Y sr?@@yGz?q>dzbX۠AyX۠ADdzbX۠AyX۠Ay1¼Ve?Y sr?@@yGz?NI>dzbX۠AyX۠Aw`/e?Y sr?@@yGz?>dzbX۠AyX۠A]o@ e?Y sr?@@yGz?*O]@>dzbX۠AyX۠APfSd?Y sr?@@yGz?~c>dzbX۠AyX۠AVߠd?Y sr?@@yGz?ZDž>dzbX۠AyX۠Ad?Y sr?@@yGz?tݞ|>dzbX۠AyX۠Ajtd?Y sr?@@yGz? 1ˣ>dzbX۠AyX۠A](EPd?Y sr?@@yGz?Q<'>dzbX۠AyX۠AO r-d?Y sr?@@yGz?kk{>dzbX۠AyX۠Ab9 d?Y sr?@@yGz?.lP3>dzbX۠AyX۠ATc?Y sr?@@yGz?]V>dzbX۠AyX۠A8"c?Y sr?@@yGz? 7Ox>dzbX۠AyX۠A͜c?Y sr?@@yGz?x)|@o>dzbX۠AyX۠AG揇c?Y sr?@@yGz?X1$>dzbX۠AyX۠Av3nbc?Y sr?@@yGz?T#>dzbX۠AyX۠A?^ Bc?Y sr?@@yGz?ŷH>dzbX۠AyX۠Aoۄ"c?Y sr?@@yGz?2C&>dzbX۠AyX۠Adwdpc?Y sr?@@yGz?H>dzbX۠AyX۠ADob?Y sr?@@yGz?Fk>dzbX۠AyX۠ArEmb?Y sr?@@yGz?xuYa>dzbX۠AyX۠A~b?Y sr?@@yGz?ꤝ>dzbX۠AyX۠Ajb?Y sr?@@yGz?Yӥ>dzbX۠AyX۠A:Flb?Y sr?@@yGz?&>dzbX۠AyX۠ACY)Ob?Y sr?@@yGz?63j5>dzbX۠AyX۠AB}mh2b?Y sr?@@yGz?b;>dzbX۠AyX۠Aeb?Y sr?@@yGz?^>dzbX۠AyX۠Am>a?Y sr?@@yGz?6rT>dzbX۠AyX۠AF8a?Y sr?@@yGz?zc >dzbX۠AyX۠A"Ka?Y sr?@@yGz?\ TƦ>dzbX۠AyX۠AVça?Y sr?@@yGz?OFs>dzbX۠AyX۠A`Ia?Y sr?@@yGz?:G7( >dzbX۠AyX۠A|Sra?Y sr?@@yGz?(.>dzbX۠AyX۠AvVxXa?Y sr?@@yGz?Q>dzbX۠AyX۠AƭNm>a?Y sr?@@yGz?  Gt>dzbX۠AyX۠AA"%a?Y sr?@@yGz?dzbX۠AyX۠AB. a?Y sr?@@yGz?`l>dzbX۠AyX۠A` g`?Y sr?@@yGz?˛eܧ>dzbX۠AyX۠Av*R`?Y sr?@@yGz?:$>dzbX۠AyX۠A:i>`?Y sr?@@yGz?h!>dzbX۠AyX۠AZ)`oة`?Y sr?@@yGz?*D>dzbX۠AyX۠Aٳ`?Y sr?@@yGz?Y9g>dzbX۠AyX۠A$yrz`?Y sr?@@yGz?5>dzbX۠AyX۠ASZ $c`?Y sr?@@yGz?by>dzbX۠AyX۠A 1L`?Y sr?@@yGz?wXϨ>dzbX۠AyX۠As J5`?Y sr?@@yGz?Ai >dzbX۠AyX۠A-`?Y sr?@@yGz?FFZ>dzbX۠AyX۠Ayao`?Y sr?@@yGz?vKw7>dzbX۠AyX۠A*e_?Y sr?@@yGz?<,Z>dzbX۠AyX۠An#_?Y sr?@@yGz?.|>dzbX۠AyX۠A T_?Y sr?@@yGz?hW>dzbX۠AyX۠A, 0#c_?Y sr?@@yGz?3K©>dzbX۠AyX۠A=8_?Y sr?@@yGz?Dc>dzbX۠AyX۠A#_?Y sr?@@yGz?#>dzbX۠AyX۠Aף^?Y sr?@@yGz?"gi*>dzbX۠AyX۠AI*^?Y sr?@@yGz?M>dzbX۠AyX۠A0n ^?Y sr?@@yGz? o>dzbX۠AyX۠Ak^?Y sr?@@yGz?kP4>dzbX۠AyX۠Ao+D^?Y sr?@@yGz?x=>dzbX۠AyX۠AV@c^?Y sr?@@yGz?Iת>dzbX۠AyX۠A h]?Y sr?@@yGz?Iך>q`X۠AyX۠A hm?^0Ww?@@yGz?%E}\>q`X۠AyX۠A Tt4m?^0Ww?@@yGz?m_b>q`X۠AyX۠AO^m?^0Ww?@@yGz?UB0>q`X۠AyX۠A.M%Qm?^0Ww?@@yGz?*$>q`X۠AyX۠A( l?^0Ww?@@yGz?f3>q`X۠AyX۠A3=(l?^0Ww?@@yGz?tmx>q`X۠AyX۠Aս?l?^0Ww?@@yGz?KGw׽>q`X۠AyX۠A2 fk?^0Ww?@@yGz?*A>q`X۠AyX۠Artk?^0Ww?@@yGz? H>q`X۠AyX۠AȆʾvk?^0Ww?@@yGz?ct>q`X۠AyX۠A 7>6k?^0Ww?@@yGz?˜Vӝ>q`X۠AyX۠A#j?^0Ww?@@yGz?!!9>q`X۠AyX۠AMuj?^0Ww?@@yGz?zS^>q`X۠AyX۠A{j?^0Ww?@@yGz?X1>q`X۠AyX۠A}?j?^0Ww?@@yGz?5>&>q`X۠AyX۠A޿j?^0Ww?@@yGz?BÐ.>q`X۠AyX۠A'Ipi?^0Ww?@@yGz?ʥs>q`X۠AyX۠Acݑi?^0Ww?@@yGz?ZSd>q`X۠AyX۠A1Yi?^0Ww?@@yGz?j>q`X۠AyX۠Aם>^"i?^0Ww?@@yGz?B &">q`X۠AyX۠A.h?^0Ww?@@yGz?;D>q`X۠AyX۠A5Fh?^0Ww?@@yGz?k: g>q`X۠AyX۠AI>`h?^0Ww?@@yGz?~:>q`X۠AyX۠A+=Oh?^0Ww?@@yGz?ﬠ>q`X۠AyX۠AiZVh?^0Ww?@@yGz?iݤϠ>q`X۠AyX۠AKfg?^0Ww?@@yGz?(KY>q`X۠AyX۠A]g?^0Ww?@@yGz?FX>q`X۠AyX۠AsdZg?^0Ww?@@yGz?Ӱ7>q`X۠AyX۠ArZg?^0Ww?@@yGz?"xZ>q`X۠AyX۠A0,g?^0Ww?@@yGz?[-}>q`X۠AyX۠A=4f?^0Ww?@@yGz?⟡>q`X۠AyX۠ADEf?^0Ww?@@yGz?mEu¡>q`X۠AyX۠A^[:Vf?^0Ww?@@yGz?t(gL>q`X۠AyX۠AHGnmxf?^0Ww?@@yGz?JlX>q`X۠AyX۠AJ6-Mf?^0Ww?@@yGz?ӰI*>q`X۠AyX۠AQ!"f?^0Ww?@@yGz?&:kM>q`X۠AyX۠Ame?^0Ww?@@yGz?29, p>q`X۠AyX۠A[(=e?^0Ww?@@yGz?b}Ւ>q`X۠AyX۠A|>|e?^0Ww?@@yGz?q>q`X۠AyX۠ADq`X۠AyX۠Ay1¼Ve?^0Ww?@@yGz?NI>q`X۠AyX۠Av`/e?^0Ww?@@yGz?>q`X۠AyX۠A]o@ e?^0Ww?@@yGz?*O]@>q`X۠AyX۠AQfSd?^0Ww?@@yGz?~c>q`X۠AyX۠AVߠd?^0Ww?@@yGz?ZDž>q`X۠AyX۠Ad?^0Ww?@@yGz?uݞ|>q`X۠AyX۠Ajtd?^0Ww?@@yGz? 1ˣ>q`X۠AyX۠A](EPd?^0Ww?@@yGz?Q<'>q`X۠AyX۠AO r-d?^0Ww?@@yGz?kk{>q`X۠AyX۠Ab9 d?^0Ww?@@yGz?.lP3>q`X۠AyX۠ATc?^0Ww?@@yGz?]V>q`X۠AyX۠A8"c?^0Ww?@@yGz? 7Ox>q`X۠AyX۠A͜c?^0Ww?@@yGz?x)|@o>q`X۠AyX۠AF揇c?^0Ww?@@yGz?X1$>q`X۠AyX۠Aw3nbc?^0Ww?@@yGz?U#>q`X۠AyX۠A>^ Bc?^0Ww?@@yGz?ķH>q`X۠AyX۠Aoۄ"c?^0Ww?@@yGz?2C&>q`X۠AyX۠Adwdpc?^0Ww?@@yGz?H>q`X۠AyX۠ADob?^0Ww?@@yGz?Fk>q`X۠AyX۠ArEmb?^0Ww?@@yGz?xuYa>q`X۠AyX۠A~b?^0Ww?@@yGz?ꤝ>q`X۠AyX۠Akb?^0Ww?@@yGz?Yӥ>q`X۠AyX۠A;Flb?^0Ww?@@yGz?&>q`X۠AyX۠ABY)Ob?^0Ww?@@yGz?63j5>q`X۠AyX۠AB}mh2b?^0Ww?@@yGz?b;>q`X۠AyX۠Aeb?^0Ww?@@yGz?^>q`X۠AyX۠Am>a?^0Ww?@@yGz?6rT>q`X۠AyX۠AF8a?^0Ww?@@yGz?zc >q`X۠AyX۠A"Ka?^0Ww?@@yGz?[ TƦ>q`X۠AyX۠AVça?^0Ww?@@yGz?OFs>q`X۠AyX۠A`Ia?^0Ww?@@yGz?:G7( >q`X۠AyX۠A|Sra?^0Ww?@@yGz?(.>q`X۠AyX۠AvVxXa?^0Ww?@@yGz?Q>q`X۠AyX۠AƭNm>a?^0Ww?@@yGz?  Gt>q`X۠AyX۠AA"%a?^0Ww?@@yGz?q`X۠AyX۠AB. a?^0Ww?@@yGz?`l>q`X۠AyX۠A` g`?^0Ww?@@yGz?̛eܧ>q`X۠AyX۠Av*R`?^0Ww?@@yGz?:$>q`X۠AyX۠A:i>`?^0Ww?@@yGz?h!>q`X۠AyX۠AZ)`oة`?^0Ww?@@yGz?*D>q`X۠AyX۠Aٳ`?^0Ww?@@yGz?Y9g>q`X۠AyX۠A$yrz`?^0Ww?@@yGz?5>q`X۠AyX۠ASZ $c`?^0Ww?@@yGz?by>q`X۠AyX۠A 1L`?^0Ww?@@yGz?wXϨ>q`X۠AyX۠As J5`?^0Ww?@@yGz?Ai >q`X۠AyX۠A-`?^0Ww?@@yGz?FFZ>q`X۠AyX۠Ayao`?^0Ww?@@yGz?vKw7>q`X۠AyX۠A*e_?^0Ww?@@yGz?<,Z>q`X۠AyX۠An#_?^0Ww?@@yGz?.|>q`X۠AyX۠A T_?^0Ww?@@yGz?hW>q`X۠AyX۠A, 0#c_?^0Ww?@@yGz?3K©>q`X۠AyX۠A=8_?^0Ww?@@yGz?Ec>q`X۠AyX۠A#_?^0Ww?@@yGz?#>q`X۠AyX۠Aף^?^0Ww?@@yGz?"gi*>q`X۠AyX۠AI*^?^0Ww?@@yGz?M>q`X۠AyX۠A0n ^?^0Ww?@@yGz? o>q`X۠AyX۠Ak^?^0Ww?@@yGz?lP4>q`X۠AyX۠Ao+D^?^0Ww?@@yGz?x=>q`X۠AyX۠AV@c^?^0Ww?@@yGz?Iת>q`X۠AyX۠A h]?^0Ww?@@yGz?Iך>h_X۠AyX۠A hm?cSq=^?@@yGz?$E}\>h_X۠AyX۠A Tt4m?cSq=^?@@yGz?m_b>h_X۠AyX۠AO^m?cSq=^?@@yGz?UB0>h_X۠AyX۠A.M%Qm?cSq=^?@@yGz?*$>h_X۠AyX۠A( l?cSq=^?@@yGz?f3>h_X۠AyX۠A3=(l?cSq=^?@@yGz?umx>h_X۠AyX۠Aս?l?cSq=^?@@yGz?LGw׽>h_X۠AyX۠A2 fk?cSq=^?@@yGz?*A>h_X۠AyX۠Artk?cSq=^?@@yGz? H>h_X۠AyX۠AȆʾvk?cSq=^?@@yGz?ct>h_X۠AyX۠A 7>6k?cSq=^?@@yGz?˜Vӝ>h_X۠AyX۠A#j?cSq=^?@@yGz?!!9>h_X۠AyX۠AMuj?cSq=^?@@yGz?zS^>h_X۠AyX۠A{j?cSq=^?@@yGz?X1>h_X۠AyX۠A}?j?cSq=^?@@yGz?4>&>h_X۠AyX۠A޿j?cSq=^?@@yGz?BÐ.>h_X۠AyX۠A'Ipi?cSq=^?@@yGz?ʥs>h_X۠AyX۠Acݑi?cSq=^?@@yGz?ZSd>h_X۠AyX۠A1Yi?cSq=^?@@yGz?j>h_X۠AyX۠A֝>^"i?cSq=^?@@yGz?B &">h_X۠AyX۠A.h?cSq=^?@@yGz?;D>h_X۠AyX۠A5Fh?cSq=^?@@yGz?k: g>h_X۠AyX۠AI>`h?cSq=^?@@yGz?~:>h_X۠AyX۠A*=Oh?cSq=^?@@yGz?ﬠ>h_X۠AyX۠AiZVh?cSq=^?@@yGz?iݤϠ>h_X۠AyX۠AKfg?cSq=^?@@yGz?(KY>h_X۠AyX۠A]g?cSq=^?@@yGz?FX>h_X۠AyX۠AsdZg?cSq=^?@@yGz?Ӱ7>h_X۠AyX۠ArZg?cSq=^?@@yGz?"xZ>h_X۠AyX۠A~0,g?cSq=^?@@yGz?[-}>h_X۠AyX۠A =4f?cSq=^?@@yGz?⟡>h_X۠AyX۠ADEf?cSq=^?@@yGz?mEu¡>h_X۠AyX۠A^[:Vf?cSq=^?@@yGz?t(gL>h_X۠AyX۠AHGnmxf?cSq=^?@@yGz?JlX>h_X۠AyX۠AJ6-Mf?cSq=^?@@yGz?ӰI*>h_X۠AyX۠AQ!"f?cSq=^?@@yGz?&:kM>h_X۠AyX۠Ame?cSq=^?@@yGz?29, p>h_X۠AyX۠A[(=e?cSq=^?@@yGz?b}Ւ>h_X۠AyX۠A|>|e?cSq=^?@@yGz?q>h_X۠AyX۠ADh_X۠AyX۠Ay1¼Ve?cSq=^?@@yGz?NI>h_X۠AyX۠Aw`/e?cSq=^?@@yGz?>h_X۠AyX۠A]o@ e?cSq=^?@@yGz?*O]@>h_X۠AyX۠APfSd?cSq=^?@@yGz?~c>h_X۠AyX۠AVߠd?cSq=^?@@yGz?ZDž>h_X۠AyX۠Ad?cSq=^?@@yGz?tݞ|>h_X۠AyX۠Ajtd?cSq=^?@@yGz? 1ˣ>h_X۠AyX۠A](EPd?cSq=^?@@yGz?Q<'>h_X۠AyX۠AO r-d?cSq=^?@@yGz?kk{>h_X۠AyX۠Ab9 d?cSq=^?@@yGz?.lP3>h_X۠AyX۠ATc?cSq=^?@@yGz?]V>h_X۠AyX۠A8"c?cSq=^?@@yGz? 7Ox>h_X۠AyX۠A͜c?cSq=^?@@yGz?x)|@o>h_X۠AyX۠AG揇c?cSq=^?@@yGz?X1$>h_X۠AyX۠Av3nbc?cSq=^?@@yGz?T#>h_X۠AyX۠A?^ Bc?cSq=^?@@yGz?ŷH>h_X۠AyX۠Aoۄ"c?cSq=^?@@yGz?2C&>h_X۠AyX۠Adwdpc?cSq=^?@@yGz?H>h_X۠AyX۠ADob?cSq=^?@@yGz?Fk>h_X۠AyX۠ArEmb?cSq=^?@@yGz?xuYa>h_X۠AyX۠A~b?cSq=^?@@yGz?ꤝ>h_X۠AyX۠Ajb?cSq=^?@@yGz?Yӥ>h_X۠AyX۠A:Flb?cSq=^?@@yGz?&>h_X۠AyX۠ACY)Ob?cSq=^?@@yGz?63j5>h_X۠AyX۠AB}mh2b?cSq=^?@@yGz?b;>h_X۠AyX۠Aeb?cSq=^?@@yGz?^>h_X۠AyX۠Am>a?cSq=^?@@yGz?6rT>h_X۠AyX۠AF8a?cSq=^?@@yGz?zc >h_X۠AyX۠A"Ka?cSq=^?@@yGz?\ TƦ>h_X۠AyX۠AVça?cSq=^?@@yGz?OFs>h_X۠AyX۠A`Ia?cSq=^?@@yGz?:G7( >h_X۠AyX۠A|Sra?cSq=^?@@yGz?(.>h_X۠AyX۠AvVxXa?cSq=^?@@yGz?Q>h_X۠AyX۠AƭNm>a?cSq=^?@@yGz?  Gt>h_X۠AyX۠AA"%a?cSq=^?@@yGz?h_X۠AyX۠AB. a?cSq=^?@@yGz?`l>h_X۠AyX۠A` g`?cSq=^?@@yGz?˛eܧ>h_X۠AyX۠Av*R`?cSq=^?@@yGz?:$>h_X۠AyX۠A:i>`?cSq=^?@@yGz?h!>h_X۠AyX۠AZ)`oة`?cSq=^?@@yGz?*D>h_X۠AyX۠Aٳ`?cSq=^?@@yGz?Y9g>h_X۠AyX۠A$yrz`?cSq=^?@@yGz?5>h_X۠AyX۠ASZ $c`?cSq=^?@@yGz?by>h_X۠AyX۠A 1L`?cSq=^?@@yGz?wXϨ>h_X۠AyX۠As J5`?cSq=^?@@yGz?Ai >h_X۠AyX۠A-`?cSq=^?@@yGz?FFZ>h_X۠AyX۠Ayao`?cSq=^?@@yGz?vKw7>h_X۠AyX۠A*e_?cSq=^?@@yGz?<,Z>h_X۠AyX۠An#_?cSq=^?@@yGz?.|>h_X۠AyX۠A T_?cSq=^?@@yGz?hW>h_X۠AyX۠A, 0#c_?cSq=^?@@yGz?3K©>h_X۠AyX۠A=8_?cSq=^?@@yGz?Dc>h_X۠AyX۠A#_?cSq=^?@@yGz?#>h_X۠AyX۠Aף^?cSq=^?@@yGz?"gi*>h_X۠AyX۠AI*^?cSq=^?@@yGz?M>h_X۠AyX۠A0n ^?cSq=^?@@yGz? o>h_X۠AyX۠Ak^?cSq=^?@@yGz?kP4>h_X۠AyX۠Ao+D^?cSq=^?@@yGz?x=>h_X۠AyX۠AV@c^?cSq=^?@@yGz?Iת>h_X۠AyX۠A h]?cSq=^?@@yGz?Iך>]X۠AyX۠A hm?hv"E?@@yGz?%E}\>]X۠AyX۠A Tt4m?hv"E?@@yGz?m_b>]X۠AyX۠AO^m?hv"E?@@yGz?UB0>]X۠AyX۠A.M%Qm?hv"E?@@yGz?*$>]X۠AyX۠A( l?hv"E?@@yGz?f3>]X۠AyX۠A3=(l?hv"E?@@yGz?tmx>]X۠AyX۠Aս?l?hv"E?@@yGz?KGw׽>]X۠AyX۠A2 fk?hv"E?@@yGz?*A>]X۠AyX۠Artk?hv"E?@@yGz? H>]X۠AyX۠AȆʾvk?hv"E?@@yGz?ct>]X۠AyX۠A 7>6k?hv"E?@@yGz?˜Vӝ>]X۠AyX۠A#j?hv"E?@@yGz?!!9>]X۠AyX۠AMuj?hv"E?@@yGz?zS^>]X۠AyX۠A{j?hv"E?@@yGz?X1>]X۠AyX۠A}?j?hv"E?@@yGz?5>&>]X۠AyX۠A޿j?hv"E?@@yGz?BÐ.>]X۠AyX۠A'Ipi?hv"E?@@yGz?ʥs>]X۠AyX۠Acݑi?hv"E?@@yGz?ZSd>]X۠AyX۠A1Yi?hv"E?@@yGz?j>]X۠AyX۠Aם>^"i?hv"E?@@yGz?B &">]X۠AyX۠A.h?hv"E?@@yGz?;D>]X۠AyX۠A5Fh?hv"E?@@yGz?k: g>]X۠AyX۠AI>`h?hv"E?@@yGz?~:>]X۠AyX۠A+=Oh?hv"E?@@yGz?ﬠ>]X۠AyX۠AiZVh?hv"E?@@yGz?iݤϠ>]X۠AyX۠AKfg?hv"E?@@yGz?(KY>]X۠AyX۠A]g?hv"E?@@yGz?FX>]X۠AyX۠AsdZg?hv"E?@@yGz?Ӱ7>]X۠AyX۠ArZg?hv"E?@@yGz?"xZ>]X۠AyX۠A0,g?hv"E?@@yGz?[-}>]X۠AyX۠A=4f?hv"E?@@yGz?⟡>]X۠AyX۠ADEf?hv"E?@@yGz?mEu¡>]X۠AyX۠A^[:Vf?hv"E?@@yGz?t(gL>]X۠AyX۠AHGnmxf?hv"E?@@yGz?JlX>]X۠AyX۠AJ6-Mf?hv"E?@@yGz?ӰI*>]X۠AyX۠AQ!"f?hv"E?@@yGz?&:kM>]X۠AyX۠Ame?hv"E?@@yGz?29, p>]X۠AyX۠A[(=e?hv"E?@@yGz?b}Ւ>]X۠AyX۠A|>|e?hv"E?@@yGz?q>]X۠AyX۠AD]X۠AyX۠Ay1¼Ve?hv"E?@@yGz?NI>]X۠AyX۠Av`/e?hv"E?@@yGz?>]X۠AyX۠A]o@ e?hv"E?@@yGz?*O]@>]X۠AyX۠AQfSd?hv"E?@@yGz?~c>]X۠AyX۠AVߠd?hv"E?@@yGz?ZDž>]X۠AyX۠Ad?hv"E?@@yGz?uݞ|>]X۠AyX۠Ajtd?hv"E?@@yGz? 1ˣ>]X۠AyX۠A](EPd?hv"E?@@yGz?Q<'>]X۠AyX۠AO r-d?hv"E?@@yGz?kk{>]X۠AyX۠Ab9 d?hv"E?@@yGz?.lP3>]X۠AyX۠ATc?hv"E?@@yGz?]V>]X۠AyX۠A8"c?hv"E?@@yGz? 7Ox>]X۠AyX۠A͜c?hv"E?@@yGz?x)|@o>]X۠AyX۠AF揇c?hv"E?@@yGz?X1$>]X۠AyX۠Aw3nbc?hv"E?@@yGz?U#>]X۠AyX۠A>^ Bc?hv"E?@@yGz?ķH>]X۠AyX۠Aoۄ"c?hv"E?@@yGz?2C&>]X۠AyX۠Adwdpc?hv"E?@@yGz?H>]X۠AyX۠ADob?hv"E?@@yGz?Fk>]X۠AyX۠ArEmb?hv"E?@@yGz?xuYa>]X۠AyX۠A~b?hv"E?@@yGz?ꤝ>]X۠AyX۠Akb?hv"E?@@yGz?Yӥ>]X۠AyX۠A;Flb?hv"E?@@yGz?&>]X۠AyX۠ABY)Ob?hv"E?@@yGz?63j5>]X۠AyX۠AB}mh2b?hv"E?@@yGz?b;>]X۠AyX۠Aeb?hv"E?@@yGz?^>]X۠AyX۠Am>a?hv"E?@@yGz?6rT>]X۠AyX۠AF8a?hv"E?@@yGz?zc >]X۠AyX۠A"Ka?hv"E?@@yGz?[ TƦ>]X۠AyX۠AVça?hv"E?@@yGz?OFs>]X۠AyX۠A`Ia?hv"E?@@yGz?:G7( >]X۠AyX۠A|Sra?hv"E?@@yGz?(.>]X۠AyX۠AvVxXa?hv"E?@@yGz?Q>]X۠AyX۠AƭNm>a?hv"E?@@yGz?  Gt>]X۠AyX۠AA"%a?hv"E?@@yGz?]X۠AyX۠AB. a?hv"E?@@yGz?`l>]X۠AyX۠A` g`?hv"E?@@yGz?̛eܧ>]X۠AyX۠Av*R`?hv"E?@@yGz?:$>]X۠AyX۠A:i>`?hv"E?@@yGz?h!>]X۠AyX۠AZ)`oة`?hv"E?@@yGz?*D>]X۠AyX۠Aٳ`?hv"E?@@yGz?Y9g>]X۠AyX۠A$yrz`?hv"E?@@yGz?5>]X۠AyX۠ASZ $c`?hv"E?@@yGz?by>]X۠AyX۠A 1L`?hv"E?@@yGz?wXϨ>]X۠AyX۠As J5`?hv"E?@@yGz?Ai >]X۠AyX۠A-`?hv"E?@@yGz?FFZ>]X۠AyX۠Ayao`?hv"E?@@yGz?vKw7>]X۠AyX۠A*e_?hv"E?@@yGz?<,Z>]X۠AyX۠An#_?hv"E?@@yGz?.|>]X۠AyX۠A T_?hv"E?@@yGz?hW>]X۠AyX۠A, 0#c_?hv"E?@@yGz?3K©>]X۠AyX۠A=8_?hv"E?@@yGz?Ec>]X۠AyX۠A#_?hv"E?@@yGz?#>]X۠AyX۠Aף^?hv"E?@@yGz?"gi*>]X۠AyX۠AI*^?hv"E?@@yGz?M>]X۠AyX۠A0n ^?hv"E?@@yGz? o>]X۠AyX۠Ak^?hv"E?@@yGz?lP4>]X۠AyX۠Ao+D^?hv"E?@@yGz?x=>]X۠AyX۠AV@c^?hv"E?@@yGz?Iת>]X۠AyX۠A h]?hv"E?@@yGz?Iך>V\X۠AyX۠A hm?noa-?@@yGz?$E}\>V\X۠AyX۠A Tt4m?noa-?@@yGz?m_b>V\X۠AyX۠AO^m?noa-?@@yGz?UB0>V\X۠AyX۠A.M%Qm?noa-?@@yGz?*$>V\X۠AyX۠A( l?noa-?@@yGz?f3>V\X۠AyX۠A3=(l?noa-?@@yGz?umx>V\X۠AyX۠Aս?l?noa-?@@yGz?LGw׽>V\X۠AyX۠A2 fk?noa-?@@yGz?*A>V\X۠AyX۠Artk?noa-?@@yGz? H>V\X۠AyX۠AȆʾvk?noa-?@@yGz?ct>V\X۠AyX۠A 7>6k?noa-?@@yGz?˜Vӝ>V\X۠AyX۠A#j?noa-?@@yGz?!!9>V\X۠AyX۠AMuj?noa-?@@yGz?zS^>V\X۠AyX۠A{j?noa-?@@yGz?X1>V\X۠AyX۠A}?j?noa-?@@yGz?4>&>V\X۠AyX۠A޿j?noa-?@@yGz?BÐ.>V\X۠AyX۠A'Ipi?noa-?@@yGz?ʥs>V\X۠AyX۠Acݑi?noa-?@@yGz?ZSd>V\X۠AyX۠A1Yi?noa-?@@yGz?j>V\X۠AyX۠A֝>^"i?noa-?@@yGz?B &">V\X۠AyX۠A.h?noa-?@@yGz?;D>V\X۠AyX۠A5Fh?noa-?@@yGz?k: g>V\X۠AyX۠AI>`h?noa-?@@yGz?~:>V\X۠AyX۠A*=Oh?noa-?@@yGz?ﬠ>V\X۠AyX۠AiZVh?noa-?@@yGz?iݤϠ>V\X۠AyX۠AKfg?noa-?@@yGz?(KY>V\X۠AyX۠A]g?noa-?@@yGz?FX>V\X۠AyX۠AsdZg?noa-?@@yGz?Ӱ7>V\X۠AyX۠ArZg?noa-?@@yGz?"xZ>V\X۠AyX۠A~0,g?noa-?@@yGz?[-}>V\X۠AyX۠A =4f?noa-?@@yGz?⟡>V\X۠AyX۠ADEf?noa-?@@yGz?mEu¡>V\X۠AyX۠A^[:Vf?noa-?@@yGz?t(gL>V\X۠AyX۠AHGnmxf?noa-?@@yGz?JlX>V\X۠AyX۠AJ6-Mf?noa-?@@yGz?ӰI*>V\X۠AyX۠AQ!"f?noa-?@@yGz?&:kM>V\X۠AyX۠Ame?noa-?@@yGz?29, p>V\X۠AyX۠A[(=e?noa-?@@yGz?b}Ւ>V\X۠AyX۠A|>|e?noa-?@@yGz?q>V\X۠AyX۠ADV\X۠AyX۠Ay1¼Ve?noa-?@@yGz?NI>V\X۠AyX۠Aw`/e?noa-?@@yGz?>V\X۠AyX۠A]o@ e?noa-?@@yGz?*O]@>V\X۠AyX۠APfSd?noa-?@@yGz?~c>V\X۠AyX۠AVߠd?noa-?@@yGz?ZDž>V\X۠AyX۠Ad?noa-?@@yGz?tݞ|>V\X۠AyX۠Ajtd?noa-?@@yGz? 1ˣ>V\X۠AyX۠A](EPd?noa-?@@yGz?Q<'>V\X۠AyX۠AO r-d?noa-?@@yGz?kk{>V\X۠AyX۠Ab9 d?noa-?@@yGz?.lP3>V\X۠AyX۠ATc?noa-?@@yGz?]V>V\X۠AyX۠A8"c?noa-?@@yGz? 7Ox>V\X۠AyX۠A͜c?noa-?@@yGz?x)|@o>V\X۠AyX۠AG揇c?noa-?@@yGz?X1$>V\X۠AyX۠Av3nbc?noa-?@@yGz?T#>V\X۠AyX۠A?^ Bc?noa-?@@yGz?ŷH>V\X۠AyX۠Aoۄ"c?noa-?@@yGz?2C&>V\X۠AyX۠Adwdpc?noa-?@@yGz?H>V\X۠AyX۠ADob?noa-?@@yGz?Fk>V\X۠AyX۠ArEmb?noa-?@@yGz?xuYa>V\X۠AyX۠A~b?noa-?@@yGz?ꤝ>V\X۠AyX۠Ajb?noa-?@@yGz?Yӥ>V\X۠AyX۠A:Flb?noa-?@@yGz?&>V\X۠AyX۠ACY)Ob?noa-?@@yGz?63j5>V\X۠AyX۠AB}mh2b?noa-?@@yGz?b;>V\X۠AyX۠Aeb?noa-?@@yGz?^>V\X۠AyX۠Am>a?noa-?@@yGz?6rT>V\X۠AyX۠AF8a?noa-?@@yGz?zc >V\X۠AyX۠A"Ka?noa-?@@yGz?\ TƦ>V\X۠AyX۠AVça?noa-?@@yGz?OFs>V\X۠AyX۠A`Ia?noa-?@@yGz?:G7( >V\X۠AyX۠A|Sra?noa-?@@yGz?(.>V\X۠AyX۠AvVxXa?noa-?@@yGz?Q>V\X۠AyX۠AƭNm>a?noa-?@@yGz?  Gt>V\X۠AyX۠AA"%a?noa-?@@yGz?V\X۠AyX۠AB. a?noa-?@@yGz?`l>V\X۠AyX۠A` g`?noa-?@@yGz?˛eܧ>V\X۠AyX۠Av*R`?noa-?@@yGz?:$>V\X۠AyX۠A:i>`?noa-?@@yGz?h!>V\X۠AyX۠AZ)`oة`?noa-?@@yGz?*D>V\X۠AyX۠Aٳ`?noa-?@@yGz?Y9g>V\X۠AyX۠A$yrz`?noa-?@@yGz?5>V\X۠AyX۠ASZ $c`?noa-?@@yGz?by>V\X۠AyX۠A 1L`?noa-?@@yGz?wXϨ>V\X۠AyX۠As J5`?noa-?@@yGz?Ai >V\X۠AyX۠A-`?noa-?@@yGz?FFZ>V\X۠AyX۠Ayao`?noa-?@@yGz?vKw7>V\X۠AyX۠A*e_?noa-?@@yGz?<,Z>V\X۠AyX۠An#_?noa-?@@yGz?.|>V\X۠AyX۠A T_?noa-?@@yGz?hW>V\X۠AyX۠A, 0#c_?noa-?@@yGz?3K©>V\X۠AyX۠A=8_?noa-?@@yGz?Dc>V\X۠AyX۠A#_?noa-?@@yGz?#>V\X۠AyX۠Aף^?noa-?@@yGz?"gi*>V\X۠AyX۠AI*^?noa-?@@yGz?M>V\X۠AyX۠A0n ^?noa-?@@yGz? o>V\X۠AyX۠Ak^?noa-?@@yGz?kP4>V\X۠AyX۠Ao+D^?noa-?@@yGz?x=>V\X۠AyX۠AV@c^?noa-?@@yGz?Iת>V\X۠AyX۠A h]?noa-?@@yGz?Iך>ZX۠AyX۠A hm?r?@@yGz?%E}\>ZX۠AyX۠A Tt4m?r?@@yGz?m_b>ZX۠AyX۠AO^m?r?@@yGz?UB0>ZX۠AyX۠A.M%Qm?r?@@yGz?*$>ZX۠AyX۠A( l?r?@@yGz?f3>ZX۠AyX۠A3=(l?r?@@yGz?tmx>ZX۠AyX۠Aս?l?r?@@yGz?KGw׽>ZX۠AyX۠A2 fk?r?@@yGz?*A>ZX۠AyX۠Artk?r?@@yGz? H>ZX۠AyX۠AȆʾvk?r?@@yGz?ct>ZX۠AyX۠A 7>6k?r?@@yGz?˜Vӝ>ZX۠AyX۠A#j?r?@@yGz?!!9>ZX۠AyX۠AMuj?r?@@yGz?zS^>ZX۠AyX۠A{j?r?@@yGz?X1>ZX۠AyX۠A}?j?r?@@yGz?5>&>ZX۠AyX۠A޿j?r?@@yGz?BÐ.>ZX۠AyX۠A'Ipi?r?@@yGz?ʥs>ZX۠AyX۠Acݑi?r?@@yGz?ZSd>ZX۠AyX۠A1Yi?r?@@yGz?j>ZX۠AyX۠Aם>^"i?r?@@yGz?B &">ZX۠AyX۠A.h?r?@@yGz?;D>ZX۠AyX۠A5Fh?r?@@yGz?k: g>ZX۠AyX۠AI>`h?r?@@yGz?~:>ZX۠AyX۠A+=Oh?r?@@yGz?ﬠ>ZX۠AyX۠AiZVh?r?@@yGz?iݤϠ>ZX۠AyX۠AKfg?r?@@yGz?(KY>ZX۠AyX۠A]g?r?@@yGz?FX>ZX۠AyX۠AsdZg?r?@@yGz?Ӱ7>ZX۠AyX۠ArZg?r?@@yGz?"xZ>ZX۠AyX۠A0,g?r?@@yGz?[-}>ZX۠AyX۠A=4f?r?@@yGz?⟡>ZX۠AyX۠ADEf?r?@@yGz?mEu¡>ZX۠AyX۠A^[:Vf?r?@@yGz?t(gL>ZX۠AyX۠AHGnmxf?r?@@yGz?JlX>ZX۠AyX۠AJ6-Mf?r?@@yGz?ӰI*>ZX۠AyX۠AQ!"f?r?@@yGz?&:kM>ZX۠AyX۠Ame?r?@@yGz?29, p>ZX۠AyX۠A[(=e?r?@@yGz?b}Ւ>ZX۠AyX۠A|>|e?r?@@yGz?q>ZX۠AyX۠ADZX۠AyX۠Ay1¼Ve?r?@@yGz?NI>ZX۠AyX۠Av`/e?r?@@yGz?>ZX۠AyX۠A]o@ e?r?@@yGz?*O]@>ZX۠AyX۠AQfSd?r?@@yGz?~c>ZX۠AyX۠AVߠd?r?@@yGz?ZDž>ZX۠AyX۠Ad?r?@@yGz?uݞ|>ZX۠AyX۠Ajtd?r?@@yGz? 1ˣ>ZX۠AyX۠A](EPd?r?@@yGz?Q<'>ZX۠AyX۠AO r-d?r?@@yGz?kk{>ZX۠AyX۠Ab9 d?r?@@yGz?.lP3>ZX۠AyX۠ATc?r?@@yGz?]V>ZX۠AyX۠A8"c?r?@@yGz? 7Ox>ZX۠AyX۠A͜c?r?@@yGz?x)|@o>ZX۠AyX۠AF揇c?r?@@yGz?X1$>ZX۠AyX۠Aw3nbc?r?@@yGz?U#>ZX۠AyX۠A>^ Bc?r?@@yGz?ķH>ZX۠AyX۠Aoۄ"c?r?@@yGz?2C&>ZX۠AyX۠Adwdpc?r?@@yGz?H>ZX۠AyX۠ADob?r?@@yGz?Fk>ZX۠AyX۠ArEmb?r?@@yGz?xuYa>ZX۠AyX۠A~b?r?@@yGz?ꤝ>ZX۠AyX۠Akb?r?@@yGz?Yӥ>ZX۠AyX۠A;Flb?r?@@yGz?&>ZX۠AyX۠ABY)Ob?r?@@yGz?63j5>ZX۠AyX۠AB}mh2b?r?@@yGz?b;>ZX۠AyX۠Aeb?r?@@yGz?^>ZX۠AyX۠Am>a?r?@@yGz?6rT>ZX۠AyX۠AF8a?r?@@yGz?zc >ZX۠AyX۠A"Ka?r?@@yGz?[ TƦ>ZX۠AyX۠AVça?r?@@yGz?OFs>ZX۠AyX۠A`Ia?r?@@yGz?:G7( >ZX۠AyX۠A|Sra?r?@@yGz?(.>ZX۠AyX۠AvVxXa?r?@@yGz?Q>ZX۠AyX۠AƭNm>a?r?@@yGz?  Gt>ZX۠AyX۠AA"%a?r?@@yGz?ZX۠AyX۠AB. a?r?@@yGz?`l>ZX۠AyX۠A` g`?r?@@yGz?̛eܧ>ZX۠AyX۠Av*R`?r?@@yGz?:$>ZX۠AyX۠A:i>`?r?@@yGz?h!>ZX۠AyX۠AZ)`oة`?r?@@yGz?*D>ZX۠AyX۠Aٳ`?r?@@yGz?Y9g>ZX۠AyX۠A$yrz`?r?@@yGz?5>ZX۠AyX۠ASZ $c`?r?@@yGz?by>ZX۠AyX۠A 1L`?r?@@yGz?wXϨ>ZX۠AyX۠As J5`?r?@@yGz?Ai >ZX۠AyX۠A-`?r?@@yGz?FFZ>ZX۠AyX۠Ayao`?r?@@yGz?vKw7>ZX۠AyX۠A*e_?r?@@yGz?<,Z>ZX۠AyX۠An#_?r?@@yGz?.|>ZX۠AyX۠A T_?r?@@yGz?hW>ZX۠AyX۠A, 0#c_?r?@@yGz?3K©>ZX۠AyX۠A=8_?r?@@yGz?Ec>ZX۠AyX۠A#_?r?@@yGz?#>ZX۠AyX۠Aף^?r?@@yGz?"gi*>ZX۠AyX۠AI*^?r?@@yGz?M>ZX۠AyX۠A0n ^?r?@@yGz? o>ZX۠AyX۠Ak^?r?@@yGz?lP4>ZX۠AyX۠Ao+D^?r?@@yGz?x=>ZX۠AyX۠AV@c^?r?@@yGz?Iת>ZX۠AyX۠A h]?r?@@yGz?Iך>DYX۠AyX۠A hm?xmB?@@yGz?$E}\>DYX۠AyX۠A Tt4m?xmB?@@yGz?m_b>DYX۠AyX۠AO^m?xmB?@@yGz?UB0>DYX۠AyX۠A.M%Qm?xmB?@@yGz?*$>DYX۠AyX۠A( l?xmB?@@yGz?f3>DYX۠AyX۠A3=(l?xmB?@@yGz?umx>DYX۠AyX۠Aս?l?xmB?@@yGz?LGw׽>DYX۠AyX۠A2 fk?xmB?@@yGz?*A>DYX۠AyX۠Artk?xmB?@@yGz? H>DYX۠AyX۠AȆʾvk?xmB?@@yGz?ct>DYX۠AyX۠A 7>6k?xmB?@@yGz?˜Vӝ>DYX۠AyX۠A#j?xmB?@@yGz?!!9>DYX۠AyX۠AMuj?xmB?@@yGz?zS^>DYX۠AyX۠A{j?xmB?@@yGz?X1>DYX۠AyX۠A}?j?xmB?@@yGz?4>&>DYX۠AyX۠A޿j?xmB?@@yGz?BÐ.>DYX۠AyX۠A'Ipi?xmB?@@yGz?ʥs>DYX۠AyX۠Acݑi?xmB?@@yGz?ZSd>DYX۠AyX۠A1Yi?xmB?@@yGz?j>DYX۠AyX۠A֝>^"i?xmB?@@yGz?B &">DYX۠AyX۠A.h?xmB?@@yGz?;D>DYX۠AyX۠A5Fh?xmB?@@yGz?k: g>DYX۠AyX۠AI>`h?xmB?@@yGz?~:>DYX۠AyX۠A*=Oh?xmB?@@yGz?ﬠ>DYX۠AyX۠AiZVh?xmB?@@yGz?iݤϠ>DYX۠AyX۠AKfg?xmB?@@yGz?(KY>DYX۠AyX۠A]g?xmB?@@yGz?FX>DYX۠AyX۠AsdZg?xmB?@@yGz?Ӱ7>DYX۠AyX۠ArZg?xmB?@@yGz?"xZ>DYX۠AyX۠A~0,g?xmB?@@yGz?[-}>DYX۠AyX۠A =4f?xmB?@@yGz?⟡>DYX۠AyX۠ADEf?xmB?@@yGz?mEu¡>DYX۠AyX۠A^[:Vf?xmB?@@yGz?t(gL>DYX۠AyX۠AHGnmxf?xmB?@@yGz?JlX>DYX۠AyX۠AJ6-Mf?xmB?@@yGz?ӰI*>DYX۠AyX۠AQ!"f?xmB?@@yGz?&:kM>DYX۠AyX۠Ame?xmB?@@yGz?29, p>DYX۠AyX۠A[(=e?xmB?@@yGz?b}Ւ>DYX۠AyX۠A|>|e?xmB?@@yGz?q>DYX۠AyX۠ADDYX۠AyX۠Ay1¼Ve?xmB?@@yGz?NI>DYX۠AyX۠Aw`/e?xmB?@@yGz?>DYX۠AyX۠A]o@ e?xmB?@@yGz?*O]@>DYX۠AyX۠APfSd?xmB?@@yGz?~c>DYX۠AyX۠AVߠd?xmB?@@yGz?ZDž>DYX۠AyX۠Ad?xmB?@@yGz?tݞ|>DYX۠AyX۠Ajtd?xmB?@@yGz? 1ˣ>DYX۠AyX۠A](EPd?xmB?@@yGz?Q<'>DYX۠AyX۠AO r-d?xmB?@@yGz?kk{>DYX۠AyX۠Ab9 d?xmB?@@yGz?.lP3>DYX۠AyX۠ATc?xmB?@@yGz?]V>DYX۠AyX۠A8"c?xmB?@@yGz? 7Ox>DYX۠AyX۠A͜c?xmB?@@yGz?x)|@o>DYX۠AyX۠AG揇c?xmB?@@yGz?X1$>DYX۠AyX۠Av3nbc?xmB?@@yGz?T#>DYX۠AyX۠A?^ Bc?xmB?@@yGz?ŷH>DYX۠AyX۠Aoۄ"c?xmB?@@yGz?2C&>DYX۠AyX۠Adwdpc?xmB?@@yGz?H>DYX۠AyX۠ADob?xmB?@@yGz?Fk>DYX۠AyX۠ArEmb?xmB?@@yGz?xuYa>DYX۠AyX۠A~b?xmB?@@yGz?ꤝ>DYX۠AyX۠Ajb?xmB?@@yGz?Yӥ>DYX۠AyX۠A:Flb?xmB?@@yGz?&>DYX۠AyX۠ACY)Ob?xmB?@@yGz?63j5>DYX۠AyX۠AB}mh2b?xmB?@@yGz?b;>DYX۠AyX۠Aeb?xmB?@@yGz?^>DYX۠AyX۠Am>a?xmB?@@yGz?6rT>DYX۠AyX۠AF8a?xmB?@@yGz?zc >DYX۠AyX۠A"Ka?xmB?@@yGz?\ TƦ>DYX۠AyX۠AVça?xmB?@@yGz?OFs>DYX۠AyX۠A`Ia?xmB?@@yGz?:G7( >DYX۠AyX۠A|Sra?xmB?@@yGz?(.>DYX۠AyX۠AvVxXa?xmB?@@yGz?Q>DYX۠AyX۠AƭNm>a?xmB?@@yGz?  Gt>DYX۠AyX۠AA"%a?xmB?@@yGz?DYX۠AyX۠AB. a?xmB?@@yGz?`l>DYX۠AyX۠A` g`?xmB?@@yGz?˛eܧ>DYX۠AyX۠Av*R`?xmB?@@yGz?:$>DYX۠AyX۠A:i>`?xmB?@@yGz?h!>DYX۠AyX۠AZ)`oة`?xmB?@@yGz?*D>DYX۠AyX۠Aٳ`?xmB?@@yGz?Y9g>DYX۠AyX۠A$yrz`?xmB?@@yGz?5>DYX۠AyX۠ASZ $c`?xmB?@@yGz?by>DYX۠AyX۠A 1L`?xmB?@@yGz?wXϨ>DYX۠AyX۠As J5`?xmB?@@yGz?Ai >DYX۠AyX۠A-`?xmB?@@yGz?FFZ>DYX۠AyX۠Ayao`?xmB?@@yGz?vKw7>DYX۠AyX۠A*e_?xmB?@@yGz?<,Z>DYX۠AyX۠An#_?xmB?@@yGz?.|>DYX۠AyX۠A T_?xmB?@@yGz?hW>DYX۠AyX۠A, 0#c_?xmB?@@yGz?3K©>DYX۠AyX۠A=8_?xmB?@@yGz?Dc>DYX۠AyX۠A#_?xmB?@@yGz?#>DYX۠AyX۠Aף^?xmB?@@yGz?"gi*>DYX۠AyX۠AI*^?xmB?@@yGz?M>DYX۠AyX۠A0n ^?xmB?@@yGz? o>DYX۠AyX۠Ak^?xmB?@@yGz?kP4>DYX۠AyX۠Ao+D^?xmB?@@yGz?x=>DYX۠AyX۠AV@c^?xmB?@@yGz?Iת>DYX۠AyX۠A h]?xmB?@@yGz?Iך>WX۠AyX۠A hm?}?@@yGz?%E}\>WX۠AyX۠A Tt4m?}?@@yGz?m_b>WX۠AyX۠AO^m?}?@@yGz?UB0>WX۠AyX۠A.M%Qm?}?@@yGz?*$>WX۠AyX۠A( l?}?@@yGz?f3>WX۠AyX۠A3=(l?}?@@yGz?tmx>WX۠AyX۠Aս?l?}?@@yGz?KGw׽>WX۠AyX۠A2 fk?}?@@yGz?*A>WX۠AyX۠Artk?}?@@yGz? H>WX۠AyX۠AȆʾvk?}?@@yGz?ct>WX۠AyX۠A 7>6k?}?@@yGz?˜Vӝ>WX۠AyX۠A#j?}?@@yGz?!!9>WX۠AyX۠AMuj?}?@@yGz?zS^>WX۠AyX۠A{j?}?@@yGz?X1>WX۠AyX۠A}?j?}?@@yGz?5>&>WX۠AyX۠A޿j?}?@@yGz?BÐ.>WX۠AyX۠A'Ipi?}?@@yGz?ʥs>WX۠AyX۠Acݑi?}?@@yGz?ZSd>WX۠AyX۠A1Yi?}?@@yGz?j>WX۠AyX۠Aם>^"i?}?@@yGz?B &">WX۠AyX۠A.h?}?@@yGz?;D>WX۠AyX۠A5Fh?}?@@yGz?k: g>WX۠AyX۠AI>`h?}?@@yGz?~:>WX۠AyX۠A+=Oh?}?@@yGz?ﬠ>WX۠AyX۠AiZVh?}?@@yGz?iݤϠ>WX۠AyX۠AKfg?}?@@yGz?(KY>WX۠AyX۠A]g?}?@@yGz?FX>WX۠AyX۠AsdZg?}?@@yGz?Ӱ7>WX۠AyX۠ArZg?}?@@yGz?"xZ>WX۠AyX۠A0,g?}?@@yGz?[-}>WX۠AyX۠A=4f?}?@@yGz?⟡>WX۠AyX۠ADEf?}?@@yGz?mEu¡>WX۠AyX۠A^[:Vf?}?@@yGz?t(gL>WX۠AyX۠AHGnmxf?}?@@yGz?JlX>WX۠AyX۠AJ6-Mf?}?@@yGz?ӰI*>WX۠AyX۠AQ!"f?}?@@yGz?&:kM>WX۠AyX۠Ame?}?@@yGz?29, p>WX۠AyX۠A[(=e?}?@@yGz?b}Ւ>WX۠AyX۠A|>|e?}?@@yGz?q>WX۠AyX۠ADWX۠AyX۠Ay1¼Ve?}?@@yGz?NI>WX۠AyX۠Av`/e?}?@@yGz?>WX۠AyX۠A]o@ e?}?@@yGz?*O]@>WX۠AyX۠AQfSd?}?@@yGz?~c>WX۠AyX۠AVߠd?}?@@yGz?ZDž>WX۠AyX۠Ad?}?@@yGz?uݞ|>WX۠AyX۠Ajtd?}?@@yGz? 1ˣ>WX۠AyX۠A](EPd?}?@@yGz?Q<'>WX۠AyX۠AO r-d?}?@@yGz?kk{>WX۠AyX۠Ab9 d?}?@@yGz?.lP3>WX۠AyX۠ATc?}?@@yGz?]V>WX۠AyX۠A8"c?}?@@yGz? 7Ox>WX۠AyX۠A͜c?}?@@yGz?x)|@o>WX۠AyX۠AF揇c?}?@@yGz?X1$>WX۠AyX۠Aw3nbc?}?@@yGz?U#>WX۠AyX۠A>^ Bc?}?@@yGz?ķH>WX۠AyX۠Aoۄ"c?}?@@yGz?2C&>WX۠AyX۠Adwdpc?}?@@yGz?H>WX۠AyX۠ADob?}?@@yGz?Fk>WX۠AyX۠ArEmb?}?@@yGz?xuYa>WX۠AyX۠A~b?}?@@yGz?ꤝ>WX۠AyX۠Akb?}?@@yGz?Yӥ>WX۠AyX۠A;Flb?}?@@yGz?&>WX۠AyX۠ABY)Ob?}?@@yGz?63j5>WX۠AyX۠AB}mh2b?}?@@yGz?b;>WX۠AyX۠Aeb?}?@@yGz?^>WX۠AyX۠Am>a?}?@@yGz?6rT>WX۠AyX۠AF8a?}?@@yGz?zc >WX۠AyX۠A"Ka?}?@@yGz?[ TƦ>WX۠AyX۠AVça?}?@@yGz?OFs>WX۠AyX۠A`Ia?}?@@yGz?:G7( >WX۠AyX۠A|Sra?}?@@yGz?(.>WX۠AyX۠AvVxXa?}?@@yGz?Q>WX۠AyX۠AƭNm>a?}?@@yGz?  Gt>WX۠AyX۠AA"%a?}?@@yGz?WX۠AyX۠AB. a?}?@@yGz?`l>WX۠AyX۠A` g`?}?@@yGz?̛eܧ>WX۠AyX۠Av*R`?}?@@yGz?:$>WX۠AyX۠A:i>`?}?@@yGz?h!>WX۠AyX۠AZ)`oة`?}?@@yGz?*D>WX۠AyX۠Aٳ`?}?@@yGz?Y9g>WX۠AyX۠A$yrz`?}?@@yGz?5>WX۠AyX۠ASZ $c`?}?@@yGz?by>WX۠AyX۠A 1L`?}?@@yGz?wXϨ>WX۠AyX۠As J5`?}?@@yGz?Ai >WX۠AyX۠A-`?}?@@yGz?FFZ>WX۠AyX۠Ayao`?}?@@yGz?vKw7>WX۠AyX۠A*e_?}?@@yGz?<,Z>WX۠AyX۠An#_?}?@@yGz?.|>WX۠AyX۠A T_?}?@@yGz?hW>WX۠AyX۠A, 0#c_?}?@@yGz?3K©>WX۠AyX۠A=8_?}?@@yGz?Ec>WX۠AyX۠A#_?}?@@yGz?#>WX۠AyX۠Aף^?}?@@yGz?"gi*>WX۠AyX۠AI*^?}?@@yGz?M>WX۠AyX۠A0n ^?}?@@yGz? o>WX۠AyX۠Ak^?}?@@yGz?lP4>WX۠AyX۠Ao+D^?}?@@yGz?x=>WX۠AyX۠AV@c^?}?@@yGz?Iת>WX۠AyX۠A h]?}?@@yGz?Iך>2VX۠AyX۠A hm?%l$?@@yGz?$E}\>2VX۠AyX۠A Tt4m?%l$?@@yGz?m_b>2VX۠AyX۠AO^m?%l$?@@yGz?UB0>2VX۠AyX۠A.M%Qm?%l$?@@yGz?*$>2VX۠AyX۠A( l?%l$?@@yGz?f3>2VX۠AyX۠A3=(l?%l$?@@yGz?umx>2VX۠AyX۠Aս?l?%l$?@@yGz?LGw׽>2VX۠AyX۠A2 fk?%l$?@@yGz?*A>2VX۠AyX۠Artk?%l$?@@yGz? H>2VX۠AyX۠AȆʾvk?%l$?@@yGz?ct>2VX۠AyX۠A 7>6k?%l$?@@yGz?˜Vӝ>2VX۠AyX۠A#j?%l$?@@yGz?!!9>2VX۠AyX۠AMuj?%l$?@@yGz?zS^>2VX۠AyX۠A{j?%l$?@@yGz?X1>2VX۠AyX۠A}?j?%l$?@@yGz?4>&>2VX۠AyX۠A޿j?%l$?@@yGz?BÐ.>2VX۠AyX۠A'Ipi?%l$?@@yGz?ʥs>2VX۠AyX۠Acݑi?%l$?@@yGz?ZSd>2VX۠AyX۠A1Yi?%l$?@@yGz?j>2VX۠AyX۠A֝>^"i?%l$?@@yGz?B &">2VX۠AyX۠A.h?%l$?@@yGz?;D>2VX۠AyX۠A5Fh?%l$?@@yGz?k: g>2VX۠AyX۠AI>`h?%l$?@@yGz?~:>2VX۠AyX۠A*=Oh?%l$?@@yGz?ﬠ>2VX۠AyX۠AiZVh?%l$?@@yGz?iݤϠ>2VX۠AyX۠AKfg?%l$?@@yGz?(KY>2VX۠AyX۠A]g?%l$?@@yGz?FX>2VX۠AyX۠AsdZg?%l$?@@yGz?Ӱ7>2VX۠AyX۠ArZg?%l$?@@yGz?"xZ>2VX۠AyX۠A~0,g?%l$?@@yGz?[-}>2VX۠AyX۠A =4f?%l$?@@yGz?⟡>2VX۠AyX۠ADEf?%l$?@@yGz?mEu¡>2VX۠AyX۠A^[:Vf?%l$?@@yGz?t(gL>2VX۠AyX۠AHGnmxf?%l$?@@yGz?JlX>2VX۠AyX۠AJ6-Mf?%l$?@@yGz?ӰI*>2VX۠AyX۠AQ!"f?%l$?@@yGz?&:kM>2VX۠AyX۠Ame?%l$?@@yGz?29, p>2VX۠AyX۠A[(=e?%l$?@@yGz?b}Ւ>2VX۠AyX۠A|>|e?%l$?@@yGz?q>2VX۠AyX۠AD2VX۠AyX۠Ay1¼Ve?%l$?@@yGz?NI>2VX۠AyX۠Aw`/e?%l$?@@yGz?>2VX۠AyX۠A]o@ e?%l$?@@yGz?*O]@>2VX۠AyX۠APfSd?%l$?@@yGz?~c>2VX۠AyX۠AVߠd?%l$?@@yGz?ZDž>2VX۠AyX۠Ad?%l$?@@yGz?tݞ|>2VX۠AyX۠Ajtd?%l$?@@yGz? 1ˣ>2VX۠AyX۠A](EPd?%l$?@@yGz?Q<'>2VX۠AyX۠AO r-d?%l$?@@yGz?kk{>2VX۠AyX۠Ab9 d?%l$?@@yGz?.lP3>2VX۠AyX۠ATc?%l$?@@yGz?]V>2VX۠AyX۠A8"c?%l$?@@yGz? 7Ox>2VX۠AyX۠A͜c?%l$?@@yGz?x)|@o>2VX۠AyX۠AG揇c?%l$?@@yGz?X1$>2VX۠AyX۠Av3nbc?%l$?@@yGz?T#>2VX۠AyX۠A?^ Bc?%l$?@@yGz?ŷH>2VX۠AyX۠Aoۄ"c?%l$?@@yGz?2C&>2VX۠AyX۠Adwdpc?%l$?@@yGz?H>2VX۠AyX۠ADob?%l$?@@yGz?Fk>2VX۠AyX۠ArEmb?%l$?@@yGz?xuYa>2VX۠AyX۠A~b?%l$?@@yGz?ꤝ>2VX۠AyX۠Ajb?%l$?@@yGz?Yӥ>2VX۠AyX۠A:Flb?%l$?@@yGz?&>2VX۠AyX۠ACY)Ob?%l$?@@yGz?63j5>2VX۠AyX۠AB}mh2b?%l$?@@yGz?b;>2VX۠AyX۠Aeb?%l$?@@yGz?^>2VX۠AyX۠Am>a?%l$?@@yGz?6rT>2VX۠AyX۠AF8a?%l$?@@yGz?zc >2VX۠AyX۠A"Ka?%l$?@@yGz?\ TƦ>2VX۠AyX۠AVça?%l$?@@yGz?OFs>2VX۠AyX۠A`Ia?%l$?@@yGz?:G7( >2VX۠AyX۠A|Sra?%l$?@@yGz?(.>2VX۠AyX۠AvVxXa?%l$?@@yGz?Q>2VX۠AyX۠AƭNm>a?%l$?@@yGz?  Gt>2VX۠AyX۠AA"%a?%l$?@@yGz?2VX۠AyX۠AB. a?%l$?@@yGz?`l>2VX۠AyX۠A` g`?%l$?@@yGz?˛eܧ>2VX۠AyX۠Av*R`?%l$?@@yGz?:$>2VX۠AyX۠A:i>`?%l$?@@yGz?h!>2VX۠AyX۠AZ)`oة`?%l$?@@yGz?*D>2VX۠AyX۠Aٳ`?%l$?@@yGz?Y9g>2VX۠AyX۠A$yrz`?%l$?@@yGz?5>2VX۠AyX۠ASZ $c`?%l$?@@yGz?by>2VX۠AyX۠A 1L`?%l$?@@yGz?wXϨ>2VX۠AyX۠As J5`?%l$?@@yGz?Ai >2VX۠AyX۠A-`?%l$?@@yGz?FFZ>2VX۠AyX۠Ayao`?%l$?@@yGz?vKw7>2VX۠AyX۠A*e_?%l$?@@yGz?<,Z>2VX۠AyX۠An#_?%l$?@@yGz?.|>2VX۠AyX۠A T_?%l$?@@yGz?hW>2VX۠AyX۠A, 0#c_?%l$?@@yGz?3K©>2VX۠AyX۠A=8_?%l$?@@yGz?Dc>2VX۠AyX۠A#_?%l$?@@yGz?#>2VX۠AyX۠Aף^?%l$?@@yGz?"gi*>2VX۠AyX۠AI*^?%l$?@@yGz?M>2VX۠AyX۠A0n ^?%l$?@@yGz? o>2VX۠AyX۠Ak^?%l$?@@yGz?kP4>2VX۠AyX۠Ao+D^?%l$?@@yGz?x=>2VX۠AyX۠AV@c^?%l$?@@yGz?Iת>2VX۠AyX۠A h]?%l$?@@yGz?Iך>ܩTX۠AyX۠A hm?H냕?@@yGz?%E}\>ܩTX۠AyX۠A Tt4m?H냕?@@yGz?m_b>ܩTX۠AyX۠AO^m?H냕?@@yGz?UB0>ܩTX۠AyX۠A.M%Qm?H냕?@@yGz?*$>ܩTX۠AyX۠A( l?H냕?@@yGz?f3>ܩTX۠AyX۠A3=(l?H냕?@@yGz?tmx>ܩTX۠AyX۠Aս?l?H냕?@@yGz?KGw׽>ܩTX۠AyX۠A2 fk?H냕?@@yGz?*A>ܩTX۠AyX۠Artk?H냕?@@yGz? H>ܩTX۠AyX۠AȆʾvk?H냕?@@yGz?ct>ܩTX۠AyX۠A 7>6k?H냕?@@yGz?˜Vӝ>ܩTX۠AyX۠A#j?H냕?@@yGz?!!9>ܩTX۠AyX۠AMuj?H냕?@@yGz?zS^>ܩTX۠AyX۠A{j?H냕?@@yGz?X1>ܩTX۠AyX۠A}?j?H냕?@@yGz?5>&>ܩTX۠AyX۠A޿j?H냕?@@yGz?BÐ.>ܩTX۠AyX۠A'Ipi?H냕?@@yGz?ʥs>ܩTX۠AyX۠Acݑi?H냕?@@yGz?ZSd>ܩTX۠AyX۠A1Yi?H냕?@@yGz?j>ܩTX۠AyX۠Aם>^"i?H냕?@@yGz?B &">ܩTX۠AyX۠A.h?H냕?@@yGz?;D>ܩTX۠AyX۠A5Fh?H냕?@@yGz?k: g>ܩTX۠AyX۠AI>`h?H냕?@@yGz?~:>ܩTX۠AyX۠A+=Oh?H냕?@@yGz?ﬠ>ܩTX۠AyX۠AiZVh?H냕?@@yGz?iݤϠ>ܩTX۠AyX۠AKfg?H냕?@@yGz?(KY>ܩTX۠AyX۠A]g?H냕?@@yGz?FX>ܩTX۠AyX۠AsdZg?H냕?@@yGz?Ӱ7>ܩTX۠AyX۠ArZg?H냕?@@yGz?"xZ>ܩTX۠AyX۠A0,g?H냕?@@yGz?[-}>ܩTX۠AyX۠A=4f?H냕?@@yGz?⟡>ܩTX۠AyX۠ADEf?H냕?@@yGz?mEu¡>ܩTX۠AyX۠A^[:Vf?H냕?@@yGz?t(gL>ܩTX۠AyX۠AHGnmxf?H냕?@@yGz?JlX>ܩTX۠AyX۠AJ6-Mf?H냕?@@yGz?ӰI*>ܩTX۠AyX۠AQ!"f?H냕?@@yGz?&:kM>ܩTX۠AyX۠Ame?H냕?@@yGz?29, p>ܩTX۠AyX۠A[(=e?H냕?@@yGz?b}Ւ>ܩTX۠AyX۠A|>|e?H냕?@@yGz?q>ܩTX۠AyX۠ADܩTX۠AyX۠Ay1¼Ve?H냕?@@yGz?NI>ܩTX۠AyX۠Av`/e?H냕?@@yGz?>ܩTX۠AyX۠A]o@ e?H냕?@@yGz?*O]@>ܩTX۠AyX۠AQfSd?H냕?@@yGz?~c>ܩTX۠AyX۠AVߠd?H냕?@@yGz?ZDž>ܩTX۠AyX۠Ad?H냕?@@yGz?uݞ|>ܩTX۠AyX۠Ajtd?H냕?@@yGz? 1ˣ>ܩTX۠AyX۠A](EPd?H냕?@@yGz?Q<'>ܩTX۠AyX۠AO r-d?H냕?@@yGz?kk{>ܩTX۠AyX۠Ab9 d?H냕?@@yGz?.lP3>ܩTX۠AyX۠ATc?H냕?@@yGz?]V>ܩTX۠AyX۠A8"c?H냕?@@yGz? 7Ox>ܩTX۠AyX۠A͜c?H냕?@@yGz?x)|@o>ܩTX۠AyX۠AF揇c?H냕?@@yGz?X1$>ܩTX۠AyX۠Aw3nbc?H냕?@@yGz?U#>ܩTX۠AyX۠A>^ Bc?H냕?@@yGz?ķH>ܩTX۠AyX۠Aoۄ"c?H냕?@@yGz?2C&>ܩTX۠AyX۠Adwdpc?H냕?@@yGz?H>ܩTX۠AyX۠ADob?H냕?@@yGz?Fk>ܩTX۠AyX۠ArEmb?H냕?@@yGz?xuYa>ܩTX۠AyX۠A~b?H냕?@@yGz?ꤝ>ܩTX۠AyX۠Akb?H냕?@@yGz?Yӥ>ܩTX۠AyX۠A;Flb?H냕?@@yGz?&>ܩTX۠AyX۠ABY)Ob?H냕?@@yGz?63j5>ܩTX۠AyX۠AB}mh2b?H냕?@@yGz?b;>ܩTX۠AyX۠Aeb?H냕?@@yGz?^>ܩTX۠AyX۠Am>a?H냕?@@yGz?6rT>ܩTX۠AyX۠AF8a?H냕?@@yGz?zc >ܩTX۠AyX۠A"Ka?H냕?@@yGz?[ TƦ>ܩTX۠AyX۠AVça?H냕?@@yGz?OFs>ܩTX۠AyX۠A`Ia?H냕?@@yGz?:G7( >ܩTX۠AyX۠A|Sra?H냕?@@yGz?(.>ܩTX۠AyX۠AvVxXa?H냕?@@yGz?Q>ܩTX۠AyX۠AƭNm>a?H냕?@@yGz?  Gt>ܩTX۠AyX۠AA"%a?H냕?@@yGz?ܩTX۠AyX۠AB. a?H냕?@@yGz?`l>ܩTX۠AyX۠A` g`?H냕?@@yGz?̛eܧ>ܩTX۠AyX۠Av*R`?H냕?@@yGz?:$>ܩTX۠AyX۠A:i>`?H냕?@@yGz?h!>ܩTX۠AyX۠AZ)`oة`?H냕?@@yGz?*D>ܩTX۠AyX۠Aٳ`?H냕?@@yGz?Y9g>ܩTX۠AyX۠A$yrz`?H냕?@@yGz?5>ܩTX۠AyX۠ASZ $c`?H냕?@@yGz?by>ܩTX۠AyX۠A 1L`?H냕?@@yGz?wXϨ>ܩTX۠AyX۠As J5`?H냕?@@yGz?Ai >ܩTX۠AyX۠A-`?H냕?@@yGz?FFZ>ܩTX۠AyX۠Ayao`?H냕?@@yGz?vKw7>ܩTX۠AyX۠A*e_?H냕?@@yGz?<,Z>ܩTX۠AyX۠An#_?H냕?@@yGz?.|>ܩTX۠AyX۠A T_?H냕?@@yGz?hW>ܩTX۠AyX۠A, 0#c_?H냕?@@yGz?3K©>ܩTX۠AyX۠A=8_?H냕?@@yGz?Ec>ܩTX۠AyX۠A#_?H냕?@@yGz?#>ܩTX۠AyX۠Aף^?H냕?@@yGz?"gi*>ܩTX۠AyX۠AI*^?H냕?@@yGz?M>ܩTX۠AyX۠A0n ^?H냕?@@yGz? o>ܩTX۠AyX۠Ak^?H냕?@@yGz?lP4>ܩTX۠AyX۠Ao+D^?H냕?@@yGz?x=>ܩTX۠AyX۠AV@c^?H냕?@@yGz?Iת>ܩTX۠AyX۠A h]?H냕?@@yGz?Iך> SX۠AyX۠A hm?kji?@@yGz?$E}\> SX۠AyX۠A Tt4m?kji?@@yGz?m_b> SX۠AyX۠AO^m?kji?@@yGz?UB0> SX۠AyX۠A.M%Qm?kji?@@yGz?*$> SX۠AyX۠A( l?kji?@@yGz?f3> SX۠AyX۠A3=(l?kji?@@yGz?umx> SX۠AyX۠Aս?l?kji?@@yGz?LGw׽> SX۠AyX۠A2 fk?kji?@@yGz?*A> SX۠AyX۠Artk?kji?@@yGz? H> SX۠AyX۠AȆʾvk?kji?@@yGz?ct> SX۠AyX۠A 7>6k?kji?@@yGz?˜Vӝ> SX۠AyX۠A#j?kji?@@yGz?!!9> SX۠AyX۠AMuj?kji?@@yGz?zS^> SX۠AyX۠A{j?kji?@@yGz?X1> SX۠AyX۠A}?j?kji?@@yGz?4>&> SX۠AyX۠A޿j?kji?@@yGz?BÐ.> SX۠AyX۠A'Ipi?kji?@@yGz?ʥs> SX۠AyX۠Acݑi?kji?@@yGz?ZSd> SX۠AyX۠A1Yi?kji?@@yGz?j> SX۠AyX۠A֝>^"i?kji?@@yGz?B &"> SX۠AyX۠A.h?kji?@@yGz?;D> SX۠AyX۠A5Fh?kji?@@yGz?k: g> SX۠AyX۠AI>`h?kji?@@yGz?~:> SX۠AyX۠A*=Oh?kji?@@yGz?ﬠ> SX۠AyX۠AiZVh?kji?@@yGz?iݤϠ> SX۠AyX۠AKfg?kji?@@yGz?(KY> SX۠AyX۠A]g?kji?@@yGz?FX> SX۠AyX۠AsdZg?kji?@@yGz?Ӱ7> SX۠AyX۠ArZg?kji?@@yGz?"xZ> SX۠AyX۠A~0,g?kji?@@yGz?[-}> SX۠AyX۠A =4f?kji?@@yGz?⟡> SX۠AyX۠ADEf?kji?@@yGz?mEu¡> SX۠AyX۠A^[:Vf?kji?@@yGz?t(gL> SX۠AyX۠AHGnmxf?kji?@@yGz?JlX> SX۠AyX۠AJ6-Mf?kji?@@yGz?ӰI*> SX۠AyX۠AQ!"f?kji?@@yGz?&:kM> SX۠AyX۠Ame?kji?@@yGz?29, p> SX۠AyX۠A[(=e?kji?@@yGz?b}Ւ> SX۠AyX۠A|>|e?kji?@@yGz?q> SX۠AyX۠AD SX۠AyX۠Ay1¼Ve?kji?@@yGz?NI> SX۠AyX۠Aw`/e?kji?@@yGz?> SX۠AyX۠A]o@ e?kji?@@yGz?*O]@> SX۠AyX۠APfSd?kji?@@yGz?~c> SX۠AyX۠AVߠd?kji?@@yGz?ZDž> SX۠AyX۠Ad?kji?@@yGz?tݞ|> SX۠AyX۠Ajtd?kji?@@yGz? 1ˣ> SX۠AyX۠A](EPd?kji?@@yGz?Q<'> SX۠AyX۠AO r-d?kji?@@yGz?kk{> SX۠AyX۠Ab9 d?kji?@@yGz?.lP3> SX۠AyX۠ATc?kji?@@yGz?]V> SX۠AyX۠A8"c?kji?@@yGz? 7Ox> SX۠AyX۠A͜c?kji?@@yGz?x)|@o> SX۠AyX۠AG揇c?kji?@@yGz?X1$> SX۠AyX۠Av3nbc?kji?@@yGz?T#> SX۠AyX۠A?^ Bc?kji?@@yGz?ŷH> SX۠AyX۠Aoۄ"c?kji?@@yGz?2C&> SX۠AyX۠Adwdpc?kji?@@yGz?H> SX۠AyX۠ADob?kji?@@yGz?Fk> SX۠AyX۠ArEmb?kji?@@yGz?xuYa> SX۠AyX۠A~b?kji?@@yGz?ꤝ> SX۠AyX۠Ajb?kji?@@yGz?Yӥ> SX۠AyX۠A:Flb?kji?@@yGz?&> SX۠AyX۠ACY)Ob?kji?@@yGz?63j5> SX۠AyX۠AB}mh2b?kji?@@yGz?b;> SX۠AyX۠Aeb?kji?@@yGz?^> SX۠AyX۠Am>a?kji?@@yGz?6rT> SX۠AyX۠AF8a?kji?@@yGz?zc > SX۠AyX۠A"Ka?kji?@@yGz?\ TƦ> SX۠AyX۠AVça?kji?@@yGz?OFs> SX۠AyX۠A`Ia?kji?@@yGz?:G7( > SX۠AyX۠A|Sra?kji?@@yGz?(.> SX۠AyX۠AvVxXa?kji?@@yGz?Q> SX۠AyX۠AƭNm>a?kji?@@yGz?  Gt> SX۠AyX۠AA"%a?kji?@@yGz? SX۠AyX۠AB. a?kji?@@yGz?`l> SX۠AyX۠A` g`?kji?@@yGz?˛eܧ> SX۠AyX۠Av*R`?kji?@@yGz?:$> SX۠AyX۠A:i>`?kji?@@yGz?h!> SX۠AyX۠AZ)`oة`?kji?@@yGz?*D> SX۠AyX۠Aٳ`?kji?@@yGz?Y9g> SX۠AyX۠A$yrz`?kji?@@yGz?5> SX۠AyX۠ASZ $c`?kji?@@yGz?by> SX۠AyX۠A 1L`?kji?@@yGz?wXϨ> SX۠AyX۠As J5`?kji?@@yGz?Ai > SX۠AyX۠A-`?kji?@@yGz?FFZ> SX۠AyX۠Ayao`?kji?@@yGz?vKw7> SX۠AyX۠A*e_?kji?@@yGz?<,Z> SX۠AyX۠An#_?kji?@@yGz?.|> SX۠AyX۠A T_?kji?@@yGz?hW> SX۠AyX۠A, 0#c_?kji?@@yGz?3K©> SX۠AyX۠A=8_?kji?@@yGz?Dc> SX۠AyX۠A#_?kji?@@yGz?#> SX۠AyX۠Aף^?kji?@@yGz?"gi*> SX۠AyX۠AI*^?kji?@@yGz?M> SX۠AyX۠A0n ^?kji?@@yGz? o> SX۠AyX۠Ak^?kji?@@yGz?kP4> SX۠AyX۠Ao+D^?kji?@@yGz?x=> SX۠AyX۠AV@c^?kji?@@yGz?Iת> SX۠AyX۠A h]?kji?@@yGz?Iך>QX۠AyX۠A hm?Nw?@@yGz?%E}\>QX۠AyX۠A Tt4m?Nw?@@yGz?m_b>QX۠AyX۠AO^m?Nw?@@yGz?UB0>QX۠AyX۠A.M%Qm?Nw?@@yGz?*$>QX۠AyX۠A( l?Nw?@@yGz?f3>QX۠AyX۠A3=(l?Nw?@@yGz?tmx>QX۠AyX۠Aս?l?Nw?@@yGz?KGw׽>QX۠AyX۠A2 fk?Nw?@@yGz?*A>QX۠AyX۠Artk?Nw?@@yGz? H>QX۠AyX۠AȆʾvk?Nw?@@yGz?ct>QX۠AyX۠A 7>6k?Nw?@@yGz?˜Vӝ>QX۠AyX۠A#j?Nw?@@yGz?!!9>QX۠AyX۠AMuj?Nw?@@yGz?zS^>QX۠AyX۠A{j?Nw?@@yGz?X1>QX۠AyX۠A}?j?Nw?@@yGz?5>&>QX۠AyX۠A޿j?Nw?@@yGz?BÐ.>QX۠AyX۠A'Ipi?Nw?@@yGz?ʥs>QX۠AyX۠Acݑi?Nw?@@yGz?ZSd>QX۠AyX۠A1Yi?Nw?@@yGz?j>QX۠AyX۠Aם>^"i?Nw?@@yGz?B &">QX۠AyX۠A.h?Nw?@@yGz?;D>QX۠AyX۠A5Fh?Nw?@@yGz?k: g>QX۠AyX۠AI>`h?Nw?@@yGz?~:>QX۠AyX۠A+=Oh?Nw?@@yGz?ﬠ>QX۠AyX۠AiZVh?Nw?@@yGz?iݤϠ>QX۠AyX۠AKfg?Nw?@@yGz?(KY>QX۠AyX۠A]g?Nw?@@yGz?FX>QX۠AyX۠AsdZg?Nw?@@yGz?Ӱ7>QX۠AyX۠ArZg?Nw?@@yGz?"xZ>QX۠AyX۠A0,g?Nw?@@yGz?[-}>QX۠AyX۠A=4f?Nw?@@yGz?⟡>QX۠AyX۠ADEf?Nw?@@yGz?mEu¡>QX۠AyX۠A^[:Vf?Nw?@@yGz?t(gL>QX۠AyX۠AHGnmxf?Nw?@@yGz?JlX>QX۠AyX۠AJ6-Mf?Nw?@@yGz?ӰI*>QX۠AyX۠AQ!"f?Nw?@@yGz?&:kM>QX۠AyX۠Ame?Nw?@@yGz?29, p>QX۠AyX۠A[(=e?Nw?@@yGz?b}Ւ>QX۠AyX۠A|>|e?Nw?@@yGz?q>QX۠AyX۠ADQX۠AyX۠Ay1¼Ve?Nw?@@yGz?NI>QX۠AyX۠Av`/e?Nw?@@yGz?>QX۠AyX۠A]o@ e?Nw?@@yGz?*O]@>QX۠AyX۠AQfSd?Nw?@@yGz?~c>QX۠AyX۠AVߠd?Nw?@@yGz?ZDž>QX۠AyX۠Ad?Nw?@@yGz?uݞ|>QX۠AyX۠Ajtd?Nw?@@yGz? 1ˣ>QX۠AyX۠A](EPd?Nw?@@yGz?Q<'>QX۠AyX۠AO r-d?Nw?@@yGz?kk{>QX۠AyX۠Ab9 d?Nw?@@yGz?.lP3>QX۠AyX۠ATc?Nw?@@yGz?]V>QX۠AyX۠A8"c?Nw?@@yGz? 7Ox>QX۠AyX۠A͜c?Nw?@@yGz?x)|@o>QX۠AyX۠AF揇c?Nw?@@yGz?X1$>QX۠AyX۠Aw3nbc?Nw?@@yGz?U#>QX۠AyX۠A>^ Bc?Nw?@@yGz?ķH>QX۠AyX۠Aoۄ"c?Nw?@@yGz?2C&>QX۠AyX۠Adwdpc?Nw?@@yGz?H>QX۠AyX۠ADob?Nw?@@yGz?Fk>QX۠AyX۠ArEmb?Nw?@@yGz?xuYa>QX۠AyX۠A~b?Nw?@@yGz?ꤝ>QX۠AyX۠Akb?Nw?@@yGz?Yӥ>QX۠AyX۠A;Flb?Nw?@@yGz?&>QX۠AyX۠ABY)Ob?Nw?@@yGz?63j5>QX۠AyX۠AB}mh2b?Nw?@@yGz?b;>QX۠AyX۠Aeb?Nw?@@yGz?^>QX۠AyX۠Am>a?Nw?@@yGz?6rT>QX۠AyX۠AF8a?Nw?@@yGz?zc >QX۠AyX۠A"Ka?Nw?@@yGz?[ TƦ>QX۠AyX۠AVça?Nw?@@yGz?OFs>QX۠AyX۠A`Ia?Nw?@@yGz?:G7( >QX۠AyX۠A|Sra?Nw?@@yGz?(.>QX۠AyX۠AvVxXa?Nw?@@yGz?Q>QX۠AyX۠AƭNm>a?Nw?@@yGz?  Gt>QX۠AyX۠AA"%a?Nw?@@yGz?QX۠AyX۠AB. a?Nw?@@yGz?`l>QX۠AyX۠A` g`?Nw?@@yGz?̛eܧ>QX۠AyX۠Av*R`?Nw?@@yGz?:$>QX۠AyX۠A:i>`?Nw?@@yGz?h!>QX۠AyX۠AZ)`oة`?Nw?@@yGz?*D>QX۠AyX۠Aٳ`?Nw?@@yGz?Y9g>QX۠AyX۠A$yrz`?Nw?@@yGz?5>QX۠AyX۠ASZ $c`?Nw?@@yGz?by>QX۠AyX۠A 1L`?Nw?@@yGz?wXϨ>QX۠AyX۠As J5`?Nw?@@yGz?Ai >QX۠AyX۠A-`?Nw?@@yGz?FFZ>QX۠AyX۠Ayao`?Nw?@@yGz?vKw7>QX۠AyX۠A*e_?Nw?@@yGz?<,Z>QX۠AyX۠An#_?Nw?@@yGz?.|>QX۠AyX۠A T_?Nw?@@yGz?hW>QX۠AyX۠A, 0#c_?Nw?@@yGz?3K©>QX۠AyX۠A=8_?Nw?@@yGz?Ec>QX۠AyX۠A#_?Nw?@@yGz?#>QX۠AyX۠Aף^?Nw?@@yGz?"gi*>QX۠AyX۠AI*^?Nw?@@yGz?M>QX۠AyX۠A0n ^?Nw?@@yGz? o>QX۠AyX۠Ak^?Nw?@@yGz?lP4>QX۠AyX۠Ao+D^?Nw?@@yGz?x=>QX۠AyX۠AV@c^?Nw?@@yGz?Iת>QX۠AyX۠A h]?Nw?@@yGz?Iך>PX۠AyX۠A hm?h4h?@@yGz?$E}\>PX۠AyX۠A Tt4m?h4h?@@yGz?m_b>PX۠AyX۠AO^m?h4h?@@yGz?UB0>PX۠AyX۠A.M%Qm?h4h?@@yGz?*$>PX۠AyX۠A( l?h4h?@@yGz?f3>PX۠AyX۠A3=(l?h4h?@@yGz?umx>PX۠AyX۠Aս?l?h4h?@@yGz?LGw׽>PX۠AyX۠A2 fk?h4h?@@yGz?*A>PX۠AyX۠Artk?h4h?@@yGz? H>PX۠AyX۠AȆʾvk?h4h?@@yGz?ct>PX۠AyX۠A 7>6k?h4h?@@yGz?˜Vӝ>PX۠AyX۠A#j?h4h?@@yGz?!!9>PX۠AyX۠AMuj?h4h?@@yGz?zS^>PX۠AyX۠A{j?h4h?@@yGz?X1>PX۠AyX۠A}?j?h4h?@@yGz?4>&>PX۠AyX۠A޿j?h4h?@@yGz?BÐ.>PX۠AyX۠A'Ipi?h4h?@@yGz?ʥs>PX۠AyX۠Acݑi?h4h?@@yGz?ZSd>PX۠AyX۠A1Yi?h4h?@@yGz?j>PX۠AyX۠A֝>^"i?h4h?@@yGz?B &">PX۠AyX۠A.h?h4h?@@yGz?;D>PX۠AyX۠A5Fh?h4h?@@yGz?k: g>PX۠AyX۠AI>`h?h4h?@@yGz?~:>PX۠AyX۠A*=Oh?h4h?@@yGz?ﬠ>PX۠AyX۠AiZVh?h4h?@@yGz?iݤϠ>PX۠AyX۠AKfg?h4h?@@yGz?(KY>PX۠AyX۠A]g?h4h?@@yGz?FX>PX۠AyX۠AsdZg?h4h?@@yGz?Ӱ7>PX۠AyX۠ArZg?h4h?@@yGz?"xZ>PX۠AyX۠A~0,g?h4h?@@yGz?[-}>PX۠AyX۠A =4f?h4h?@@yGz?⟡>PX۠AyX۠ADEf?h4h?@@yGz?mEu¡>PX۠AyX۠A^[:Vf?h4h?@@yGz?t(gL>PX۠AyX۠AHGnmxf?h4h?@@yGz?JlX>PX۠AyX۠AJ6-Mf?h4h?@@yGz?ӰI*>PX۠AyX۠AQ!"f?h4h?@@yGz?&:kM>PX۠AyX۠Ame?h4h?@@yGz?29, p>PX۠AyX۠A[(=e?h4h?@@yGz?b}Ւ>PX۠AyX۠A|>|e?h4h?@@yGz?q>PX۠AyX۠ADPX۠AyX۠Ay1¼Ve?h4h?@@yGz?NI>PX۠AyX۠Aw`/e?h4h?@@yGz?>PX۠AyX۠A]o@ e?h4h?@@yGz?*O]@>PX۠AyX۠APfSd?h4h?@@yGz?~c>PX۠AyX۠AVߠd?h4h?@@yGz?ZDž>PX۠AyX۠Ad?h4h?@@yGz?tݞ|>PX۠AyX۠Ajtd?h4h?@@yGz? 1ˣ>PX۠AyX۠A](EPd?h4h?@@yGz?Q<'>PX۠AyX۠AO r-d?h4h?@@yGz?kk{>PX۠AyX۠Ab9 d?h4h?@@yGz?.lP3>PX۠AyX۠ATc?h4h?@@yGz?]V>PX۠AyX۠A8"c?h4h?@@yGz? 7Ox>PX۠AyX۠A͜c?h4h?@@yGz?x)|@o>PX۠AyX۠AG揇c?h4h?@@yGz?X1$>PX۠AyX۠Av3nbc?h4h?@@yGz?T#>PX۠AyX۠A?^ Bc?h4h?@@yGz?ŷH>PX۠AyX۠Aoۄ"c?h4h?@@yGz?2C&>PX۠AyX۠Adwdpc?h4h?@@yGz?H>PX۠AyX۠ADob?h4h?@@yGz?Fk>PX۠AyX۠ArEmb?h4h?@@yGz?xuYa>PX۠AyX۠A~b?h4h?@@yGz?ꤝ>PX۠AyX۠Ajb?h4h?@@yGz?Yӥ>PX۠AyX۠A:Flb?h4h?@@yGz?&>PX۠AyX۠ACY)Ob?h4h?@@yGz?63j5>PX۠AyX۠AB}mh2b?h4h?@@yGz?b;>PX۠AyX۠Aeb?h4h?@@yGz?^>PX۠AyX۠Am>a?h4h?@@yGz?6rT>PX۠AyX۠AF8a?h4h?@@yGz?zc >PX۠AyX۠A"Ka?h4h?@@yGz?\ TƦ>PX۠AyX۠AVça?h4h?@@yGz?OFs>PX۠AyX۠A`Ia?h4h?@@yGz?:G7( >PX۠AyX۠A|Sra?h4h?@@yGz?(.>PX۠AyX۠AvVxXa?h4h?@@yGz?Q>PX۠AyX۠AƭNm>a?h4h?@@yGz?  Gt>PX۠AyX۠AA"%a?h4h?@@yGz?PX۠AyX۠AB. a?h4h?@@yGz?`l>PX۠AyX۠A` g`?h4h?@@yGz?˛eܧ>PX۠AyX۠Av*R`?h4h?@@yGz?:$>PX۠AyX۠A:i>`?h4h?@@yGz?h!>PX۠AyX۠AZ)`oة`?h4h?@@yGz?*D>PX۠AyX۠Aٳ`?h4h?@@yGz?Y9g>PX۠AyX۠A$yrz`?h4h?@@yGz?5>PX۠AyX۠ASZ $c`?h4h?@@yGz?by>PX۠AyX۠A 1L`?h4h?@@yGz?wXϨ>PX۠AyX۠As J5`?h4h?@@yGz?Ai >PX۠AyX۠A-`?h4h?@@yGz?FFZ>PX۠AyX۠Ayao`?h4h?@@yGz?vKw7>PX۠AyX۠A*e_?h4h?@@yGz?<,Z>PX۠AyX۠An#_?h4h?@@yGz?.|>PX۠AyX۠A T_?h4h?@@yGz?hW>PX۠AyX۠A, 0#c_?h4h?@@yGz?3K©>PX۠AyX۠A=8_?h4h?@@yGz?Dc>PX۠AyX۠A#_?h4h?@@yGz?#>PX۠AyX۠Aף^?h4h?@@yGz?"gi*>PX۠AyX۠AI*^?h4h?@@yGz?M>PX۠AyX۠A0n ^?h4h?@@yGz? o>PX۠AyX۠Ak^?h4h?@@yGz?kP4>PX۠AyX۠Ao+D^?h4h?@@yGz?x=>PX۠AyX۠AV@c^?h4h?@@yGz?Iת>PX۠AyX۠A h]?h4h?@@yGz?Iך>NX۠AyX۠A hm?YP?@@yGz?%E}\>NX۠AyX۠A Tt4m?YP?@@yGz?m_b>NX۠AyX۠AO^m?YP?@@yGz?UB0>NX۠AyX۠A.M%Qm?YP?@@yGz?*$>NX۠AyX۠A( l?YP?@@yGz?f3>NX۠AyX۠A3=(l?YP?@@yGz?tmx>NX۠AyX۠Aս?l?YP?@@yGz?KGw׽>NX۠AyX۠A2 fk?YP?@@yGz?*A>NX۠AyX۠Artk?YP?@@yGz? H>NX۠AyX۠AȆʾvk?YP?@@yGz?ct>NX۠AyX۠A 7>6k?YP?@@yGz?˜Vӝ>NX۠AyX۠A#j?YP?@@yGz?!!9>NX۠AyX۠AMuj?YP?@@yGz?zS^>NX۠AyX۠A{j?YP?@@yGz?X1>NX۠AyX۠A}?j?YP?@@yGz?5>&>NX۠AyX۠A޿j?YP?@@yGz?BÐ.>NX۠AyX۠A'Ipi?YP?@@yGz?ʥs>NX۠AyX۠Acݑi?YP?@@yGz?ZSd>NX۠AyX۠A1Yi?YP?@@yGz?j>NX۠AyX۠Aם>^"i?YP?@@yGz?B &">NX۠AyX۠A.h?YP?@@yGz?;D>NX۠AyX۠A5Fh?YP?@@yGz?k: g>NX۠AyX۠AI>`h?YP?@@yGz?~:>NX۠AyX۠A+=Oh?YP?@@yGz?ﬠ>NX۠AyX۠AiZVh?YP?@@yGz?iݤϠ>NX۠AyX۠AKfg?YP?@@yGz?(KY>NX۠AyX۠A]g?YP?@@yGz?FX>NX۠AyX۠AsdZg?YP?@@yGz?Ӱ7>NX۠AyX۠ArZg?YP?@@yGz?"xZ>NX۠AyX۠A0,g?YP?@@yGz?[-}>NX۠AyX۠A=4f?YP?@@yGz?⟡>NX۠AyX۠ADEf?YP?@@yGz?mEu¡>NX۠AyX۠A^[:Vf?YP?@@yGz?t(gL>NX۠AyX۠AHGnmxf?YP?@@yGz?JlX>NX۠AyX۠AJ6-Mf?YP?@@yGz?ӰI*>NX۠AyX۠AQ!"f?YP?@@yGz?&:kM>NX۠AyX۠Ame?YP?@@yGz?29, p>NX۠AyX۠A[(=e?YP?@@yGz?b}Ւ>NX۠AyX۠A|>|e?YP?@@yGz?q>NX۠AyX۠ADNX۠AyX۠Ay1¼Ve?YP?@@yGz?NI>NX۠AyX۠Av`/e?YP?@@yGz?>NX۠AyX۠A]o@ e?YP?@@yGz?*O]@>NX۠AyX۠AQfSd?YP?@@yGz?~c>NX۠AyX۠AVߠd?YP?@@yGz?ZDž>NX۠AyX۠Ad?YP?@@yGz?uݞ|>NX۠AyX۠Ajtd?YP?@@yGz? 1ˣ>NX۠AyX۠A](EPd?YP?@@yGz?Q<'>NX۠AyX۠AO r-d?YP?@@yGz?kk{>NX۠AyX۠Ab9 d?YP?@@yGz?.lP3>NX۠AyX۠ATc?YP?@@yGz?]V>NX۠AyX۠A8"c?YP?@@yGz? 7Ox>NX۠AyX۠A͜c?YP?@@yGz?x)|@o>NX۠AyX۠AF揇c?YP?@@yGz?X1$>NX۠AyX۠Aw3nbc?YP?@@yGz?U#>NX۠AyX۠A>^ Bc?YP?@@yGz?ķH>NX۠AyX۠Aoۄ"c?YP?@@yGz?2C&>NX۠AyX۠Adwdpc?YP?@@yGz?H>NX۠AyX۠ADob?YP?@@yGz?Fk>NX۠AyX۠ArEmb?YP?@@yGz?xuYa>NX۠AyX۠A~b?YP?@@yGz?ꤝ>NX۠AyX۠Akb?YP?@@yGz?Yӥ>NX۠AyX۠A;Flb?YP?@@yGz?&>NX۠AyX۠ABY)Ob?YP?@@yGz?63j5>NX۠AyX۠AB}mh2b?YP?@@yGz?b;>NX۠AyX۠Aeb?YP?@@yGz?^>NX۠AyX۠Am>a?YP?@@yGz?6rT>NX۠AyX۠AF8a?YP?@@yGz?zc >NX۠AyX۠A"Ka?YP?@@yGz?[ TƦ>NX۠AyX۠AVça?YP?@@yGz?OFs>NX۠AyX۠A`Ia?YP?@@yGz?:G7( >NX۠AyX۠A|Sra?YP?@@yGz?(.>NX۠AyX۠AvVxXa?YP?@@yGz?Q>NX۠AyX۠AƭNm>a?YP?@@yGz?  Gt>NX۠AyX۠AA"%a?YP?@@yGz?NX۠AyX۠AB. a?YP?@@yGz?`l>NX۠AyX۠A` g`?YP?@@yGz?̛eܧ>NX۠AyX۠Av*R`?YP?@@yGz?:$>NX۠AyX۠A:i>`?YP?@@yGz?h!>NX۠AyX۠AZ)`oة`?YP?@@yGz?*D>NX۠AyX۠Aٳ`?YP?@@yGz?Y9g>NX۠AyX۠A$yrz`?YP?@@yGz?5>NX۠AyX۠ASZ $c`?YP?@@yGz?by>NX۠AyX۠A 1L`?YP?@@yGz?wXϨ>NX۠AyX۠As J5`?YP?@@yGz?Ai >NX۠AyX۠A-`?YP?@@yGz?FFZ>NX۠AyX۠Ayao`?YP?@@yGz?vKw7>NX۠AyX۠A*e_?YP?@@yGz?<,Z>NX۠AyX۠An#_?YP?@@yGz?.|>NX۠AyX۠A T_?YP?@@yGz?hW>NX۠AyX۠A, 0#c_?YP?@@yGz?3K©>NX۠AyX۠A=8_?YP?@@yGz?Ec>NX۠AyX۠A#_?YP?@@yGz?#>NX۠AyX۠Aף^?YP?@@yGz?"gi*>NX۠AyX۠AI*^?YP?@@yGz?M>NX۠AyX۠A0n ^?YP?@@yGz? o>NX۠AyX۠Ak^?YP?@@yGz?lP4>NX۠AyX۠Ao+D^?YP?@@yGz?x=>NX۠AyX۠AV@c^?YP?@@yGz?Iת>NX۠AyX۠A h]?YP?@@yGz?Iך>LX۠AyX۠A hm?f7?@@yGz?$E}\>LX۠AyX۠A Tt4m?f7?@@yGz?m_b>LX۠AyX۠AO^m?f7?@@yGz?UB0>LX۠AyX۠A.M%Qm?f7?@@yGz?*$>LX۠AyX۠A( l?f7?@@yGz?f3>LX۠AyX۠A3=(l?f7?@@yGz?umx>LX۠AyX۠Aս?l?f7?@@yGz?LGw׽>LX۠AyX۠A2 fk?f7?@@yGz?*A>LX۠AyX۠Artk?f7?@@yGz? H>LX۠AyX۠AȆʾvk?f7?@@yGz?ct>LX۠AyX۠A 7>6k?f7?@@yGz?˜Vӝ>LX۠AyX۠A#j?f7?@@yGz?!!9>LX۠AyX۠AMuj?f7?@@yGz?zS^>LX۠AyX۠A{j?f7?@@yGz?X1>LX۠AyX۠A}?j?f7?@@yGz?4>&>LX۠AyX۠A޿j?f7?@@yGz?BÐ.>LX۠AyX۠A'Ipi?f7?@@yGz?ʥs>LX۠AyX۠Acݑi?f7?@@yGz?ZSd>LX۠AyX۠A1Yi?f7?@@yGz?j>LX۠AyX۠A֝>^"i?f7?@@yGz?B &">LX۠AyX۠A.h?f7?@@yGz?;D>LX۠AyX۠A5Fh?f7?@@yGz?k: g>LX۠AyX۠AI>`h?f7?@@yGz?~:>LX۠AyX۠A*=Oh?f7?@@yGz?ﬠ>LX۠AyX۠AiZVh?f7?@@yGz?iݤϠ>LX۠AyX۠AKfg?f7?@@yGz?(KY>LX۠AyX۠A]g?f7?@@yGz?FX>LX۠AyX۠AsdZg?f7?@@yGz?Ӱ7>LX۠AyX۠ArZg?f7?@@yGz?"xZ>LX۠AyX۠A~0,g?f7?@@yGz?[-}>LX۠AyX۠A =4f?f7?@@yGz?⟡>LX۠AyX۠ADEf?f7?@@yGz?mEu¡>LX۠AyX۠A^[:Vf?f7?@@yGz?t(gL>LX۠AyX۠AHGnmxf?f7?@@yGz?JlX>LX۠AyX۠AJ6-Mf?f7?@@yGz?ӰI*>LX۠AyX۠AQ!"f?f7?@@yGz?&:kM>LX۠AyX۠Ame?f7?@@yGz?29, p>LX۠AyX۠A[(=e?f7?@@yGz?b}Ւ>LX۠AyX۠A|>|e?f7?@@yGz?q>LX۠AyX۠ADLX۠AyX۠Ay1¼Ve?f7?@@yGz?NI>LX۠AyX۠Aw`/e?f7?@@yGz?>LX۠AyX۠A]o@ e?f7?@@yGz?*O]@>LX۠AyX۠APfSd?f7?@@yGz?~c>LX۠AyX۠AVߠd?f7?@@yGz?ZDž>LX۠AyX۠Ad?f7?@@yGz?tݞ|>LX۠AyX۠Ajtd?f7?@@yGz? 1ˣ>LX۠AyX۠A](EPd?f7?@@yGz?Q<'>LX۠AyX۠AO r-d?f7?@@yGz?kk{>LX۠AyX۠Ab9 d?f7?@@yGz?.lP3>LX۠AyX۠ATc?f7?@@yGz?]V>LX۠AyX۠A8"c?f7?@@yGz? 7Ox>LX۠AyX۠A͜c?f7?@@yGz?x)|@o>LX۠AyX۠AG揇c?f7?@@yGz?X1$>LX۠AyX۠Av3nbc?f7?@@yGz?T#>LX۠AyX۠A?^ Bc?f7?@@yGz?ŷH>LX۠AyX۠Aoۄ"c?f7?@@yGz?2C&>LX۠AyX۠Adwdpc?f7?@@yGz?H>LX۠AyX۠ADob?f7?@@yGz?Fk>LX۠AyX۠ArEmb?f7?@@yGz?xuYa>LX۠AyX۠A~b?f7?@@yGz?ꤝ>LX۠AyX۠Ajb?f7?@@yGz?Yӥ>LX۠AyX۠A:Flb?f7?@@yGz?&>LX۠AyX۠ACY)Ob?f7?@@yGz?63j5>LX۠AyX۠AB}mh2b?f7?@@yGz?b;>LX۠AyX۠Aeb?f7?@@yGz?^>LX۠AyX۠Am>a?f7?@@yGz?6rT>LX۠AyX۠AF8a?f7?@@yGz?zc >LX۠AyX۠A"Ka?f7?@@yGz?\ TƦ>LX۠AyX۠AVça?f7?@@yGz?OFs>LX۠AyX۠A`Ia?f7?@@yGz?:G7( >LX۠AyX۠A|Sra?f7?@@yGz?(.>LX۠AyX۠AvVxXa?f7?@@yGz?Q>LX۠AyX۠AƭNm>a?f7?@@yGz?  Gt>LX۠AyX۠AA"%a?f7?@@yGz?LX۠AyX۠AB. a?f7?@@yGz?`l>LX۠AyX۠A` g`?f7?@@yGz?˛eܧ>LX۠AyX۠Av*R`?f7?@@yGz?:$>LX۠AyX۠A:i>`?f7?@@yGz?h!>LX۠AyX۠AZ)`oة`?f7?@@yGz?*D>LX۠AyX۠Aٳ`?f7?@@yGz?Y9g>LX۠AyX۠A$yrz`?f7?@@yGz?5>LX۠AyX۠ASZ $c`?f7?@@yGz?by>LX۠AyX۠A 1L`?f7?@@yGz?wXϨ>LX۠AyX۠As J5`?f7?@@yGz?Ai >LX۠AyX۠A-`?f7?@@yGz?FFZ>LX۠AyX۠Ayao`?f7?@@yGz?vKw7>LX۠AyX۠A*e_?f7?@@yGz?<,Z>LX۠AyX۠An#_?f7?@@yGz?.|>LX۠AyX۠A T_?f7?@@yGz?hW>LX۠AyX۠A, 0#c_?f7?@@yGz?3K©>LX۠AyX۠A=8_?f7?@@yGz?Dc>LX۠AyX۠A#_?f7?@@yGz?#>LX۠AyX۠Aף^?f7?@@yGz?"gi*>LX۠AyX۠AI*^?f7?@@yGz?M>LX۠AyX۠A0n ^?f7?@@yGz? o>LX۠AyX۠Ak^?f7?@@yGz?kP4>LX۠AyX۠Ao+D^?f7?@@yGz?x=>LX۠AyX۠AV@c^?f7?@@yGz?Iת>LX۠AyX۠A h]?f7?@@yGz?Iך>,tKX۠AyX۠A hm?:?@@yGz?%E}\>,tKX۠AyX۠A Tt4m?:?@@yGz?m_b>,tKX۠AyX۠AO^m?:?@@yGz?UB0>,tKX۠AyX۠A.M%Qm?:?@@yGz?*$>,tKX۠AyX۠A( l?:?@@yGz?f3>,tKX۠AyX۠A3=(l?:?@@yGz?tmx>,tKX۠AyX۠Aս?l?:?@@yGz?KGw׽>,tKX۠AyX۠A2 fk?:?@@yGz?*A>,tKX۠AyX۠Artk?:?@@yGz? H>,tKX۠AyX۠AȆʾvk?:?@@yGz?ct>,tKX۠AyX۠A 7>6k?:?@@yGz?˜Vӝ>,tKX۠AyX۠A#j?:?@@yGz?!!9>,tKX۠AyX۠AMuj?:?@@yGz?zS^>,tKX۠AyX۠A{j?:?@@yGz?X1>,tKX۠AyX۠A}?j?:?@@yGz?5>&>,tKX۠AyX۠A޿j?:?@@yGz?BÐ.>,tKX۠AyX۠A'Ipi?:?@@yGz?ʥs>,tKX۠AyX۠Acݑi?:?@@yGz?ZSd>,tKX۠AyX۠A1Yi?:?@@yGz?j>,tKX۠AyX۠Aם>^"i?:?@@yGz?B &">,tKX۠AyX۠A.h?:?@@yGz?;D>,tKX۠AyX۠A5Fh?:?@@yGz?k: g>,tKX۠AyX۠AI>`h?:?@@yGz?~:>,tKX۠AyX۠A+=Oh?:?@@yGz?ﬠ>,tKX۠AyX۠AiZVh?:?@@yGz?iݤϠ>,tKX۠AyX۠AKfg?:?@@yGz?(KY>,tKX۠AyX۠A]g?:?@@yGz?FX>,tKX۠AyX۠AsdZg?:?@@yGz?Ӱ7>,tKX۠AyX۠ArZg?:?@@yGz?"xZ>,tKX۠AyX۠A0,g?:?@@yGz?[-}>,tKX۠AyX۠A=4f?:?@@yGz?⟡>,tKX۠AyX۠ADEf?:?@@yGz?mEu¡>,tKX۠AyX۠A^[:Vf?:?@@yGz?t(gL>,tKX۠AyX۠AHGnmxf?:?@@yGz?JlX>,tKX۠AyX۠AJ6-Mf?:?@@yGz?ӰI*>,tKX۠AyX۠AQ!"f?:?@@yGz?&:kM>,tKX۠AyX۠Ame?:?@@yGz?29, p>,tKX۠AyX۠A[(=e?:?@@yGz?b}Ւ>,tKX۠AyX۠A|>|e?:?@@yGz?q>,tKX۠AyX۠AD,tKX۠AyX۠Ay1¼Ve?:?@@yGz?NI>,tKX۠AyX۠Av`/e?:?@@yGz?>,tKX۠AyX۠A]o@ e?:?@@yGz?*O]@>,tKX۠AyX۠AQfSd?:?@@yGz?~c>,tKX۠AyX۠AVߠd?:?@@yGz?ZDž>,tKX۠AyX۠Ad?:?@@yGz?uݞ|>,tKX۠AyX۠Ajtd?:?@@yGz? 1ˣ>,tKX۠AyX۠A](EPd?:?@@yGz?Q<'>,tKX۠AyX۠AO r-d?:?@@yGz?kk{>,tKX۠AyX۠Ab9 d?:?@@yGz?.lP3>,tKX۠AyX۠ATc?:?@@yGz?]V>,tKX۠AyX۠A8"c?:?@@yGz? 7Ox>,tKX۠AyX۠A͜c?:?@@yGz?x)|@o>,tKX۠AyX۠AF揇c?:?@@yGz?X1$>,tKX۠AyX۠Aw3nbc?:?@@yGz?U#>,tKX۠AyX۠A>^ Bc?:?@@yGz?ķH>,tKX۠AyX۠Aoۄ"c?:?@@yGz?2C&>,tKX۠AyX۠Adwdpc?:?@@yGz?H>,tKX۠AyX۠ADob?:?@@yGz?Fk>,tKX۠AyX۠ArEmb?:?@@yGz?xuYa>,tKX۠AyX۠A~b?:?@@yGz?ꤝ>,tKX۠AyX۠Akb?:?@@yGz?Yӥ>,tKX۠AyX۠A;Flb?:?@@yGz?&>,tKX۠AyX۠ABY)Ob?:?@@yGz?63j5>,tKX۠AyX۠AB}mh2b?:?@@yGz?b;>,tKX۠AyX۠Aeb?:?@@yGz?^>,tKX۠AyX۠Am>a?:?@@yGz?6rT>,tKX۠AyX۠AF8a?:?@@yGz?zc >,tKX۠AyX۠A"Ka?:?@@yGz?[ TƦ>,tKX۠AyX۠AVça?:?@@yGz?OFs>,tKX۠AyX۠A`Ia?:?@@yGz?:G7( >,tKX۠AyX۠A|Sra?:?@@yGz?(.>,tKX۠AyX۠AvVxXa?:?@@yGz?Q>,tKX۠AyX۠AƭNm>a?:?@@yGz?  Gt>,tKX۠AyX۠AA"%a?:?@@yGz?,tKX۠AyX۠AB. a?:?@@yGz?`l>,tKX۠AyX۠A` g`?:?@@yGz?̛eܧ>,tKX۠AyX۠Av*R`?:?@@yGz?:$>,tKX۠AyX۠A:i>`?:?@@yGz?h!>,tKX۠AyX۠AZ)`oة`?:?@@yGz?*D>,tKX۠AyX۠Aٳ`?:?@@yGz?Y9g>,tKX۠AyX۠A$yrz`?:?@@yGz?5>,tKX۠AyX۠ASZ $c`?:?@@yGz?by>,tKX۠AyX۠A 1L`?:?@@yGz?wXϨ>,tKX۠AyX۠As J5`?:?@@yGz?Ai >,tKX۠AyX۠A-`?:?@@yGz?FFZ>,tKX۠AyX۠Ayao`?:?@@yGz?vKw7>,tKX۠AyX۠A*e_?:?@@yGz?<,Z>,tKX۠AyX۠An#_?:?@@yGz?.|>,tKX۠AyX۠A T_?:?@@yGz?hW>,tKX۠AyX۠A, 0#c_?:?@@yGz?3K©>,tKX۠AyX۠A=8_?:?@@yGz?Ec>,tKX۠AyX۠A#_?:?@@yGz?#>,tKX۠AyX۠Aף^?:?@@yGz?"gi*>,tKX۠AyX۠AI*^?:?@@yGz?M>,tKX۠AyX۠A0n ^?:?@@yGz? o>,tKX۠AyX۠Ak^?:?@@yGz?lP4>,tKX۠AyX۠Ao+D^?:?@@yGz?x=>,tKX۠AyX۠AV@c^?:?@@yGz?Iת>,tKX۠AyX۠A h]?:?@@yGz?Iך>9IX۠AyX۠A hm?=eʫ?@@yGz?$E}\>9IX۠AyX۠A Tt4m?=eʫ?@@yGz?m_b>9IX۠AyX۠AO^m?=eʫ?@@yGz?UB0>9IX۠AyX۠A.M%Qm?=eʫ?@@yGz?*$>9IX۠AyX۠A( l?=eʫ?@@yGz?f3>9IX۠AyX۠A3=(l?=eʫ?@@yGz?umx>9IX۠AyX۠Aս?l?=eʫ?@@yGz?LGw׽>9IX۠AyX۠A2 fk?=eʫ?@@yGz?*A>9IX۠AyX۠Artk?=eʫ?@@yGz? H>9IX۠AyX۠AȆʾvk?=eʫ?@@yGz?ct>9IX۠AyX۠A 7>6k?=eʫ?@@yGz?˜Vӝ>9IX۠AyX۠A#j?=eʫ?@@yGz?!!9>9IX۠AyX۠AMuj?=eʫ?@@yGz?zS^>9IX۠AyX۠A{j?=eʫ?@@yGz?X1>9IX۠AyX۠A}?j?=eʫ?@@yGz?4>&>9IX۠AyX۠A޿j?=eʫ?@@yGz?BÐ.>9IX۠AyX۠A'Ipi?=eʫ?@@yGz?ʥs>9IX۠AyX۠Acݑi?=eʫ?@@yGz?ZSd>9IX۠AyX۠A1Yi?=eʫ?@@yGz?j>9IX۠AyX۠A֝>^"i?=eʫ?@@yGz?B &">9IX۠AyX۠A.h?=eʫ?@@yGz?;D>9IX۠AyX۠A5Fh?=eʫ?@@yGz?k: g>9IX۠AyX۠AI>`h?=eʫ?@@yGz?~:>9IX۠AyX۠A*=Oh?=eʫ?@@yGz?ﬠ>9IX۠AyX۠AiZVh?=eʫ?@@yGz?iݤϠ>9IX۠AyX۠AKfg?=eʫ?@@yGz?(KY>9IX۠AyX۠A]g?=eʫ?@@yGz?FX>9IX۠AyX۠AsdZg?=eʫ?@@yGz?Ӱ7>9IX۠AyX۠ArZg?=eʫ?@@yGz?"xZ>9IX۠AyX۠A~0,g?=eʫ?@@yGz?[-}>9IX۠AyX۠A =4f?=eʫ?@@yGz?⟡>9IX۠AyX۠ADEf?=eʫ?@@yGz?mEu¡>9IX۠AyX۠A^[:Vf?=eʫ?@@yGz?t(gL>9IX۠AyX۠AHGnmxf?=eʫ?@@yGz?JlX>9IX۠AyX۠AJ6-Mf?=eʫ?@@yGz?ӰI*>9IX۠AyX۠AQ!"f?=eʫ?@@yGz?&:kM>9IX۠AyX۠Ame?=eʫ?@@yGz?29, p>9IX۠AyX۠A[(=e?=eʫ?@@yGz?b}Ւ>9IX۠AyX۠A|>|e?=eʫ?@@yGz?q>9IX۠AyX۠AD9IX۠AyX۠Ay1¼Ve?=eʫ?@@yGz?NI>9IX۠AyX۠Aw`/e?=eʫ?@@yGz?>9IX۠AyX۠A]o@ e?=eʫ?@@yGz?*O]@>9IX۠AyX۠APfSd?=eʫ?@@yGz?~c>9IX۠AyX۠AVߠd?=eʫ?@@yGz?ZDž>9IX۠AyX۠Ad?=eʫ?@@yGz?tݞ|>9IX۠AyX۠Ajtd?=eʫ?@@yGz? 1ˣ>9IX۠AyX۠A](EPd?=eʫ?@@yGz?Q<'>9IX۠AyX۠AO r-d?=eʫ?@@yGz?kk{>9IX۠AyX۠Ab9 d?=eʫ?@@yGz?.lP3>9IX۠AyX۠ATc?=eʫ?@@yGz?]V>9IX۠AyX۠A8"c?=eʫ?@@yGz? 7Ox>9IX۠AyX۠A͜c?=eʫ?@@yGz?x)|@o>9IX۠AyX۠AG揇c?=eʫ?@@yGz?X1$>9IX۠AyX۠Av3nbc?=eʫ?@@yGz?T#>9IX۠AyX۠A?^ Bc?=eʫ?@@yGz?ŷH>9IX۠AyX۠Aoۄ"c?=eʫ?@@yGz?2C&>9IX۠AyX۠Adwdpc?=eʫ?@@yGz?H>9IX۠AyX۠ADob?=eʫ?@@yGz?Fk>9IX۠AyX۠ArEmb?=eʫ?@@yGz?xuYa>9IX۠AyX۠A~b?=eʫ?@@yGz?ꤝ>9IX۠AyX۠Ajb?=eʫ?@@yGz?Yӥ>9IX۠AyX۠A:Flb?=eʫ?@@yGz?&>9IX۠AyX۠ACY)Ob?=eʫ?@@yGz?63j5>9IX۠AyX۠AB}mh2b?=eʫ?@@yGz?b;>9IX۠AyX۠Aeb?=eʫ?@@yGz?^>9IX۠AyX۠Am>a?=eʫ?@@yGz?6rT>9IX۠AyX۠AF8a?=eʫ?@@yGz?zc >9IX۠AyX۠A"Ka?=eʫ?@@yGz?\ TƦ>9IX۠AyX۠AVça?=eʫ?@@yGz?OFs>9IX۠AyX۠A`Ia?=eʫ?@@yGz?:G7( >9IX۠AyX۠A|Sra?=eʫ?@@yGz?(.>9IX۠AyX۠AvVxXa?=eʫ?@@yGz?Q>9IX۠AyX۠AƭNm>a?=eʫ?@@yGz?  Gt>9IX۠AyX۠AA"%a?=eʫ?@@yGz?9IX۠AyX۠AB. a?=eʫ?@@yGz?`l>9IX۠AyX۠A` g`?=eʫ?@@yGz?˛eܧ>9IX۠AyX۠Av*R`?=eʫ?@@yGz?:$>9IX۠AyX۠A:i>`?=eʫ?@@yGz?h!>9IX۠AyX۠AZ)`oة`?=eʫ?@@yGz?*D>9IX۠AyX۠Aٳ`?=eʫ?@@yGz?Y9g>9IX۠AyX۠A$yrz`?=eʫ?@@yGz?5>9IX۠AyX۠ASZ $c`?=eʫ?@@yGz?by>9IX۠AyX۠A 1L`?=eʫ?@@yGz?wXϨ>9IX۠AyX۠As J5`?=eʫ?@@yGz?Ai >9IX۠AyX۠A-`?=eʫ?@@yGz?FFZ>9IX۠AyX۠Ayao`?=eʫ?@@yGz?vKw7>9IX۠AyX۠A*e_?=eʫ?@@yGz?<,Z>9IX۠AyX۠An#_?=eʫ?@@yGz?.|>9IX۠AyX۠A T_?=eʫ?@@yGz?hW>9IX۠AyX۠A, 0#c_?=eʫ?@@yGz?3K©>9IX۠AyX۠A=8_?=eʫ?@@yGz?Dc>9IX۠AyX۠A#_?=eʫ?@@yGz?#>9IX۠AyX۠Aף^?=eʫ?@@yGz?"gi*>9IX۠AyX۠AI*^?=eʫ?@@yGz?M>9IX۠AyX۠A0n ^?=eʫ?@@yGz? o>9IX۠AyX۠Ak^?=eʫ?@@yGz?kP4>9IX۠AyX۠Ao+D^?=eʫ?@@yGz?x=>9IX۠AyX۠AV@c^?=eʫ?@@yGz?Iת>9IX۠AyX۠A h]?=eʫ?@@yGz?Iך>GbHX۠AyX۠A hm?`?@@yGz?%E}\>GbHX۠AyX۠A Tt4m?`?@@yGz?m_b>GbHX۠AyX۠AO^m?`?@@yGz?UB0>GbHX۠AyX۠A.M%Qm?`?@@yGz?*$>GbHX۠AyX۠A( l?`?@@yGz?f3>GbHX۠AyX۠A3=(l?`?@@yGz?tmx>GbHX۠AyX۠Aս?l?`?@@yGz?KGw׽>GbHX۠AyX۠A2 fk?`?@@yGz?*A>GbHX۠AyX۠Artk?`?@@yGz? H>GbHX۠AyX۠AȆʾvk?`?@@yGz?ct>GbHX۠AyX۠A 7>6k?`?@@yGz?˜Vӝ>GbHX۠AyX۠A#j?`?@@yGz?!!9>GbHX۠AyX۠AMuj?`?@@yGz?zS^>GbHX۠AyX۠A{j?`?@@yGz?X1>GbHX۠AyX۠A}?j?`?@@yGz?5>&>GbHX۠AyX۠A޿j?`?@@yGz?BÐ.>GbHX۠AyX۠A'Ipi?`?@@yGz?ʥs>GbHX۠AyX۠Acݑi?`?@@yGz?ZSd>GbHX۠AyX۠A1Yi?`?@@yGz?j>GbHX۠AyX۠Aם>^"i?`?@@yGz?B &">GbHX۠AyX۠A.h?`?@@yGz?;D>GbHX۠AyX۠A5Fh?`?@@yGz?k: g>GbHX۠AyX۠AI>`h?`?@@yGz?~:>GbHX۠AyX۠A+=Oh?`?@@yGz?ﬠ>GbHX۠AyX۠AiZVh?`?@@yGz?iݤϠ>GbHX۠AyX۠AKfg?`?@@yGz?(KY>GbHX۠AyX۠A]g?`?@@yGz?FX>GbHX۠AyX۠AsdZg?`?@@yGz?Ӱ7>GbHX۠AyX۠ArZg?`?@@yGz?"xZ>GbHX۠AyX۠A0,g?`?@@yGz?[-}>GbHX۠AyX۠A=4f?`?@@yGz?⟡>GbHX۠AyX۠ADEf?`?@@yGz?mEu¡>GbHX۠AyX۠A^[:Vf?`?@@yGz?t(gL>GbHX۠AyX۠AHGnmxf?`?@@yGz?JlX>GbHX۠AyX۠AJ6-Mf?`?@@yGz?ӰI*>GbHX۠AyX۠AQ!"f?`?@@yGz?&:kM>GbHX۠AyX۠Ame?`?@@yGz?29, p>GbHX۠AyX۠A[(=e?`?@@yGz?b}Ւ>GbHX۠AyX۠A|>|e?`?@@yGz?q>GbHX۠AyX۠ADGbHX۠AyX۠Ay1¼Ve?`?@@yGz?NI>GbHX۠AyX۠Av`/e?`?@@yGz?>GbHX۠AyX۠A]o@ e?`?@@yGz?*O]@>GbHX۠AyX۠AQfSd?`?@@yGz?~c>GbHX۠AyX۠AVߠd?`?@@yGz?ZDž>GbHX۠AyX۠Ad?`?@@yGz?uݞ|>GbHX۠AyX۠Ajtd?`?@@yGz? 1ˣ>GbHX۠AyX۠A](EPd?`?@@yGz?Q<'>GbHX۠AyX۠AO r-d?`?@@yGz?kk{>GbHX۠AyX۠Ab9 d?`?@@yGz?.lP3>GbHX۠AyX۠ATc?`?@@yGz?]V>GbHX۠AyX۠A8"c?`?@@yGz? 7Ox>GbHX۠AyX۠A͜c?`?@@yGz?x)|@o>GbHX۠AyX۠AF揇c?`?@@yGz?X1$>GbHX۠AyX۠Aw3nbc?`?@@yGz?U#>GbHX۠AyX۠A>^ Bc?`?@@yGz?ķH>GbHX۠AyX۠Aoۄ"c?`?@@yGz?2C&>GbHX۠AyX۠Adwdpc?`?@@yGz?H>GbHX۠AyX۠ADob?`?@@yGz?Fk>GbHX۠AyX۠ArEmb?`?@@yGz?xuYa>GbHX۠AyX۠A~b?`?@@yGz?ꤝ>GbHX۠AyX۠Akb?`?@@yGz?Yӥ>GbHX۠AyX۠A;Flb?`?@@yGz?&>GbHX۠AyX۠ABY)Ob?`?@@yGz?63j5>GbHX۠AyX۠AB}mh2b?`?@@yGz?b;>GbHX۠AyX۠Aeb?`?@@yGz?^>GbHX۠AyX۠Am>a?`?@@yGz?6rT>GbHX۠AyX۠AF8a?`?@@yGz?zc >GbHX۠AyX۠A"Ka?`?@@yGz?[ TƦ>GbHX۠AyX۠AVça?`?@@yGz?OFs>GbHX۠AyX۠A`Ia?`?@@yGz?:G7( >GbHX۠AyX۠A|Sra?`?@@yGz?(.>GbHX۠AyX۠AvVxXa?`?@@yGz?Q>GbHX۠AyX۠AƭNm>a?`?@@yGz?  Gt>GbHX۠AyX۠AA"%a?`?@@yGz?GbHX۠AyX۠AB. a?`?@@yGz?`l>GbHX۠AyX۠A` g`?`?@@yGz?̛eܧ>GbHX۠AyX۠Av*R`?`?@@yGz?:$>GbHX۠AyX۠A:i>`?`?@@yGz?h!>GbHX۠AyX۠AZ)`oة`?`?@@yGz?*D>GbHX۠AyX۠Aٳ`?`?@@yGz?Y9g>GbHX۠AyX۠A$yrz`?`?@@yGz?5>GbHX۠AyX۠ASZ $c`?`?@@yGz?by>GbHX۠AyX۠A 1L`?`?@@yGz?wXϨ>GbHX۠AyX۠As J5`?`?@@yGz?Ai >GbHX۠AyX۠A-`?`?@@yGz?FFZ>GbHX۠AyX۠Ayao`?`?@@yGz?vKw7>GbHX۠AyX۠A*e_?`?@@yGz?<,Z>GbHX۠AyX۠An#_?`?@@yGz?.|>GbHX۠AyX۠A T_?`?@@yGz?hW>GbHX۠AyX۠A, 0#c_?`?@@yGz?3K©>GbHX۠AyX۠A=8_?`?@@yGz?Ec>GbHX۠AyX۠A#_?`?@@yGz?#>GbHX۠AyX۠Aף^?`?@@yGz?"gi*>GbHX۠AyX۠AI*^?`?@@yGz?M>GbHX۠AyX۠A0n ^?`?@@yGz? o>GbHX۠AyX۠Ak^?`?@@yGz?lP4>GbHX۠AyX۠Ao+D^?`?@@yGz?x=>GbHX۠AyX۠AV@c^?`?@@yGz?Iת>GbHX۠AyX۠A h]?`?@@yGz?Iך>TFX۠AyX۠A hm?c?@@yGz?$E}\>TFX۠AyX۠A Tt4m?c?@@yGz?m_b>TFX۠AyX۠AO^m?c?@@yGz?UB0>TFX۠AyX۠A.M%Qm?c?@@yGz?*$>TFX۠AyX۠A( l?c?@@yGz?f3>TFX۠AyX۠A3=(l?c?@@yGz?umx>TFX۠AyX۠Aս?l?c?@@yGz?LGw׽>TFX۠AyX۠A2 fk?c?@@yGz?*A>TFX۠AyX۠Artk?c?@@yGz? H>TFX۠AyX۠AȆʾvk?c?@@yGz?ct>TFX۠AyX۠A 7>6k?c?@@yGz?˜Vӝ>TFX۠AyX۠A#j?c?@@yGz?!!9>TFX۠AyX۠AMuj?c?@@yGz?zS^>TFX۠AyX۠A{j?c?@@yGz?X1>TFX۠AyX۠A}?j?c?@@yGz?4>&>TFX۠AyX۠A޿j?c?@@yGz?BÐ.>TFX۠AyX۠A'Ipi?c?@@yGz?ʥs>TFX۠AyX۠Acݑi?c?@@yGz?ZSd>TFX۠AyX۠A1Yi?c?@@yGz?j>TFX۠AyX۠A֝>^"i?c?@@yGz?B &">TFX۠AyX۠A.h?c?@@yGz?;D>TFX۠AyX۠A5Fh?c?@@yGz?k: g>TFX۠AyX۠AI>`h?c?@@yGz?~:>TFX۠AyX۠A*=Oh?c?@@yGz?ﬠ>TFX۠AyX۠AiZVh?c?@@yGz?iݤϠ>TFX۠AyX۠AKfg?c?@@yGz?(KY>TFX۠AyX۠A]g?c?@@yGz?FX>TFX۠AyX۠AsdZg?c?@@yGz?Ӱ7>TFX۠AyX۠ArZg?c?@@yGz?"xZ>TFX۠AyX۠A~0,g?c?@@yGz?[-}>TFX۠AyX۠A =4f?c?@@yGz?⟡>TFX۠AyX۠ADEf?c?@@yGz?mEu¡>TFX۠AyX۠A^[:Vf?c?@@yGz?t(gL>TFX۠AyX۠AHGnmxf?c?@@yGz?JlX>TFX۠AyX۠AJ6-Mf?c?@@yGz?ӰI*>TFX۠AyX۠AQ!"f?c?@@yGz?&:kM>TFX۠AyX۠Ame?c?@@yGz?29, p>TFX۠AyX۠A[(=e?c?@@yGz?b}Ւ>TFX۠AyX۠A|>|e?c?@@yGz?q>TFX۠AyX۠ADTFX۠AyX۠Ay1¼Ve?c?@@yGz?NI>TFX۠AyX۠Aw`/e?c?@@yGz?>TFX۠AyX۠A]o@ e?c?@@yGz?*O]@>TFX۠AyX۠APfSd?c?@@yGz?~c>TFX۠AyX۠AVߠd?c?@@yGz?ZDž>TFX۠AyX۠Ad?c?@@yGz?tݞ|>TFX۠AyX۠Ajtd?c?@@yGz? 1ˣ>TFX۠AyX۠A](EPd?c?@@yGz?Q<'>TFX۠AyX۠AO r-d?c?@@yGz?kk{>TFX۠AyX۠Ab9 d?c?@@yGz?.lP3>TFX۠AyX۠ATc?c?@@yGz?]V>TFX۠AyX۠A8"c?c?@@yGz? 7Ox>TFX۠AyX۠A͜c?c?@@yGz?x)|@o>TFX۠AyX۠AG揇c?c?@@yGz?X1$>TFX۠AyX۠Av3nbc?c?@@yGz?T#>TFX۠AyX۠A?^ Bc?c?@@yGz?ŷH>TFX۠AyX۠Aoۄ"c?c?@@yGz?2C&>TFX۠AyX۠Adwdpc?c?@@yGz?H>TFX۠AyX۠ADob?c?@@yGz?Fk>TFX۠AyX۠ArEmb?c?@@yGz?xuYa>TFX۠AyX۠A~b?c?@@yGz?ꤝ>TFX۠AyX۠Ajb?c?@@yGz?Yӥ>TFX۠AyX۠A:Flb?c?@@yGz?&>TFX۠AyX۠ACY)Ob?c?@@yGz?63j5>TFX۠AyX۠AB}mh2b?c?@@yGz?b;>TFX۠AyX۠Aeb?c?@@yGz?^>TFX۠AyX۠Am>a?c?@@yGz?6rT>TFX۠AyX۠AF8a?c?@@yGz?zc >TFX۠AyX۠A"Ka?c?@@yGz?\ TƦ>TFX۠AyX۠AVça?c?@@yGz?OFs>TFX۠AyX۠A`Ia?c?@@yGz?:G7( >TFX۠AyX۠A|Sra?c?@@yGz?(.>TFX۠AyX۠AvVxXa?c?@@yGz?Q>TFX۠AyX۠AƭNm>a?c?@@yGz?  Gt>TFX۠AyX۠AA"%a?c?@@yGz?TFX۠AyX۠AB. a?c?@@yGz?`l>TFX۠AyX۠A` g`?c?@@yGz?˛eܧ>TFX۠AyX۠Av*R`?c?@@yGz?:$>TFX۠AyX۠A:i>`?c?@@yGz?h!>TFX۠AyX۠AZ)`oة`?c?@@yGz?*D>TFX۠AyX۠Aٳ`?c?@@yGz?Y9g>TFX۠AyX۠A$yrz`?c?@@yGz?5>TFX۠AyX۠ASZ $c`?c?@@yGz?by>TFX۠AyX۠A 1L`?c?@@yGz?wXϨ>TFX۠AyX۠As J5`?c?@@yGz?Ai >TFX۠AyX۠A-`?c?@@yGz?FFZ>TFX۠AyX۠Ayao`?c?@@yGz?vKw7>TFX۠AyX۠A*e_?c?@@yGz?<,Z>TFX۠AyX۠An#_?c?@@yGz?.|>TFX۠AyX۠A T_?c?@@yGz?hW>TFX۠AyX۠A, 0#c_?c?@@yGz?3K©>TFX۠AyX۠A=8_?c?@@yGz?Dc>TFX۠AyX۠A#_?c?@@yGz?#>TFX۠AyX۠Aף^?c?@@yGz?"gi*>TFX۠AyX۠AI*^?c?@@yGz?M>TFX۠AyX۠A0n ^?c?@@yGz? o>TFX۠AyX۠Ak^?c?@@yGz?kP4>TFX۠AyX۠Ao+D^?c?@@yGz?x=>TFX۠AyX۠AV@c^?c?@@yGz?Iת>TFX۠AyX۠A h]?c?@@yGz?Iך>aPEX۠AyX۠A hm?z?@@yGz?%E}\>aPEX۠AyX۠A Tt4m?z?@@yGz?m_b>aPEX۠AyX۠AO^m?z?@@yGz?UB0>aPEX۠AyX۠A.M%Qm?z?@@yGz?*$>aPEX۠AyX۠A( l?z?@@yGz?f3>aPEX۠AyX۠A3=(l?z?@@yGz?tmx>aPEX۠AyX۠Aս?l?z?@@yGz?KGw׽>aPEX۠AyX۠A2 fk?z?@@yGz?*A>aPEX۠AyX۠Artk?z?@@yGz? H>aPEX۠AyX۠AȆʾvk?z?@@yGz?ct>aPEX۠AyX۠A 7>6k?z?@@yGz?˜Vӝ>aPEX۠AyX۠A#j?z?@@yGz?!!9>aPEX۠AyX۠AMuj?z?@@yGz?zS^>aPEX۠AyX۠A{j?z?@@yGz?X1>aPEX۠AyX۠A}?j?z?@@yGz?5>&>aPEX۠AyX۠A޿j?z?@@yGz?BÐ.>aPEX۠AyX۠A'Ipi?z?@@yGz?ʥs>aPEX۠AyX۠Acݑi?z?@@yGz?ZSd>aPEX۠AyX۠A1Yi?z?@@yGz?j>aPEX۠AyX۠Aם>^"i?z?@@yGz?B &">aPEX۠AyX۠A.h?z?@@yGz?;D>aPEX۠AyX۠A5Fh?z?@@yGz?k: g>aPEX۠AyX۠AI>`h?z?@@yGz?~:>aPEX۠AyX۠A+=Oh?z?@@yGz?ﬠ>aPEX۠AyX۠AiZVh?z?@@yGz?iݤϠ>aPEX۠AyX۠AKfg?z?@@yGz?(KY>aPEX۠AyX۠A]g?z?@@yGz?FX>aPEX۠AyX۠AsdZg?z?@@yGz?Ӱ7>aPEX۠AyX۠ArZg?z?@@yGz?"xZ>aPEX۠AyX۠A0,g?z?@@yGz?[-}>aPEX۠AyX۠A=4f?z?@@yGz?⟡>aPEX۠AyX۠ADEf?z?@@yGz?mEu¡>aPEX۠AyX۠A^[:Vf?z?@@yGz?t(gL>aPEX۠AyX۠AHGnmxf?z?@@yGz?JlX>aPEX۠AyX۠AJ6-Mf?z?@@yGz?ӰI*>aPEX۠AyX۠AQ!"f?z?@@yGz?&:kM>aPEX۠AyX۠Ame?z?@@yGz?29, p>aPEX۠AyX۠A[(=e?z?@@yGz?b}Ւ>aPEX۠AyX۠A|>|e?z?@@yGz?q>aPEX۠AyX۠ADaPEX۠AyX۠Ay1¼Ve?z?@@yGz?NI>aPEX۠AyX۠Av`/e?z?@@yGz?>aPEX۠AyX۠A]o@ e?z?@@yGz?*O]@>aPEX۠AyX۠AQfSd?z?@@yGz?~c>aPEX۠AyX۠AVߠd?z?@@yGz?ZDž>aPEX۠AyX۠Ad?z?@@yGz?uݞ|>aPEX۠AyX۠Ajtd?z?@@yGz? 1ˣ>aPEX۠AyX۠A](EPd?z?@@yGz?Q<'>aPEX۠AyX۠AO r-d?z?@@yGz?kk{>aPEX۠AyX۠Ab9 d?z?@@yGz?.lP3>aPEX۠AyX۠ATc?z?@@yGz?]V>aPEX۠AyX۠A8"c?z?@@yGz? 7Ox>aPEX۠AyX۠A͜c?z?@@yGz?x)|@o>aPEX۠AyX۠AF揇c?z?@@yGz?X1$>aPEX۠AyX۠Aw3nbc?z?@@yGz?U#>aPEX۠AyX۠A>^ Bc?z?@@yGz?ķH>aPEX۠AyX۠Aoۄ"c?z?@@yGz?2C&>aPEX۠AyX۠Adwdpc?z?@@yGz?H>aPEX۠AyX۠ADob?z?@@yGz?Fk>aPEX۠AyX۠ArEmb?z?@@yGz?xuYa>aPEX۠AyX۠A~b?z?@@yGz?ꤝ>aPEX۠AyX۠Akb?z?@@yGz?Yӥ>aPEX۠AyX۠A;Flb?z?@@yGz?&>aPEX۠AyX۠ABY)Ob?z?@@yGz?63j5>aPEX۠AyX۠AB}mh2b?z?@@yGz?b;>aPEX۠AyX۠Aeb?z?@@yGz?^>aPEX۠AyX۠Am>a?z?@@yGz?6rT>aPEX۠AyX۠AF8a?z?@@yGz?zc >aPEX۠AyX۠A"Ka?z?@@yGz?[ TƦ>aPEX۠AyX۠AVça?z?@@yGz?OFs>aPEX۠AyX۠A`Ia?z?@@yGz?:G7( >aPEX۠AyX۠A|Sra?z?@@yGz?(.>aPEX۠AyX۠AvVxXa?z?@@yGz?Q>aPEX۠AyX۠AƭNm>a?z?@@yGz?  Gt>aPEX۠AyX۠AA"%a?z?@@yGz?aPEX۠AyX۠AB. a?z?@@yGz?`l>aPEX۠AyX۠A` g`?z?@@yGz?̛eܧ>aPEX۠AyX۠Av*R`?z?@@yGz?:$>aPEX۠AyX۠A:i>`?z?@@yGz?h!>aPEX۠AyX۠AZ)`oة`?z?@@yGz?*D>aPEX۠AyX۠Aٳ`?z?@@yGz?Y9g>aPEX۠AyX۠A$yrz`?z?@@yGz?5>aPEX۠AyX۠ASZ $c`?z?@@yGz?by>aPEX۠AyX۠A 1L`?z?@@yGz?wXϨ>aPEX۠AyX۠As J5`?z?@@yGz?Ai >aPEX۠AyX۠A-`?z?@@yGz?FFZ>aPEX۠AyX۠Ayao`?z?@@yGz?vKw7>aPEX۠AyX۠A*e_?z?@@yGz?<,Z>aPEX۠AyX۠An#_?z?@@yGz?.|>aPEX۠AyX۠A T_?z?@@yGz?hW>aPEX۠AyX۠A, 0#c_?z?@@yGz?3K©>aPEX۠AyX۠A=8_?z?@@yGz?Ec>aPEX۠AyX۠A#_?z?@@yGz?#>aPEX۠AyX۠Aף^?z?@@yGz?"gi*>aPEX۠AyX۠AI*^?z?@@yGz?M>aPEX۠AyX۠A0n ^?z?@@yGz? o>aPEX۠AyX۠Ak^?z?@@yGz?lP4>aPEX۠AyX۠Ao+D^?z?@@yGz?x=>aPEX۠AyX۠AV@c^?z?@@yGz?Iת>aPEX۠AyX۠A h]?z?@@yGz?Iך>oCX۠AyX۠A hm?a`o?@@yGz?$E}\>oCX۠AyX۠A Tt4m?a`o?@@yGz?m_b>oCX۠AyX۠AO^m?a`o?@@yGz?UB0>oCX۠AyX۠A.M%Qm?a`o?@@yGz?*$>oCX۠AyX۠A( l?a`o?@@yGz?f3>oCX۠AyX۠A3=(l?a`o?@@yGz?umx>oCX۠AyX۠Aս?l?a`o?@@yGz?LGw׽>oCX۠AyX۠A2 fk?a`o?@@yGz?*A>oCX۠AyX۠Artk?a`o?@@yGz? H>oCX۠AyX۠AȆʾvk?a`o?@@yGz?ct>oCX۠AyX۠A 7>6k?a`o?@@yGz?˜Vӝ>oCX۠AyX۠A#j?a`o?@@yGz?!!9>oCX۠AyX۠AMuj?a`o?@@yGz?zS^>oCX۠AyX۠A{j?a`o?@@yGz?X1>oCX۠AyX۠A}?j?a`o?@@yGz?4>&>oCX۠AyX۠A޿j?a`o?@@yGz?BÐ.>oCX۠AyX۠A'Ipi?a`o?@@yGz?ʥs>oCX۠AyX۠Acݑi?a`o?@@yGz?ZSd>oCX۠AyX۠A1Yi?a`o?@@yGz?j>oCX۠AyX۠A֝>^"i?a`o?@@yGz?B &">oCX۠AyX۠A.h?a`o?@@yGz?;D>oCX۠AyX۠A5Fh?a`o?@@yGz?k: g>oCX۠AyX۠AI>`h?a`o?@@yGz?~:>oCX۠AyX۠A*=Oh?a`o?@@yGz?ﬠ>oCX۠AyX۠AiZVh?a`o?@@yGz?iݤϠ>oCX۠AyX۠AKfg?a`o?@@yGz?(KY>oCX۠AyX۠A]g?a`o?@@yGz?FX>oCX۠AyX۠AsdZg?a`o?@@yGz?Ӱ7>oCX۠AyX۠ArZg?a`o?@@yGz?"xZ>oCX۠AyX۠A~0,g?a`o?@@yGz?[-}>oCX۠AyX۠A =4f?a`o?@@yGz?⟡>oCX۠AyX۠ADEf?a`o?@@yGz?mEu¡>oCX۠AyX۠A^[:Vf?a`o?@@yGz?t(gL>oCX۠AyX۠AHGnmxf?a`o?@@yGz?JlX>oCX۠AyX۠AJ6-Mf?a`o?@@yGz?ӰI*>oCX۠AyX۠AQ!"f?a`o?@@yGz?&:kM>oCX۠AyX۠Ame?a`o?@@yGz?29, p>oCX۠AyX۠A[(=e?a`o?@@yGz?b}Ւ>oCX۠AyX۠A|>|e?a`o?@@yGz?q>oCX۠AyX۠ADoCX۠AyX۠Ay1¼Ve?a`o?@@yGz?NI>oCX۠AyX۠Aw`/e?a`o?@@yGz?>oCX۠AyX۠A]o@ e?a`o?@@yGz?*O]@>oCX۠AyX۠APfSd?a`o?@@yGz?~c>oCX۠AyX۠AVߠd?a`o?@@yGz?ZDž>oCX۠AyX۠Ad?a`o?@@yGz?tݞ|>oCX۠AyX۠Ajtd?a`o?@@yGz? 1ˣ>oCX۠AyX۠A](EPd?a`o?@@yGz?Q<'>oCX۠AyX۠AO r-d?a`o?@@yGz?kk{>oCX۠AyX۠Ab9 d?a`o?@@yGz?.lP3>oCX۠AyX۠ATc?a`o?@@yGz?]V>oCX۠AyX۠A8"c?a`o?@@yGz? 7Ox>oCX۠AyX۠A͜c?a`o?@@yGz?x)|@o>oCX۠AyX۠AG揇c?a`o?@@yGz?X1$>oCX۠AyX۠Av3nbc?a`o?@@yGz?T#>oCX۠AyX۠A?^ Bc?a`o?@@yGz?ŷH>oCX۠AyX۠Aoۄ"c?a`o?@@yGz?2C&>oCX۠AyX۠Adwdpc?a`o?@@yGz?H>oCX۠AyX۠ADob?a`o?@@yGz?Fk>oCX۠AyX۠ArEmb?a`o?@@yGz?xuYa>oCX۠AyX۠A~b?a`o?@@yGz?ꤝ>oCX۠AyX۠Ajb?a`o?@@yGz?Yӥ>oCX۠AyX۠A:Flb?a`o?@@yGz?&>oCX۠AyX۠ACY)Ob?a`o?@@yGz?63j5>oCX۠AyX۠AB}mh2b?a`o?@@yGz?b;>oCX۠AyX۠Aeb?a`o?@@yGz?^>oCX۠AyX۠Am>a?a`o?@@yGz?6rT>oCX۠AyX۠AF8a?a`o?@@yGz?zc >oCX۠AyX۠A"Ka?a`o?@@yGz?\ TƦ>oCX۠AyX۠AVça?a`o?@@yGz?OFs>oCX۠AyX۠A`Ia?a`o?@@yGz?:G7( >oCX۠AyX۠A|Sra?a`o?@@yGz?(.>oCX۠AyX۠AvVxXa?a`o?@@yGz?Q>oCX۠AyX۠AƭNm>a?a`o?@@yGz?  Gt>oCX۠AyX۠AA"%a?a`o?@@yGz?oCX۠AyX۠AB. a?a`o?@@yGz?`l>oCX۠AyX۠A` g`?a`o?@@yGz?˛eܧ>oCX۠AyX۠Av*R`?a`o?@@yGz?:$>oCX۠AyX۠A:i>`?a`o?@@yGz?h!>oCX۠AyX۠AZ)`oة`?a`o?@@yGz?*D>oCX۠AyX۠Aٳ`?a`o?@@yGz?Y9g>oCX۠AyX۠A$yrz`?a`o?@@yGz?5>oCX۠AyX۠ASZ $c`?a`o?@@yGz?by>oCX۠AyX۠A 1L`?a`o?@@yGz?wXϨ>oCX۠AyX۠As J5`?a`o?@@yGz?Ai >oCX۠AyX۠A-`?a`o?@@yGz?FFZ>oCX۠AyX۠Ayao`?a`o?@@yGz?vKw7>oCX۠AyX۠A*e_?a`o?@@yGz?<,Z>oCX۠AyX۠An#_?a`o?@@yGz?.|>oCX۠AyX۠A T_?a`o?@@yGz?hW>oCX۠AyX۠A, 0#c_?a`o?@@yGz?3K©>oCX۠AyX۠A=8_?a`o?@@yGz?Dc>oCX۠AyX۠A#_?a`o?@@yGz?#>oCX۠AyX۠Aף^?a`o?@@yGz?"gi*>oCX۠AyX۠AI*^?a`o?@@yGz?M>oCX۠AyX۠A0n ^?a`o?@@yGz? o>oCX۠AyX۠Ak^?a`o?@@yGz?kP4>oCX۠AyX۠Ao+D^?a`o?@@yGz?x=>oCX۠AyX۠AV@c^?a`o?@@yGz?Iת>oCX۠AyX۠A h]?a`o?@@yGz?Iך>|>BX۠AyX۠A hm?E?@@yGz?%E}\>|>BX۠AyX۠A Tt4m?E?@@yGz?m_b>|>BX۠AyX۠AO^m?E?@@yGz?UB0>|>BX۠AyX۠A.M%Qm?E?@@yGz?*$>|>BX۠AyX۠A( l?E?@@yGz?f3>|>BX۠AyX۠A3=(l?E?@@yGz?tmx>|>BX۠AyX۠Aս?l?E?@@yGz?KGw׽>|>BX۠AyX۠A2 fk?E?@@yGz?*A>|>BX۠AyX۠Artk?E?@@yGz? H>|>BX۠AyX۠AȆʾvk?E?@@yGz?ct>|>BX۠AyX۠A 7>6k?E?@@yGz?˜Vӝ>|>BX۠AyX۠A#j?E?@@yGz?!!9>|>BX۠AyX۠AMuj?E?@@yGz?zS^>|>BX۠AyX۠A{j?E?@@yGz?X1>|>BX۠AyX۠A}?j?E?@@yGz?5>&>|>BX۠AyX۠A޿j?E?@@yGz?BÐ.>|>BX۠AyX۠A'Ipi?E?@@yGz?ʥs>|>BX۠AyX۠Acݑi?E?@@yGz?ZSd>|>BX۠AyX۠A1Yi?E?@@yGz?j>|>BX۠AyX۠Aם>^"i?E?@@yGz?B &">|>BX۠AyX۠A.h?E?@@yGz?;D>|>BX۠AyX۠A5Fh?E?@@yGz?k: g>|>BX۠AyX۠AI>`h?E?@@yGz?~:>|>BX۠AyX۠A+=Oh?E?@@yGz?ﬠ>|>BX۠AyX۠AiZVh?E?@@yGz?iݤϠ>|>BX۠AyX۠AKfg?E?@@yGz?(KY>|>BX۠AyX۠A]g?E?@@yGz?FX>|>BX۠AyX۠AsdZg?E?@@yGz?Ӱ7>|>BX۠AyX۠ArZg?E?@@yGz?"xZ>|>BX۠AyX۠A0,g?E?@@yGz?[-}>|>BX۠AyX۠A=4f?E?@@yGz?⟡>|>BX۠AyX۠ADEf?E?@@yGz?mEu¡>|>BX۠AyX۠A^[:Vf?E?@@yGz?t(gL>|>BX۠AyX۠AHGnmxf?E?@@yGz?JlX>|>BX۠AyX۠AJ6-Mf?E?@@yGz?ӰI*>|>BX۠AyX۠AQ!"f?E?@@yGz?&:kM>|>BX۠AyX۠Ame?E?@@yGz?29, p>|>BX۠AyX۠A[(=e?E?@@yGz?b}Ւ>|>BX۠AyX۠A|>|e?E?@@yGz?q>|>BX۠AyX۠AD|>BX۠AyX۠Ay1¼Ve?E?@@yGz?NI>|>BX۠AyX۠Av`/e?E?@@yGz?>|>BX۠AyX۠A]o@ e?E?@@yGz?*O]@>|>BX۠AyX۠AQfSd?E?@@yGz?~c>|>BX۠AyX۠AVߠd?E?@@yGz?ZDž>|>BX۠AyX۠Ad?E?@@yGz?uݞ|>|>BX۠AyX۠Ajtd?E?@@yGz? 1ˣ>|>BX۠AyX۠A](EPd?E?@@yGz?Q<'>|>BX۠AyX۠AO r-d?E?@@yGz?kk{>|>BX۠AyX۠Ab9 d?E?@@yGz?.lP3>|>BX۠AyX۠ATc?E?@@yGz?]V>|>BX۠AyX۠A8"c?E?@@yGz? 7Ox>|>BX۠AyX۠A͜c?E?@@yGz?x)|@o>|>BX۠AyX۠AF揇c?E?@@yGz?X1$>|>BX۠AyX۠Aw3nbc?E?@@yGz?U#>|>BX۠AyX۠A>^ Bc?E?@@yGz?ķH>|>BX۠AyX۠Aoۄ"c?E?@@yGz?2C&>|>BX۠AyX۠Adwdpc?E?@@yGz?H>|>BX۠AyX۠ADob?E?@@yGz?Fk>|>BX۠AyX۠ArEmb?E?@@yGz?xuYa>|>BX۠AyX۠A~b?E?@@yGz?ꤝ>|>BX۠AyX۠Akb?E?@@yGz?Yӥ>|>BX۠AyX۠A;Flb?E?@@yGz?&>|>BX۠AyX۠ABY)Ob?E?@@yGz?63j5>|>BX۠AyX۠AB}mh2b?E?@@yGz?b;>|>BX۠AyX۠Aeb?E?@@yGz?^>|>BX۠AyX۠Am>a?E?@@yGz?6rT>|>BX۠AyX۠AF8a?E?@@yGz?zc >|>BX۠AyX۠A"Ka?E?@@yGz?[ TƦ>|>BX۠AyX۠AVça?E?@@yGz?OFs>|>BX۠AyX۠A`Ia?E?@@yGz?:G7( >|>BX۠AyX۠A|Sra?E?@@yGz?(.>|>BX۠AyX۠AvVxXa?E?@@yGz?Q>|>BX۠AyX۠AƭNm>a?E?@@yGz?  Gt>|>BX۠AyX۠AA"%a?E?@@yGz?|>BX۠AyX۠AB. a?E?@@yGz?`l>|>BX۠AyX۠A` g`?E?@@yGz?̛eܧ>|>BX۠AyX۠Av*R`?E?@@yGz?:$>|>BX۠AyX۠A:i>`?E?@@yGz?h!>|>BX۠AyX۠AZ)`oة`?E?@@yGz?*D>|>BX۠AyX۠Aٳ`?E?@@yGz?Y9g>|>BX۠AyX۠A$yrz`?E?@@yGz?5>|>BX۠AyX۠ASZ $c`?E?@@yGz?by>|>BX۠AyX۠A 1L`?E?@@yGz?wXϨ>|>BX۠AyX۠As J5`?E?@@yGz?Ai >|>BX۠AyX۠A-`?E?@@yGz?FFZ>|>BX۠AyX۠Ayao`?E?@@yGz?vKw7>|>BX۠AyX۠A*e_?E?@@yGz?<,Z>|>BX۠AyX۠An#_?E?@@yGz?.|>|>BX۠AyX۠A T_?E?@@yGz?hW>|>BX۠AyX۠A, 0#c_?E?@@yGz?3K©>|>BX۠AyX۠A=8_?E?@@yGz?Ec>|>BX۠AyX۠A#_?E?@@yGz?#>|>BX۠AyX۠Aף^?E?@@yGz?"gi*>|>BX۠AyX۠AI*^?E?@@yGz?M>|>BX۠AyX۠A0n ^?E?@@yGz? o>|>BX۠AyX۠Ak^?E?@@yGz?lP4>|>BX۠AyX۠Ao+D^?E?@@yGz?x=>|>BX۠AyX۠AV@c^?E?@@yGz?Iת>|>BX۠AyX۠A h]?E?@@yGz?Iך>@X۠AyX۠A hm?`+Qs?@@yGz?$E}\>@X۠AyX۠A Tt4m?`+Qs?@@yGz?m_b>@X۠AyX۠AO^m?`+Qs?@@yGz?UB0>@X۠AyX۠A.M%Qm?`+Qs?@@yGz?*$>@X۠AyX۠A( l?`+Qs?@@yGz?f3>@X۠AyX۠A3=(l?`+Qs?@@yGz?umx>@X۠AyX۠Aս?l?`+Qs?@@yGz?LGw׽>@X۠AyX۠A2 fk?`+Qs?@@yGz?*A>@X۠AyX۠Artk?`+Qs?@@yGz? H>@X۠AyX۠AȆʾvk?`+Qs?@@yGz?ct>@X۠AyX۠A 7>6k?`+Qs?@@yGz?˜Vӝ>@X۠AyX۠A#j?`+Qs?@@yGz?!!9>@X۠AyX۠AMuj?`+Qs?@@yGz?zS^>@X۠AyX۠A{j?`+Qs?@@yGz?X1>@X۠AyX۠A}?j?`+Qs?@@yGz?4>&>@X۠AyX۠A޿j?`+Qs?@@yGz?BÐ.>@X۠AyX۠A'Ipi?`+Qs?@@yGz?ʥs>@X۠AyX۠Acݑi?`+Qs?@@yGz?ZSd>@X۠AyX۠A1Yi?`+Qs?@@yGz?j>@X۠AyX۠A֝>^"i?`+Qs?@@yGz?B &">@X۠AyX۠A.h?`+Qs?@@yGz?;D>@X۠AyX۠A5Fh?`+Qs?@@yGz?k: g>@X۠AyX۠AI>`h?`+Qs?@@yGz?~:>@X۠AyX۠A*=Oh?`+Qs?@@yGz?ﬠ>@X۠AyX۠AiZVh?`+Qs?@@yGz?iݤϠ>@X۠AyX۠AKfg?`+Qs?@@yGz?(KY>@X۠AyX۠A]g?`+Qs?@@yGz?FX>@X۠AyX۠AsdZg?`+Qs?@@yGz?Ӱ7>@X۠AyX۠ArZg?`+Qs?@@yGz?"xZ>@X۠AyX۠A~0,g?`+Qs?@@yGz?[-}>@X۠AyX۠A =4f?`+Qs?@@yGz?⟡>@X۠AyX۠ADEf?`+Qs?@@yGz?mEu¡>@X۠AyX۠A^[:Vf?`+Qs?@@yGz?t(gL>@X۠AyX۠AHGnmxf?`+Qs?@@yGz?JlX>@X۠AyX۠AJ6-Mf?`+Qs?@@yGz?ӰI*>@X۠AyX۠AQ!"f?`+Qs?@@yGz?&:kM>@X۠AyX۠Ame?`+Qs?@@yGz?29, p>@X۠AyX۠A[(=e?`+Qs?@@yGz?b}Ւ>@X۠AyX۠A|>|e?`+Qs?@@yGz?q>@X۠AyX۠AD@X۠AyX۠Ay1¼Ve?`+Qs?@@yGz?NI>@X۠AyX۠Aw`/e?`+Qs?@@yGz?>@X۠AyX۠A]o@ e?`+Qs?@@yGz?*O]@>@X۠AyX۠APfSd?`+Qs?@@yGz?~c>@X۠AyX۠AVߠd?`+Qs?@@yGz?ZDž>@X۠AyX۠Ad?`+Qs?@@yGz?tݞ|>@X۠AyX۠Ajtd?`+Qs?@@yGz? 1ˣ>@X۠AyX۠A](EPd?`+Qs?@@yGz?Q<'>@X۠AyX۠AO r-d?`+Qs?@@yGz?kk{>@X۠AyX۠Ab9 d?`+Qs?@@yGz?.lP3>@X۠AyX۠ATc?`+Qs?@@yGz?]V>@X۠AyX۠A8"c?`+Qs?@@yGz? 7Ox>@X۠AyX۠A͜c?`+Qs?@@yGz?x)|@o>@X۠AyX۠AG揇c?`+Qs?@@yGz?X1$>@X۠AyX۠Av3nbc?`+Qs?@@yGz?T#>@X۠AyX۠A?^ Bc?`+Qs?@@yGz?ŷH>@X۠AyX۠Aoۄ"c?`+Qs?@@yGz?2C&>@X۠AyX۠Adwdpc?`+Qs?@@yGz?H>@X۠AyX۠ADob?`+Qs?@@yGz?Fk>@X۠AyX۠ArEmb?`+Qs?@@yGz?xuYa>@X۠AyX۠A~b?`+Qs?@@yGz?ꤝ>@X۠AyX۠Ajb?`+Qs?@@yGz?Yӥ>@X۠AyX۠A:Flb?`+Qs?@@yGz?&>@X۠AyX۠ACY)Ob?`+Qs?@@yGz?63j5>@X۠AyX۠AB}mh2b?`+Qs?@@yGz?b;>@X۠AyX۠Aeb?`+Qs?@@yGz?^>@X۠AyX۠Am>a?`+Qs?@@yGz?6rT>@X۠AyX۠AF8a?`+Qs?@@yGz?zc >@X۠AyX۠A"Ka?`+Qs?@@yGz?\ TƦ>@X۠AyX۠AVça?`+Qs?@@yGz?OFs>@X۠AyX۠A`Ia?`+Qs?@@yGz?:G7( >@X۠AyX۠A|Sra?`+Qs?@@yGz?(.>@X۠AyX۠AvVxXa?`+Qs?@@yGz?Q>@X۠AyX۠AƭNm>a?`+Qs?@@yGz?  Gt>@X۠AyX۠AA"%a?`+Qs?@@yGz?@X۠AyX۠AB. a?`+Qs?@@yGz?`l>@X۠AyX۠A` g`?`+Qs?@@yGz?˛eܧ>@X۠AyX۠Av*R`?`+Qs?@@yGz?:$>@X۠AyX۠A:i>`?`+Qs?@@yGz?h!>@X۠AyX۠AZ)`oة`?`+Qs?@@yGz?*D>@X۠AyX۠Aٳ`?`+Qs?@@yGz?Y9g>@X۠AyX۠A$yrz`?`+Qs?@@yGz?5>@X۠AyX۠ASZ $c`?`+Qs?@@yGz?by>@X۠AyX۠A 1L`?`+Qs?@@yGz?wXϨ>@X۠AyX۠As J5`?`+Qs?@@yGz?Ai >@X۠AyX۠A-`?`+Qs?@@yGz?FFZ>@X۠AyX۠Ayao`?`+Qs?@@yGz?vKw7>@X۠AyX۠A*e_?`+Qs?@@yGz?<,Z>@X۠AyX۠An#_?`+Qs?@@yGz?.|>@X۠AyX۠A T_?`+Qs?@@yGz?hW>@X۠AyX۠A, 0#c_?`+Qs?@@yGz?3K©>@X۠AyX۠A=8_?`+Qs?@@yGz?Dc>@X۠AyX۠A#_?`+Qs?@@yGz?#>@X۠AyX۠Aף^?`+Qs?@@yGz?"gi*>@X۠AyX۠AI*^?`+Qs?@@yGz?M>@X۠AyX۠A0n ^?`+Qs?@@yGz? o>@X۠AyX۠Ak^?`+Qs?@@yGz?kP4>@X۠AyX۠Ao+D^?`+Qs?@@yGz?x=>@X۠AyX۠AV@c^?`+Qs?@@yGz?Iת>@X۠AyX۠A h]?`+Qs?@@yGz?Iך>,?X۠AyX۠A hm?2Z?@@yGz?%E}\>,?X۠AyX۠A Tt4m?2Z?@@yGz?m_b>,?X۠AyX۠AO^m?2Z?@@yGz?UB0>,?X۠AyX۠A.M%Qm?2Z?@@yGz?*$>,?X۠AyX۠A( l?2Z?@@yGz?f3>,?X۠AyX۠A3=(l?2Z?@@yGz?tmx>,?X۠AyX۠Aս?l?2Z?@@yGz?KGw׽>,?X۠AyX۠A2 fk?2Z?@@yGz?*A>,?X۠AyX۠Artk?2Z?@@yGz? H>,?X۠AyX۠AȆʾvk?2Z?@@yGz?ct>,?X۠AyX۠A 7>6k?2Z?@@yGz?˜Vӝ>,?X۠AyX۠A#j?2Z?@@yGz?!!9>,?X۠AyX۠AMuj?2Z?@@yGz?zS^>,?X۠AyX۠A{j?2Z?@@yGz?X1>,?X۠AyX۠A}?j?2Z?@@yGz?5>&>,?X۠AyX۠A޿j?2Z?@@yGz?BÐ.>,?X۠AyX۠A'Ipi?2Z?@@yGz?ʥs>,?X۠AyX۠Acݑi?2Z?@@yGz?ZSd>,?X۠AyX۠A1Yi?2Z?@@yGz?j>,?X۠AyX۠Aם>^"i?2Z?@@yGz?B &">,?X۠AyX۠A.h?2Z?@@yGz?;D>,?X۠AyX۠A5Fh?2Z?@@yGz?k: g>,?X۠AyX۠AI>`h?2Z?@@yGz?~:>,?X۠AyX۠A+=Oh?2Z?@@yGz?ﬠ>,?X۠AyX۠AiZVh?2Z?@@yGz?iݤϠ>,?X۠AyX۠AKfg?2Z?@@yGz?(KY>,?X۠AyX۠A]g?2Z?@@yGz?FX>,?X۠AyX۠AsdZg?2Z?@@yGz?Ӱ7>,?X۠AyX۠ArZg?2Z?@@yGz?"xZ>,?X۠AyX۠A0,g?2Z?@@yGz?[-}>,?X۠AyX۠A=4f?2Z?@@yGz?⟡>,?X۠AyX۠ADEf?2Z?@@yGz?mEu¡>,?X۠AyX۠A^[:Vf?2Z?@@yGz?t(gL>,?X۠AyX۠AHGnmxf?2Z?@@yGz?JlX>,?X۠AyX۠AJ6-Mf?2Z?@@yGz?ӰI*>,?X۠AyX۠AQ!"f?2Z?@@yGz?&:kM>,?X۠AyX۠Ame?2Z?@@yGz?29, p>,?X۠AyX۠A[(=e?2Z?@@yGz?b}Ւ>,?X۠AyX۠A|>|e?2Z?@@yGz?q>,?X۠AyX۠AD,?X۠AyX۠Ay1¼Ve?2Z?@@yGz?NI>,?X۠AyX۠Av`/e?2Z?@@yGz?>,?X۠AyX۠A]o@ e?2Z?@@yGz?*O]@>,?X۠AyX۠AQfSd?2Z?@@yGz?~c>,?X۠AyX۠AVߠd?2Z?@@yGz?ZDž>,?X۠AyX۠Ad?2Z?@@yGz?uݞ|>,?X۠AyX۠Ajtd?2Z?@@yGz? 1ˣ>,?X۠AyX۠A](EPd?2Z?@@yGz?Q<'>,?X۠AyX۠AO r-d?2Z?@@yGz?kk{>,?X۠AyX۠Ab9 d?2Z?@@yGz?.lP3>,?X۠AyX۠ATc?2Z?@@yGz?]V>,?X۠AyX۠A8"c?2Z?@@yGz? 7Ox>,?X۠AyX۠A͜c?2Z?@@yGz?x)|@o>,?X۠AyX۠AF揇c?2Z?@@yGz?X1$>,?X۠AyX۠Aw3nbc?2Z?@@yGz?U#>,?X۠AyX۠A>^ Bc?2Z?@@yGz?ķH>,?X۠AyX۠Aoۄ"c?2Z?@@yGz?2C&>,?X۠AyX۠Adwdpc?2Z?@@yGz?H>,?X۠AyX۠ADob?2Z?@@yGz?Fk>,?X۠AyX۠ArEmb?2Z?@@yGz?xuYa>,?X۠AyX۠A~b?2Z?@@yGz?ꤝ>,?X۠AyX۠Akb?2Z?@@yGz?Yӥ>,?X۠AyX۠A;Flb?2Z?@@yGz?&>,?X۠AyX۠ABY)Ob?2Z?@@yGz?63j5>,?X۠AyX۠AB}mh2b?2Z?@@yGz?b;>,?X۠AyX۠Aeb?2Z?@@yGz?^>,?X۠AyX۠Am>a?2Z?@@yGz?6rT>,?X۠AyX۠AF8a?2Z?@@yGz?zc >,?X۠AyX۠A"Ka?2Z?@@yGz?[ TƦ>,?X۠AyX۠AVça?2Z?@@yGz?OFs>,?X۠AyX۠A`Ia?2Z?@@yGz?:G7( >,?X۠AyX۠A|Sra?2Z?@@yGz?(.>,?X۠AyX۠AvVxXa?2Z?@@yGz?Q>,?X۠AyX۠AƭNm>a?2Z?@@yGz?  Gt>,?X۠AyX۠AA"%a?2Z?@@yGz?,?X۠AyX۠AB. a?2Z?@@yGz?`l>,?X۠AyX۠A` g`?2Z?@@yGz?̛eܧ>,?X۠AyX۠Av*R`?2Z?@@yGz?:$>,?X۠AyX۠A:i>`?2Z?@@yGz?h!>,?X۠AyX۠AZ)`oة`?2Z?@@yGz?*D>,?X۠AyX۠Aٳ`?2Z?@@yGz?Y9g>,?X۠AyX۠A$yrz`?2Z?@@yGz?5>,?X۠AyX۠ASZ $c`?2Z?@@yGz?by>,?X۠AyX۠A 1L`?2Z?@@yGz?wXϨ>,?X۠AyX۠As J5`?2Z?@@yGz?Ai >,?X۠AyX۠A-`?2Z?@@yGz?FFZ>,?X۠AyX۠Ayao`?2Z?@@yGz?vKw7>,?X۠AyX۠A*e_?2Z?@@yGz?<,Z>,?X۠AyX۠An#_?2Z?@@yGz?.|>,?X۠AyX۠A T_?2Z?@@yGz?hW>,?X۠AyX۠A, 0#c_?2Z?@@yGz?3K©>,?X۠AyX۠A=8_?2Z?@@yGz?Ec>,?X۠AyX۠A#_?2Z?@@yGz?#>,?X۠AyX۠Aף^?2Z?@@yGz?"gi*>,?X۠AyX۠AI*^?2Z?@@yGz?M>,?X۠AyX۠A0n ^?2Z?@@yGz? o>,?X۠AyX۠Ak^?2Z?@@yGz?lP4>,?X۠AyX۠Ao+D^?2Z?@@yGz?x=>,?X۠AyX۠AV@c^?2Z?@@yGz?Iת>,?X۠AyX۠A h]?2Z?@@yGz?Iך>=X۠AyX۠A hm?U^2B?@@yGz?$E}\>=X۠AyX۠A Tt4m?U^2B?@@yGz?m_b>=X۠AyX۠AO^m?U^2B?@@yGz?UB0>=X۠AyX۠A.M%Qm?U^2B?@@yGz?*$>=X۠AyX۠A( l?U^2B?@@yGz?f3>=X۠AyX۠A3=(l?U^2B?@@yGz?umx>=X۠AyX۠Aս?l?U^2B?@@yGz?LGw׽>=X۠AyX۠A2 fk?U^2B?@@yGz?*A>=X۠AyX۠Artk?U^2B?@@yGz? H>=X۠AyX۠AȆʾvk?U^2B?@@yGz?ct>=X۠AyX۠A 7>6k?U^2B?@@yGz?˜Vӝ>=X۠AyX۠A#j?U^2B?@@yGz?!!9>=X۠AyX۠AMuj?U^2B?@@yGz?zS^>=X۠AyX۠A{j?U^2B?@@yGz?X1>=X۠AyX۠A}?j?U^2B?@@yGz?4>&>=X۠AyX۠A޿j?U^2B?@@yGz?BÐ.>=X۠AyX۠A'Ipi?U^2B?@@yGz?ʥs>=X۠AyX۠Acݑi?U^2B?@@yGz?ZSd>=X۠AyX۠A1Yi?U^2B?@@yGz?j>=X۠AyX۠A֝>^"i?U^2B?@@yGz?B &">=X۠AyX۠A.h?U^2B?@@yGz?;D>=X۠AyX۠A5Fh?U^2B?@@yGz?k: g>=X۠AyX۠AI>`h?U^2B?@@yGz?~:>=X۠AyX۠A*=Oh?U^2B?@@yGz?ﬠ>=X۠AyX۠AiZVh?U^2B?@@yGz?iݤϠ>=X۠AyX۠AKfg?U^2B?@@yGz?(KY>=X۠AyX۠A]g?U^2B?@@yGz?FX>=X۠AyX۠AsdZg?U^2B?@@yGz?Ӱ7>=X۠AyX۠ArZg?U^2B?@@yGz?"xZ>=X۠AyX۠A~0,g?U^2B?@@yGz?[-}>=X۠AyX۠A =4f?U^2B?@@yGz?⟡>=X۠AyX۠ADEf?U^2B?@@yGz?mEu¡>=X۠AyX۠A^[:Vf?U^2B?@@yGz?t(gL>=X۠AyX۠AHGnmxf?U^2B?@@yGz?JlX>=X۠AyX۠AJ6-Mf?U^2B?@@yGz?ӰI*>=X۠AyX۠AQ!"f?U^2B?@@yGz?&:kM>=X۠AyX۠Ame?U^2B?@@yGz?29, p>=X۠AyX۠A[(=e?U^2B?@@yGz?b}Ւ>=X۠AyX۠A|>|e?U^2B?@@yGz?q>=X۠AyX۠AD=X۠AyX۠Ay1¼Ve?U^2B?@@yGz?NI>=X۠AyX۠Aw`/e?U^2B?@@yGz?>=X۠AyX۠A]o@ e?U^2B?@@yGz?*O]@>=X۠AyX۠APfSd?U^2B?@@yGz?~c>=X۠AyX۠AVߠd?U^2B?@@yGz?ZDž>=X۠AyX۠Ad?U^2B?@@yGz?tݞ|>=X۠AyX۠Ajtd?U^2B?@@yGz? 1ˣ>=X۠AyX۠A](EPd?U^2B?@@yGz?Q<'>=X۠AyX۠AO r-d?U^2B?@@yGz?kk{>=X۠AyX۠Ab9 d?U^2B?@@yGz?.lP3>=X۠AyX۠ATc?U^2B?@@yGz?]V>=X۠AyX۠A8"c?U^2B?@@yGz? 7Ox>=X۠AyX۠A͜c?U^2B?@@yGz?x)|@o>=X۠AyX۠AG揇c?U^2B?@@yGz?X1$>=X۠AyX۠Av3nbc?U^2B?@@yGz?T#>=X۠AyX۠A?^ Bc?U^2B?@@yGz?ŷH>=X۠AyX۠Aoۄ"c?U^2B?@@yGz?2C&>=X۠AyX۠Adwdpc?U^2B?@@yGz?H>=X۠AyX۠ADob?U^2B?@@yGz?Fk>=X۠AyX۠ArEmb?U^2B?@@yGz?xuYa>=X۠AyX۠A~b?U^2B?@@yGz?ꤝ>=X۠AyX۠Ajb?U^2B?@@yGz?Yӥ>=X۠AyX۠A:Flb?U^2B?@@yGz?&>=X۠AyX۠ACY)Ob?U^2B?@@yGz?63j5>=X۠AyX۠AB}mh2b?U^2B?@@yGz?b;>=X۠AyX۠Aeb?U^2B?@@yGz?^>=X۠AyX۠Am>a?U^2B?@@yGz?6rT>=X۠AyX۠AF8a?U^2B?@@yGz?zc >=X۠AyX۠A"Ka?U^2B?@@yGz?\ TƦ>=X۠AyX۠AVça?U^2B?@@yGz?OFs>=X۠AyX۠A`Ia?U^2B?@@yGz?:G7( >=X۠AyX۠A|Sra?U^2B?@@yGz?(.>=X۠AyX۠AvVxXa?U^2B?@@yGz?Q>=X۠AyX۠AƭNm>a?U^2B?@@yGz?  Gt>=X۠AyX۠AA"%a?U^2B?@@yGz?=X۠AyX۠AB. a?U^2B?@@yGz?`l>=X۠AyX۠A` g`?U^2B?@@yGz?˛eܧ>=X۠AyX۠Av*R`?U^2B?@@yGz?:$>=X۠AyX۠A:i>`?U^2B?@@yGz?h!>=X۠AyX۠AZ)`oة`?U^2B?@@yGz?*D>=X۠AyX۠Aٳ`?U^2B?@@yGz?Y9g>=X۠AyX۠A$yrz`?U^2B?@@yGz?5>=X۠AyX۠ASZ $c`?U^2B?@@yGz?by>=X۠AyX۠A 1L`?U^2B?@@yGz?wXϨ>=X۠AyX۠As J5`?U^2B?@@yGz?Ai >=X۠AyX۠A-`?U^2B?@@yGz?FFZ>=X۠AyX۠Ayao`?U^2B?@@yGz?vKw7>=X۠AyX۠A*e_?U^2B?@@yGz?<,Z>=X۠AyX۠An#_?U^2B?@@yGz?.|>=X۠AyX۠A T_?U^2B?@@yGz?hW>=X۠AyX۠A, 0#c_?U^2B?@@yGz?3K©>=X۠AyX۠A=8_?U^2B?@@yGz?Dc>=X۠AyX۠A#_?U^2B?@@yGz?#>=X۠AyX۠Aף^?U^2B?@@yGz?"gi*>=X۠AyX۠AI*^?U^2B?@@yGz?M>=X۠AyX۠A0n ^?U^2B?@@yGz? o>=X۠AyX۠Ak^?U^2B?@@yGz?kP4>=X۠AyX۠Ao+D^?U^2B?@@yGz?x=>=X۠AyX۠AV@c^?U^2B?@@yGz?Iת>=X۠AyX۠A h]?U^2B?@@yGz?Iך>6k?xۣ)?@@yGz?˜Vӝ>&>^"i?xۣ)?@@yGz?B &">`h?xۣ)?@@yGz?~:>|e?xۣ)?@@yGz?q>^ Bc?xۣ)?@@yGz?ķH>a?xۣ)?@@yGz?6rT>a?xۣ)?@@yGz?  Gt>`?xۣ)?@@yGz?h!>:X۠AyX۠A hm?\?@@yGz?$E}\>:X۠AyX۠A Tt4m?\?@@yGz?m_b>:X۠AyX۠AO^m?\?@@yGz?UB0>:X۠AyX۠A.M%Qm?\?@@yGz?*$>:X۠AyX۠A( l?\?@@yGz?f3>:X۠AyX۠A3=(l?\?@@yGz?umx>:X۠AyX۠Aս?l?\?@@yGz?LGw׽>:X۠AyX۠A2 fk?\?@@yGz?*A>:X۠AyX۠Artk?\?@@yGz? H>:X۠AyX۠AȆʾvk?\?@@yGz?ct>:X۠AyX۠A 7>6k?\?@@yGz?˜Vӝ>:X۠AyX۠A#j?\?@@yGz?!!9>:X۠AyX۠AMuj?\?@@yGz?zS^>:X۠AyX۠A{j?\?@@yGz?X1>:X۠AyX۠A}?j?\?@@yGz?4>&>:X۠AyX۠A޿j?\?@@yGz?BÐ.>:X۠AyX۠A'Ipi?\?@@yGz?ʥs>:X۠AyX۠Acݑi?\?@@yGz?ZSd>:X۠AyX۠A1Yi?\?@@yGz?j>:X۠AyX۠A֝>^"i?\?@@yGz?B &">:X۠AyX۠A.h?\?@@yGz?;D>:X۠AyX۠A5Fh?\?@@yGz?k: g>:X۠AyX۠AI>`h?\?@@yGz?~:>:X۠AyX۠A*=Oh?\?@@yGz?ﬠ>:X۠AyX۠AiZVh?\?@@yGz?iݤϠ>:X۠AyX۠AKfg?\?@@yGz?(KY>:X۠AyX۠A]g?\?@@yGz?FX>:X۠AyX۠AsdZg?\?@@yGz?Ӱ7>:X۠AyX۠ArZg?\?@@yGz?"xZ>:X۠AyX۠A~0,g?\?@@yGz?[-}>:X۠AyX۠A =4f?\?@@yGz?⟡>:X۠AyX۠ADEf?\?@@yGz?mEu¡>:X۠AyX۠A^[:Vf?\?@@yGz?t(gL>:X۠AyX۠AHGnmxf?\?@@yGz?JlX>:X۠AyX۠AJ6-Mf?\?@@yGz?ӰI*>:X۠AyX۠AQ!"f?\?@@yGz?&:kM>:X۠AyX۠Ame?\?@@yGz?29, p>:X۠AyX۠A[(=e?\?@@yGz?b}Ւ>:X۠AyX۠A|>|e?\?@@yGz?q>:X۠AyX۠AD:X۠AyX۠Ay1¼Ve?\?@@yGz?NI>:X۠AyX۠Aw`/e?\?@@yGz?>:X۠AyX۠A]o@ e?\?@@yGz?*O]@>:X۠AyX۠APfSd?\?@@yGz?~c>:X۠AyX۠AVߠd?\?@@yGz?ZDž>:X۠AyX۠Ad?\?@@yGz?tݞ|>:X۠AyX۠Ajtd?\?@@yGz? 1ˣ>:X۠AyX۠A](EPd?\?@@yGz?Q<'>:X۠AyX۠AO r-d?\?@@yGz?kk{>:X۠AyX۠Ab9 d?\?@@yGz?.lP3>:X۠AyX۠ATc?\?@@yGz?]V>:X۠AyX۠A8"c?\?@@yGz? 7Ox>:X۠AyX۠A͜c?\?@@yGz?x)|@o>:X۠AyX۠AG揇c?\?@@yGz?X1$>:X۠AyX۠Av3nbc?\?@@yGz?T#>:X۠AyX۠A?^ Bc?\?@@yGz?ŷH>:X۠AyX۠Aoۄ"c?\?@@yGz?2C&>:X۠AyX۠Adwdpc?\?@@yGz?H>:X۠AyX۠ADob?\?@@yGz?Fk>:X۠AyX۠ArEmb?\?@@yGz?xuYa>:X۠AyX۠A~b?\?@@yGz?ꤝ>:X۠AyX۠Ajb?\?@@yGz?Yӥ>:X۠AyX۠A:Flb?\?@@yGz?&>:X۠AyX۠ACY)Ob?\?@@yGz?63j5>:X۠AyX۠AB}mh2b?\?@@yGz?b;>:X۠AyX۠Aeb?\?@@yGz?^>:X۠AyX۠Am>a?\?@@yGz?6rT>:X۠AyX۠AF8a?\?@@yGz?zc >:X۠AyX۠A"Ka?\?@@yGz?\ TƦ>:X۠AyX۠AVça?\?@@yGz?OFs>:X۠AyX۠A`Ia?\?@@yGz?:G7( >:X۠AyX۠A|Sra?\?@@yGz?(.>:X۠AyX۠AvVxXa?\?@@yGz?Q>:X۠AyX۠AƭNm>a?\?@@yGz?  Gt>:X۠AyX۠AA"%a?\?@@yGz?:X۠AyX۠AB. a?\?@@yGz?`l>:X۠AyX۠A` g`?\?@@yGz?˛eܧ>:X۠AyX۠Av*R`?\?@@yGz?:$>:X۠AyX۠A:i>`?\?@@yGz?h!>:X۠AyX۠AZ)`oة`?\?@@yGz?*D>:X۠AyX۠Aٳ`?\?@@yGz?Y9g>:X۠AyX۠A$yrz`?\?@@yGz?5>:X۠AyX۠ASZ $c`?\?@@yGz?by>:X۠AyX۠A 1L`?\?@@yGz?wXϨ>:X۠AyX۠As J5`?\?@@yGz?Ai >:X۠AyX۠A-`?\?@@yGz?FFZ>:X۠AyX۠Ayao`?\?@@yGz?vKw7>:X۠AyX۠A*e_?\?@@yGz?<,Z>:X۠AyX۠An#_?\?@@yGz?.|>:X۠AyX۠A T_?\?@@yGz?hW>:X۠AyX۠A, 0#c_?\?@@yGz?3K©>:X۠AyX۠A=8_?\?@@yGz?Dc>:X۠AyX۠A#_?\?@@yGz?#>:X۠AyX۠Aף^?\?@@yGz?"gi*>:X۠AyX۠AI*^?\?@@yGz?M>:X۠AyX۠A0n ^?\?@@yGz? o>:X۠AyX۠Ak^?\?@@yGz?kP4>:X۠AyX۠Ao+D^?\?@@yGz?x=>:X۠AyX۠AV@c^?\?@@yGz?Iת>:X۠AyX۠A h]?\?@@yGz?Iך>9X۠AyX۠A hm?ۦ?@@yGz?%E}\>9X۠AyX۠A Tt4m?ۦ?@@yGz?m_b>9X۠AyX۠AO^m?ۦ?@@yGz?UB0>9X۠AyX۠A.M%Qm?ۦ?@@yGz?*$>9X۠AyX۠A( l?ۦ?@@yGz?f3>9X۠AyX۠A3=(l?ۦ?@@yGz?tmx>9X۠AyX۠Aս?l?ۦ?@@yGz?KGw׽>9X۠AyX۠A2 fk?ۦ?@@yGz?*A>9X۠AyX۠Artk?ۦ?@@yGz? H>9X۠AyX۠AȆʾvk?ۦ?@@yGz?ct>9X۠AyX۠A 7>6k?ۦ?@@yGz?˜Vӝ>9X۠AyX۠A#j?ۦ?@@yGz?!!9>9X۠AyX۠AMuj?ۦ?@@yGz?zS^>9X۠AyX۠A{j?ۦ?@@yGz?X1>9X۠AyX۠A}?j?ۦ?@@yGz?5>&>9X۠AyX۠A޿j?ۦ?@@yGz?BÐ.>9X۠AyX۠A'Ipi?ۦ?@@yGz?ʥs>9X۠AyX۠Acݑi?ۦ?@@yGz?ZSd>9X۠AyX۠A1Yi?ۦ?@@yGz?j>9X۠AyX۠Aם>^"i?ۦ?@@yGz?B &">9X۠AyX۠A.h?ۦ?@@yGz?;D>9X۠AyX۠A5Fh?ۦ?@@yGz?k: g>9X۠AyX۠AI>`h?ۦ?@@yGz?~:>9X۠AyX۠A+=Oh?ۦ?@@yGz?ﬠ>9X۠AyX۠AiZVh?ۦ?@@yGz?iݤϠ>9X۠AyX۠AKfg?ۦ?@@yGz?(KY>9X۠AyX۠A]g?ۦ?@@yGz?FX>9X۠AyX۠AsdZg?ۦ?@@yGz?Ӱ7>9X۠AyX۠ArZg?ۦ?@@yGz?"xZ>9X۠AyX۠A0,g?ۦ?@@yGz?[-}>9X۠AyX۠A=4f?ۦ?@@yGz?⟡>9X۠AyX۠ADEf?ۦ?@@yGz?mEu¡>9X۠AyX۠A^[:Vf?ۦ?@@yGz?t(gL>9X۠AyX۠AHGnmxf?ۦ?@@yGz?JlX>9X۠AyX۠AJ6-Mf?ۦ?@@yGz?ӰI*>9X۠AyX۠AQ!"f?ۦ?@@yGz?&:kM>9X۠AyX۠Ame?ۦ?@@yGz?29, p>9X۠AyX۠A[(=e?ۦ?@@yGz?b}Ւ>9X۠AyX۠A|>|e?ۦ?@@yGz?q>9X۠AyX۠AD9X۠AyX۠Ay1¼Ve?ۦ?@@yGz?NI>9X۠AyX۠Av`/e?ۦ?@@yGz?>9X۠AyX۠A]o@ e?ۦ?@@yGz?*O]@>9X۠AyX۠AQfSd?ۦ?@@yGz?~c>9X۠AyX۠AVߠd?ۦ?@@yGz?ZDž>9X۠AyX۠Ad?ۦ?@@yGz?uݞ|>9X۠AyX۠Ajtd?ۦ?@@yGz? 1ˣ>9X۠AyX۠A](EPd?ۦ?@@yGz?Q<'>9X۠AyX۠AO r-d?ۦ?@@yGz?kk{>9X۠AyX۠Ab9 d?ۦ?@@yGz?.lP3>9X۠AyX۠ATc?ۦ?@@yGz?]V>9X۠AyX۠A8"c?ۦ?@@yGz? 7Ox>9X۠AyX۠A͜c?ۦ?@@yGz?x)|@o>9X۠AyX۠AF揇c?ۦ?@@yGz?X1$>9X۠AyX۠Aw3nbc?ۦ?@@yGz?U#>9X۠AyX۠A>^ Bc?ۦ?@@yGz?ķH>9X۠AyX۠Aoۄ"c?ۦ?@@yGz?2C&>9X۠AyX۠Adwdpc?ۦ?@@yGz?H>9X۠AyX۠ADob?ۦ?@@yGz?Fk>9X۠AyX۠ArEmb?ۦ?@@yGz?xuYa>9X۠AyX۠A~b?ۦ?@@yGz?ꤝ>9X۠AyX۠Akb?ۦ?@@yGz?Yӥ>9X۠AyX۠A;Flb?ۦ?@@yGz?&>9X۠AyX۠ABY)Ob?ۦ?@@yGz?63j5>9X۠AyX۠AB}mh2b?ۦ?@@yGz?b;>9X۠AyX۠Aeb?ۦ?@@yGz?^>9X۠AyX۠Am>a?ۦ?@@yGz?6rT>9X۠AyX۠AF8a?ۦ?@@yGz?zc >9X۠AyX۠A"Ka?ۦ?@@yGz?[ TƦ>9X۠AyX۠AVça?ۦ?@@yGz?OFs>9X۠AyX۠A`Ia?ۦ?@@yGz?:G7( >9X۠AyX۠A|Sra?ۦ?@@yGz?(.>9X۠AyX۠AvVxXa?ۦ?@@yGz?Q>9X۠AyX۠AƭNm>a?ۦ?@@yGz?  Gt>9X۠AyX۠AA"%a?ۦ?@@yGz?9X۠AyX۠AB. a?ۦ?@@yGz?`l>9X۠AyX۠A` g`?ۦ?@@yGz?̛eܧ>9X۠AyX۠Av*R`?ۦ?@@yGz?:$>9X۠AyX۠A:i>`?ۦ?@@yGz?h!>9X۠AyX۠AZ)`oة`?ۦ?@@yGz?*D>9X۠AyX۠Aٳ`?ۦ?@@yGz?Y9g>9X۠AyX۠A$yrz`?ۦ?@@yGz?5>9X۠AyX۠ASZ $c`?ۦ?@@yGz?by>9X۠AyX۠A 1L`?ۦ?@@yGz?wXϨ>9X۠AyX۠As J5`?ۦ?@@yGz?Ai >9X۠AyX۠A-`?ۦ?@@yGz?FFZ>9X۠AyX۠Ayao`?ۦ?@@yGz?vKw7>9X۠AyX۠A*e_?ۦ?@@yGz?<,Z>9X۠AyX۠An#_?ۦ?@@yGz?.|>9X۠AyX۠A T_?ۦ?@@yGz?hW>9X۠AyX۠A, 0#c_?ۦ?@@yGz?3K©>9X۠AyX۠A=8_?ۦ?@@yGz?Ec>9X۠AyX۠A#_?ۦ?@@yGz?#>9X۠AyX۠Aף^?ۦ?@@yGz?"gi*>9X۠AyX۠AI*^?ۦ?@@yGz?M>9X۠AyX۠A0n ^?ۦ?@@yGz? o>9X۠AyX۠Ak^?ۦ?@@yGz?lP4>9X۠AyX۠Ao+D^?ۦ?@@yGz?x=>9X۠AyX۠AV@c^?ۦ?@@yGz?Iת>9X۠AyX۠A h]?ۦ?@@yGz?Iך>7X۠AyX۠A hm?Z?@@yGz?$E}\>7X۠AyX۠A Tt4m?Z?@@yGz?m_b>7X۠AyX۠AO^m?Z?@@yGz?UB0>7X۠AyX۠A.M%Qm?Z?@@yGz?*$>7X۠AyX۠A( l?Z?@@yGz?f3>7X۠AyX۠A3=(l?Z?@@yGz?umx>7X۠AyX۠Aս?l?Z?@@yGz?LGw׽>7X۠AyX۠A2 fk?Z?@@yGz?*A>7X۠AyX۠Artk?Z?@@yGz? H>7X۠AyX۠AȆʾvk?Z?@@yGz?ct>7X۠AyX۠A 7>6k?Z?@@yGz?˜Vӝ>7X۠AyX۠A#j?Z?@@yGz?!!9>7X۠AyX۠AMuj?Z?@@yGz?zS^>7X۠AyX۠A{j?Z?@@yGz?X1>7X۠AyX۠A}?j?Z?@@yGz?4>&>7X۠AyX۠A޿j?Z?@@yGz?BÐ.>7X۠AyX۠A'Ipi?Z?@@yGz?ʥs>7X۠AyX۠Acݑi?Z?@@yGz?ZSd>7X۠AyX۠A1Yi?Z?@@yGz?j>7X۠AyX۠A֝>^"i?Z?@@yGz?B &">7X۠AyX۠A.h?Z?@@yGz?;D>7X۠AyX۠A5Fh?Z?@@yGz?k: g>7X۠AyX۠AI>`h?Z?@@yGz?~:>7X۠AyX۠A*=Oh?Z?@@yGz?ﬠ>7X۠AyX۠AiZVh?Z?@@yGz?iݤϠ>7X۠AyX۠AKfg?Z?@@yGz?(KY>7X۠AyX۠A]g?Z?@@yGz?FX>7X۠AyX۠AsdZg?Z?@@yGz?Ӱ7>7X۠AyX۠ArZg?Z?@@yGz?"xZ>7X۠AyX۠A~0,g?Z?@@yGz?[-}>7X۠AyX۠A =4f?Z?@@yGz?⟡>7X۠AyX۠ADEf?Z?@@yGz?mEu¡>7X۠AyX۠A^[:Vf?Z?@@yGz?t(gL>7X۠AyX۠AHGnmxf?Z?@@yGz?JlX>7X۠AyX۠AJ6-Mf?Z?@@yGz?ӰI*>7X۠AyX۠AQ!"f?Z?@@yGz?&:kM>7X۠AyX۠Ame?Z?@@yGz?29, p>7X۠AyX۠A[(=e?Z?@@yGz?b}Ւ>7X۠AyX۠A|>|e?Z?@@yGz?q>7X۠AyX۠AD7X۠AyX۠Ay1¼Ve?Z?@@yGz?NI>7X۠AyX۠Aw`/e?Z?@@yGz?>7X۠AyX۠A]o@ e?Z?@@yGz?*O]@>7X۠AyX۠APfSd?Z?@@yGz?~c>7X۠AyX۠AVߠd?Z?@@yGz?ZDž>7X۠AyX۠Ad?Z?@@yGz?tݞ|>7X۠AyX۠Ajtd?Z?@@yGz? 1ˣ>7X۠AyX۠A](EPd?Z?@@yGz?Q<'>7X۠AyX۠AO r-d?Z?@@yGz?kk{>7X۠AyX۠Ab9 d?Z?@@yGz?.lP3>7X۠AyX۠ATc?Z?@@yGz?]V>7X۠AyX۠A8"c?Z?@@yGz? 7Ox>7X۠AyX۠A͜c?Z?@@yGz?x)|@o>7X۠AyX۠AG揇c?Z?@@yGz?X1$>7X۠AyX۠Av3nbc?Z?@@yGz?T#>7X۠AyX۠A?^ Bc?Z?@@yGz?ŷH>7X۠AyX۠Aoۄ"c?Z?@@yGz?2C&>7X۠AyX۠Adwdpc?Z?@@yGz?H>7X۠AyX۠ADob?Z?@@yGz?Fk>7X۠AyX۠ArEmb?Z?@@yGz?xuYa>7X۠AyX۠A~b?Z?@@yGz?ꤝ>7X۠AyX۠Ajb?Z?@@yGz?Yӥ>7X۠AyX۠A:Flb?Z?@@yGz?&>7X۠AyX۠ACY)Ob?Z?@@yGz?63j5>7X۠AyX۠AB}mh2b?Z?@@yGz?b;>7X۠AyX۠Aeb?Z?@@yGz?^>7X۠AyX۠Am>a?Z?@@yGz?6rT>7X۠AyX۠AF8a?Z?@@yGz?zc >7X۠AyX۠A"Ka?Z?@@yGz?\ TƦ>7X۠AyX۠AVça?Z?@@yGz?OFs>7X۠AyX۠A`Ia?Z?@@yGz?:G7( >7X۠AyX۠A|Sra?Z?@@yGz?(.>7X۠AyX۠AvVxXa?Z?@@yGz?Q>7X۠AyX۠AƭNm>a?Z?@@yGz?  Gt>7X۠AyX۠AA"%a?Z?@@yGz?7X۠AyX۠AB. a?Z?@@yGz?`l>7X۠AyX۠A` g`?Z?@@yGz?˛eܧ>7X۠AyX۠Av*R`?Z?@@yGz?:$>7X۠AyX۠A:i>`?Z?@@yGz?h!>7X۠AyX۠AZ)`oة`?Z?@@yGz?*D>7X۠AyX۠Aٳ`?Z?@@yGz?Y9g>7X۠AyX۠A$yrz`?Z?@@yGz?5>7X۠AyX۠ASZ $c`?Z?@@yGz?by>7X۠AyX۠A 1L`?Z?@@yGz?wXϨ>7X۠AyX۠As J5`?Z?@@yGz?Ai >7X۠AyX۠A-`?Z?@@yGz?FFZ>7X۠AyX۠Ayao`?Z?@@yGz?vKw7>7X۠AyX۠A*e_?Z?@@yGz?<,Z>7X۠AyX۠An#_?Z?@@yGz?.|>7X۠AyX۠A T_?Z?@@yGz?hW>7X۠AyX۠A, 0#c_?Z?@@yGz?3K©>7X۠AyX۠A=8_?Z?@@yGz?Dc>7X۠AyX۠A#_?Z?@@yGz?#>7X۠AyX۠Aף^?Z?@@yGz?"gi*>7X۠AyX۠AI*^?Z?@@yGz?M>7X۠AyX۠A0n ^?Z?@@yGz? o>7X۠AyX۠Ak^?Z?@@yGz?kP4>7X۠AyX۠Ao+D^?Z?@@yGz?x=>7X۠AyX۠AV@c^?Z?@@yGz?Iת>7X۠AyX۠A h]?Z?@@yGz?Iך>5X۠AyX۠A hm?qg?@@yGz?%E}\>5X۠AyX۠A Tt4m?qg?@@yGz?m_b>5X۠AyX۠AO^m?qg?@@yGz?UB0>5X۠AyX۠A.M%Qm?qg?@@yGz?*$>5X۠AyX۠A( l?qg?@@yGz?f3>5X۠AyX۠A3=(l?qg?@@yGz?tmx>5X۠AyX۠Aս?l?qg?@@yGz?KGw׽>5X۠AyX۠A2 fk?qg?@@yGz?*A>5X۠AyX۠Artk?qg?@@yGz? H>5X۠AyX۠AȆʾvk?qg?@@yGz?ct>5X۠AyX۠A 7>6k?qg?@@yGz?˜Vӝ>5X۠AyX۠A#j?qg?@@yGz?!!9>5X۠AyX۠AMuj?qg?@@yGz?zS^>5X۠AyX۠A{j?qg?@@yGz?X1>5X۠AyX۠A}?j?qg?@@yGz?5>&>5X۠AyX۠A޿j?qg?@@yGz?BÐ.>5X۠AyX۠A'Ipi?qg?@@yGz?ʥs>5X۠AyX۠Acݑi?qg?@@yGz?ZSd>5X۠AyX۠A1Yi?qg?@@yGz?j>5X۠AyX۠Aם>^"i?qg?@@yGz?B &">5X۠AyX۠A.h?qg?@@yGz?;D>5X۠AyX۠A5Fh?qg?@@yGz?k: g>5X۠AyX۠AI>`h?qg?@@yGz?~:>5X۠AyX۠A+=Oh?qg?@@yGz?ﬠ>5X۠AyX۠AiZVh?qg?@@yGz?iݤϠ>5X۠AyX۠AKfg?qg?@@yGz?(KY>5X۠AyX۠A]g?qg?@@yGz?FX>5X۠AyX۠AsdZg?qg?@@yGz?Ӱ7>5X۠AyX۠ArZg?qg?@@yGz?"xZ>5X۠AyX۠A0,g?qg?@@yGz?[-}>5X۠AyX۠A=4f?qg?@@yGz?⟡>5X۠AyX۠ADEf?qg?@@yGz?mEu¡>5X۠AyX۠A^[:Vf?qg?@@yGz?t(gL>5X۠AyX۠AHGnmxf?qg?@@yGz?JlX>5X۠AyX۠AJ6-Mf?qg?@@yGz?ӰI*>5X۠AyX۠AQ!"f?qg?@@yGz?&:kM>5X۠AyX۠Ame?qg?@@yGz?29, p>5X۠AyX۠A[(=e?qg?@@yGz?b}Ւ>5X۠AyX۠A|>|e?qg?@@yGz?q>5X۠AyX۠AD5X۠AyX۠Ay1¼Ve?qg?@@yGz?NI>5X۠AyX۠Av`/e?qg?@@yGz?>5X۠AyX۠A]o@ e?qg?@@yGz?*O]@>5X۠AyX۠AQfSd?qg?@@yGz?~c>5X۠AyX۠AVߠd?qg?@@yGz?ZDž>5X۠AyX۠Ad?qg?@@yGz?uݞ|>5X۠AyX۠Ajtd?qg?@@yGz? 1ˣ>5X۠AyX۠A](EPd?qg?@@yGz?Q<'>5X۠AyX۠AO r-d?qg?@@yGz?kk{>5X۠AyX۠Ab9 d?qg?@@yGz?.lP3>5X۠AyX۠ATc?qg?@@yGz?]V>5X۠AyX۠A8"c?qg?@@yGz? 7Ox>5X۠AyX۠A͜c?qg?@@yGz?x)|@o>5X۠AyX۠AF揇c?qg?@@yGz?X1$>5X۠AyX۠Aw3nbc?qg?@@yGz?U#>5X۠AyX۠A>^ Bc?qg?@@yGz?ķH>5X۠AyX۠Aoۄ"c?qg?@@yGz?2C&>5X۠AyX۠Adwdpc?qg?@@yGz?H>5X۠AyX۠ADob?qg?@@yGz?Fk>5X۠AyX۠ArEmb?qg?@@yGz?xuYa>5X۠AyX۠A~b?qg?@@yGz?ꤝ>5X۠AyX۠Akb?qg?@@yGz?Yӥ>5X۠AyX۠A;Flb?qg?@@yGz?&>5X۠AyX۠ABY)Ob?qg?@@yGz?63j5>5X۠AyX۠AB}mh2b?qg?@@yGz?b;>5X۠AyX۠Aeb?qg?@@yGz?^>5X۠AyX۠Am>a?qg?@@yGz?6rT>5X۠AyX۠AF8a?qg?@@yGz?zc >5X۠AyX۠A"Ka?qg?@@yGz?[ TƦ>5X۠AyX۠AVça?qg?@@yGz?OFs>5X۠AyX۠A`Ia?qg?@@yGz?:G7( >5X۠AyX۠A|Sra?qg?@@yGz?(.>5X۠AyX۠AvVxXa?qg?@@yGz?Q>5X۠AyX۠AƭNm>a?qg?@@yGz?  Gt>5X۠AyX۠AA"%a?qg?@@yGz?5X۠AyX۠AB. a?qg?@@yGz?`l>5X۠AyX۠A` g`?qg?@@yGz?̛eܧ>5X۠AyX۠Av*R`?qg?@@yGz?:$>5X۠AyX۠A:i>`?qg?@@yGz?h!>5X۠AyX۠AZ)`oة`?qg?@@yGz?*D>5X۠AyX۠Aٳ`?qg?@@yGz?Y9g>5X۠AyX۠A$yrz`?qg?@@yGz?5>5X۠AyX۠ASZ $c`?qg?@@yGz?by>5X۠AyX۠A 1L`?qg?@@yGz?wXϨ>5X۠AyX۠As J5`?qg?@@yGz?Ai >5X۠AyX۠A-`?qg?@@yGz?FFZ>5X۠AyX۠Ayao`?qg?@@yGz?vKw7>5X۠AyX۠A*e_?qg?@@yGz?<,Z>5X۠AyX۠An#_?qg?@@yGz?.|>5X۠AyX۠A T_?qg?@@yGz?hW>5X۠AyX۠A, 0#c_?qg?@@yGz?3K©>5X۠AyX۠A=8_?qg?@@yGz?Ec>5X۠AyX۠A#_?qg?@@yGz?#>5X۠AyX۠Aף^?qg?@@yGz?"gi*>5X۠AyX۠AI*^?qg?@@yGz?M>5X۠AyX۠A0n ^?qg?@@yGz? o>5X۠AyX۠Ak^?qg?@@yGz?lP4>5X۠AyX۠Ao+D^?qg?@@yGz?x=>5X۠AyX۠AV@c^?qg?@@yGz?Iת>5X۠AyX۠A h]?qg?@@yGz?Iך>m4X۠AyX۠A hm?'YWخ?@@yGz?$E}\>m4X۠AyX۠A Tt4m?'YWخ?@@yGz?m_b>m4X۠AyX۠AO^m?'YWخ?@@yGz?UB0>m4X۠AyX۠A.M%Qm?'YWخ?@@yGz?*$>m4X۠AyX۠A( l?'YWخ?@@yGz?f3>m4X۠AyX۠A3=(l?'YWخ?@@yGz?umx>m4X۠AyX۠Aս?l?'YWخ?@@yGz?LGw׽>m4X۠AyX۠A2 fk?'YWخ?@@yGz?*A>m4X۠AyX۠Artk?'YWخ?@@yGz? H>m4X۠AyX۠AȆʾvk?'YWخ?@@yGz?ct>m4X۠AyX۠A 7>6k?'YWخ?@@yGz?˜Vӝ>m4X۠AyX۠A#j?'YWخ?@@yGz?!!9>m4X۠AyX۠AMuj?'YWخ?@@yGz?zS^>m4X۠AyX۠A{j?'YWخ?@@yGz?X1>m4X۠AyX۠A}?j?'YWخ?@@yGz?4>&>m4X۠AyX۠A޿j?'YWخ?@@yGz?BÐ.>m4X۠AyX۠A'Ipi?'YWخ?@@yGz?ʥs>m4X۠AyX۠Acݑi?'YWخ?@@yGz?ZSd>m4X۠AyX۠A1Yi?'YWخ?@@yGz?j>m4X۠AyX۠A֝>^"i?'YWخ?@@yGz?B &">m4X۠AyX۠A.h?'YWخ?@@yGz?;D>m4X۠AyX۠A5Fh?'YWخ?@@yGz?k: g>m4X۠AyX۠AI>`h?'YWخ?@@yGz?~:>m4X۠AyX۠A*=Oh?'YWخ?@@yGz?ﬠ>m4X۠AyX۠AiZVh?'YWخ?@@yGz?iݤϠ>m4X۠AyX۠AKfg?'YWخ?@@yGz?(KY>m4X۠AyX۠A]g?'YWخ?@@yGz?FX>m4X۠AyX۠AsdZg?'YWخ?@@yGz?Ӱ7>m4X۠AyX۠ArZg?'YWخ?@@yGz?"xZ>m4X۠AyX۠A~0,g?'YWخ?@@yGz?[-}>m4X۠AyX۠A =4f?'YWخ?@@yGz?⟡>m4X۠AyX۠ADEf?'YWخ?@@yGz?mEu¡>m4X۠AyX۠A^[:Vf?'YWخ?@@yGz?t(gL>m4X۠AyX۠AHGnmxf?'YWخ?@@yGz?JlX>m4X۠AyX۠AJ6-Mf?'YWخ?@@yGz?ӰI*>m4X۠AyX۠AQ!"f?'YWخ?@@yGz?&:kM>m4X۠AyX۠Ame?'YWخ?@@yGz?29, p>m4X۠AyX۠A[(=e?'YWخ?@@yGz?b}Ւ>m4X۠AyX۠A|>|e?'YWخ?@@yGz?q>m4X۠AyX۠ADm4X۠AyX۠Ay1¼Ve?'YWخ?@@yGz?NI>m4X۠AyX۠Aw`/e?'YWخ?@@yGz?>m4X۠AyX۠A]o@ e?'YWخ?@@yGz?*O]@>m4X۠AyX۠APfSd?'YWخ?@@yGz?~c>m4X۠AyX۠AVߠd?'YWخ?@@yGz?ZDž>m4X۠AyX۠Ad?'YWخ?@@yGz?tݞ|>m4X۠AyX۠Ajtd?'YWخ?@@yGz? 1ˣ>m4X۠AyX۠A](EPd?'YWخ?@@yGz?Q<'>m4X۠AyX۠AO r-d?'YWخ?@@yGz?kk{>m4X۠AyX۠Ab9 d?'YWخ?@@yGz?.lP3>m4X۠AyX۠ATc?'YWخ?@@yGz?]V>m4X۠AyX۠A8"c?'YWخ?@@yGz? 7Ox>m4X۠AyX۠A͜c?'YWخ?@@yGz?x)|@o>m4X۠AyX۠AG揇c?'YWخ?@@yGz?X1$>m4X۠AyX۠Av3nbc?'YWخ?@@yGz?T#>m4X۠AyX۠A?^ Bc?'YWخ?@@yGz?ŷH>m4X۠AyX۠Aoۄ"c?'YWخ?@@yGz?2C&>m4X۠AyX۠Adwdpc?'YWخ?@@yGz?H>m4X۠AyX۠ADob?'YWخ?@@yGz?Fk>m4X۠AyX۠ArEmb?'YWخ?@@yGz?xuYa>m4X۠AyX۠A~b?'YWخ?@@yGz?ꤝ>m4X۠AyX۠Ajb?'YWخ?@@yGz?Yӥ>m4X۠AyX۠A:Flb?'YWخ?@@yGz?&>m4X۠AyX۠ACY)Ob?'YWخ?@@yGz?63j5>m4X۠AyX۠AB}mh2b?'YWخ?@@yGz?b;>m4X۠AyX۠Aeb?'YWخ?@@yGz?^>m4X۠AyX۠Am>a?'YWخ?@@yGz?6rT>m4X۠AyX۠AF8a?'YWخ?@@yGz?zc >m4X۠AyX۠A"Ka?'YWخ?@@yGz?\ TƦ>m4X۠AyX۠AVça?'YWخ?@@yGz?OFs>m4X۠AyX۠A`Ia?'YWخ?@@yGz?:G7( >m4X۠AyX۠A|Sra?'YWخ?@@yGz?(.>m4X۠AyX۠AvVxXa?'YWخ?@@yGz?Q>m4X۠AyX۠AƭNm>a?'YWخ?@@yGz?  Gt>m4X۠AyX۠AA"%a?'YWخ?@@yGz?m4X۠AyX۠AB. a?'YWخ?@@yGz?`l>m4X۠AyX۠A` g`?'YWخ?@@yGz?˛eܧ>m4X۠AyX۠Av*R`?'YWخ?@@yGz?:$>m4X۠AyX۠A:i>`?'YWخ?@@yGz?h!>m4X۠AyX۠AZ)`oة`?'YWخ?@@yGz?*D>m4X۠AyX۠Aٳ`?'YWخ?@@yGz?Y9g>m4X۠AyX۠A$yrz`?'YWخ?@@yGz?5>m4X۠AyX۠ASZ $c`?'YWخ?@@yGz?by>m4X۠AyX۠A 1L`?'YWخ?@@yGz?wXϨ>m4X۠AyX۠As J5`?'YWخ?@@yGz?Ai >m4X۠AyX۠A-`?'YWخ?@@yGz?FFZ>m4X۠AyX۠Ayao`?'YWخ?@@yGz?vKw7>m4X۠AyX۠A*e_?'YWخ?@@yGz?<,Z>m4X۠AyX۠An#_?'YWخ?@@yGz?.|>m4X۠AyX۠A T_?'YWخ?@@yGz?hW>m4X۠AyX۠A, 0#c_?'YWخ?@@yGz?3K©>m4X۠AyX۠A=8_?'YWخ?@@yGz?Dc>m4X۠AyX۠A#_?'YWخ?@@yGz?#>m4X۠AyX۠Aף^?'YWخ?@@yGz?"gi*>m4X۠AyX۠AI*^?'YWخ?@@yGz?M>m4X۠AyX۠A0n ^?'YWخ?@@yGz? o>m4X۠AyX۠Ak^?'YWخ?@@yGz?kP4>m4X۠AyX۠Ao+D^?'YWخ?@@yGz?x=>m4X۠AyX۠AV@c^?'YWخ?@@yGz?Iת>m4X۠AyX۠A h]?'YWخ?@@yGz?Iך>2X۠AyX۠A hm?J2X۠AyX۠A Tt4m?J2X۠AyX۠AO^m?J2X۠AyX۠A.M%Qm?J2X۠AyX۠A( l?J2X۠AyX۠A3=(l?J2X۠AyX۠Aս?l?J2X۠AyX۠A2 fk?J2X۠AyX۠Artk?J2X۠AyX۠AȆʾvk?J2X۠AyX۠A 7>6k?J2X۠AyX۠A#j?J2X۠AyX۠AMuj?J2X۠AyX۠A{j?J2X۠AyX۠A}?j?J&>2X۠AyX۠A޿j?J2X۠AyX۠A'Ipi?J2X۠AyX۠Acݑi?J2X۠AyX۠A1Yi?J2X۠AyX۠Aם>^"i?J2X۠AyX۠A.h?J2X۠AyX۠A5Fh?J2X۠AyX۠AI>`h?J2X۠AyX۠A+=Oh?J2X۠AyX۠AiZVh?J2X۠AyX۠AKfg?J2X۠AyX۠A]g?J2X۠AyX۠AsdZg?J2X۠AyX۠ArZg?J2X۠AyX۠A0,g?J2X۠AyX۠A=4f?J2X۠AyX۠ADEf?J2X۠AyX۠A^[:Vf?J2X۠AyX۠AHGnmxf?J2X۠AyX۠AJ6-Mf?J2X۠AyX۠AQ!"f?J2X۠AyX۠Ame?J2X۠AyX۠A[(=e?J2X۠AyX۠A|>|e?J2X۠AyX۠AD2X۠AyX۠Ay1¼Ve?J2X۠AyX۠Av`/e?J2X۠AyX۠A]o@ e?J2X۠AyX۠AQfSd?J2X۠AyX۠AVߠd?J2X۠AyX۠Ad?J2X۠AyX۠Ajtd?J2X۠AyX۠A](EPd?J2X۠AyX۠AO r-d?J2X۠AyX۠Ab9 d?J2X۠AyX۠ATc?J2X۠AyX۠A8"c?J2X۠AyX۠A͜c?J2X۠AyX۠AF揇c?J2X۠AyX۠Aw3nbc?J2X۠AyX۠A>^ Bc?J2X۠AyX۠Aoۄ"c?J2X۠AyX۠Adwdpc?J2X۠AyX۠ADob?J2X۠AyX۠ArEmb?J2X۠AyX۠A~b?J2X۠AyX۠Akb?J2X۠AyX۠A;Flb?J2X۠AyX۠ABY)Ob?J2X۠AyX۠AB}mh2b?J2X۠AyX۠Aeb?J2X۠AyX۠Am>a?J2X۠AyX۠AF8a?J2X۠AyX۠A"Ka?J2X۠AyX۠AVça?J2X۠AyX۠A`Ia?J2X۠AyX۠A|Sra?J2X۠AyX۠AvVxXa?J2X۠AyX۠AƭNm>a?J2X۠AyX۠AA"%a?J2X۠AyX۠AB. a?J2X۠AyX۠A` g`?J2X۠AyX۠Av*R`?J2X۠AyX۠A:i>`?J2X۠AyX۠AZ)`oة`?J2X۠AyX۠Aٳ`?J2X۠AyX۠A$yrz`?J2X۠AyX۠ASZ $c`?J2X۠AyX۠A 1L`?J2X۠AyX۠As J5`?J2X۠AyX۠A-`?J2X۠AyX۠Ayao`?J2X۠AyX۠A*e_?J2X۠AyX۠An#_?J2X۠AyX۠A T_?J2X۠AyX۠A, 0#c_?J2X۠AyX۠A=8_?J2X۠AyX۠A#_?J2X۠AyX۠Aף^?J2X۠AyX۠AI*^?J2X۠AyX۠A0n ^?J2X۠AyX۠Ak^?J2X۠AyX۠Ao+D^?J2X۠AyX۠AV@c^?J2X۠AyX۠A h]?J\1X۠AyX۠A hm?nW"}?@@yGz?$E}\>\1X۠AyX۠A Tt4m?nW"}?@@yGz?m_b>\1X۠AyX۠AO^m?nW"}?@@yGz?UB0>\1X۠AyX۠A.M%Qm?nW"}?@@yGz?*$>\1X۠AyX۠A( l?nW"}?@@yGz?f3>\1X۠AyX۠A3=(l?nW"}?@@yGz?umx>\1X۠AyX۠Aս?l?nW"}?@@yGz?LGw׽>\1X۠AyX۠A2 fk?nW"}?@@yGz?*A>\1X۠AyX۠Artk?nW"}?@@yGz? H>\1X۠AyX۠AȆʾvk?nW"}?@@yGz?ct>\1X۠AyX۠A 7>6k?nW"}?@@yGz?˜Vӝ>\1X۠AyX۠A#j?nW"}?@@yGz?!!9>\1X۠AyX۠AMuj?nW"}?@@yGz?zS^>\1X۠AyX۠A{j?nW"}?@@yGz?X1>\1X۠AyX۠A}?j?nW"}?@@yGz?4>&>\1X۠AyX۠A޿j?nW"}?@@yGz?BÐ.>\1X۠AyX۠A'Ipi?nW"}?@@yGz?ʥs>\1X۠AyX۠Acݑi?nW"}?@@yGz?ZSd>\1X۠AyX۠A1Yi?nW"}?@@yGz?j>\1X۠AyX۠A֝>^"i?nW"}?@@yGz?B &">\1X۠AyX۠A.h?nW"}?@@yGz?;D>\1X۠AyX۠A5Fh?nW"}?@@yGz?k: g>\1X۠AyX۠AI>`h?nW"}?@@yGz?~:>\1X۠AyX۠A*=Oh?nW"}?@@yGz?ﬠ>\1X۠AyX۠AiZVh?nW"}?@@yGz?iݤϠ>\1X۠AyX۠AKfg?nW"}?@@yGz?(KY>\1X۠AyX۠A]g?nW"}?@@yGz?FX>\1X۠AyX۠AsdZg?nW"}?@@yGz?Ӱ7>\1X۠AyX۠ArZg?nW"}?@@yGz?"xZ>\1X۠AyX۠A~0,g?nW"}?@@yGz?[-}>\1X۠AyX۠A =4f?nW"}?@@yGz?⟡>\1X۠AyX۠ADEf?nW"}?@@yGz?mEu¡>\1X۠AyX۠A^[:Vf?nW"}?@@yGz?t(gL>\1X۠AyX۠AHGnmxf?nW"}?@@yGz?JlX>\1X۠AyX۠AJ6-Mf?nW"}?@@yGz?ӰI*>\1X۠AyX۠AQ!"f?nW"}?@@yGz?&:kM>\1X۠AyX۠Ame?nW"}?@@yGz?29, p>\1X۠AyX۠A[(=e?nW"}?@@yGz?b}Ւ>\1X۠AyX۠A|>|e?nW"}?@@yGz?q>\1X۠AyX۠AD\1X۠AyX۠Ay1¼Ve?nW"}?@@yGz?NI>\1X۠AyX۠Aw`/e?nW"}?@@yGz?>\1X۠AyX۠A]o@ e?nW"}?@@yGz?*O]@>\1X۠AyX۠APfSd?nW"}?@@yGz?~c>\1X۠AyX۠AVߠd?nW"}?@@yGz?ZDž>\1X۠AyX۠Ad?nW"}?@@yGz?tݞ|>\1X۠AyX۠Ajtd?nW"}?@@yGz? 1ˣ>\1X۠AyX۠A](EPd?nW"}?@@yGz?Q<'>\1X۠AyX۠AO r-d?nW"}?@@yGz?kk{>\1X۠AyX۠Ab9 d?nW"}?@@yGz?.lP3>\1X۠AyX۠ATc?nW"}?@@yGz?]V>\1X۠AyX۠A8"c?nW"}?@@yGz? 7Ox>\1X۠AyX۠A͜c?nW"}?@@yGz?x)|@o>\1X۠AyX۠AG揇c?nW"}?@@yGz?X1$>\1X۠AyX۠Av3nbc?nW"}?@@yGz?T#>\1X۠AyX۠A?^ Bc?nW"}?@@yGz?ŷH>\1X۠AyX۠Aoۄ"c?nW"}?@@yGz?2C&>\1X۠AyX۠Adwdpc?nW"}?@@yGz?H>\1X۠AyX۠ADob?nW"}?@@yGz?Fk>\1X۠AyX۠ArEmb?nW"}?@@yGz?xuYa>\1X۠AyX۠A~b?nW"}?@@yGz?ꤝ>\1X۠AyX۠Ajb?nW"}?@@yGz?Yӥ>\1X۠AyX۠A:Flb?nW"}?@@yGz?&>\1X۠AyX۠ACY)Ob?nW"}?@@yGz?63j5>\1X۠AyX۠AB}mh2b?nW"}?@@yGz?b;>\1X۠AyX۠Aeb?nW"}?@@yGz?^>\1X۠AyX۠Am>a?nW"}?@@yGz?6rT>\1X۠AyX۠AF8a?nW"}?@@yGz?zc >\1X۠AyX۠A"Ka?nW"}?@@yGz?\ TƦ>\1X۠AyX۠AVça?nW"}?@@yGz?OFs>\1X۠AyX۠A`Ia?nW"}?@@yGz?:G7( >\1X۠AyX۠A|Sra?nW"}?@@yGz?(.>\1X۠AyX۠AvVxXa?nW"}?@@yGz?Q>\1X۠AyX۠AƭNm>a?nW"}?@@yGz?  Gt>\1X۠AyX۠AA"%a?nW"}?@@yGz?\1X۠AyX۠AB. a?nW"}?@@yGz?`l>\1X۠AyX۠A` g`?nW"}?@@yGz?˛eܧ>\1X۠AyX۠Av*R`?nW"}?@@yGz?:$>\1X۠AyX۠A:i>`?nW"}?@@yGz?h!>\1X۠AyX۠AZ)`oة`?nW"}?@@yGz?*D>\1X۠AyX۠Aٳ`?nW"}?@@yGz?Y9g>\1X۠AyX۠A$yrz`?nW"}?@@yGz?5>\1X۠AyX۠ASZ $c`?nW"}?@@yGz?by>\1X۠AyX۠A 1L`?nW"}?@@yGz?wXϨ>\1X۠AyX۠As J5`?nW"}?@@yGz?Ai >\1X۠AyX۠A-`?nW"}?@@yGz?FFZ>\1X۠AyX۠Ayao`?nW"}?@@yGz?vKw7>\1X۠AyX۠A*e_?nW"}?@@yGz?<,Z>\1X۠AyX۠An#_?nW"}?@@yGz?.|>\1X۠AyX۠A T_?nW"}?@@yGz?hW>\1X۠AyX۠A, 0#c_?nW"}?@@yGz?3K©>\1X۠AyX۠A=8_?nW"}?@@yGz?Dc>\1X۠AyX۠A#_?nW"}?@@yGz?#>\1X۠AyX۠Aף^?nW"}?@@yGz?"gi*>\1X۠AyX۠AI*^?nW"}?@@yGz?M>\1X۠AyX۠A0n ^?nW"}?@@yGz? o>\1X۠AyX۠Ak^?nW"}?@@yGz?kP4>\1X۠AyX۠Ao+D^?nW"}?@@yGz?x=>\1X۠AyX۠AV@c^?nW"}?@@yGz?Iת>\1X۠AyX۠A h]?nW"}?@@yGz?Iך>/X۠AyX۠A hm?+e?@@yGz?%E}\>/X۠AyX۠A Tt4m?+e?@@yGz?m_b>/X۠AyX۠AO^m?+e?@@yGz?UB0>/X۠AyX۠A.M%Qm?+e?@@yGz?*$>/X۠AyX۠A( l?+e?@@yGz?f3>/X۠AyX۠A3=(l?+e?@@yGz?tmx>/X۠AyX۠Aս?l?+e?@@yGz?KGw׽>/X۠AyX۠A2 fk?+e?@@yGz?*A>/X۠AyX۠Artk?+e?@@yGz? H>/X۠AyX۠AȆʾvk?+e?@@yGz?ct>/X۠AyX۠A 7>6k?+e?@@yGz?˜Vӝ>/X۠AyX۠A#j?+e?@@yGz?!!9>/X۠AyX۠AMuj?+e?@@yGz?zS^>/X۠AyX۠A{j?+e?@@yGz?X1>/X۠AyX۠A}?j?+e?@@yGz?5>&>/X۠AyX۠A޿j?+e?@@yGz?BÐ.>/X۠AyX۠A'Ipi?+e?@@yGz?ʥs>/X۠AyX۠Acݑi?+e?@@yGz?ZSd>/X۠AyX۠A1Yi?+e?@@yGz?j>/X۠AyX۠Aם>^"i?+e?@@yGz?B &">/X۠AyX۠A.h?+e?@@yGz?;D>/X۠AyX۠A5Fh?+e?@@yGz?k: g>/X۠AyX۠AI>`h?+e?@@yGz?~:>/X۠AyX۠A+=Oh?+e?@@yGz?ﬠ>/X۠AyX۠AiZVh?+e?@@yGz?iݤϠ>/X۠AyX۠AKfg?+e?@@yGz?(KY>/X۠AyX۠A]g?+e?@@yGz?FX>/X۠AyX۠AsdZg?+e?@@yGz?Ӱ7>/X۠AyX۠ArZg?+e?@@yGz?"xZ>/X۠AyX۠A0,g?+e?@@yGz?[-}>/X۠AyX۠A=4f?+e?@@yGz?⟡>/X۠AyX۠ADEf?+e?@@yGz?mEu¡>/X۠AyX۠A^[:Vf?+e?@@yGz?t(gL>/X۠AyX۠AHGnmxf?+e?@@yGz?JlX>/X۠AyX۠AJ6-Mf?+e?@@yGz?ӰI*>/X۠AyX۠AQ!"f?+e?@@yGz?&:kM>/X۠AyX۠Ame?+e?@@yGz?29, p>/X۠AyX۠A[(=e?+e?@@yGz?b}Ւ>/X۠AyX۠A|>|e?+e?@@yGz?q>/X۠AyX۠AD/X۠AyX۠Ay1¼Ve?+e?@@yGz?NI>/X۠AyX۠Av`/e?+e?@@yGz?>/X۠AyX۠A]o@ e?+e?@@yGz?*O]@>/X۠AyX۠AQfSd?+e?@@yGz?~c>/X۠AyX۠AVߠd?+e?@@yGz?ZDž>/X۠AyX۠Ad?+e?@@yGz?uݞ|>/X۠AyX۠Ajtd?+e?@@yGz? 1ˣ>/X۠AyX۠A](EPd?+e?@@yGz?Q<'>/X۠AyX۠AO r-d?+e?@@yGz?kk{>/X۠AyX۠Ab9 d?+e?@@yGz?.lP3>/X۠AyX۠ATc?+e?@@yGz?]V>/X۠AyX۠A8"c?+e?@@yGz? 7Ox>/X۠AyX۠A͜c?+e?@@yGz?x)|@o>/X۠AyX۠AF揇c?+e?@@yGz?X1$>/X۠AyX۠Aw3nbc?+e?@@yGz?U#>/X۠AyX۠A>^ Bc?+e?@@yGz?ķH>/X۠AyX۠Aoۄ"c?+e?@@yGz?2C&>/X۠AyX۠Adwdpc?+e?@@yGz?H>/X۠AyX۠ADob?+e?@@yGz?Fk>/X۠AyX۠ArEmb?+e?@@yGz?xuYa>/X۠AyX۠A~b?+e?@@yGz?ꤝ>/X۠AyX۠Akb?+e?@@yGz?Yӥ>/X۠AyX۠A;Flb?+e?@@yGz?&>/X۠AyX۠ABY)Ob?+e?@@yGz?63j5>/X۠AyX۠AB}mh2b?+e?@@yGz?b;>/X۠AyX۠Aeb?+e?@@yGz?^>/X۠AyX۠Am>a?+e?@@yGz?6rT>/X۠AyX۠AF8a?+e?@@yGz?zc >/X۠AyX۠A"Ka?+e?@@yGz?[ TƦ>/X۠AyX۠AVça?+e?@@yGz?OFs>/X۠AyX۠A`Ia?+e?@@yGz?:G7( >/X۠AyX۠A|Sra?+e?@@yGz?(.>/X۠AyX۠AvVxXa?+e?@@yGz?Q>/X۠AyX۠AƭNm>a?+e?@@yGz?  Gt>/X۠AyX۠AA"%a?+e?@@yGz?/X۠AyX۠AB. a?+e?@@yGz?`l>/X۠AyX۠A` g`?+e?@@yGz?̛eܧ>/X۠AyX۠Av*R`?+e?@@yGz?:$>/X۠AyX۠A:i>`?+e?@@yGz?h!>/X۠AyX۠AZ)`oة`?+e?@@yGz?*D>/X۠AyX۠Aٳ`?+e?@@yGz?Y9g>/X۠AyX۠A$yrz`?+e?@@yGz?5>/X۠AyX۠ASZ $c`?+e?@@yGz?by>/X۠AyX۠A 1L`?+e?@@yGz?wXϨ>/X۠AyX۠As J5`?+e?@@yGz?Ai >/X۠AyX۠A-`?+e?@@yGz?FFZ>/X۠AyX۠Ayao`?+e?@@yGz?vKw7>/X۠AyX۠A*e_?+e?@@yGz?<,Z>/X۠AyX۠An#_?+e?@@yGz?.|>/X۠AyX۠A T_?+e?@@yGz?hW>/X۠AyX۠A, 0#c_?+e?@@yGz?3K©>/X۠AyX۠A=8_?+e?@@yGz?Ec>/X۠AyX۠A#_?+e?@@yGz?#>/X۠AyX۠Aף^?+e?@@yGz?"gi*>/X۠AyX۠AI*^?+e?@@yGz?M>/X۠AyX۠A0n ^?+e?@@yGz? o>/X۠AyX۠Ak^?+e?@@yGz?lP4>/X۠AyX۠Ao+D^?+e?@@yGz?x=>/X۠AyX۠AV@c^?+e?@@yGz?Iת>/X۠AyX۠A h]?+e?@@yGz?Iך>)J.X۠AyX۠A hm? UL?@@yGz?$E}\>)J.X۠AyX۠A Tt4m? UL?@@yGz?m_b>)J.X۠AyX۠AO^m? UL?@@yGz?UB0>)J.X۠AyX۠A.M%Qm? UL?@@yGz?*$>)J.X۠AyX۠A( l? UL?@@yGz?f3>)J.X۠AyX۠A3=(l? UL?@@yGz?umx>)J.X۠AyX۠Aս?l? UL?@@yGz?LGw׽>)J.X۠AyX۠A2 fk? UL?@@yGz?*A>)J.X۠AyX۠Artk? UL?@@yGz? H>)J.X۠AyX۠AȆʾvk? UL?@@yGz?ct>)J.X۠AyX۠A 7>6k? UL?@@yGz?˜Vӝ>)J.X۠AyX۠A#j? UL?@@yGz?!!9>)J.X۠AyX۠AMuj? UL?@@yGz?zS^>)J.X۠AyX۠A{j? UL?@@yGz?X1>)J.X۠AyX۠A}?j? UL?@@yGz?4>&>)J.X۠AyX۠A޿j? UL?@@yGz?BÐ.>)J.X۠AyX۠A'Ipi? UL?@@yGz?ʥs>)J.X۠AyX۠Acݑi? UL?@@yGz?ZSd>)J.X۠AyX۠A1Yi? UL?@@yGz?j>)J.X۠AyX۠A֝>^"i? UL?@@yGz?B &">)J.X۠AyX۠A.h? UL?@@yGz?;D>)J.X۠AyX۠A5Fh? UL?@@yGz?k: g>)J.X۠AyX۠AI>`h? UL?@@yGz?~:>)J.X۠AyX۠A*=Oh? UL?@@yGz?ﬠ>)J.X۠AyX۠AiZVh? UL?@@yGz?iݤϠ>)J.X۠AyX۠AKfg? UL?@@yGz?(KY>)J.X۠AyX۠A]g? UL?@@yGz?FX>)J.X۠AyX۠AsdZg? UL?@@yGz?Ӱ7>)J.X۠AyX۠ArZg? UL?@@yGz?"xZ>)J.X۠AyX۠A~0,g? UL?@@yGz?[-}>)J.X۠AyX۠A =4f? UL?@@yGz?⟡>)J.X۠AyX۠ADEf? UL?@@yGz?mEu¡>)J.X۠AyX۠A^[:Vf? UL?@@yGz?t(gL>)J.X۠AyX۠AHGnmxf? UL?@@yGz?JlX>)J.X۠AyX۠AJ6-Mf? UL?@@yGz?ӰI*>)J.X۠AyX۠AQ!"f? UL?@@yGz?&:kM>)J.X۠AyX۠Ame? UL?@@yGz?29, p>)J.X۠AyX۠A[(=e? UL?@@yGz?b}Ւ>)J.X۠AyX۠A|>|e? UL?@@yGz?q>)J.X۠AyX۠AD)J.X۠AyX۠Ay1¼Ve? UL?@@yGz?NI>)J.X۠AyX۠Aw`/e? UL?@@yGz?>)J.X۠AyX۠A]o@ e? UL?@@yGz?*O]@>)J.X۠AyX۠APfSd? UL?@@yGz?~c>)J.X۠AyX۠AVߠd? UL?@@yGz?ZDž>)J.X۠AyX۠Ad? UL?@@yGz?tݞ|>)J.X۠AyX۠Ajtd? UL?@@yGz? 1ˣ>)J.X۠AyX۠A](EPd? UL?@@yGz?Q<'>)J.X۠AyX۠AO r-d? UL?@@yGz?kk{>)J.X۠AyX۠Ab9 d? UL?@@yGz?.lP3>)J.X۠AyX۠ATc? UL?@@yGz?]V>)J.X۠AyX۠A8"c? UL?@@yGz? 7Ox>)J.X۠AyX۠A͜c? UL?@@yGz?x)|@o>)J.X۠AyX۠AG揇c? UL?@@yGz?X1$>)J.X۠AyX۠Av3nbc? UL?@@yGz?T#>)J.X۠AyX۠A?^ Bc? UL?@@yGz?ŷH>)J.X۠AyX۠Aoۄ"c? UL?@@yGz?2C&>)J.X۠AyX۠Adwdpc? UL?@@yGz?H>)J.X۠AyX۠ADob? UL?@@yGz?Fk>)J.X۠AyX۠ArEmb? UL?@@yGz?xuYa>)J.X۠AyX۠A~b? UL?@@yGz?ꤝ>)J.X۠AyX۠Ajb? UL?@@yGz?Yӥ>)J.X۠AyX۠A:Flb? UL?@@yGz?&>)J.X۠AyX۠ACY)Ob? UL?@@yGz?63j5>)J.X۠AyX۠AB}mh2b? UL?@@yGz?b;>)J.X۠AyX۠Aeb? UL?@@yGz?^>)J.X۠AyX۠Am>a? UL?@@yGz?6rT>)J.X۠AyX۠AF8a? UL?@@yGz?zc >)J.X۠AyX۠A"Ka? UL?@@yGz?\ TƦ>)J.X۠AyX۠AVça? UL?@@yGz?OFs>)J.X۠AyX۠A`Ia? UL?@@yGz?:G7( >)J.X۠AyX۠A|Sra? UL?@@yGz?(.>)J.X۠AyX۠AvVxXa? UL?@@yGz?Q>)J.X۠AyX۠AƭNm>a? UL?@@yGz?  Gt>)J.X۠AyX۠AA"%a? UL?@@yGz?)J.X۠AyX۠AB. a? UL?@@yGz?`l>)J.X۠AyX۠A` g`? UL?@@yGz?˛eܧ>)J.X۠AyX۠Av*R`? UL?@@yGz?:$>)J.X۠AyX۠A:i>`? UL?@@yGz?h!>)J.X۠AyX۠AZ)`oة`? UL?@@yGz?*D>)J.X۠AyX۠Aٳ`? UL?@@yGz?Y9g>)J.X۠AyX۠A$yrz`? UL?@@yGz?5>)J.X۠AyX۠ASZ $c`? UL?@@yGz?by>)J.X۠AyX۠A 1L`? UL?@@yGz?wXϨ>)J.X۠AyX۠As J5`? UL?@@yGz?Ai >)J.X۠AyX۠A-`? UL?@@yGz?FFZ>)J.X۠AyX۠Ayao`? UL?@@yGz?vKw7>)J.X۠AyX۠A*e_? UL?@@yGz?<,Z>)J.X۠AyX۠An#_? UL?@@yGz?.|>)J.X۠AyX۠A T_? UL?@@yGz?hW>)J.X۠AyX۠A, 0#c_? UL?@@yGz?3K©>)J.X۠AyX۠A=8_? UL?@@yGz?Dc>)J.X۠AyX۠A#_? UL?@@yGz?#>)J.X۠AyX۠Aף^? UL?@@yGz?"gi*>)J.X۠AyX۠AI*^? UL?@@yGz?M>)J.X۠AyX۠A0n ^? UL?@@yGz? o>)J.X۠AyX۠Ak^? UL?@@yGz?kP4>)J.X۠AyX۠Ao+D^? UL?@@yGz?x=>)J.X۠AyX۠AV@c^? UL?@@yGz?Iת>)J.X۠AyX۠A h]? UL?@@yGz?Iך>7,X۠AyX۠A hm? 4?@@yGz?%E}\>7,X۠AyX۠A Tt4m? 4?@@yGz?m_b>7,X۠AyX۠AO^m? 4?@@yGz?UB0>7,X۠AyX۠A.M%Qm? 4?@@yGz?*$>7,X۠AyX۠A( l? 4?@@yGz?f3>7,X۠AyX۠A3=(l? 4?@@yGz?tmx>7,X۠AyX۠Aս?l? 4?@@yGz?KGw׽>7,X۠AyX۠A2 fk? 4?@@yGz?*A>7,X۠AyX۠Artk? 4?@@yGz? H>7,X۠AyX۠AȆʾvk? 4?@@yGz?ct>7,X۠AyX۠A 7>6k? 4?@@yGz?˜Vӝ>7,X۠AyX۠A#j? 4?@@yGz?!!9>7,X۠AyX۠AMuj? 4?@@yGz?zS^>7,X۠AyX۠A{j? 4?@@yGz?X1>7,X۠AyX۠A}?j? 4?@@yGz?5>&>7,X۠AyX۠A޿j? 4?@@yGz?BÐ.>7,X۠AyX۠A'Ipi? 4?@@yGz?ʥs>7,X۠AyX۠Acݑi? 4?@@yGz?ZSd>7,X۠AyX۠A1Yi? 4?@@yGz?j>7,X۠AyX۠Aם>^"i? 4?@@yGz?B &">7,X۠AyX۠A.h? 4?@@yGz?;D>7,X۠AyX۠A5Fh? 4?@@yGz?k: g>7,X۠AyX۠AI>`h? 4?@@yGz?~:>7,X۠AyX۠A+=Oh? 4?@@yGz?ﬠ>7,X۠AyX۠AiZVh? 4?@@yGz?iݤϠ>7,X۠AyX۠AKfg? 4?@@yGz?(KY>7,X۠AyX۠A]g? 4?@@yGz?FX>7,X۠AyX۠AsdZg? 4?@@yGz?Ӱ7>7,X۠AyX۠ArZg? 4?@@yGz?"xZ>7,X۠AyX۠A0,g? 4?@@yGz?[-}>7,X۠AyX۠A=4f? 4?@@yGz?⟡>7,X۠AyX۠ADEf? 4?@@yGz?mEu¡>7,X۠AyX۠A^[:Vf? 4?@@yGz?t(gL>7,X۠AyX۠AHGnmxf? 4?@@yGz?JlX>7,X۠AyX۠AJ6-Mf? 4?@@yGz?ӰI*>7,X۠AyX۠AQ!"f? 4?@@yGz?&:kM>7,X۠AyX۠Ame? 4?@@yGz?29, p>7,X۠AyX۠A[(=e? 4?@@yGz?b}Ւ>7,X۠AyX۠A|>|e? 4?@@yGz?q>7,X۠AyX۠AD7,X۠AyX۠Ay1¼Ve? 4?@@yGz?NI>7,X۠AyX۠Av`/e? 4?@@yGz?>7,X۠AyX۠A]o@ e? 4?@@yGz?*O]@>7,X۠AyX۠AQfSd? 4?@@yGz?~c>7,X۠AyX۠AVߠd? 4?@@yGz?ZDž>7,X۠AyX۠Ad? 4?@@yGz?uݞ|>7,X۠AyX۠Ajtd? 4?@@yGz? 1ˣ>7,X۠AyX۠A](EPd? 4?@@yGz?Q<'>7,X۠AyX۠AO r-d? 4?@@yGz?kk{>7,X۠AyX۠Ab9 d? 4?@@yGz?.lP3>7,X۠AyX۠ATc? 4?@@yGz?]V>7,X۠AyX۠A8"c? 4?@@yGz? 7Ox>7,X۠AyX۠A͜c? 4?@@yGz?x)|@o>7,X۠AyX۠AF揇c? 4?@@yGz?X1$>7,X۠AyX۠Aw3nbc? 4?@@yGz?U#>7,X۠AyX۠A>^ Bc? 4?@@yGz?ķH>7,X۠AyX۠Aoۄ"c? 4?@@yGz?2C&>7,X۠AyX۠Adwdpc? 4?@@yGz?H>7,X۠AyX۠ADob? 4?@@yGz?Fk>7,X۠AyX۠ArEmb? 4?@@yGz?xuYa>7,X۠AyX۠A~b? 4?@@yGz?ꤝ>7,X۠AyX۠Akb? 4?@@yGz?Yӥ>7,X۠AyX۠A;Flb? 4?@@yGz?&>7,X۠AyX۠ABY)Ob? 4?@@yGz?63j5>7,X۠AyX۠AB}mh2b? 4?@@yGz?b;>7,X۠AyX۠Aeb? 4?@@yGz?^>7,X۠AyX۠Am>a? 4?@@yGz?6rT>7,X۠AyX۠AF8a? 4?@@yGz?zc >7,X۠AyX۠A"Ka? 4?@@yGz?[ TƦ>7,X۠AyX۠AVça? 4?@@yGz?OFs>7,X۠AyX۠A`Ia? 4?@@yGz?:G7( >7,X۠AyX۠A|Sra? 4?@@yGz?(.>7,X۠AyX۠AvVxXa? 4?@@yGz?Q>7,X۠AyX۠AƭNm>a? 4?@@yGz?  Gt>7,X۠AyX۠AA"%a? 4?@@yGz?7,X۠AyX۠AB. a? 4?@@yGz?`l>7,X۠AyX۠A` g`? 4?@@yGz?̛eܧ>7,X۠AyX۠Av*R`? 4?@@yGz?:$>7,X۠AyX۠A:i>`? 4?@@yGz?h!>7,X۠AyX۠AZ)`oة`? 4?@@yGz?*D>7,X۠AyX۠Aٳ`? 4?@@yGz?Y9g>7,X۠AyX۠A$yrz`? 4?@@yGz?5>7,X۠AyX۠ASZ $c`? 4?@@yGz?by>7,X۠AyX۠A 1L`? 4?@@yGz?wXϨ>7,X۠AyX۠As J5`? 4?@@yGz?Ai >7,X۠AyX۠A-`? 4?@@yGz?FFZ>7,X۠AyX۠Ayao`? 4?@@yGz?vKw7>7,X۠AyX۠A*e_? 4?@@yGz?<,Z>7,X۠AyX۠An#_? 4?@@yGz?.|>7,X۠AyX۠A T_? 4?@@yGz?hW>7,X۠AyX۠A, 0#c_? 4?@@yGz?3K©>7,X۠AyX۠A=8_? 4?@@yGz?Ec>7,X۠AyX۠A#_? 4?@@yGz?#>7,X۠AyX۠Aף^? 4?@@yGz?"gi*>7,X۠AyX۠AI*^? 4?@@yGz?M>7,X۠AyX۠A0n ^? 4?@@yGz? o>7,X۠AyX۠Ak^? 4?@@yGz?lP4>7,X۠AyX۠Ao+D^? 4?@@yGz?x=>7,X۠AyX۠AV@c^? 4?@@yGz?Iת>7,X۠AyX۠A h]? 4?@@yGz?Iך>D8+X۠AyX۠A hm?S}?@@yGz?$E}\>D8+X۠AyX۠A Tt4m?S}?@@yGz?m_b>D8+X۠AyX۠AO^m?S}?@@yGz?UB0>D8+X۠AyX۠A.M%Qm?S}?@@yGz?*$>D8+X۠AyX۠A( l?S}?@@yGz?f3>D8+X۠AyX۠A3=(l?S}?@@yGz?umx>D8+X۠AyX۠Aս?l?S}?@@yGz?LGw׽>D8+X۠AyX۠A2 fk?S}?@@yGz?*A>D8+X۠AyX۠Artk?S}?@@yGz? H>D8+X۠AyX۠AȆʾvk?S}?@@yGz?ct>D8+X۠AyX۠A 7>6k?S}?@@yGz?˜Vӝ>D8+X۠AyX۠A#j?S}?@@yGz?!!9>D8+X۠AyX۠AMuj?S}?@@yGz?zS^>D8+X۠AyX۠A{j?S}?@@yGz?X1>D8+X۠AyX۠A}?j?S}?@@yGz?4>&>D8+X۠AyX۠A޿j?S}?@@yGz?BÐ.>D8+X۠AyX۠A'Ipi?S}?@@yGz?ʥs>D8+X۠AyX۠Acݑi?S}?@@yGz?ZSd>D8+X۠AyX۠A1Yi?S}?@@yGz?j>D8+X۠AyX۠A֝>^"i?S}?@@yGz?B &">D8+X۠AyX۠A.h?S}?@@yGz?;D>D8+X۠AyX۠A5Fh?S}?@@yGz?k: g>D8+X۠AyX۠AI>`h?S}?@@yGz?~:>D8+X۠AyX۠A*=Oh?S}?@@yGz?ﬠ>D8+X۠AyX۠AiZVh?S}?@@yGz?iݤϠ>D8+X۠AyX۠AKfg?S}?@@yGz?(KY>D8+X۠AyX۠A]g?S}?@@yGz?FX>D8+X۠AyX۠AsdZg?S}?@@yGz?Ӱ7>D8+X۠AyX۠ArZg?S}?@@yGz?"xZ>D8+X۠AyX۠A~0,g?S}?@@yGz?[-}>D8+X۠AyX۠A =4f?S}?@@yGz?⟡>D8+X۠AyX۠ADEf?S}?@@yGz?mEu¡>D8+X۠AyX۠A^[:Vf?S}?@@yGz?t(gL>D8+X۠AyX۠AHGnmxf?S}?@@yGz?JlX>D8+X۠AyX۠AJ6-Mf?S}?@@yGz?ӰI*>D8+X۠AyX۠AQ!"f?S}?@@yGz?&:kM>D8+X۠AyX۠Ame?S}?@@yGz?29, p>D8+X۠AyX۠A[(=e?S}?@@yGz?b}Ւ>D8+X۠AyX۠A|>|e?S}?@@yGz?q>D8+X۠AyX۠ADD8+X۠AyX۠Ay1¼Ve?S}?@@yGz?NI>D8+X۠AyX۠Aw`/e?S}?@@yGz?>D8+X۠AyX۠A]o@ e?S}?@@yGz?*O]@>D8+X۠AyX۠APfSd?S}?@@yGz?~c>D8+X۠AyX۠AVߠd?S}?@@yGz?ZDž>D8+X۠AyX۠Ad?S}?@@yGz?tݞ|>D8+X۠AyX۠Ajtd?S}?@@yGz? 1ˣ>D8+X۠AyX۠A](EPd?S}?@@yGz?Q<'>D8+X۠AyX۠AO r-d?S}?@@yGz?kk{>D8+X۠AyX۠Ab9 d?S}?@@yGz?.lP3>D8+X۠AyX۠ATc?S}?@@yGz?]V>D8+X۠AyX۠A8"c?S}?@@yGz? 7Ox>D8+X۠AyX۠A͜c?S}?@@yGz?x)|@o>D8+X۠AyX۠AG揇c?S}?@@yGz?X1$>D8+X۠AyX۠Av3nbc?S}?@@yGz?T#>D8+X۠AyX۠A?^ Bc?S}?@@yGz?ŷH>D8+X۠AyX۠Aoۄ"c?S}?@@yGz?2C&>D8+X۠AyX۠Adwdpc?S}?@@yGz?H>D8+X۠AyX۠ADob?S}?@@yGz?Fk>D8+X۠AyX۠ArEmb?S}?@@yGz?xuYa>D8+X۠AyX۠A~b?S}?@@yGz?ꤝ>D8+X۠AyX۠Ajb?S}?@@yGz?Yӥ>D8+X۠AyX۠A:Flb?S}?@@yGz?&>D8+X۠AyX۠ACY)Ob?S}?@@yGz?63j5>D8+X۠AyX۠AB}mh2b?S}?@@yGz?b;>D8+X۠AyX۠Aeb?S}?@@yGz?^>D8+X۠AyX۠Am>a?S}?@@yGz?6rT>D8+X۠AyX۠AF8a?S}?@@yGz?zc >D8+X۠AyX۠A"Ka?S}?@@yGz?\ TƦ>D8+X۠AyX۠AVça?S}?@@yGz?OFs>D8+X۠AyX۠A`Ia?S}?@@yGz?:G7( >D8+X۠AyX۠A|Sra?S}?@@yGz?(.>D8+X۠AyX۠AvVxXa?S}?@@yGz?Q>D8+X۠AyX۠AƭNm>a?S}?@@yGz?  Gt>D8+X۠AyX۠AA"%a?S}?@@yGz?D8+X۠AyX۠AB. a?S}?@@yGz?`l>D8+X۠AyX۠A` g`?S}?@@yGz?˛eܧ>D8+X۠AyX۠Av*R`?S}?@@yGz?:$>D8+X۠AyX۠A:i>`?S}?@@yGz?h!>D8+X۠AyX۠AZ)`oة`?S}?@@yGz?*D>D8+X۠AyX۠Aٳ`?S}?@@yGz?Y9g>D8+X۠AyX۠A$yrz`?S}?@@yGz?5>D8+X۠AyX۠ASZ $c`?S}?@@yGz?by>D8+X۠AyX۠A 1L`?S}?@@yGz?wXϨ>D8+X۠AyX۠As J5`?S}?@@yGz?Ai >D8+X۠AyX۠A-`?S}?@@yGz?FFZ>D8+X۠AyX۠Ayao`?S}?@@yGz?vKw7>D8+X۠AyX۠A*e_?S}?@@yGz?<,Z>D8+X۠AyX۠An#_?S}?@@yGz?.|>D8+X۠AyX۠A T_?S}?@@yGz?hW>D8+X۠AyX۠A, 0#c_?S}?@@yGz?3K©>D8+X۠AyX۠A=8_?S}?@@yGz?Dc>D8+X۠AyX۠A#_?S}?@@yGz?#>D8+X۠AyX۠Aף^?S}?@@yGz?"gi*>D8+X۠AyX۠AI*^?S}?@@yGz?M>D8+X۠AyX۠A0n ^?S}?@@yGz? o>D8+X۠AyX۠Ak^?S}?@@yGz?kP4>D8+X۠AyX۠Ao+D^?S}?@@yGz?x=>D8+X۠AyX۠AV@c^?S}?@@yGz?Iת>D8+X۠AyX۠A h]?S}?@@yGz?Iך>Q)X۠AyX۠A hm?ӝ?@@yGz?%E}\>Q)X۠AyX۠A Tt4m?ӝ?@@yGz?m_b>Q)X۠AyX۠AO^m?ӝ?@@yGz?UB0>Q)X۠AyX۠A.M%Qm?ӝ?@@yGz?*$>Q)X۠AyX۠A( l?ӝ?@@yGz?f3>Q)X۠AyX۠A3=(l?ӝ?@@yGz?tmx>Q)X۠AyX۠Aս?l?ӝ?@@yGz?KGw׽>Q)X۠AyX۠A2 fk?ӝ?@@yGz?*A>Q)X۠AyX۠Artk?ӝ?@@yGz? H>Q)X۠AyX۠AȆʾvk?ӝ?@@yGz?ct>Q)X۠AyX۠A 7>6k?ӝ?@@yGz?˜Vӝ>Q)X۠AyX۠A#j?ӝ?@@yGz?!!9>Q)X۠AyX۠AMuj?ӝ?@@yGz?zS^>Q)X۠AyX۠A{j?ӝ?@@yGz?X1>Q)X۠AyX۠A}?j?ӝ?@@yGz?5>&>Q)X۠AyX۠A޿j?ӝ?@@yGz?BÐ.>Q)X۠AyX۠A'Ipi?ӝ?@@yGz?ʥs>Q)X۠AyX۠Acݑi?ӝ?@@yGz?ZSd>Q)X۠AyX۠A1Yi?ӝ?@@yGz?j>Q)X۠AyX۠Aם>^"i?ӝ?@@yGz?B &">Q)X۠AyX۠A.h?ӝ?@@yGz?;D>Q)X۠AyX۠A5Fh?ӝ?@@yGz?k: g>Q)X۠AyX۠AI>`h?ӝ?@@yGz?~:>Q)X۠AyX۠A+=Oh?ӝ?@@yGz?ﬠ>Q)X۠AyX۠AiZVh?ӝ?@@yGz?iݤϠ>Q)X۠AyX۠AKfg?ӝ?@@yGz?(KY>Q)X۠AyX۠A]g?ӝ?@@yGz?FX>Q)X۠AyX۠AsdZg?ӝ?@@yGz?Ӱ7>Q)X۠AyX۠ArZg?ӝ?@@yGz?"xZ>Q)X۠AyX۠A0,g?ӝ?@@yGz?[-}>Q)X۠AyX۠A=4f?ӝ?@@yGz?⟡>Q)X۠AyX۠ADEf?ӝ?@@yGz?mEu¡>Q)X۠AyX۠A^[:Vf?ӝ?@@yGz?t(gL>Q)X۠AyX۠AHGnmxf?ӝ?@@yGz?JlX>Q)X۠AyX۠AJ6-Mf?ӝ?@@yGz?ӰI*>Q)X۠AyX۠AQ!"f?ӝ?@@yGz?&:kM>Q)X۠AyX۠Ame?ӝ?@@yGz?29, p>Q)X۠AyX۠A[(=e?ӝ?@@yGz?b}Ւ>Q)X۠AyX۠A|>|e?ӝ?@@yGz?q>Q)X۠AyX۠ADQ)X۠AyX۠Ay1¼Ve?ӝ?@@yGz?NI>Q)X۠AyX۠Av`/e?ӝ?@@yGz?>Q)X۠AyX۠A]o@ e?ӝ?@@yGz?*O]@>Q)X۠AyX۠AQfSd?ӝ?@@yGz?~c>Q)X۠AyX۠AVߠd?ӝ?@@yGz?ZDž>Q)X۠AyX۠Ad?ӝ?@@yGz?uݞ|>Q)X۠AyX۠Ajtd?ӝ?@@yGz? 1ˣ>Q)X۠AyX۠A](EPd?ӝ?@@yGz?Q<'>Q)X۠AyX۠AO r-d?ӝ?@@yGz?kk{>Q)X۠AyX۠Ab9 d?ӝ?@@yGz?.lP3>Q)X۠AyX۠ATc?ӝ?@@yGz?]V>Q)X۠AyX۠A8"c?ӝ?@@yGz? 7Ox>Q)X۠AyX۠A͜c?ӝ?@@yGz?x)|@o>Q)X۠AyX۠AF揇c?ӝ?@@yGz?X1$>Q)X۠AyX۠Aw3nbc?ӝ?@@yGz?U#>Q)X۠AyX۠A>^ Bc?ӝ?@@yGz?ķH>Q)X۠AyX۠Aoۄ"c?ӝ?@@yGz?2C&>Q)X۠AyX۠Adwdpc?ӝ?@@yGz?H>Q)X۠AyX۠ADob?ӝ?@@yGz?Fk>Q)X۠AyX۠ArEmb?ӝ?@@yGz?xuYa>Q)X۠AyX۠A~b?ӝ?@@yGz?ꤝ>Q)X۠AyX۠Akb?ӝ?@@yGz?Yӥ>Q)X۠AyX۠A;Flb?ӝ?@@yGz?&>Q)X۠AyX۠ABY)Ob?ӝ?@@yGz?63j5>Q)X۠AyX۠AB}mh2b?ӝ?@@yGz?b;>Q)X۠AyX۠Aeb?ӝ?@@yGz?^>Q)X۠AyX۠Am>a?ӝ?@@yGz?6rT>Q)X۠AyX۠AF8a?ӝ?@@yGz?zc >Q)X۠AyX۠A"Ka?ӝ?@@yGz?[ TƦ>Q)X۠AyX۠AVça?ӝ?@@yGz?OFs>Q)X۠AyX۠A`Ia?ӝ?@@yGz?:G7( >Q)X۠AyX۠A|Sra?ӝ?@@yGz?(.>Q)X۠AyX۠AvVxXa?ӝ?@@yGz?Q>Q)X۠AyX۠AƭNm>a?ӝ?@@yGz?  Gt>Q)X۠AyX۠AA"%a?ӝ?@@yGz?Q)X۠AyX۠AB. a?ӝ?@@yGz?`l>Q)X۠AyX۠A` g`?ӝ?@@yGz?̛eܧ>Q)X۠AyX۠Av*R`?ӝ?@@yGz?:$>Q)X۠AyX۠A:i>`?ӝ?@@yGz?h!>Q)X۠AyX۠AZ)`oة`?ӝ?@@yGz?*D>Q)X۠AyX۠Aٳ`?ӝ?@@yGz?Y9g>Q)X۠AyX۠A$yrz`?ӝ?@@yGz?5>Q)X۠AyX۠ASZ $c`?ӝ?@@yGz?by>Q)X۠AyX۠A 1L`?ӝ?@@yGz?wXϨ>Q)X۠AyX۠As J5`?ӝ?@@yGz?Ai >Q)X۠AyX۠A-`?ӝ?@@yGz?FFZ>Q)X۠AyX۠Ayao`?ӝ?@@yGz?vKw7>Q)X۠AyX۠A*e_?ӝ?@@yGz?<,Z>Q)X۠AyX۠An#_?ӝ?@@yGz?.|>Q)X۠AyX۠A T_?ӝ?@@yGz?hW>Q)X۠AyX۠A, 0#c_?ӝ?@@yGz?3K©>Q)X۠AyX۠A=8_?ӝ?@@yGz?Ec>Q)X۠AyX۠A#_?ӝ?@@yGz?#>Q)X۠AyX۠Aף^?ӝ?@@yGz?"gi*>Q)X۠AyX۠AI*^?ӝ?@@yGz?M>Q)X۠AyX۠A0n ^?ӝ?@@yGz? o>Q)X۠AyX۠Ak^?ӝ?@@yGz?lP4>Q)X۠AyX۠Ao+D^?ӝ?@@yGz?x=>Q)X۠AyX۠AV@c^?ӝ?@@yGz?Iת>Q)X۠AyX۠A h]?ӝ?@@yGz?Iך>_&(X۠AyX۠A hm?"@R_?@@yGz?$E}\>_&(X۠AyX۠A Tt4m?"@R_?@@yGz?m_b>_&(X۠AyX۠AO^m?"@R_?@@yGz?UB0>_&(X۠AyX۠A.M%Qm?"@R_?@@yGz?*$>_&(X۠AyX۠A( l?"@R_?@@yGz?f3>_&(X۠AyX۠A3=(l?"@R_?@@yGz?umx>_&(X۠AyX۠Aս?l?"@R_?@@yGz?LGw׽>_&(X۠AyX۠A2 fk?"@R_?@@yGz?*A>_&(X۠AyX۠Artk?"@R_?@@yGz? H>_&(X۠AyX۠AȆʾvk?"@R_?@@yGz?ct>_&(X۠AyX۠A 7>6k?"@R_?@@yGz?˜Vӝ>_&(X۠AyX۠A#j?"@R_?@@yGz?!!9>_&(X۠AyX۠AMuj?"@R_?@@yGz?zS^>_&(X۠AyX۠A{j?"@R_?@@yGz?X1>_&(X۠AyX۠A}?j?"@R_?@@yGz?4>&>_&(X۠AyX۠A޿j?"@R_?@@yGz?BÐ.>_&(X۠AyX۠A'Ipi?"@R_?@@yGz?ʥs>_&(X۠AyX۠Acݑi?"@R_?@@yGz?ZSd>_&(X۠AyX۠A1Yi?"@R_?@@yGz?j>_&(X۠AyX۠A֝>^"i?"@R_?@@yGz?B &">_&(X۠AyX۠A.h?"@R_?@@yGz?;D>_&(X۠AyX۠A5Fh?"@R_?@@yGz?k: g>_&(X۠AyX۠AI>`h?"@R_?@@yGz?~:>_&(X۠AyX۠A*=Oh?"@R_?@@yGz?ﬠ>_&(X۠AyX۠AiZVh?"@R_?@@yGz?iݤϠ>_&(X۠AyX۠AKfg?"@R_?@@yGz?(KY>_&(X۠AyX۠A]g?"@R_?@@yGz?FX>_&(X۠AyX۠AsdZg?"@R_?@@yGz?Ӱ7>_&(X۠AyX۠ArZg?"@R_?@@yGz?"xZ>_&(X۠AyX۠A~0,g?"@R_?@@yGz?[-}>_&(X۠AyX۠A =4f?"@R_?@@yGz?⟡>_&(X۠AyX۠ADEf?"@R_?@@yGz?mEu¡>_&(X۠AyX۠A^[:Vf?"@R_?@@yGz?t(gL>_&(X۠AyX۠AHGnmxf?"@R_?@@yGz?JlX>_&(X۠AyX۠AJ6-Mf?"@R_?@@yGz?ӰI*>_&(X۠AyX۠AQ!"f?"@R_?@@yGz?&:kM>_&(X۠AyX۠Ame?"@R_?@@yGz?29, p>_&(X۠AyX۠A[(=e?"@R_?@@yGz?b}Ւ>_&(X۠AyX۠A|>|e?"@R_?@@yGz?q>_&(X۠AyX۠AD_&(X۠AyX۠Ay1¼Ve?"@R_?@@yGz?NI>_&(X۠AyX۠Aw`/e?"@R_?@@yGz?>_&(X۠AyX۠A]o@ e?"@R_?@@yGz?*O]@>_&(X۠AyX۠APfSd?"@R_?@@yGz?~c>_&(X۠AyX۠AVߠd?"@R_?@@yGz?ZDž>_&(X۠AyX۠Ad?"@R_?@@yGz?tݞ|>_&(X۠AyX۠Ajtd?"@R_?@@yGz? 1ˣ>_&(X۠AyX۠A](EPd?"@R_?@@yGz?Q<'>_&(X۠AyX۠AO r-d?"@R_?@@yGz?kk{>_&(X۠AyX۠Ab9 d?"@R_?@@yGz?.lP3>_&(X۠AyX۠ATc?"@R_?@@yGz?]V>_&(X۠AyX۠A8"c?"@R_?@@yGz? 7Ox>_&(X۠AyX۠A͜c?"@R_?@@yGz?x)|@o>_&(X۠AyX۠AG揇c?"@R_?@@yGz?X1$>_&(X۠AyX۠Av3nbc?"@R_?@@yGz?T#>_&(X۠AyX۠A?^ Bc?"@R_?@@yGz?ŷH>_&(X۠AyX۠Aoۄ"c?"@R_?@@yGz?2C&>_&(X۠AyX۠Adwdpc?"@R_?@@yGz?H>_&(X۠AyX۠ADob?"@R_?@@yGz?Fk>_&(X۠AyX۠ArEmb?"@R_?@@yGz?xuYa>_&(X۠AyX۠A~b?"@R_?@@yGz?ꤝ>_&(X۠AyX۠Ajb?"@R_?@@yGz?Yӥ>_&(X۠AyX۠A:Flb?"@R_?@@yGz?&>_&(X۠AyX۠ACY)Ob?"@R_?@@yGz?63j5>_&(X۠AyX۠AB}mh2b?"@R_?@@yGz?b;>_&(X۠AyX۠Aeb?"@R_?@@yGz?^>_&(X۠AyX۠Am>a?"@R_?@@yGz?6rT>_&(X۠AyX۠AF8a?"@R_?@@yGz?zc >_&(X۠AyX۠A"Ka?"@R_?@@yGz?\ TƦ>_&(X۠AyX۠AVça?"@R_?@@yGz?OFs>_&(X۠AyX۠A`Ia?"@R_?@@yGz?:G7( >_&(X۠AyX۠A|Sra?"@R_?@@yGz?(.>_&(X۠AyX۠AvVxXa?"@R_?@@yGz?Q>_&(X۠AyX۠AƭNm>a?"@R_?@@yGz?  Gt>_&(X۠AyX۠AA"%a?"@R_?@@yGz?_&(X۠AyX۠AB. a?"@R_?@@yGz?`l>_&(X۠AyX۠A` g`?"@R_?@@yGz?˛eܧ>_&(X۠AyX۠Av*R`?"@R_?@@yGz?:$>_&(X۠AyX۠A:i>`?"@R_?@@yGz?h!>_&(X۠AyX۠AZ)`oة`?"@R_?@@yGz?*D>_&(X۠AyX۠Aٳ`?"@R_?@@yGz?Y9g>_&(X۠AyX۠A$yrz`?"@R_?@@yGz?5>_&(X۠AyX۠ASZ $c`?"@R_?@@yGz?by>_&(X۠AyX۠A 1L`?"@R_?@@yGz?wXϨ>_&(X۠AyX۠As J5`?"@R_?@@yGz?Ai >_&(X۠AyX۠A-`?"@R_?@@yGz?FFZ>_&(X۠AyX۠Ayao`?"@R_?@@yGz?vKw7>_&(X۠AyX۠A*e_?"@R_?@@yGz?<,Z>_&(X۠AyX۠An#_?"@R_?@@yGz?.|>_&(X۠AyX۠A T_?"@R_?@@yGz?hW>_&(X۠AyX۠A, 0#c_?"@R_?@@yGz?3K©>_&(X۠AyX۠A=8_?"@R_?@@yGz?Dc>_&(X۠AyX۠A#_?"@R_?@@yGz?#>_&(X۠AyX۠Aף^?"@R_?@@yGz?"gi*>_&(X۠AyX۠AI*^?"@R_?@@yGz?M>_&(X۠AyX۠A0n ^?"@R_?@@yGz? o>_&(X۠AyX۠Ak^?"@R_?@@yGz?kP4>_&(X۠AyX۠Ao+D^?"@R_?@@yGz?x=>_&(X۠AyX۠AV@c^?"@R_?@@yGz?Iת>_&(X۠AyX۠A h]?"@R_?@@yGz?Iך>l&X۠AyX۠A hm?&ch?@@yGz?%E}\>l&X۠AyX۠A Tt4m?&ch?@@yGz?m_b>l&X۠AyX۠AO^m?&ch?@@yGz?UB0>l&X۠AyX۠A.M%Qm?&ch?@@yGz?*$>l&X۠AyX۠A( l?&ch?@@yGz?f3>l&X۠AyX۠A3=(l?&ch?@@yGz?tmx>l&X۠AyX۠Aս?l?&ch?@@yGz?KGw׽>l&X۠AyX۠A2 fk?&ch?@@yGz?*A>l&X۠AyX۠Artk?&ch?@@yGz? H>l&X۠AyX۠AȆʾvk?&ch?@@yGz?ct>l&X۠AyX۠A 7>6k?&ch?@@yGz?˜Vӝ>l&X۠AyX۠A#j?&ch?@@yGz?!!9>l&X۠AyX۠AMuj?&ch?@@yGz?zS^>l&X۠AyX۠A{j?&ch?@@yGz?X1>l&X۠AyX۠A}?j?&ch?@@yGz?5>&>l&X۠AyX۠A޿j?&ch?@@yGz?BÐ.>l&X۠AyX۠A'Ipi?&ch?@@yGz?ʥs>l&X۠AyX۠Acݑi?&ch?@@yGz?ZSd>l&X۠AyX۠A1Yi?&ch?@@yGz?j>l&X۠AyX۠Aם>^"i?&ch?@@yGz?B &">l&X۠AyX۠A.h?&ch?@@yGz?;D>l&X۠AyX۠A5Fh?&ch?@@yGz?k: g>l&X۠AyX۠AI>`h?&ch?@@yGz?~:>l&X۠AyX۠A+=Oh?&ch?@@yGz?ﬠ>l&X۠AyX۠AiZVh?&ch?@@yGz?iݤϠ>l&X۠AyX۠AKfg?&ch?@@yGz?(KY>l&X۠AyX۠A]g?&ch?@@yGz?FX>l&X۠AyX۠AsdZg?&ch?@@yGz?Ӱ7>l&X۠AyX۠ArZg?&ch?@@yGz?"xZ>l&X۠AyX۠A0,g?&ch?@@yGz?[-}>l&X۠AyX۠A=4f?&ch?@@yGz?⟡>l&X۠AyX۠ADEf?&ch?@@yGz?mEu¡>l&X۠AyX۠A^[:Vf?&ch?@@yGz?t(gL>l&X۠AyX۠AHGnmxf?&ch?@@yGz?JlX>l&X۠AyX۠AJ6-Mf?&ch?@@yGz?ӰI*>l&X۠AyX۠AQ!"f?&ch?@@yGz?&:kM>l&X۠AyX۠Ame?&ch?@@yGz?29, p>l&X۠AyX۠A[(=e?&ch?@@yGz?b}Ւ>l&X۠AyX۠A|>|e?&ch?@@yGz?q>l&X۠AyX۠ADl&X۠AyX۠Ay1¼Ve?&ch?@@yGz?NI>l&X۠AyX۠Av`/e?&ch?@@yGz?>l&X۠AyX۠A]o@ e?&ch?@@yGz?*O]@>l&X۠AyX۠AQfSd?&ch?@@yGz?~c>l&X۠AyX۠AVߠd?&ch?@@yGz?ZDž>l&X۠AyX۠Ad?&ch?@@yGz?uݞ|>l&X۠AyX۠Ajtd?&ch?@@yGz? 1ˣ>l&X۠AyX۠A](EPd?&ch?@@yGz?Q<'>l&X۠AyX۠AO r-d?&ch?@@yGz?kk{>l&X۠AyX۠Ab9 d?&ch?@@yGz?.lP3>l&X۠AyX۠ATc?&ch?@@yGz?]V>l&X۠AyX۠A8"c?&ch?@@yGz? 7Ox>l&X۠AyX۠A͜c?&ch?@@yGz?x)|@o>l&X۠AyX۠AF揇c?&ch?@@yGz?X1$>l&X۠AyX۠Aw3nbc?&ch?@@yGz?U#>l&X۠AyX۠A>^ Bc?&ch?@@yGz?ķH>l&X۠AyX۠Aoۄ"c?&ch?@@yGz?2C&>l&X۠AyX۠Adwdpc?&ch?@@yGz?H>l&X۠AyX۠ADob?&ch?@@yGz?Fk>l&X۠AyX۠ArEmb?&ch?@@yGz?xuYa>l&X۠AyX۠A~b?&ch?@@yGz?ꤝ>l&X۠AyX۠Akb?&ch?@@yGz?Yӥ>l&X۠AyX۠A;Flb?&ch?@@yGz?&>l&X۠AyX۠ABY)Ob?&ch?@@yGz?63j5>l&X۠AyX۠AB}mh2b?&ch?@@yGz?b;>l&X۠AyX۠Aeb?&ch?@@yGz?^>l&X۠AyX۠Am>a?&ch?@@yGz?6rT>l&X۠AyX۠AF8a?&ch?@@yGz?zc >l&X۠AyX۠A"Ka?&ch?@@yGz?[ TƦ>l&X۠AyX۠AVça?&ch?@@yGz?OFs>l&X۠AyX۠A`Ia?&ch?@@yGz?:G7( >l&X۠AyX۠A|Sra?&ch?@@yGz?(.>l&X۠AyX۠AvVxXa?&ch?@@yGz?Q>l&X۠AyX۠AƭNm>a?&ch?@@yGz?  Gt>l&X۠AyX۠AA"%a?&ch?@@yGz?l&X۠AyX۠AB. a?&ch?@@yGz?`l>l&X۠AyX۠A` g`?&ch?@@yGz?̛eܧ>l&X۠AyX۠Av*R`?&ch?@@yGz?:$>l&X۠AyX۠A:i>`?&ch?@@yGz?h!>l&X۠AyX۠AZ)`oة`?&ch?@@yGz?*D>l&X۠AyX۠Aٳ`?&ch?@@yGz?Y9g>l&X۠AyX۠A$yrz`?&ch?@@yGz?5>l&X۠AyX۠ASZ $c`?&ch?@@yGz?by>l&X۠AyX۠A 1L`?&ch?@@yGz?wXϨ>l&X۠AyX۠As J5`?&ch?@@yGz?Ai >l&X۠AyX۠A-`?&ch?@@yGz?FFZ>l&X۠AyX۠Ayao`?&ch?@@yGz?vKw7>l&X۠AyX۠A*e_?&ch?@@yGz?<,Z>l&X۠AyX۠An#_?&ch?@@yGz?.|>l&X۠AyX۠A T_?&ch?@@yGz?hW>l&X۠AyX۠A, 0#c_?&ch?@@yGz?3K©>l&X۠AyX۠A=8_?&ch?@@yGz?Ec>l&X۠AyX۠A#_?&ch?@@yGz?#>l&X۠AyX۠Aף^?&ch?@@yGz?"gi*>l&X۠AyX۠AI*^?&ch?@@yGz?M>l&X۠AyX۠A0n ^?&ch?@@yGz? o>l&X۠AyX۠Ak^?&ch?@@yGz?lP4>l&X۠AyX۠Ao+D^?&ch?@@yGz?x=>l&X۠AyX۠AV@c^?&ch?@@yGz?Iת>l&X۠AyX۠A h]?&ch?@@yGz?Iך>y%X۠AyX۠A hm?+PNA?@@yGz?$E}\>y%X۠AyX۠A Tt4m?+PNA?@@yGz?m_b>y%X۠AyX۠AO^m?+PNA?@@yGz?UB0>y%X۠AyX۠A.M%Qm?+PNA?@@yGz?*$>y%X۠AyX۠A( l?+PNA?@@yGz?f3>y%X۠AyX۠A3=(l?+PNA?@@yGz?umx>y%X۠AyX۠Aս?l?+PNA?@@yGz?LGw׽>y%X۠AyX۠A2 fk?+PNA?@@yGz?*A>y%X۠AyX۠Artk?+PNA?@@yGz? H>y%X۠AyX۠AȆʾvk?+PNA?@@yGz?ct>y%X۠AyX۠A 7>6k?+PNA?@@yGz?˜Vӝ>y%X۠AyX۠A#j?+PNA?@@yGz?!!9>y%X۠AyX۠AMuj?+PNA?@@yGz?zS^>y%X۠AyX۠A{j?+PNA?@@yGz?X1>y%X۠AyX۠A}?j?+PNA?@@yGz?4>&>y%X۠AyX۠A޿j?+PNA?@@yGz?BÐ.>y%X۠AyX۠A'Ipi?+PNA?@@yGz?ʥs>y%X۠AyX۠Acݑi?+PNA?@@yGz?ZSd>y%X۠AyX۠A1Yi?+PNA?@@yGz?j>y%X۠AyX۠A֝>^"i?+PNA?@@yGz?B &">y%X۠AyX۠A.h?+PNA?@@yGz?;D>y%X۠AyX۠A5Fh?+PNA?@@yGz?k: g>y%X۠AyX۠AI>`h?+PNA?@@yGz?~:>y%X۠AyX۠A*=Oh?+PNA?@@yGz?ﬠ>y%X۠AyX۠AiZVh?+PNA?@@yGz?iݤϠ>y%X۠AyX۠AKfg?+PNA?@@yGz?(KY>y%X۠AyX۠A]g?+PNA?@@yGz?FX>y%X۠AyX۠AsdZg?+PNA?@@yGz?Ӱ7>y%X۠AyX۠ArZg?+PNA?@@yGz?"xZ>y%X۠AyX۠A~0,g?+PNA?@@yGz?[-}>y%X۠AyX۠A =4f?+PNA?@@yGz?⟡>y%X۠AyX۠ADEf?+PNA?@@yGz?mEu¡>y%X۠AyX۠A^[:Vf?+PNA?@@yGz?t(gL>y%X۠AyX۠AHGnmxf?+PNA?@@yGz?JlX>y%X۠AyX۠AJ6-Mf?+PNA?@@yGz?ӰI*>y%X۠AyX۠AQ!"f?+PNA?@@yGz?&:kM>y%X۠AyX۠Ame?+PNA?@@yGz?29, p>y%X۠AyX۠A[(=e?+PNA?@@yGz?b}Ւ>y%X۠AyX۠A|>|e?+PNA?@@yGz?q>y%X۠AyX۠ADy%X۠AyX۠Ay1¼Ve?+PNA?@@yGz?NI>y%X۠AyX۠Aw`/e?+PNA?@@yGz?>y%X۠AyX۠A]o@ e?+PNA?@@yGz?*O]@>y%X۠AyX۠APfSd?+PNA?@@yGz?~c>y%X۠AyX۠AVߠd?+PNA?@@yGz?ZDž>y%X۠AyX۠Ad?+PNA?@@yGz?tݞ|>y%X۠AyX۠Ajtd?+PNA?@@yGz? 1ˣ>y%X۠AyX۠A](EPd?+PNA?@@yGz?Q<'>y%X۠AyX۠AO r-d?+PNA?@@yGz?kk{>y%X۠AyX۠Ab9 d?+PNA?@@yGz?.lP3>y%X۠AyX۠ATc?+PNA?@@yGz?]V>y%X۠AyX۠A8"c?+PNA?@@yGz? 7Ox>y%X۠AyX۠A͜c?+PNA?@@yGz?x)|@o>y%X۠AyX۠AG揇c?+PNA?@@yGz?X1$>y%X۠AyX۠Av3nbc?+PNA?@@yGz?T#>y%X۠AyX۠A?^ Bc?+PNA?@@yGz?ŷH>y%X۠AyX۠Aoۄ"c?+PNA?@@yGz?2C&>y%X۠AyX۠Adwdpc?+PNA?@@yGz?H>y%X۠AyX۠ADob?+PNA?@@yGz?Fk>y%X۠AyX۠ArEmb?+PNA?@@yGz?xuYa>y%X۠AyX۠A~b?+PNA?@@yGz?ꤝ>y%X۠AyX۠Ajb?+PNA?@@yGz?Yӥ>y%X۠AyX۠A:Flb?+PNA?@@yGz?&>y%X۠AyX۠ACY)Ob?+PNA?@@yGz?63j5>y%X۠AyX۠AB}mh2b?+PNA?@@yGz?b;>y%X۠AyX۠Aeb?+PNA?@@yGz?^>y%X۠AyX۠Am>a?+PNA?@@yGz?6rT>y%X۠AyX۠AF8a?+PNA?@@yGz?zc >y%X۠AyX۠A"Ka?+PNA?@@yGz?\ TƦ>y%X۠AyX۠AVça?+PNA?@@yGz?OFs>y%X۠AyX۠A`Ia?+PNA?@@yGz?:G7( >y%X۠AyX۠A|Sra?+PNA?@@yGz?(.>y%X۠AyX۠AvVxXa?+PNA?@@yGz?Q>y%X۠AyX۠AƭNm>a?+PNA?@@yGz?  Gt>y%X۠AyX۠AA"%a?+PNA?@@yGz?y%X۠AyX۠AB. a?+PNA?@@yGz?`l>y%X۠AyX۠A` g`?+PNA?@@yGz?˛eܧ>y%X۠AyX۠Av*R`?+PNA?@@yGz?:$>y%X۠AyX۠A:i>`?+PNA?@@yGz?h!>y%X۠AyX۠AZ)`oة`?+PNA?@@yGz?*D>y%X۠AyX۠Aٳ`?+PNA?@@yGz?Y9g>y%X۠AyX۠A$yrz`?+PNA?@@yGz?5>y%X۠AyX۠ASZ $c`?+PNA?@@yGz?by>y%X۠AyX۠A 1L`?+PNA?@@yGz?wXϨ>y%X۠AyX۠As J5`?+PNA?@@yGz?Ai >y%X۠AyX۠A-`?+PNA?@@yGz?FFZ>y%X۠AyX۠Ayao`?+PNA?@@yGz?vKw7>y%X۠AyX۠A*e_?+PNA?@@yGz?<,Z>y%X۠AyX۠An#_?+PNA?@@yGz?.|>y%X۠AyX۠A T_?+PNA?@@yGz?hW>y%X۠AyX۠A, 0#c_?+PNA?@@yGz?3K©>y%X۠AyX۠A=8_?+PNA?@@yGz?Dc>y%X۠AyX۠A#_?+PNA?@@yGz?#>y%X۠AyX۠Aף^?+PNA?@@yGz?"gi*>y%X۠AyX۠AI*^?+PNA?@@yGz?M>y%X۠AyX۠A0n ^?+PNA?@@yGz? o>y%X۠AyX۠Ak^?+PNA?@@yGz?kP4>y%X۠AyX۠Ao+D^?+PNA?@@yGz?x=>y%X۠AyX۠AV@c^?+PNA?@@yGz?Iת>y%X۠AyX۠A h]?+PNA?@@yGz?Iך>#X۠AyX۠A hm?23?@@yGz?%E}\>#X۠AyX۠A Tt4m?23?@@yGz?m_b>#X۠AyX۠AO^m?23?@@yGz?UB0>#X۠AyX۠A.M%Qm?23?@@yGz?*$>#X۠AyX۠A( l?23?@@yGz?f3>#X۠AyX۠A3=(l?23?@@yGz?tmx>#X۠AyX۠Aս?l?23?@@yGz?KGw׽>#X۠AyX۠A2 fk?23?@@yGz?*A>#X۠AyX۠Artk?23?@@yGz? H>#X۠AyX۠AȆʾvk?23?@@yGz?ct>#X۠AyX۠A 7>6k?23?@@yGz?˜Vӝ>#X۠AyX۠A#j?23?@@yGz?!!9>#X۠AyX۠AMuj?23?@@yGz?zS^>#X۠AyX۠A{j?23?@@yGz?X1>#X۠AyX۠A}?j?23?@@yGz?5>&>#X۠AyX۠A޿j?23?@@yGz?BÐ.>#X۠AyX۠A'Ipi?23?@@yGz?ʥs>#X۠AyX۠Acݑi?23?@@yGz?ZSd>#X۠AyX۠A1Yi?23?@@yGz?j>#X۠AyX۠Aם>^"i?23?@@yGz?B &">#X۠AyX۠A.h?23?@@yGz?;D>#X۠AyX۠A5Fh?23?@@yGz?k: g>#X۠AyX۠AI>`h?23?@@yGz?~:>#X۠AyX۠A+=Oh?23?@@yGz?ﬠ>#X۠AyX۠AiZVh?23?@@yGz?iݤϠ>#X۠AyX۠AKfg?23?@@yGz?(KY>#X۠AyX۠A]g?23?@@yGz?FX>#X۠AyX۠AsdZg?23?@@yGz?Ӱ7>#X۠AyX۠ArZg?23?@@yGz?"xZ>#X۠AyX۠A0,g?23?@@yGz?[-}>#X۠AyX۠A=4f?23?@@yGz?⟡>#X۠AyX۠ADEf?23?@@yGz?mEu¡>#X۠AyX۠A^[:Vf?23?@@yGz?t(gL>#X۠AyX۠AHGnmxf?23?@@yGz?JlX>#X۠AyX۠AJ6-Mf?23?@@yGz?ӰI*>#X۠AyX۠AQ!"f?23?@@yGz?&:kM>#X۠AyX۠Ame?23?@@yGz?29, p>#X۠AyX۠A[(=e?23?@@yGz?b}Ւ>#X۠AyX۠A|>|e?23?@@yGz?q>#X۠AyX۠AD#X۠AyX۠Ay1¼Ve?23?@@yGz?NI>#X۠AyX۠Av`/e?23?@@yGz?>#X۠AyX۠A]o@ e?23?@@yGz?*O]@>#X۠AyX۠AQfSd?23?@@yGz?~c>#X۠AyX۠AVߠd?23?@@yGz?ZDž>#X۠AyX۠Ad?23?@@yGz?uݞ|>#X۠AyX۠Ajtd?23?@@yGz? 1ˣ>#X۠AyX۠A](EPd?23?@@yGz?Q<'>#X۠AyX۠AO r-d?23?@@yGz?kk{>#X۠AyX۠Ab9 d?23?@@yGz?.lP3>#X۠AyX۠ATc?23?@@yGz?]V>#X۠AyX۠A8"c?23?@@yGz? 7Ox>#X۠AyX۠A͜c?23?@@yGz?x)|@o>#X۠AyX۠AF揇c?23?@@yGz?X1$>#X۠AyX۠Aw3nbc?23?@@yGz?U#>#X۠AyX۠A>^ Bc?23?@@yGz?ķH>#X۠AyX۠Aoۄ"c?23?@@yGz?2C&>#X۠AyX۠Adwdpc?23?@@yGz?H>#X۠AyX۠ADob?23?@@yGz?Fk>#X۠AyX۠ArEmb?23?@@yGz?xuYa>#X۠AyX۠A~b?23?@@yGz?ꤝ>#X۠AyX۠Akb?23?@@yGz?Yӥ>#X۠AyX۠A;Flb?23?@@yGz?&>#X۠AyX۠ABY)Ob?23?@@yGz?63j5>#X۠AyX۠AB}mh2b?23?@@yGz?b;>#X۠AyX۠Aeb?23?@@yGz?^>#X۠AyX۠Am>a?23?@@yGz?6rT>#X۠AyX۠AF8a?23?@@yGz?zc >#X۠AyX۠A"Ka?23?@@yGz?[ TƦ>#X۠AyX۠AVça?23?@@yGz?OFs>#X۠AyX۠A`Ia?23?@@yGz?:G7( >#X۠AyX۠A|Sra?23?@@yGz?(.>#X۠AyX۠AvVxXa?23?@@yGz?Q>#X۠AyX۠AƭNm>a?23?@@yGz?  Gt>#X۠AyX۠AA"%a?23?@@yGz?#X۠AyX۠AB. a?23?@@yGz?`l>#X۠AyX۠A` g`?23?@@yGz?̛eܧ>#X۠AyX۠Av*R`?23?@@yGz?:$>#X۠AyX۠A:i>`?23?@@yGz?h!>#X۠AyX۠AZ)`oة`?23?@@yGz?*D>#X۠AyX۠Aٳ`?23?@@yGz?Y9g>#X۠AyX۠A$yrz`?23?@@yGz?5>#X۠AyX۠ASZ $c`?23?@@yGz?by>#X۠AyX۠A 1L`?23?@@yGz?wXϨ>#X۠AyX۠As J5`?23?@@yGz?Ai >#X۠AyX۠A-`?23?@@yGz?FFZ>#X۠AyX۠Ayao`?23?@@yGz?vKw7>#X۠AyX۠A*e_?23?@@yGz?<,Z>#X۠AyX۠An#_?23?@@yGz?.|>#X۠AyX۠A T_?23?@@yGz?hW>#X۠AyX۠A, 0#c_?23?@@yGz?3K©>#X۠AyX۠A=8_?23?@@yGz?Ec>#X۠AyX۠A#_?23?@@yGz?#>#X۠AyX۠Aף^?23?@@yGz?"gi*>#X۠AyX۠AI*^?23?@@yGz?M>#X۠AyX۠A0n ^?23?@@yGz? o>#X۠AyX۠Ak^?23?@@yGz?lP4>#X۠AyX۠Ao+D^?23?@@yGz?x=>#X۠AyX۠AV@c^?23?@@yGz?Iת>#X۠AyX۠A h]?23?@@yGz?Iך>"X۠AyX۠A hm?7N#?@@yGz?$E}\>"X۠AyX۠A Tt4m?7N#?@@yGz?m_b>"X۠AyX۠AO^m?7N#?@@yGz?UB0>"X۠AyX۠A.M%Qm?7N#?@@yGz?*$>"X۠AyX۠A( l?7N#?@@yGz?f3>"X۠AyX۠A3=(l?7N#?@@yGz?umx>"X۠AyX۠Aս?l?7N#?@@yGz?LGw׽>"X۠AyX۠A2 fk?7N#?@@yGz?*A>"X۠AyX۠Artk?7N#?@@yGz? H>"X۠AyX۠AȆʾvk?7N#?@@yGz?ct>"X۠AyX۠A 7>6k?7N#?@@yGz?˜Vӝ>"X۠AyX۠A#j?7N#?@@yGz?!!9>"X۠AyX۠AMuj?7N#?@@yGz?zS^>"X۠AyX۠A{j?7N#?@@yGz?X1>"X۠AyX۠A}?j?7N#?@@yGz?4>&>"X۠AyX۠A޿j?7N#?@@yGz?BÐ.>"X۠AyX۠A'Ipi?7N#?@@yGz?ʥs>"X۠AyX۠Acݑi?7N#?@@yGz?ZSd>"X۠AyX۠A1Yi?7N#?@@yGz?j>"X۠AyX۠A֝>^"i?7N#?@@yGz?B &">"X۠AyX۠A.h?7N#?@@yGz?;D>"X۠AyX۠A5Fh?7N#?@@yGz?k: g>"X۠AyX۠AI>`h?7N#?@@yGz?~:>"X۠AyX۠A*=Oh?7N#?@@yGz?ﬠ>"X۠AyX۠AiZVh?7N#?@@yGz?iݤϠ>"X۠AyX۠AKfg?7N#?@@yGz?(KY>"X۠AyX۠A]g?7N#?@@yGz?FX>"X۠AyX۠AsdZg?7N#?@@yGz?Ӱ7>"X۠AyX۠ArZg?7N#?@@yGz?"xZ>"X۠AyX۠A~0,g?7N#?@@yGz?[-}>"X۠AyX۠A =4f?7N#?@@yGz?⟡>"X۠AyX۠ADEf?7N#?@@yGz?mEu¡>"X۠AyX۠A^[:Vf?7N#?@@yGz?t(gL>"X۠AyX۠AHGnmxf?7N#?@@yGz?JlX>"X۠AyX۠AJ6-Mf?7N#?@@yGz?ӰI*>"X۠AyX۠AQ!"f?7N#?@@yGz?&:kM>"X۠AyX۠Ame?7N#?@@yGz?29, p>"X۠AyX۠A[(=e?7N#?@@yGz?b}Ւ>"X۠AyX۠A|>|e?7N#?@@yGz?q>"X۠AyX۠AD"X۠AyX۠Ay1¼Ve?7N#?@@yGz?NI>"X۠AyX۠Aw`/e?7N#?@@yGz?>"X۠AyX۠A]o@ e?7N#?@@yGz?*O]@>"X۠AyX۠APfSd?7N#?@@yGz?~c>"X۠AyX۠AVߠd?7N#?@@yGz?ZDž>"X۠AyX۠Ad?7N#?@@yGz?tݞ|>"X۠AyX۠Ajtd?7N#?@@yGz? 1ˣ>"X۠AyX۠A](EPd?7N#?@@yGz?Q<'>"X۠AyX۠AO r-d?7N#?@@yGz?kk{>"X۠AyX۠Ab9 d?7N#?@@yGz?.lP3>"X۠AyX۠ATc?7N#?@@yGz?]V>"X۠AyX۠A8"c?7N#?@@yGz? 7Ox>"X۠AyX۠A͜c?7N#?@@yGz?x)|@o>"X۠AyX۠AG揇c?7N#?@@yGz?X1$>"X۠AyX۠Av3nbc?7N#?@@yGz?T#>"X۠AyX۠A?^ Bc?7N#?@@yGz?ŷH>"X۠AyX۠Aoۄ"c?7N#?@@yGz?2C&>"X۠AyX۠Adwdpc?7N#?@@yGz?H>"X۠AyX۠ADob?7N#?@@yGz?Fk>"X۠AyX۠ArEmb?7N#?@@yGz?xuYa>"X۠AyX۠A~b?7N#?@@yGz?ꤝ>"X۠AyX۠Ajb?7N#?@@yGz?Yӥ>"X۠AyX۠A:Flb?7N#?@@yGz?&>"X۠AyX۠ACY)Ob?7N#?@@yGz?63j5>"X۠AyX۠AB}mh2b?7N#?@@yGz?b;>"X۠AyX۠Aeb?7N#?@@yGz?^>"X۠AyX۠Am>a?7N#?@@yGz?6rT>"X۠AyX۠AF8a?7N#?@@yGz?zc >"X۠AyX۠A"Ka?7N#?@@yGz?\ TƦ>"X۠AyX۠AVça?7N#?@@yGz?OFs>"X۠AyX۠A`Ia?7N#?@@yGz?:G7( >"X۠AyX۠A|Sra?7N#?@@yGz?(.>"X۠AyX۠AvVxXa?7N#?@@yGz?Q>"X۠AyX۠AƭNm>a?7N#?@@yGz?  Gt>"X۠AyX۠AA"%a?7N#?@@yGz?"X۠AyX۠AB. a?7N#?@@yGz?`l>"X۠AyX۠A` g`?7N#?@@yGz?˛eܧ>"X۠AyX۠Av*R`?7N#?@@yGz?:$>"X۠AyX۠A:i>`?7N#?@@yGz?h!>"X۠AyX۠AZ)`oة`?7N#?@@yGz?*D>"X۠AyX۠Aٳ`?7N#?@@yGz?Y9g>"X۠AyX۠A$yrz`?7N#?@@yGz?5>"X۠AyX۠ASZ $c`?7N#?@@yGz?by>"X۠AyX۠A 1L`?7N#?@@yGz?wXϨ>"X۠AyX۠As J5`?7N#?@@yGz?Ai >"X۠AyX۠A-`?7N#?@@yGz?FFZ>"X۠AyX۠Ayao`?7N#?@@yGz?vKw7>"X۠AyX۠A*e_?7N#?@@yGz?<,Z>"X۠AyX۠An#_?7N#?@@yGz?.|>"X۠AyX۠A T_?7N#?@@yGz?hW>"X۠AyX۠A, 0#c_?7N#?@@yGz?3K©>"X۠AyX۠A=8_?7N#?@@yGz?Dc>"X۠AyX۠A#_?7N#?@@yGz?#>"X۠AyX۠Aף^?7N#?@@yGz?"gi*>"X۠AyX۠AI*^?7N#?@@yGz?M>"X۠AyX۠A0n ^?7N#?@@yGz? o>"X۠AyX۠Ak^?7N#?@@yGz?kP4>"X۠AyX۠Ao+D^?7N#?@@yGz?x=>"X۠AyX۠AV@c^?7N#?@@yGz?Iת>"X۠AyX۠A h]?7N#?@@yGz?Iך>y X۠AyX۠A hm?>o?@@yGz?%E}\>y X۠AyX۠A Tt4m?>o?@@yGz?m_b>y X۠AyX۠AO^m?>o?@@yGz?UB0>y X۠AyX۠A.M%Qm?>o?@@yGz?*$>y X۠AyX۠A( l?>o?@@yGz?f3>y X۠AyX۠A3=(l?>o?@@yGz?tmx>y X۠AyX۠Aս?l?>o?@@yGz?KGw׽>y X۠AyX۠A2 fk?>o?@@yGz?*A>y X۠AyX۠Artk?>o?@@yGz? H>y X۠AyX۠AȆʾvk?>o?@@yGz?ct>y X۠AyX۠A 7>6k?>o?@@yGz?˜Vӝ>y X۠AyX۠A#j?>o?@@yGz?!!9>y X۠AyX۠AMuj?>o?@@yGz?zS^>y X۠AyX۠A{j?>o?@@yGz?X1>y X۠AyX۠A}?j?>o?@@yGz?5>&>y X۠AyX۠A޿j?>o?@@yGz?BÐ.>y X۠AyX۠A'Ipi?>o?@@yGz?ʥs>y X۠AyX۠Acݑi?>o?@@yGz?ZSd>y X۠AyX۠A1Yi?>o?@@yGz?j>y X۠AyX۠Aם>^"i?>o?@@yGz?B &">y X۠AyX۠A.h?>o?@@yGz?;D>y X۠AyX۠A5Fh?>o?@@yGz?k: g>y X۠AyX۠AI>`h?>o?@@yGz?~:>y X۠AyX۠A+=Oh?>o?@@yGz?ﬠ>y X۠AyX۠AiZVh?>o?@@yGz?iݤϠ>y X۠AyX۠AKfg?>o?@@yGz?(KY>y X۠AyX۠A]g?>o?@@yGz?FX>y X۠AyX۠AsdZg?>o?@@yGz?Ӱ7>y X۠AyX۠ArZg?>o?@@yGz?"xZ>y X۠AyX۠A0,g?>o?@@yGz?[-}>y X۠AyX۠A=4f?>o?@@yGz?⟡>y X۠AyX۠ADEf?>o?@@yGz?mEu¡>y X۠AyX۠A^[:Vf?>o?@@yGz?t(gL>y X۠AyX۠AHGnmxf?>o?@@yGz?JlX>y X۠AyX۠AJ6-Mf?>o?@@yGz?ӰI*>y X۠AyX۠AQ!"f?>o?@@yGz?&:kM>y X۠AyX۠Ame?>o?@@yGz?29, p>y X۠AyX۠A[(=e?>o?@@yGz?b}Ւ>y X۠AyX۠A|>|e?>o?@@yGz?q>y X۠AyX۠ADo?@@yGz??آ>y X۠AyX۠Ay1¼Ve?>o?@@yGz?NI>y X۠AyX۠Av`/e?>o?@@yGz?>y X۠AyX۠A]o@ e?>o?@@yGz?*O]@>y X۠AyX۠AQfSd?>o?@@yGz?~c>y X۠AyX۠AVߠd?>o?@@yGz?ZDž>y X۠AyX۠Ad?>o?@@yGz?uݞ|>y X۠AyX۠Ajtd?>o?@@yGz? 1ˣ>y X۠AyX۠A](EPd?>o?@@yGz?Q<'>y X۠AyX۠AO r-d?>o?@@yGz?kk{>y X۠AyX۠Ab9 d?>o?@@yGz?.lP3>y X۠AyX۠ATc?>o?@@yGz?]V>y X۠AyX۠A8"c?>o?@@yGz? 7Ox>y X۠AyX۠A͜c?>o?@@yGz?x)|@o>y X۠AyX۠AF揇c?>o?@@yGz?X1$>y X۠AyX۠Aw3nbc?>o?@@yGz?U#>y X۠AyX۠A>^ Bc?>o?@@yGz?ķH>y X۠AyX۠Aoۄ"c?>o?@@yGz?2C&>y X۠AyX۠Adwdpc?>o?@@yGz?H>y X۠AyX۠ADob?>o?@@yGz?Fk>y X۠AyX۠ArEmb?>o?@@yGz?xuYa>y X۠AyX۠A~b?>o?@@yGz?ꤝ>y X۠AyX۠Akb?>o?@@yGz?Yӥ>y X۠AyX۠A;Flb?>o?@@yGz?&>y X۠AyX۠ABY)Ob?>o?@@yGz?63j5>y X۠AyX۠AB}mh2b?>o?@@yGz?b;>y X۠AyX۠Aeb?>o?@@yGz?^>y X۠AyX۠Am>a?>o?@@yGz?6rT>y X۠AyX۠AF8a?>o?@@yGz?zc >y X۠AyX۠A"Ka?>o?@@yGz?[ TƦ>y X۠AyX۠AVça?>o?@@yGz?OFs>y X۠AyX۠A`Ia?>o?@@yGz?:G7( >y X۠AyX۠A|Sra?>o?@@yGz?(.>y X۠AyX۠AvVxXa?>o?@@yGz?Q>y X۠AyX۠AƭNm>a?>o?@@yGz?  Gt>y X۠AyX۠AA"%a?>o?@@yGz?y X۠AyX۠AB. a?>o?@@yGz?`l>y X۠AyX۠A` g`?>o?@@yGz?̛eܧ>y X۠AyX۠Av*R`?>o?@@yGz?:$>y X۠AyX۠A:i>`?>o?@@yGz?h!>y X۠AyX۠AZ)`oة`?>o?@@yGz?*D>y X۠AyX۠Aٳ`?>o?@@yGz?Y9g>y X۠AyX۠A$yrz`?>o?@@yGz?5>y X۠AyX۠ASZ $c`?>o?@@yGz?by>y X۠AyX۠A 1L`?>o?@@yGz?wXϨ>y X۠AyX۠As J5`?>o?@@yGz?Ai >y X۠AyX۠A-`?>o?@@yGz?FFZ>y X۠AyX۠Ayao`?>o?@@yGz?vKw7>y X۠AyX۠A*e_?>o?@@yGz?<,Z>y X۠AyX۠An#_?>o?@@yGz?.|>y X۠AyX۠A T_?>o?@@yGz?hW>y X۠AyX۠A, 0#c_?>o?@@yGz?3K©>y X۠AyX۠A=8_?>o?@@yGz?Ec>y X۠AyX۠A#_?>o?@@yGz?#>y X۠AyX۠Aף^?>o?@@yGz?"gi*>y X۠AyX۠AI*^?>o?@@yGz?M>y X۠AyX۠A0n ^?>o?@@yGz? o>y X۠AyX۠Ak^?>o?@@yGz?lP4>y X۠AyX۠Ao+D^?>o?@@yGz?x=>y X۠AyX۠AV@c^?>o?@@yGz?Iת>y X۠AyX۠A h]?>o?@@yGz?Iך>X۠AyX۠A hm?CMW?@@yGz?$E}\>X۠AyX۠A Tt4m?CMW?@@yGz?m_b>X۠AyX۠AO^m?CMW?@@yGz?UB0>X۠AyX۠A.M%Qm?CMW?@@yGz?*$>X۠AyX۠A( l?CMW?@@yGz?f3>X۠AyX۠A3=(l?CMW?@@yGz?umx>X۠AyX۠Aս?l?CMW?@@yGz?LGw׽>X۠AyX۠A2 fk?CMW?@@yGz?*A>X۠AyX۠Artk?CMW?@@yGz? H>X۠AyX۠AȆʾvk?CMW?@@yGz?ct>X۠AyX۠A 7>6k?CMW?@@yGz?˜Vӝ>X۠AyX۠A#j?CMW?@@yGz?!!9>X۠AyX۠AMuj?CMW?@@yGz?zS^>X۠AyX۠A{j?CMW?@@yGz?X1>X۠AyX۠A}?j?CMW?@@yGz?4>&>X۠AyX۠A޿j?CMW?@@yGz?BÐ.>X۠AyX۠A'Ipi?CMW?@@yGz?ʥs>X۠AyX۠Acݑi?CMW?@@yGz?ZSd>X۠AyX۠A1Yi?CMW?@@yGz?j>X۠AyX۠A֝>^"i?CMW?@@yGz?B &">X۠AyX۠A.h?CMW?@@yGz?;D>X۠AyX۠A5Fh?CMW?@@yGz?k: g>X۠AyX۠AI>`h?CMW?@@yGz?~:>X۠AyX۠A*=Oh?CMW?@@yGz?ﬠ>X۠AyX۠AiZVh?CMW?@@yGz?iݤϠ>X۠AyX۠AKfg?CMW?@@yGz?(KY>X۠AyX۠A]g?CMW?@@yGz?FX>X۠AyX۠AsdZg?CMW?@@yGz?Ӱ7>X۠AyX۠ArZg?CMW?@@yGz?"xZ>X۠AyX۠A~0,g?CMW?@@yGz?[-}>X۠AyX۠A =4f?CMW?@@yGz?⟡>X۠AyX۠ADEf?CMW?@@yGz?mEu¡>X۠AyX۠A^[:Vf?CMW?@@yGz?t(gL>X۠AyX۠AHGnmxf?CMW?@@yGz?JlX>X۠AyX۠AJ6-Mf?CMW?@@yGz?ӰI*>X۠AyX۠AQ!"f?CMW?@@yGz?&:kM>X۠AyX۠Ame?CMW?@@yGz?29, p>X۠AyX۠A[(=e?CMW?@@yGz?b}Ւ>X۠AyX۠A|>|e?CMW?@@yGz?q>X۠AyX۠ADX۠AyX۠Ay1¼Ve?CMW?@@yGz?NI>X۠AyX۠Aw`/e?CMW?@@yGz?>X۠AyX۠A]o@ e?CMW?@@yGz?*O]@>X۠AyX۠APfSd?CMW?@@yGz?~c>X۠AyX۠AVߠd?CMW?@@yGz?ZDž>X۠AyX۠Ad?CMW?@@yGz?tݞ|>X۠AyX۠Ajtd?CMW?@@yGz? 1ˣ>X۠AyX۠A](EPd?CMW?@@yGz?Q<'>X۠AyX۠AO r-d?CMW?@@yGz?kk{>X۠AyX۠Ab9 d?CMW?@@yGz?.lP3>X۠AyX۠ATc?CMW?@@yGz?]V>X۠AyX۠A8"c?CMW?@@yGz? 7Ox>X۠AyX۠A͜c?CMW?@@yGz?x)|@o>X۠AyX۠AG揇c?CMW?@@yGz?X1$>X۠AyX۠Av3nbc?CMW?@@yGz?T#>X۠AyX۠A?^ Bc?CMW?@@yGz?ŷH>X۠AyX۠Aoۄ"c?CMW?@@yGz?2C&>X۠AyX۠Adwdpc?CMW?@@yGz?H>X۠AyX۠ADob?CMW?@@yGz?Fk>X۠AyX۠ArEmb?CMW?@@yGz?xuYa>X۠AyX۠A~b?CMW?@@yGz?ꤝ>X۠AyX۠Ajb?CMW?@@yGz?Yӥ>X۠AyX۠A:Flb?CMW?@@yGz?&>X۠AyX۠ACY)Ob?CMW?@@yGz?63j5>X۠AyX۠AB}mh2b?CMW?@@yGz?b;>X۠AyX۠Aeb?CMW?@@yGz?^>X۠AyX۠Am>a?CMW?@@yGz?6rT>X۠AyX۠AF8a?CMW?@@yGz?zc >X۠AyX۠A"Ka?CMW?@@yGz?\ TƦ>X۠AyX۠AVça?CMW?@@yGz?OFs>X۠AyX۠A`Ia?CMW?@@yGz?:G7( >X۠AyX۠A|Sra?CMW?@@yGz?(.>X۠AyX۠AvVxXa?CMW?@@yGz?Q>X۠AyX۠AƭNm>a?CMW?@@yGz?  Gt>X۠AyX۠AA"%a?CMW?@@yGz?X۠AyX۠AB. a?CMW?@@yGz?`l>X۠AyX۠A` g`?CMW?@@yGz?˛eܧ>X۠AyX۠Av*R`?CMW?@@yGz?:$>X۠AyX۠A:i>`?CMW?@@yGz?h!>X۠AyX۠AZ)`oة`?CMW?@@yGz?*D>X۠AyX۠Aٳ`?CMW?@@yGz?Y9g>X۠AyX۠A$yrz`?CMW?@@yGz?5>X۠AyX۠ASZ $c`?CMW?@@yGz?by>X۠AyX۠A 1L`?CMW?@@yGz?wXϨ>X۠AyX۠As J5`?CMW?@@yGz?Ai >X۠AyX۠A-`?CMW?@@yGz?FFZ>X۠AyX۠Ayao`?CMW?@@yGz?vKw7>X۠AyX۠A*e_?CMW?@@yGz?<,Z>X۠AyX۠An#_?CMW?@@yGz?.|>X۠AyX۠A T_?CMW?@@yGz?hW>X۠AyX۠A, 0#c_?CMW?@@yGz?3K©>X۠AyX۠A=8_?CMW?@@yGz?Dc>X۠AyX۠A#_?CMW?@@yGz?#>X۠AyX۠Aף^?CMW?@@yGz?"gi*>X۠AyX۠AI*^?CMW?@@yGz?M>X۠AyX۠A0n ^?CMW?@@yGz? o>X۠AyX۠Ak^?CMW?@@yGz?kP4>X۠AyX۠Ao+D^?CMW?@@yGz?x=>X۠AyX۠AV@c^?CMW?@@yGz?Iת>X۠AyX۠A h]?CMW?@@yGz?Iך>gX۠AyX۠A hm?H5u>?@@yGz?%E}\>gX۠AyX۠A Tt4m?H5u>?@@yGz?m_b>gX۠AyX۠AO^m?H5u>?@@yGz?UB0>gX۠AyX۠A.M%Qm?H5u>?@@yGz?*$>gX۠AyX۠A( l?H5u>?@@yGz?f3>gX۠AyX۠A3=(l?H5u>?@@yGz?tmx>gX۠AyX۠Aս?l?H5u>?@@yGz?KGw׽>gX۠AyX۠A2 fk?H5u>?@@yGz?*A>gX۠AyX۠Artk?H5u>?@@yGz? H>gX۠AyX۠AȆʾvk?H5u>?@@yGz?ct>gX۠AyX۠A 7>6k?H5u>?@@yGz?˜Vӝ>gX۠AyX۠A#j?H5u>?@@yGz?!!9>gX۠AyX۠AMuj?H5u>?@@yGz?zS^>gX۠AyX۠A{j?H5u>?@@yGz?X1>gX۠AyX۠A}?j?H5u>?@@yGz?5>&>gX۠AyX۠A޿j?H5u>?@@yGz?BÐ.>gX۠AyX۠A'Ipi?H5u>?@@yGz?ʥs>gX۠AyX۠Acݑi?H5u>?@@yGz?ZSd>gX۠AyX۠A1Yi?H5u>?@@yGz?j>gX۠AyX۠Aם>^"i?H5u>?@@yGz?B &">gX۠AyX۠A.h?H5u>?@@yGz?;D>gX۠AyX۠A5Fh?H5u>?@@yGz?k: g>gX۠AyX۠AI>`h?H5u>?@@yGz?~:>gX۠AyX۠A+=Oh?H5u>?@@yGz?ﬠ>gX۠AyX۠AiZVh?H5u>?@@yGz?iݤϠ>gX۠AyX۠AKfg?H5u>?@@yGz?(KY>gX۠AyX۠A]g?H5u>?@@yGz?FX>gX۠AyX۠AsdZg?H5u>?@@yGz?Ӱ7>gX۠AyX۠ArZg?H5u>?@@yGz?"xZ>gX۠AyX۠A0,g?H5u>?@@yGz?[-}>gX۠AyX۠A=4f?H5u>?@@yGz?⟡>gX۠AyX۠ADEf?H5u>?@@yGz?mEu¡>gX۠AyX۠A^[:Vf?H5u>?@@yGz?t(gL>gX۠AyX۠AHGnmxf?H5u>?@@yGz?JlX>gX۠AyX۠AJ6-Mf?H5u>?@@yGz?ӰI*>gX۠AyX۠AQ!"f?H5u>?@@yGz?&:kM>gX۠AyX۠Ame?H5u>?@@yGz?29, p>gX۠AyX۠A[(=e?H5u>?@@yGz?b}Ւ>gX۠AyX۠A|>|e?H5u>?@@yGz?q>gX۠AyX۠AD?@@yGz??آ>gX۠AyX۠Ay1¼Ve?H5u>?@@yGz?NI>gX۠AyX۠Av`/e?H5u>?@@yGz?>gX۠AyX۠A]o@ e?H5u>?@@yGz?*O]@>gX۠AyX۠AQfSd?H5u>?@@yGz?~c>gX۠AyX۠AVߠd?H5u>?@@yGz?ZDž>gX۠AyX۠Ad?H5u>?@@yGz?uݞ|>gX۠AyX۠Ajtd?H5u>?@@yGz? 1ˣ>gX۠AyX۠A](EPd?H5u>?@@yGz?Q<'>gX۠AyX۠AO r-d?H5u>?@@yGz?kk{>gX۠AyX۠Ab9 d?H5u>?@@yGz?.lP3>gX۠AyX۠ATc?H5u>?@@yGz?]V>gX۠AyX۠A8"c?H5u>?@@yGz? 7Ox>gX۠AyX۠A͜c?H5u>?@@yGz?x)|@o>gX۠AyX۠AF揇c?H5u>?@@yGz?X1$>gX۠AyX۠Aw3nbc?H5u>?@@yGz?U#>gX۠AyX۠A>^ Bc?H5u>?@@yGz?ķH>gX۠AyX۠Aoۄ"c?H5u>?@@yGz?2C&>gX۠AyX۠Adwdpc?H5u>?@@yGz?H>gX۠AyX۠ADob?H5u>?@@yGz?Fk>gX۠AyX۠ArEmb?H5u>?@@yGz?xuYa>gX۠AyX۠A~b?H5u>?@@yGz?ꤝ>gX۠AyX۠Akb?H5u>?@@yGz?Yӥ>gX۠AyX۠A;Flb?H5u>?@@yGz?&>gX۠AyX۠ABY)Ob?H5u>?@@yGz?63j5>gX۠AyX۠AB}mh2b?H5u>?@@yGz?b;>gX۠AyX۠Aeb?H5u>?@@yGz?^>gX۠AyX۠Am>a?H5u>?@@yGz?6rT>gX۠AyX۠AF8a?H5u>?@@yGz?zc >gX۠AyX۠A"Ka?H5u>?@@yGz?[ TƦ>gX۠AyX۠AVça?H5u>?@@yGz?OFs>gX۠AyX۠A`Ia?H5u>?@@yGz?:G7( >gX۠AyX۠A|Sra?H5u>?@@yGz?(.>gX۠AyX۠AvVxXa?H5u>?@@yGz?Q>gX۠AyX۠AƭNm>a?H5u>?@@yGz?  Gt>gX۠AyX۠AA"%a?H5u>?@@yGz?gX۠AyX۠AB. a?H5u>?@@yGz?`l>gX۠AyX۠A` g`?H5u>?@@yGz?̛eܧ>gX۠AyX۠Av*R`?H5u>?@@yGz?:$>gX۠AyX۠A:i>`?H5u>?@@yGz?h!>gX۠AyX۠AZ)`oة`?H5u>?@@yGz?*D>gX۠AyX۠Aٳ`?H5u>?@@yGz?Y9g>gX۠AyX۠A$yrz`?H5u>?@@yGz?5>gX۠AyX۠ASZ $c`?H5u>?@@yGz?by>gX۠AyX۠A 1L`?H5u>?@@yGz?wXϨ>gX۠AyX۠As J5`?H5u>?@@yGz?Ai >gX۠AyX۠A-`?H5u>?@@yGz?FFZ>gX۠AyX۠Ayao`?H5u>?@@yGz?vKw7>gX۠AyX۠A*e_?H5u>?@@yGz?<,Z>gX۠AyX۠An#_?H5u>?@@yGz?.|>gX۠AyX۠A T_?H5u>?@@yGz?hW>gX۠AyX۠A, 0#c_?H5u>?@@yGz?3K©>gX۠AyX۠A=8_?H5u>?@@yGz?Ec>gX۠AyX۠A#_?H5u>?@@yGz?#>gX۠AyX۠Aף^?H5u>?@@yGz?"gi*>gX۠AyX۠AI*^?H5u>?@@yGz?M>gX۠AyX۠A0n ^?H5u>?@@yGz? o>gX۠AyX۠Ak^?H5u>?@@yGz?lP4>gX۠AyX۠Ao+D^?H5u>?@@yGz?x=>gX۠AyX۠AV@c^?H5u>?@@yGz?Iת>gX۠AyX۠A h]?H5u>?@@yGz?Iך>X۠AyX۠A hm?MXK%?@@yGz?$E}\>X۠AyX۠A Tt4m?MXK%?@@yGz?m_b>X۠AyX۠AO^m?MXK%?@@yGz?UB0>X۠AyX۠A.M%Qm?MXK%?@@yGz?*$>X۠AyX۠A( l?MXK%?@@yGz?f3>X۠AyX۠A3=(l?MXK%?@@yGz?umx>X۠AyX۠Aս?l?MXK%?@@yGz?LGw׽>X۠AyX۠A2 fk?MXK%?@@yGz?*A>X۠AyX۠Artk?MXK%?@@yGz? H>X۠AyX۠AȆʾvk?MXK%?@@yGz?ct>X۠AyX۠A 7>6k?MXK%?@@yGz?˜Vӝ>X۠AyX۠A#j?MXK%?@@yGz?!!9>X۠AyX۠AMuj?MXK%?@@yGz?zS^>X۠AyX۠A{j?MXK%?@@yGz?X1>X۠AyX۠A}?j?MXK%?@@yGz?4>&>X۠AyX۠A޿j?MXK%?@@yGz?BÐ.>X۠AyX۠A'Ipi?MXK%?@@yGz?ʥs>X۠AyX۠Acݑi?MXK%?@@yGz?ZSd>X۠AyX۠A1Yi?MXK%?@@yGz?j>X۠AyX۠A֝>^"i?MXK%?@@yGz?B &">X۠AyX۠A.h?MXK%?@@yGz?;D>X۠AyX۠A5Fh?MXK%?@@yGz?k: g>X۠AyX۠AI>`h?MXK%?@@yGz?~:>X۠AyX۠A*=Oh?MXK%?@@yGz?ﬠ>X۠AyX۠AiZVh?MXK%?@@yGz?iݤϠ>X۠AyX۠AKfg?MXK%?@@yGz?(KY>X۠AyX۠A]g?MXK%?@@yGz?FX>X۠AyX۠AsdZg?MXK%?@@yGz?Ӱ7>X۠AyX۠ArZg?MXK%?@@yGz?"xZ>X۠AyX۠A~0,g?MXK%?@@yGz?[-}>X۠AyX۠A =4f?MXK%?@@yGz?⟡>X۠AyX۠ADEf?MXK%?@@yGz?mEu¡>X۠AyX۠A^[:Vf?MXK%?@@yGz?t(gL>X۠AyX۠AHGnmxf?MXK%?@@yGz?JlX>X۠AyX۠AJ6-Mf?MXK%?@@yGz?ӰI*>X۠AyX۠AQ!"f?MXK%?@@yGz?&:kM>X۠AyX۠Ame?MXK%?@@yGz?29, p>X۠AyX۠A[(=e?MXK%?@@yGz?b}Ւ>X۠AyX۠A|>|e?MXK%?@@yGz?q>X۠AyX۠ADX۠AyX۠Ay1¼Ve?MXK%?@@yGz?NI>X۠AyX۠Aw`/e?MXK%?@@yGz?>X۠AyX۠A]o@ e?MXK%?@@yGz?*O]@>X۠AyX۠APfSd?MXK%?@@yGz?~c>X۠AyX۠AVߠd?MXK%?@@yGz?ZDž>X۠AyX۠Ad?MXK%?@@yGz?tݞ|>X۠AyX۠Ajtd?MXK%?@@yGz? 1ˣ>X۠AyX۠A](EPd?MXK%?@@yGz?Q<'>X۠AyX۠AO r-d?MXK%?@@yGz?kk{>X۠AyX۠Ab9 d?MXK%?@@yGz?.lP3>X۠AyX۠ATc?MXK%?@@yGz?]V>X۠AyX۠A8"c?MXK%?@@yGz? 7Ox>X۠AyX۠A͜c?MXK%?@@yGz?x)|@o>X۠AyX۠AG揇c?MXK%?@@yGz?X1$>X۠AyX۠Av3nbc?MXK%?@@yGz?T#>X۠AyX۠A?^ Bc?MXK%?@@yGz?ŷH>X۠AyX۠Aoۄ"c?MXK%?@@yGz?2C&>X۠AyX۠Adwdpc?MXK%?@@yGz?H>X۠AyX۠ADob?MXK%?@@yGz?Fk>X۠AyX۠ArEmb?MXK%?@@yGz?xuYa>X۠AyX۠A~b?MXK%?@@yGz?ꤝ>X۠AyX۠Ajb?MXK%?@@yGz?Yӥ>X۠AyX۠A:Flb?MXK%?@@yGz?&>X۠AyX۠ACY)Ob?MXK%?@@yGz?63j5>X۠AyX۠AB}mh2b?MXK%?@@yGz?b;>X۠AyX۠Aeb?MXK%?@@yGz?^>X۠AyX۠Am>a?MXK%?@@yGz?6rT>X۠AyX۠AF8a?MXK%?@@yGz?zc >X۠AyX۠A"Ka?MXK%?@@yGz?\ TƦ>X۠AyX۠AVça?MXK%?@@yGz?OFs>X۠AyX۠A`Ia?MXK%?@@yGz?:G7( >X۠AyX۠A|Sra?MXK%?@@yGz?(.>X۠AyX۠AvVxXa?MXK%?@@yGz?Q>X۠AyX۠AƭNm>a?MXK%?@@yGz?  Gt>X۠AyX۠AA"%a?MXK%?@@yGz?X۠AyX۠AB. a?MXK%?@@yGz?`l>X۠AyX۠A` g`?MXK%?@@yGz?˛eܧ>X۠AyX۠Av*R`?MXK%?@@yGz?:$>X۠AyX۠A:i>`?MXK%?@@yGz?h!>X۠AyX۠AZ)`oة`?MXK%?@@yGz?*D>X۠AyX۠Aٳ`?MXK%?@@yGz?Y9g>X۠AyX۠A$yrz`?MXK%?@@yGz?5>X۠AyX۠ASZ $c`?MXK%?@@yGz?by>X۠AyX۠A 1L`?MXK%?@@yGz?wXϨ>X۠AyX۠As J5`?MXK%?@@yGz?Ai >X۠AyX۠A-`?MXK%?@@yGz?FFZ>X۠AyX۠Ayao`?MXK%?@@yGz?vKw7>X۠AyX۠A*e_?MXK%?@@yGz?<,Z>X۠AyX۠An#_?MXK%?@@yGz?.|>X۠AyX۠A T_?MXK%?@@yGz?hW>X۠AyX۠A, 0#c_?MXK%?@@yGz?3K©>X۠AyX۠A=8_?MXK%?@@yGz?Dc>X۠AyX۠A#_?MXK%?@@yGz?#>X۠AyX۠Aף^?MXK%?@@yGz?"gi*>X۠AyX۠AI*^?MXK%?@@yGz?M>X۠AyX۠A0n ^?MXK%?@@yGz? o>X۠AyX۠Ak^?MXK%?@@yGz?kP4>X۠AyX۠Ao+D^?MXK%?@@yGz?x=>X۠AyX۠AV@c^?MXK%?@@yGz?Iת>X۠AyX۠A h]?MXK%?@@yGz?Iך>UX۠AyX۠A hm?S{ʔW ?@@yGz?%E}\>UX۠AyX۠A Tt4m?S{ʔW ?@@yGz?m_b>UX۠AyX۠AO^m?S{ʔW ?@@yGz?UB0>UX۠AyX۠A.M%Qm?S{ʔW ?@@yGz?*$>UX۠AyX۠A( l?S{ʔW ?@@yGz?f3>UX۠AyX۠A3=(l?S{ʔW ?@@yGz?tmx>UX۠AyX۠Aս?l?S{ʔW ?@@yGz?KGw׽>UX۠AyX۠A2 fk?S{ʔW ?@@yGz?*A>UX۠AyX۠Artk?S{ʔW ?@@yGz? H>UX۠AyX۠AȆʾvk?S{ʔW ?@@yGz?ct>UX۠AyX۠A 7>6k?S{ʔW ?@@yGz?˜Vӝ>UX۠AyX۠A#j?S{ʔW ?@@yGz?!!9>UX۠AyX۠AMuj?S{ʔW ?@@yGz?zS^>UX۠AyX۠A{j?S{ʔW ?@@yGz?X1>UX۠AyX۠A}?j?S{ʔW ?@@yGz?5>&>UX۠AyX۠A޿j?S{ʔW ?@@yGz?BÐ.>UX۠AyX۠A'Ipi?S{ʔW ?@@yGz?ʥs>UX۠AyX۠Acݑi?S{ʔW ?@@yGz?ZSd>UX۠AyX۠A1Yi?S{ʔW ?@@yGz?j>UX۠AyX۠Aם>^"i?S{ʔW ?@@yGz?B &">UX۠AyX۠A.h?S{ʔW ?@@yGz?;D>UX۠AyX۠A5Fh?S{ʔW ?@@yGz?k: g>UX۠AyX۠AI>`h?S{ʔW ?@@yGz?~:>UX۠AyX۠A+=Oh?S{ʔW ?@@yGz?ﬠ>UX۠AyX۠AiZVh?S{ʔW ?@@yGz?iݤϠ>UX۠AyX۠AKfg?S{ʔW ?@@yGz?(KY>UX۠AyX۠A]g?S{ʔW ?@@yGz?FX>UX۠AyX۠AsdZg?S{ʔW ?@@yGz?Ӱ7>UX۠AyX۠ArZg?S{ʔW ?@@yGz?"xZ>UX۠AyX۠A0,g?S{ʔW ?@@yGz?[-}>UX۠AyX۠A=4f?S{ʔW ?@@yGz?⟡>UX۠AyX۠ADEf?S{ʔW ?@@yGz?mEu¡>UX۠AyX۠A^[:Vf?S{ʔW ?@@yGz?t(gL>UX۠AyX۠AHGnmxf?S{ʔW ?@@yGz?JlX>UX۠AyX۠AJ6-Mf?S{ʔW ?@@yGz?ӰI*>UX۠AyX۠AQ!"f?S{ʔW ?@@yGz?&:kM>UX۠AyX۠Ame?S{ʔW ?@@yGz?29, p>UX۠AyX۠A[(=e?S{ʔW ?@@yGz?b}Ւ>UX۠AyX۠A|>|e?S{ʔW ?@@yGz?q>UX۠AyX۠ADUX۠AyX۠Ay1¼Ve?S{ʔW ?@@yGz?NI>UX۠AyX۠Av`/e?S{ʔW ?@@yGz?>UX۠AyX۠A]o@ e?S{ʔW ?@@yGz?*O]@>UX۠AyX۠AQfSd?S{ʔW ?@@yGz?~c>UX۠AyX۠AVߠd?S{ʔW ?@@yGz?ZDž>UX۠AyX۠Ad?S{ʔW ?@@yGz?uݞ|>UX۠AyX۠Ajtd?S{ʔW ?@@yGz? 1ˣ>UX۠AyX۠A](EPd?S{ʔW ?@@yGz?Q<'>UX۠AyX۠AO r-d?S{ʔW ?@@yGz?kk{>UX۠AyX۠Ab9 d?S{ʔW ?@@yGz?.lP3>UX۠AyX۠ATc?S{ʔW ?@@yGz?]V>UX۠AyX۠A8"c?S{ʔW ?@@yGz? 7Ox>UX۠AyX۠A͜c?S{ʔW ?@@yGz?x)|@o>UX۠AyX۠AF揇c?S{ʔW ?@@yGz?X1$>UX۠AyX۠Aw3nbc?S{ʔW ?@@yGz?U#>UX۠AyX۠A>^ Bc?S{ʔW ?@@yGz?ķH>UX۠AyX۠Aoۄ"c?S{ʔW ?@@yGz?2C&>UX۠AyX۠Adwdpc?S{ʔW ?@@yGz?H>UX۠AyX۠ADob?S{ʔW ?@@yGz?Fk>UX۠AyX۠ArEmb?S{ʔW ?@@yGz?xuYa>UX۠AyX۠A~b?S{ʔW ?@@yGz?ꤝ>UX۠AyX۠Akb?S{ʔW ?@@yGz?Yӥ>UX۠AyX۠A;Flb?S{ʔW ?@@yGz?&>UX۠AyX۠ABY)Ob?S{ʔW ?@@yGz?63j5>UX۠AyX۠AB}mh2b?S{ʔW ?@@yGz?b;>UX۠AyX۠Aeb?S{ʔW ?@@yGz?^>UX۠AyX۠Am>a?S{ʔW ?@@yGz?6rT>UX۠AyX۠AF8a?S{ʔW ?@@yGz?zc >UX۠AyX۠A"Ka?S{ʔW ?@@yGz?[ TƦ>UX۠AyX۠AVça?S{ʔW ?@@yGz?OFs>UX۠AyX۠A`Ia?S{ʔW ?@@yGz?:G7( >UX۠AyX۠A|Sra?S{ʔW ?@@yGz?(.>UX۠AyX۠AvVxXa?S{ʔW ?@@yGz?Q>UX۠AyX۠AƭNm>a?S{ʔW ?@@yGz?  Gt>UX۠AyX۠AA"%a?S{ʔW ?@@yGz?UX۠AyX۠AB. a?S{ʔW ?@@yGz?`l>UX۠AyX۠A` g`?S{ʔW ?@@yGz?̛eܧ>UX۠AyX۠Av*R`?S{ʔW ?@@yGz?:$>UX۠AyX۠A:i>`?S{ʔW ?@@yGz?h!>UX۠AyX۠AZ)`oة`?S{ʔW ?@@yGz?*D>UX۠AyX۠Aٳ`?S{ʔW ?@@yGz?Y9g>UX۠AyX۠A$yrz`?S{ʔW ?@@yGz?5>UX۠AyX۠ASZ $c`?S{ʔW ?@@yGz?by>UX۠AyX۠A 1L`?S{ʔW ?@@yGz?wXϨ>UX۠AyX۠As J5`?S{ʔW ?@@yGz?Ai >UX۠AyX۠A-`?S{ʔW ?@@yGz?FFZ>UX۠AyX۠Ayao`?S{ʔW ?@@yGz?vKw7>UX۠AyX۠A*e_?S{ʔW ?@@yGz?<,Z>UX۠AyX۠An#_?S{ʔW ?@@yGz?.|>UX۠AyX۠A T_?S{ʔW ?@@yGz?hW>UX۠AyX۠A, 0#c_?S{ʔW ?@@yGz?3K©>UX۠AyX۠A=8_?S{ʔW ?@@yGz?Ec>UX۠AyX۠A#_?S{ʔW ?@@yGz?#>UX۠AyX۠Aף^?S{ʔW ?@@yGz?"gi*>UX۠AyX۠AI*^?S{ʔW ?@@yGz?M>UX۠AyX۠A0n ^?S{ʔW ?@@yGz? o>UX۠AyX۠Ak^?S{ʔW ?@@yGz?lP4>UX۠AyX۠Ao+D^?S{ʔW ?@@yGz?x=>UX۠AyX۠AV@c^?S{ʔW ?@@yGz?Iת>UX۠AyX۠A h]?S{ʔW ?@@yGz?Iך>X۠AyX۠A hm?WIz?@@yGz?$E}\>X۠AyX۠A Tt4m?WIz?@@yGz?m_b>X۠AyX۠AO^m?WIz?@@yGz?UB0>X۠AyX۠A.M%Qm?WIz?@@yGz?*$>X۠AyX۠A( l?WIz?@@yGz?f3>X۠AyX۠A3=(l?WIz?@@yGz?umx>X۠AyX۠Aս?l?WIz?@@yGz?LGw׽>X۠AyX۠A2 fk?WIz?@@yGz?*A>X۠AyX۠Artk?WIz?@@yGz? H>X۠AyX۠AȆʾvk?WIz?@@yGz?ct>X۠AyX۠A 7>6k?WIz?@@yGz?˜Vӝ>X۠AyX۠A#j?WIz?@@yGz?!!9>X۠AyX۠AMuj?WIz?@@yGz?zS^>X۠AyX۠A{j?WIz?@@yGz?X1>X۠AyX۠A}?j?WIz?@@yGz?4>&>X۠AyX۠A޿j?WIz?@@yGz?BÐ.>X۠AyX۠A'Ipi?WIz?@@yGz?ʥs>X۠AyX۠Acݑi?WIz?@@yGz?ZSd>X۠AyX۠A1Yi?WIz?@@yGz?j>X۠AyX۠A֝>^"i?WIz?@@yGz?B &">X۠AyX۠A.h?WIz?@@yGz?;D>X۠AyX۠A5Fh?WIz?@@yGz?k: g>X۠AyX۠AI>`h?WIz?@@yGz?~:>X۠AyX۠A*=Oh?WIz?@@yGz?ﬠ>X۠AyX۠AiZVh?WIz?@@yGz?iݤϠ>X۠AyX۠AKfg?WIz?@@yGz?(KY>X۠AyX۠A]g?WIz?@@yGz?FX>X۠AyX۠AsdZg?WIz?@@yGz?Ӱ7>X۠AyX۠ArZg?WIz?@@yGz?"xZ>X۠AyX۠A~0,g?WIz?@@yGz?[-}>X۠AyX۠A =4f?WIz?@@yGz?⟡>X۠AyX۠ADEf?WIz?@@yGz?mEu¡>X۠AyX۠A^[:Vf?WIz?@@yGz?t(gL>X۠AyX۠AHGnmxf?WIz?@@yGz?JlX>X۠AyX۠AJ6-Mf?WIz?@@yGz?ӰI*>X۠AyX۠AQ!"f?WIz?@@yGz?&:kM>X۠AyX۠Ame?WIz?@@yGz?29, p>X۠AyX۠A[(=e?WIz?@@yGz?b}Ւ>X۠AyX۠A|>|e?WIz?@@yGz?q>X۠AyX۠ADX۠AyX۠Ay1¼Ve?WIz?@@yGz?NI>X۠AyX۠Aw`/e?WIz?@@yGz?>X۠AyX۠A]o@ e?WIz?@@yGz?*O]@>X۠AyX۠APfSd?WIz?@@yGz?~c>X۠AyX۠AVߠd?WIz?@@yGz?ZDž>X۠AyX۠Ad?WIz?@@yGz?tݞ|>X۠AyX۠Ajtd?WIz?@@yGz? 1ˣ>X۠AyX۠A](EPd?WIz?@@yGz?Q<'>X۠AyX۠AO r-d?WIz?@@yGz?kk{>X۠AyX۠Ab9 d?WIz?@@yGz?.lP3>X۠AyX۠ATc?WIz?@@yGz?]V>X۠AyX۠A8"c?WIz?@@yGz? 7Ox>X۠AyX۠A͜c?WIz?@@yGz?x)|@o>X۠AyX۠AG揇c?WIz?@@yGz?X1$>X۠AyX۠Av3nbc?WIz?@@yGz?T#>X۠AyX۠A?^ Bc?WIz?@@yGz?ŷH>X۠AyX۠Aoۄ"c?WIz?@@yGz?2C&>X۠AyX۠Adwdpc?WIz?@@yGz?H>X۠AyX۠ADob?WIz?@@yGz?Fk>X۠AyX۠ArEmb?WIz?@@yGz?xuYa>X۠AyX۠A~b?WIz?@@yGz?ꤝ>X۠AyX۠Ajb?WIz?@@yGz?Yӥ>X۠AyX۠A:Flb?WIz?@@yGz?&>X۠AyX۠ACY)Ob?WIz?@@yGz?63j5>X۠AyX۠AB}mh2b?WIz?@@yGz?b;>X۠AyX۠Aeb?WIz?@@yGz?^>X۠AyX۠Am>a?WIz?@@yGz?6rT>X۠AyX۠AF8a?WIz?@@yGz?zc >X۠AyX۠A"Ka?WIz?@@yGz?\ TƦ>X۠AyX۠AVça?WIz?@@yGz?OFs>X۠AyX۠A`Ia?WIz?@@yGz?:G7( >X۠AyX۠A|Sra?WIz?@@yGz?(.>X۠AyX۠AvVxXa?WIz?@@yGz?Q>X۠AyX۠AƭNm>a?WIz?@@yGz?  Gt>X۠AyX۠AA"%a?WIz?@@yGz?X۠AyX۠AB. a?WIz?@@yGz?`l>X۠AyX۠A` g`?WIz?@@yGz?˛eܧ>X۠AyX۠Av*R`?WIz?@@yGz?:$>X۠AyX۠A:i>`?WIz?@@yGz?h!>X۠AyX۠AZ)`oة`?WIz?@@yGz?*D>X۠AyX۠Aٳ`?WIz?@@yGz?Y9g>X۠AyX۠A$yrz`?WIz?@@yGz?5>X۠AyX۠ASZ $c`?WIz?@@yGz?by>X۠AyX۠A 1L`?WIz?@@yGz?wXϨ>X۠AyX۠As J5`?WIz?@@yGz?Ai >X۠AyX۠A-`?WIz?@@yGz?FFZ>X۠AyX۠Ayao`?WIz?@@yGz?vKw7>X۠AyX۠A*e_?WIz?@@yGz?<,Z>X۠AyX۠An#_?WIz?@@yGz?.|>X۠AyX۠A T_?WIz?@@yGz?hW>X۠AyX۠A, 0#c_?WIz?@@yGz?3K©>X۠AyX۠A=8_?WIz?@@yGz?Dc>X۠AyX۠A#_?WIz?@@yGz?#>X۠AyX۠Aף^?WIz?@@yGz?"gi*>X۠AyX۠AI*^?WIz?@@yGz?M>X۠AyX۠A0n ^?WIz?@@yGz? o>X۠AyX۠Ak^?WIz?@@yGz?kP4>X۠AyX۠Ao+D^?WIz?@@yGz?x=>X۠AyX۠AV@c^?WIz?@@yGz?Iת>X۠AyX۠A h]?WIz?@@yGz?Iך>CX۠AyX۠A hm?]_9?@@yGz?%E}\>CX۠AyX۠A Tt4m?]_9?@@yGz?m_b>CX۠AyX۠AO^m?]_9?@@yGz?UB0>CX۠AyX۠A.M%Qm?]_9?@@yGz?*$>CX۠AyX۠A( l?]_9?@@yGz?f3>CX۠AyX۠A3=(l?]_9?@@yGz?tmx>CX۠AyX۠Aս?l?]_9?@@yGz?KGw׽>CX۠AyX۠A2 fk?]_9?@@yGz?*A>CX۠AyX۠Artk?]_9?@@yGz? H>CX۠AyX۠AȆʾvk?]_9?@@yGz?ct>CX۠AyX۠A 7>6k?]_9?@@yGz?˜Vӝ>CX۠AyX۠A#j?]_9?@@yGz?!!9>CX۠AyX۠AMuj?]_9?@@yGz?zS^>CX۠AyX۠A{j?]_9?@@yGz?X1>CX۠AyX۠A}?j?]_9?@@yGz?5>&>CX۠AyX۠A޿j?]_9?@@yGz?BÐ.>CX۠AyX۠A'Ipi?]_9?@@yGz?ʥs>CX۠AyX۠Acݑi?]_9?@@yGz?ZSd>CX۠AyX۠A1Yi?]_9?@@yGz?j>CX۠AyX۠Aם>^"i?]_9?@@yGz?B &">CX۠AyX۠A.h?]_9?@@yGz?;D>CX۠AyX۠A5Fh?]_9?@@yGz?k: g>CX۠AyX۠AI>`h?]_9?@@yGz?~:>CX۠AyX۠A+=Oh?]_9?@@yGz?ﬠ>CX۠AyX۠AiZVh?]_9?@@yGz?iݤϠ>CX۠AyX۠AKfg?]_9?@@yGz?(KY>CX۠AyX۠A]g?]_9?@@yGz?FX>CX۠AyX۠AsdZg?]_9?@@yGz?Ӱ7>CX۠AyX۠ArZg?]_9?@@yGz?"xZ>CX۠AyX۠A0,g?]_9?@@yGz?[-}>CX۠AyX۠A=4f?]_9?@@yGz?⟡>CX۠AyX۠ADEf?]_9?@@yGz?mEu¡>CX۠AyX۠A^[:Vf?]_9?@@yGz?t(gL>CX۠AyX۠AHGnmxf?]_9?@@yGz?JlX>CX۠AyX۠AJ6-Mf?]_9?@@yGz?ӰI*>CX۠AyX۠AQ!"f?]_9?@@yGz?&:kM>CX۠AyX۠Ame?]_9?@@yGz?29, p>CX۠AyX۠A[(=e?]_9?@@yGz?b}Ւ>CX۠AyX۠A|>|e?]_9?@@yGz?q>CX۠AyX۠ADCX۠AyX۠Ay1¼Ve?]_9?@@yGz?NI>CX۠AyX۠Av`/e?]_9?@@yGz?>CX۠AyX۠A]o@ e?]_9?@@yGz?*O]@>CX۠AyX۠AQfSd?]_9?@@yGz?~c>CX۠AyX۠AVߠd?]_9?@@yGz?ZDž>CX۠AyX۠Ad?]_9?@@yGz?uݞ|>CX۠AyX۠Ajtd?]_9?@@yGz? 1ˣ>CX۠AyX۠A](EPd?]_9?@@yGz?Q<'>CX۠AyX۠AO r-d?]_9?@@yGz?kk{>CX۠AyX۠Ab9 d?]_9?@@yGz?.lP3>CX۠AyX۠ATc?]_9?@@yGz?]V>CX۠AyX۠A8"c?]_9?@@yGz? 7Ox>CX۠AyX۠A͜c?]_9?@@yGz?x)|@o>CX۠AyX۠AF揇c?]_9?@@yGz?X1$>CX۠AyX۠Aw3nbc?]_9?@@yGz?U#>CX۠AyX۠A>^ Bc?]_9?@@yGz?ķH>CX۠AyX۠Aoۄ"c?]_9?@@yGz?2C&>CX۠AyX۠Adwdpc?]_9?@@yGz?H>CX۠AyX۠ADob?]_9?@@yGz?Fk>CX۠AyX۠ArEmb?]_9?@@yGz?xuYa>CX۠AyX۠A~b?]_9?@@yGz?ꤝ>CX۠AyX۠Akb?]_9?@@yGz?Yӥ>CX۠AyX۠A;Flb?]_9?@@yGz?&>CX۠AyX۠ABY)Ob?]_9?@@yGz?63j5>CX۠AyX۠AB}mh2b?]_9?@@yGz?b;>CX۠AyX۠Aeb?]_9?@@yGz?^>CX۠AyX۠Am>a?]_9?@@yGz?6rT>CX۠AyX۠AF8a?]_9?@@yGz?zc >CX۠AyX۠A"Ka?]_9?@@yGz?[ TƦ>CX۠AyX۠AVça?]_9?@@yGz?OFs>CX۠AyX۠A`Ia?]_9?@@yGz?:G7( >CX۠AyX۠A|Sra?]_9?@@yGz?(.>CX۠AyX۠AvVxXa?]_9?@@yGz?Q>CX۠AyX۠AƭNm>a?]_9?@@yGz?  Gt>CX۠AyX۠AA"%a?]_9?@@yGz?CX۠AyX۠AB. a?]_9?@@yGz?`l>CX۠AyX۠A` g`?]_9?@@yGz?̛eܧ>CX۠AyX۠Av*R`?]_9?@@yGz?:$>CX۠AyX۠A:i>`?]_9?@@yGz?h!>CX۠AyX۠AZ)`oة`?]_9?@@yGz?*D>CX۠AyX۠Aٳ`?]_9?@@yGz?Y9g>CX۠AyX۠A$yrz`?]_9?@@yGz?5>CX۠AyX۠ASZ $c`?]_9?@@yGz?by>CX۠AyX۠A 1L`?]_9?@@yGz?wXϨ>CX۠AyX۠As J5`?]_9?@@yGz?Ai >CX۠AyX۠A-`?]_9?@@yGz?FFZ>CX۠AyX۠Ayao`?]_9?@@yGz?vKw7>CX۠AyX۠A*e_?]_9?@@yGz?<,Z>CX۠AyX۠An#_?]_9?@@yGz?.|>CX۠AyX۠A T_?]_9?@@yGz?hW>CX۠AyX۠A, 0#c_?]_9?@@yGz?3K©>CX۠AyX۠A=8_?]_9?@@yGz?Ec>CX۠AyX۠A#_?]_9?@@yGz?#>CX۠AyX۠Aף^?]_9?@@yGz?"gi*>CX۠AyX۠AI*^?]_9?@@yGz?M>CX۠AyX۠A0n ^?]_9?@@yGz? o>CX۠AyX۠Ak^?]_9?@@yGz?lP4>CX۠AyX۠Ao+D^?]_9?@@yGz?x=>CX۠AyX۠AV@c^?]_9?@@yGz?Iת>CX۠AyX۠A h]?]_9?@@yGz?Iך>X۠AyX۠A hm?bGE?@@yGz?$E}\>X۠AyX۠A Tt4m?bGE?@@yGz?m_b>X۠AyX۠AO^m?bGE?@@yGz?UB0>X۠AyX۠A.M%Qm?bGE?@@yGz?*$>X۠AyX۠A( l?bGE?@@yGz?f3>X۠AyX۠A3=(l?bGE?@@yGz?umx>X۠AyX۠Aս?l?bGE?@@yGz?LGw׽>X۠AyX۠A2 fk?bGE?@@yGz?*A>X۠AyX۠Artk?bGE?@@yGz? H>X۠AyX۠AȆʾvk?bGE?@@yGz?ct>X۠AyX۠A 7>6k?bGE?@@yGz?˜Vӝ>X۠AyX۠A#j?bGE?@@yGz?!!9>X۠AyX۠AMuj?bGE?@@yGz?zS^>X۠AyX۠A{j?bGE?@@yGz?X1>X۠AyX۠A}?j?bGE?@@yGz?4>&>X۠AyX۠A޿j?bGE?@@yGz?BÐ.>X۠AyX۠A'Ipi?bGE?@@yGz?ʥs>X۠AyX۠Acݑi?bGE?@@yGz?ZSd>X۠AyX۠A1Yi?bGE?@@yGz?j>X۠AyX۠A֝>^"i?bGE?@@yGz?B &">X۠AyX۠A.h?bGE?@@yGz?;D>X۠AyX۠A5Fh?bGE?@@yGz?k: g>X۠AyX۠AI>`h?bGE?@@yGz?~:>X۠AyX۠A*=Oh?bGE?@@yGz?ﬠ>X۠AyX۠AiZVh?bGE?@@yGz?iݤϠ>X۠AyX۠AKfg?bGE?@@yGz?(KY>X۠AyX۠A]g?bGE?@@yGz?FX>X۠AyX۠AsdZg?bGE?@@yGz?Ӱ7>X۠AyX۠ArZg?bGE?@@yGz?"xZ>X۠AyX۠A~0,g?bGE?@@yGz?[-}>X۠AyX۠A =4f?bGE?@@yGz?⟡>X۠AyX۠ADEf?bGE?@@yGz?mEu¡>X۠AyX۠A^[:Vf?bGE?@@yGz?t(gL>X۠AyX۠AHGnmxf?bGE?@@yGz?JlX>X۠AyX۠AJ6-Mf?bGE?@@yGz?ӰI*>X۠AyX۠AQ!"f?bGE?@@yGz?&:kM>X۠AyX۠Ame?bGE?@@yGz?29, p>X۠AyX۠A[(=e?bGE?@@yGz?b}Ւ>X۠AyX۠A|>|e?bGE?@@yGz?q>X۠AyX۠ADX۠AyX۠Ay1¼Ve?bGE?@@yGz?NI>X۠AyX۠Aw`/e?bGE?@@yGz?>X۠AyX۠A]o@ e?bGE?@@yGz?*O]@>X۠AyX۠APfSd?bGE?@@yGz?~c>X۠AyX۠AVߠd?bGE?@@yGz?ZDž>X۠AyX۠Ad?bGE?@@yGz?tݞ|>X۠AyX۠Ajtd?bGE?@@yGz? 1ˣ>X۠AyX۠A](EPd?bGE?@@yGz?Q<'>X۠AyX۠AO r-d?bGE?@@yGz?kk{>X۠AyX۠Ab9 d?bGE?@@yGz?.lP3>X۠AyX۠ATc?bGE?@@yGz?]V>X۠AyX۠A8"c?bGE?@@yGz? 7Ox>X۠AyX۠A͜c?bGE?@@yGz?x)|@o>X۠AyX۠AG揇c?bGE?@@yGz?X1$>X۠AyX۠Av3nbc?bGE?@@yGz?T#>X۠AyX۠A?^ Bc?bGE?@@yGz?ŷH>X۠AyX۠Aoۄ"c?bGE?@@yGz?2C&>X۠AyX۠Adwdpc?bGE?@@yGz?H>X۠AyX۠ADob?bGE?@@yGz?Fk>X۠AyX۠ArEmb?bGE?@@yGz?xuYa>X۠AyX۠A~b?bGE?@@yGz?ꤝ>X۠AyX۠Ajb?bGE?@@yGz?Yӥ>X۠AyX۠A:Flb?bGE?@@yGz?&>X۠AyX۠ACY)Ob?bGE?@@yGz?63j5>X۠AyX۠AB}mh2b?bGE?@@yGz?b;>X۠AyX۠Aeb?bGE?@@yGz?^>X۠AyX۠Am>a?bGE?@@yGz?6rT>X۠AyX۠AF8a?bGE?@@yGz?zc >X۠AyX۠A"Ka?bGE?@@yGz?\ TƦ>X۠AyX۠AVça?bGE?@@yGz?OFs>X۠AyX۠A`Ia?bGE?@@yGz?:G7( >X۠AyX۠A|Sra?bGE?@@yGz?(.>X۠AyX۠AvVxXa?bGE?@@yGz?Q>X۠AyX۠AƭNm>a?bGE?@@yGz?  Gt>X۠AyX۠AA"%a?bGE?@@yGz?X۠AyX۠AB. a?bGE?@@yGz?`l>X۠AyX۠A` g`?bGE?@@yGz?˛eܧ>X۠AyX۠Av*R`?bGE?@@yGz?:$>X۠AyX۠A:i>`?bGE?@@yGz?h!>X۠AyX۠AZ)`oة`?bGE?@@yGz?*D>X۠AyX۠Aٳ`?bGE?@@yGz?Y9g>X۠AyX۠A$yrz`?bGE?@@yGz?5>X۠AyX۠ASZ $c`?bGE?@@yGz?by>X۠AyX۠A 1L`?bGE?@@yGz?wXϨ>X۠AyX۠As J5`?bGE?@@yGz?Ai >X۠AyX۠A-`?bGE?@@yGz?FFZ>X۠AyX۠Ayao`?bGE?@@yGz?vKw7>X۠AyX۠A*e_?bGE?@@yGz?<,Z>X۠AyX۠An#_?bGE?@@yGz?.|>X۠AyX۠A T_?bGE?@@yGz?hW>X۠AyX۠A, 0#c_?bGE?@@yGz?3K©>X۠AyX۠A=8_?bGE?@@yGz?Dc>X۠AyX۠A#_?bGE?@@yGz?#>X۠AyX۠Aף^?bGE?@@yGz?"gi*>X۠AyX۠AI*^?bGE?@@yGz?M>X۠AyX۠A0n ^?bGE?@@yGz? o>X۠AyX۠Ak^?bGE?@@yGz?kP4>X۠AyX۠Ao+D^?bGE?@@yGz?x=>X۠AyX۠AV@c^?bGE?@@yGz?Iת>X۠AyX۠A h]?bGE?@@yGz?Iך> 2X۠AyX۠A hm?h*?@@yGz?%E}\> 2X۠AyX۠A Tt4m?h*?@@yGz?m_b> 2X۠AyX۠AO^m?h*?@@yGz?UB0> 2X۠AyX۠A.M%Qm?h*?@@yGz?*$> 2X۠AyX۠A( l?h*?@@yGz?f3> 2X۠AyX۠A3=(l?h*?@@yGz?tmx> 2X۠AyX۠Aս?l?h*?@@yGz?KGw׽> 2X۠AyX۠A2 fk?h*?@@yGz?*A> 2X۠AyX۠Artk?h*?@@yGz? H> 2X۠AyX۠AȆʾvk?h*?@@yGz?ct> 2X۠AyX۠A 7>6k?h*?@@yGz?˜Vӝ> 2X۠AyX۠A#j?h*?@@yGz?!!9> 2X۠AyX۠AMuj?h*?@@yGz?zS^> 2X۠AyX۠A{j?h*?@@yGz?X1> 2X۠AyX۠A}?j?h*?@@yGz?5>&> 2X۠AyX۠A޿j?h*?@@yGz?BÐ.> 2X۠AyX۠A'Ipi?h*?@@yGz?ʥs> 2X۠AyX۠Acݑi?h*?@@yGz?ZSd> 2X۠AyX۠A1Yi?h*?@@yGz?j> 2X۠AyX۠Aם>^"i?h*?@@yGz?B &"> 2X۠AyX۠A.h?h*?@@yGz?;D> 2X۠AyX۠A5Fh?h*?@@yGz?k: g> 2X۠AyX۠AI>`h?h*?@@yGz?~:> 2X۠AyX۠A+=Oh?h*?@@yGz?ﬠ> 2X۠AyX۠AiZVh?h*?@@yGz?iݤϠ> 2X۠AyX۠AKfg?h*?@@yGz?(KY> 2X۠AyX۠A]g?h*?@@yGz?FX> 2X۠AyX۠AsdZg?h*?@@yGz?Ӱ7> 2X۠AyX۠ArZg?h*?@@yGz?"xZ> 2X۠AyX۠A0,g?h*?@@yGz?[-}> 2X۠AyX۠A=4f?h*?@@yGz?⟡> 2X۠AyX۠ADEf?h*?@@yGz?mEu¡> 2X۠AyX۠A^[:Vf?h*?@@yGz?t(gL> 2X۠AyX۠AHGnmxf?h*?@@yGz?JlX> 2X۠AyX۠AJ6-Mf?h*?@@yGz?ӰI*> 2X۠AyX۠AQ!"f?h*?@@yGz?&:kM> 2X۠AyX۠Ame?h*?@@yGz?29, p> 2X۠AyX۠A[(=e?h*?@@yGz?b}Ւ> 2X۠AyX۠A|>|e?h*?@@yGz?q> 2X۠AyX۠AD 2X۠AyX۠Ay1¼Ve?h*?@@yGz?NI> 2X۠AyX۠Av`/e?h*?@@yGz?> 2X۠AyX۠A]o@ e?h*?@@yGz?*O]@> 2X۠AyX۠AQfSd?h*?@@yGz?~c> 2X۠AyX۠AVߠd?h*?@@yGz?ZDž> 2X۠AyX۠Ad?h*?@@yGz?uݞ|> 2X۠AyX۠Ajtd?h*?@@yGz? 1ˣ> 2X۠AyX۠A](EPd?h*?@@yGz?Q<'> 2X۠AyX۠AO r-d?h*?@@yGz?kk{> 2X۠AyX۠Ab9 d?h*?@@yGz?.lP3> 2X۠AyX۠ATc?h*?@@yGz?]V> 2X۠AyX۠A8"c?h*?@@yGz? 7Ox> 2X۠AyX۠A͜c?h*?@@yGz?x)|@o> 2X۠AyX۠AF揇c?h*?@@yGz?X1$> 2X۠AyX۠Aw3nbc?h*?@@yGz?U#> 2X۠AyX۠A>^ Bc?h*?@@yGz?ķH> 2X۠AyX۠Aoۄ"c?h*?@@yGz?2C&> 2X۠AyX۠Adwdpc?h*?@@yGz?H> 2X۠AyX۠ADob?h*?@@yGz?Fk> 2X۠AyX۠ArEmb?h*?@@yGz?xuYa> 2X۠AyX۠A~b?h*?@@yGz?ꤝ> 2X۠AyX۠Akb?h*?@@yGz?Yӥ> 2X۠AyX۠A;Flb?h*?@@yGz?&> 2X۠AyX۠ABY)Ob?h*?@@yGz?63j5> 2X۠AyX۠AB}mh2b?h*?@@yGz?b;> 2X۠AyX۠Aeb?h*?@@yGz?^> 2X۠AyX۠Am>a?h*?@@yGz?6rT> 2X۠AyX۠AF8a?h*?@@yGz?zc > 2X۠AyX۠A"Ka?h*?@@yGz?[ TƦ> 2X۠AyX۠AVça?h*?@@yGz?OFs> 2X۠AyX۠A`Ia?h*?@@yGz?:G7( > 2X۠AyX۠A|Sra?h*?@@yGz?(.> 2X۠AyX۠AvVxXa?h*?@@yGz?Q> 2X۠AyX۠AƭNm>a?h*?@@yGz?  Gt> 2X۠AyX۠AA"%a?h*?@@yGz? 2X۠AyX۠AB. a?h*?@@yGz?`l> 2X۠AyX۠A` g`?h*?@@yGz?̛eܧ> 2X۠AyX۠Av*R`?h*?@@yGz?:$> 2X۠AyX۠A:i>`?h*?@@yGz?h!> 2X۠AyX۠AZ)`oة`?h*?@@yGz?*D> 2X۠AyX۠Aٳ`?h*?@@yGz?Y9g> 2X۠AyX۠A$yrz`?h*?@@yGz?5> 2X۠AyX۠ASZ $c`?h*?@@yGz?by> 2X۠AyX۠A 1L`?h*?@@yGz?wXϨ> 2X۠AyX۠As J5`?h*?@@yGz?Ai > 2X۠AyX۠A-`?h*?@@yGz?FFZ> 2X۠AyX۠Ayao`?h*?@@yGz?vKw7> 2X۠AyX۠A*e_?h*?@@yGz?<,Z> 2X۠AyX۠An#_?h*?@@yGz?.|> 2X۠AyX۠A T_?h*?@@yGz?hW> 2X۠AyX۠A, 0#c_?h*?@@yGz?3K©> 2X۠AyX۠A=8_?h*?@@yGz?Ec> 2X۠AyX۠A#_?h*?@@yGz?#> 2X۠AyX۠Aף^?h*?@@yGz?"gi*> 2X۠AyX۠AI*^?h*?@@yGz?M> 2X۠AyX۠A0n ^?h*?@@yGz? o> 2X۠AyX۠Ak^?h*?@@yGz?lP4> 2X۠AyX۠Ao+D^?h*?@@yGz?x=> 2X۠AyX۠AV@c^?h*?@@yGz?Iת> 2X۠AyX۠A h]?h*?@@yGz?Iך>X۠AyX۠A hm?n*F?@@yGz?$E}\>X۠AyX۠A Tt4m?n*F?@@yGz?m_b>X۠AyX۠AO^m?n*F?@@yGz?UB0>X۠AyX۠A.M%Qm?n*F?@@yGz?*$>X۠AyX۠A( l?n*F?@@yGz?f3>X۠AyX۠A3=(l?n*F?@@yGz?umx>X۠AyX۠Aս?l?n*F?@@yGz?LGw׽>X۠AyX۠A2 fk?n*F?@@yGz?*A>X۠AyX۠Artk?n*F?@@yGz? H>X۠AyX۠AȆʾvk?n*F?@@yGz?ct>X۠AyX۠A 7>6k?n*F?@@yGz?˜Vӝ>X۠AyX۠A#j?n*F?@@yGz?!!9>X۠AyX۠AMuj?n*F?@@yGz?zS^>X۠AyX۠A{j?n*F?@@yGz?X1>X۠AyX۠A}?j?n*F?@@yGz?4>&>X۠AyX۠A޿j?n*F?@@yGz?BÐ.>X۠AyX۠A'Ipi?n*F?@@yGz?ʥs>X۠AyX۠Acݑi?n*F?@@yGz?ZSd>X۠AyX۠A1Yi?n*F?@@yGz?j>X۠AyX۠A֝>^"i?n*F?@@yGz?B &">X۠AyX۠A.h?n*F?@@yGz?;D>X۠AyX۠A5Fh?n*F?@@yGz?k: g>X۠AyX۠AI>`h?n*F?@@yGz?~:>X۠AyX۠A*=Oh?n*F?@@yGz?ﬠ>X۠AyX۠AiZVh?n*F?@@yGz?iݤϠ>X۠AyX۠AKfg?n*F?@@yGz?(KY>X۠AyX۠A]g?n*F?@@yGz?FX>X۠AyX۠AsdZg?n*F?@@yGz?Ӱ7>X۠AyX۠ArZg?n*F?@@yGz?"xZ>X۠AyX۠A~0,g?n*F?@@yGz?[-}>X۠AyX۠A =4f?n*F?@@yGz?⟡>X۠AyX۠ADEf?n*F?@@yGz?mEu¡>X۠AyX۠A^[:Vf?n*F?@@yGz?t(gL>X۠AyX۠AHGnmxf?n*F?@@yGz?JlX>X۠AyX۠AJ6-Mf?n*F?@@yGz?ӰI*>X۠AyX۠AQ!"f?n*F?@@yGz?&:kM>X۠AyX۠Ame?n*F?@@yGz?29, p>X۠AyX۠A[(=e?n*F?@@yGz?b}Ւ>X۠AyX۠A|>|e?n*F?@@yGz?q>X۠AyX۠ADX۠AyX۠Ay1¼Ve?n*F?@@yGz?NI>X۠AyX۠Aw`/e?n*F?@@yGz?>X۠AyX۠A]o@ e?n*F?@@yGz?*O]@>X۠AyX۠APfSd?n*F?@@yGz?~c>X۠AyX۠AVߠd?n*F?@@yGz?ZDž>X۠AyX۠Ad?n*F?@@yGz?tݞ|>X۠AyX۠Ajtd?n*F?@@yGz? 1ˣ>X۠AyX۠A](EPd?n*F?@@yGz?Q<'>X۠AyX۠AO r-d?n*F?@@yGz?kk{>X۠AyX۠Ab9 d?n*F?@@yGz?.lP3>X۠AyX۠ATc?n*F?@@yGz?]V>X۠AyX۠A8"c?n*F?@@yGz? 7Ox>X۠AyX۠A͜c?n*F?@@yGz?x)|@o>X۠AyX۠AG揇c?n*F?@@yGz?X1$>X۠AyX۠Av3nbc?n*F?@@yGz?T#>X۠AyX۠A?^ Bc?n*F?@@yGz?ŷH>X۠AyX۠Aoۄ"c?n*F?@@yGz?2C&>X۠AyX۠Adwdpc?n*F?@@yGz?H>X۠AyX۠ADob?n*F?@@yGz?Fk>X۠AyX۠ArEmb?n*F?@@yGz?xuYa>X۠AyX۠A~b?n*F?@@yGz?ꤝ>X۠AyX۠Ajb?n*F?@@yGz?Yӥ>X۠AyX۠A:Flb?n*F?@@yGz?&>X۠AyX۠ACY)Ob?n*F?@@yGz?63j5>X۠AyX۠AB}mh2b?n*F?@@yGz?b;>X۠AyX۠Aeb?n*F?@@yGz?^>X۠AyX۠Am>a?n*F?@@yGz?6rT>X۠AyX۠AF8a?n*F?@@yGz?zc >X۠AyX۠A"Ka?n*F?@@yGz?\ TƦ>X۠AyX۠AVça?n*F?@@yGz?OFs>X۠AyX۠A`Ia?n*F?@@yGz?:G7( >X۠AyX۠A|Sra?n*F?@@yGz?(.>X۠AyX۠AvVxXa?n*F?@@yGz?Q>X۠AyX۠AƭNm>a?n*F?@@yGz?  Gt>X۠AyX۠AA"%a?n*F?@@yGz?X۠AyX۠AB. a?n*F?@@yGz?`l>X۠AyX۠A` g`?n*F?@@yGz?˛eܧ>X۠AyX۠Av*R`?n*F?@@yGz?:$>X۠AyX۠A:i>`?n*F?@@yGz?h!>X۠AyX۠AZ)`oة`?n*F?@@yGz?*D>X۠AyX۠Aٳ`?n*F?@@yGz?Y9g>X۠AyX۠A$yrz`?n*F?@@yGz?5>X۠AyX۠ASZ $c`?n*F?@@yGz?by>X۠AyX۠A 1L`?n*F?@@yGz?wXϨ>X۠AyX۠As J5`?n*F?@@yGz?Ai >X۠AyX۠A-`?n*F?@@yGz?FFZ>X۠AyX۠Ayao`?n*F?@@yGz?vKw7>X۠AyX۠A*e_?n*F?@@yGz?<,Z>X۠AyX۠An#_?n*F?@@yGz?.|>X۠AyX۠A T_?n*F?@@yGz?hW>X۠AyX۠A, 0#c_?n*F?@@yGz?3K©>X۠AyX۠A=8_?n*F?@@yGz?Dc>X۠AyX۠A#_?n*F?@@yGz?#>X۠AyX۠Aף^?n*F?@@yGz?"gi*>X۠AyX۠AI*^?n*F?@@yGz?M>X۠AyX۠A0n ^?n*F?@@yGz? o>X۠AyX۠Ak^?n*F?@@yGz?kP4>X۠AyX۠Ao+D^?n*F?@@yGz?x=>X۠AyX۠AV@c^?n*F?@@yGz?Iת>X۠AyX۠A h]?n*F?@@yGz?Iך>' X۠AyX۠A hm?sMy?@@yGz?%E}\>' X۠AyX۠A Tt4m?sMy?@@yGz?m_b>' X۠AyX۠AO^m?sMy?@@yGz?UB0>' X۠AyX۠A.M%Qm?sMy?@@yGz?*$>' X۠AyX۠A( l?sMy?@@yGz?f3>' X۠AyX۠A3=(l?sMy?@@yGz?tmx>' X۠AyX۠Aս?l?sMy?@@yGz?KGw׽>' X۠AyX۠A2 fk?sMy?@@yGz?*A>' X۠AyX۠Artk?sMy?@@yGz? H>' X۠AyX۠AȆʾvk?sMy?@@yGz?ct>' X۠AyX۠A 7>6k?sMy?@@yGz?˜Vӝ>' X۠AyX۠A#j?sMy?@@yGz?!!9>' X۠AyX۠AMuj?sMy?@@yGz?zS^>' X۠AyX۠A{j?sMy?@@yGz?X1>' X۠AyX۠A}?j?sMy?@@yGz?5>&>' X۠AyX۠A޿j?sMy?@@yGz?BÐ.>' X۠AyX۠A'Ipi?sMy?@@yGz?ʥs>' X۠AyX۠Acݑi?sMy?@@yGz?ZSd>' X۠AyX۠A1Yi?sMy?@@yGz?j>' X۠AyX۠Aם>^"i?sMy?@@yGz?B &">' X۠AyX۠A.h?sMy?@@yGz?;D>' X۠AyX۠A5Fh?sMy?@@yGz?k: g>' X۠AyX۠AI>`h?sMy?@@yGz?~:>' X۠AyX۠A+=Oh?sMy?@@yGz?ﬠ>' X۠AyX۠AiZVh?sMy?@@yGz?iݤϠ>' X۠AyX۠AKfg?sMy?@@yGz?(KY>' X۠AyX۠A]g?sMy?@@yGz?FX>' X۠AyX۠AsdZg?sMy?@@yGz?Ӱ7>' X۠AyX۠ArZg?sMy?@@yGz?"xZ>' X۠AyX۠A0,g?sMy?@@yGz?[-}>' X۠AyX۠A=4f?sMy?@@yGz?⟡>' X۠AyX۠ADEf?sMy?@@yGz?mEu¡>' X۠AyX۠A^[:Vf?sMy?@@yGz?t(gL>' X۠AyX۠AHGnmxf?sMy?@@yGz?JlX>' X۠AyX۠AJ6-Mf?sMy?@@yGz?ӰI*>' X۠AyX۠AQ!"f?sMy?@@yGz?&:kM>' X۠AyX۠Ame?sMy?@@yGz?29, p>' X۠AyX۠A[(=e?sMy?@@yGz?b}Ւ>' X۠AyX۠A|>|e?sMy?@@yGz?q>' X۠AyX۠AD' X۠AyX۠Ay1¼Ve?sMy?@@yGz?NI>' X۠AyX۠Av`/e?sMy?@@yGz?>' X۠AyX۠A]o@ e?sMy?@@yGz?*O]@>' X۠AyX۠AQfSd?sMy?@@yGz?~c>' X۠AyX۠AVߠd?sMy?@@yGz?ZDž>' X۠AyX۠Ad?sMy?@@yGz?uݞ|>' X۠AyX۠Ajtd?sMy?@@yGz? 1ˣ>' X۠AyX۠A](EPd?sMy?@@yGz?Q<'>' X۠AyX۠AO r-d?sMy?@@yGz?kk{>' X۠AyX۠Ab9 d?sMy?@@yGz?.lP3>' X۠AyX۠ATc?sMy?@@yGz?]V>' X۠AyX۠A8"c?sMy?@@yGz? 7Ox>' X۠AyX۠A͜c?sMy?@@yGz?x)|@o>' X۠AyX۠AF揇c?sMy?@@yGz?X1$>' X۠AyX۠Aw3nbc?sMy?@@yGz?U#>' X۠AyX۠A>^ Bc?sMy?@@yGz?ķH>' X۠AyX۠Aoۄ"c?sMy?@@yGz?2C&>' X۠AyX۠Adwdpc?sMy?@@yGz?H>' X۠AyX۠ADob?sMy?@@yGz?Fk>' X۠AyX۠ArEmb?sMy?@@yGz?xuYa>' X۠AyX۠A~b?sMy?@@yGz?ꤝ>' X۠AyX۠Akb?sMy?@@yGz?Yӥ>' X۠AyX۠A;Flb?sMy?@@yGz?&>' X۠AyX۠ABY)Ob?sMy?@@yGz?63j5>' X۠AyX۠AB}mh2b?sMy?@@yGz?b;>' X۠AyX۠Aeb?sMy?@@yGz?^>' X۠AyX۠Am>a?sMy?@@yGz?6rT>' X۠AyX۠AF8a?sMy?@@yGz?zc >' X۠AyX۠A"Ka?sMy?@@yGz?[ TƦ>' X۠AyX۠AVça?sMy?@@yGz?OFs>' X۠AyX۠A`Ia?sMy?@@yGz?:G7( >' X۠AyX۠A|Sra?sMy?@@yGz?(.>' X۠AyX۠AvVxXa?sMy?@@yGz?Q>' X۠AyX۠AƭNm>a?sMy?@@yGz?  Gt>' X۠AyX۠AA"%a?sMy?@@yGz?' X۠AyX۠AB. a?sMy?@@yGz?`l>' X۠AyX۠A` g`?sMy?@@yGz?̛eܧ>' X۠AyX۠Av*R`?sMy?@@yGz?:$>' X۠AyX۠A:i>`?sMy?@@yGz?h!>' X۠AyX۠AZ)`oة`?sMy?@@yGz?*D>' X۠AyX۠Aٳ`?sMy?@@yGz?Y9g>' X۠AyX۠A$yrz`?sMy?@@yGz?5>' X۠AyX۠ASZ $c`?sMy?@@yGz?by>' X۠AyX۠A 1L`?sMy?@@yGz?wXϨ>' X۠AyX۠As J5`?sMy?@@yGz?Ai >' X۠AyX۠A-`?sMy?@@yGz?FFZ>' X۠AyX۠Ayao`?sMy?@@yGz?vKw7>' X۠AyX۠A*e_?sMy?@@yGz?<,Z>' X۠AyX۠An#_?sMy?@@yGz?.|>' X۠AyX۠A T_?sMy?@@yGz?hW>' X۠AyX۠A, 0#c_?sMy?@@yGz?3K©>' X۠AyX۠A=8_?sMy?@@yGz?Ec>' X۠AyX۠A#_?sMy?@@yGz?#>' X۠AyX۠Aף^?sMy?@@yGz?"gi*>' X۠AyX۠AI*^?sMy?@@yGz?M>' X۠AyX۠A0n ^?sMy?@@yGz? o>' X۠AyX۠Ak^?sMy?@@yGz?lP4>' X۠AyX۠Ao+D^?sMy?@@yGz?x=>' X۠AyX۠AV@c^?sMy?@@yGz?Iת>' X۠AyX۠A h]?sMy?@@yGz?Iך>4X۠AyX۠A hm?xpDma?@@yGz?$E}\>4X۠AyX۠A Tt4m?xpDma?@@yGz?m_b>4X۠AyX۠AO^m?xpDma?@@yGz?UB0>4X۠AyX۠A.M%Qm?xpDma?@@yGz?*$>4X۠AyX۠A( l?xpDma?@@yGz?f3>4X۠AyX۠A3=(l?xpDma?@@yGz?umx>4X۠AyX۠Aս?l?xpDma?@@yGz?LGw׽>4X۠AyX۠A2 fk?xpDma?@@yGz?*A>4X۠AyX۠Artk?xpDma?@@yGz? H>4X۠AyX۠AȆʾvk?xpDma?@@yGz?ct>4X۠AyX۠A 7>6k?xpDma?@@yGz?˜Vӝ>4X۠AyX۠A#j?xpDma?@@yGz?!!9>4X۠AyX۠AMuj?xpDma?@@yGz?zS^>4X۠AyX۠A{j?xpDma?@@yGz?X1>4X۠AyX۠A}?j?xpDma?@@yGz?4>&>4X۠AyX۠A޿j?xpDma?@@yGz?BÐ.>4X۠AyX۠A'Ipi?xpDma?@@yGz?ʥs>4X۠AyX۠Acݑi?xpDma?@@yGz?ZSd>4X۠AyX۠A1Yi?xpDma?@@yGz?j>4X۠AyX۠A֝>^"i?xpDma?@@yGz?B &">4X۠AyX۠A.h?xpDma?@@yGz?;D>4X۠AyX۠A5Fh?xpDma?@@yGz?k: g>4X۠AyX۠AI>`h?xpDma?@@yGz?~:>4X۠AyX۠A*=Oh?xpDma?@@yGz?ﬠ>4X۠AyX۠AiZVh?xpDma?@@yGz?iݤϠ>4X۠AyX۠AKfg?xpDma?@@yGz?(KY>4X۠AyX۠A]g?xpDma?@@yGz?FX>4X۠AyX۠AsdZg?xpDma?@@yGz?Ӱ7>4X۠AyX۠ArZg?xpDma?@@yGz?"xZ>4X۠AyX۠A~0,g?xpDma?@@yGz?[-}>4X۠AyX۠A =4f?xpDma?@@yGz?⟡>4X۠AyX۠ADEf?xpDma?@@yGz?mEu¡>4X۠AyX۠A^[:Vf?xpDma?@@yGz?t(gL>4X۠AyX۠AHGnmxf?xpDma?@@yGz?JlX>4X۠AyX۠AJ6-Mf?xpDma?@@yGz?ӰI*>4X۠AyX۠AQ!"f?xpDma?@@yGz?&:kM>4X۠AyX۠Ame?xpDma?@@yGz?29, p>4X۠AyX۠A[(=e?xpDma?@@yGz?b}Ւ>4X۠AyX۠A|>|e?xpDma?@@yGz?q>4X۠AyX۠AD4X۠AyX۠Ay1¼Ve?xpDma?@@yGz?NI>4X۠AyX۠Aw`/e?xpDma?@@yGz?>4X۠AyX۠A]o@ e?xpDma?@@yGz?*O]@>4X۠AyX۠APfSd?xpDma?@@yGz?~c>4X۠AyX۠AVߠd?xpDma?@@yGz?ZDž>4X۠AyX۠Ad?xpDma?@@yGz?tݞ|>4X۠AyX۠Ajtd?xpDma?@@yGz? 1ˣ>4X۠AyX۠A](EPd?xpDma?@@yGz?Q<'>4X۠AyX۠AO r-d?xpDma?@@yGz?kk{>4X۠AyX۠Ab9 d?xpDma?@@yGz?.lP3>4X۠AyX۠ATc?xpDma?@@yGz?]V>4X۠AyX۠A8"c?xpDma?@@yGz? 7Ox>4X۠AyX۠A͜c?xpDma?@@yGz?x)|@o>4X۠AyX۠AG揇c?xpDma?@@yGz?X1$>4X۠AyX۠Av3nbc?xpDma?@@yGz?T#>4X۠AyX۠A?^ Bc?xpDma?@@yGz?ŷH>4X۠AyX۠Aoۄ"c?xpDma?@@yGz?2C&>4X۠AyX۠Adwdpc?xpDma?@@yGz?H>4X۠AyX۠ADob?xpDma?@@yGz?Fk>4X۠AyX۠ArEmb?xpDma?@@yGz?xuYa>4X۠AyX۠A~b?xpDma?@@yGz?ꤝ>4X۠AyX۠Ajb?xpDma?@@yGz?Yӥ>4X۠AyX۠A:Flb?xpDma?@@yGz?&>4X۠AyX۠ACY)Ob?xpDma?@@yGz?63j5>4X۠AyX۠AB}mh2b?xpDma?@@yGz?b;>4X۠AyX۠Aeb?xpDma?@@yGz?^>4X۠AyX۠Am>a?xpDma?@@yGz?6rT>4X۠AyX۠AF8a?xpDma?@@yGz?zc >4X۠AyX۠A"Ka?xpDma?@@yGz?\ TƦ>4X۠AyX۠AVça?xpDma?@@yGz?OFs>4X۠AyX۠A`Ia?xpDma?@@yGz?:G7( >4X۠AyX۠A|Sra?xpDma?@@yGz?(.>4X۠AyX۠AvVxXa?xpDma?@@yGz?Q>4X۠AyX۠AƭNm>a?xpDma?@@yGz?  Gt>4X۠AyX۠AA"%a?xpDma?@@yGz?4X۠AyX۠AB. a?xpDma?@@yGz?`l>4X۠AyX۠A` g`?xpDma?@@yGz?˛eܧ>4X۠AyX۠Av*R`?xpDma?@@yGz?:$>4X۠AyX۠A:i>`?xpDma?@@yGz?h!>4X۠AyX۠AZ)`oة`?xpDma?@@yGz?*D>4X۠AyX۠Aٳ`?xpDma?@@yGz?Y9g>4X۠AyX۠A$yrz`?xpDma?@@yGz?5>4X۠AyX۠ASZ $c`?xpDma?@@yGz?by>4X۠AyX۠A 1L`?xpDma?@@yGz?wXϨ>4X۠AyX۠As J5`?xpDma?@@yGz?Ai >4X۠AyX۠A-`?xpDma?@@yGz?FFZ>4X۠AyX۠Ayao`?xpDma?@@yGz?vKw7>4X۠AyX۠A*e_?xpDma?@@yGz?<,Z>4X۠AyX۠An#_?xpDma?@@yGz?.|>4X۠AyX۠A T_?xpDma?@@yGz?hW>4X۠AyX۠A, 0#c_?xpDma?@@yGz?3K©>4X۠AyX۠A=8_?xpDma?@@yGz?Dc>4X۠AyX۠A#_?xpDma?@@yGz?#>4X۠AyX۠Aף^?xpDma?@@yGz?"gi*>4X۠AyX۠AI*^?xpDma?@@yGz?M>4X۠AyX۠A0n ^?xpDma?@@yGz? o>4X۠AyX۠Ak^?xpDma?@@yGz?kP4>4X۠AyX۠Ao+D^?xpDma?@@yGz?x=>4X۠AyX۠AV@c^?xpDma?@@yGz?Iת>4X۠AyX۠A h]?xpDma?@@yGz?Iך>AX۠AyX۠A hm?}H?@@yGz?%E}\>AX۠AyX۠A Tt4m?}H?@@yGz?m_b>AX۠AyX۠AO^m?}H?@@yGz?UB0>AX۠AyX۠A.M%Qm?}H?@@yGz?*$>AX۠AyX۠A( l?}H?@@yGz?f3>AX۠AyX۠A3=(l?}H?@@yGz?tmx>AX۠AyX۠Aս?l?}H?@@yGz?KGw׽>AX۠AyX۠A2 fk?}H?@@yGz?*A>AX۠AyX۠Artk?}H?@@yGz? H>AX۠AyX۠AȆʾvk?}H?@@yGz?ct>AX۠AyX۠A 7>6k?}H?@@yGz?˜Vӝ>AX۠AyX۠A#j?}H?@@yGz?!!9>AX۠AyX۠AMuj?}H?@@yGz?zS^>AX۠AyX۠A{j?}H?@@yGz?X1>AX۠AyX۠A}?j?}H?@@yGz?5>&>AX۠AyX۠A޿j?}H?@@yGz?BÐ.>AX۠AyX۠A'Ipi?}H?@@yGz?ʥs>AX۠AyX۠Acݑi?}H?@@yGz?ZSd>AX۠AyX۠A1Yi?}H?@@yGz?j>AX۠AyX۠Aם>^"i?}H?@@yGz?B &">AX۠AyX۠A.h?}H?@@yGz?;D>AX۠AyX۠A5Fh?}H?@@yGz?k: g>AX۠AyX۠AI>`h?}H?@@yGz?~:>AX۠AyX۠A+=Oh?}H?@@yGz?ﬠ>AX۠AyX۠AiZVh?}H?@@yGz?iݤϠ>AX۠AyX۠AKfg?}H?@@yGz?(KY>AX۠AyX۠A]g?}H?@@yGz?FX>AX۠AyX۠AsdZg?}H?@@yGz?Ӱ7>AX۠AyX۠ArZg?}H?@@yGz?"xZ>AX۠AyX۠A0,g?}H?@@yGz?[-}>AX۠AyX۠A=4f?}H?@@yGz?⟡>AX۠AyX۠ADEf?}H?@@yGz?mEu¡>AX۠AyX۠A^[:Vf?}H?@@yGz?t(gL>AX۠AyX۠AHGnmxf?}H?@@yGz?JlX>AX۠AyX۠AJ6-Mf?}H?@@yGz?ӰI*>AX۠AyX۠AQ!"f?}H?@@yGz?&:kM>AX۠AyX۠Ame?}H?@@yGz?29, p>AX۠AyX۠A[(=e?}H?@@yGz?b}Ւ>AX۠AyX۠A|>|e?}H?@@yGz?q>AX۠AyX۠ADAX۠AyX۠Ay1¼Ve?}H?@@yGz?NI>AX۠AyX۠Av`/e?}H?@@yGz?>AX۠AyX۠A]o@ e?}H?@@yGz?*O]@>AX۠AyX۠AQfSd?}H?@@yGz?~c>AX۠AyX۠AVߠd?}H?@@yGz?ZDž>AX۠AyX۠Ad?}H?@@yGz?uݞ|>AX۠AyX۠Ajtd?}H?@@yGz? 1ˣ>AX۠AyX۠A](EPd?}H?@@yGz?Q<'>AX۠AyX۠AO r-d?}H?@@yGz?kk{>AX۠AyX۠Ab9 d?}H?@@yGz?.lP3>AX۠AyX۠ATc?}H?@@yGz?]V>AX۠AyX۠A8"c?}H?@@yGz? 7Ox>AX۠AyX۠A͜c?}H?@@yGz?x)|@o>AX۠AyX۠AF揇c?}H?@@yGz?X1$>AX۠AyX۠Aw3nbc?}H?@@yGz?U#>AX۠AyX۠A>^ Bc?}H?@@yGz?ķH>AX۠AyX۠Aoۄ"c?}H?@@yGz?2C&>AX۠AyX۠Adwdpc?}H?@@yGz?H>AX۠AyX۠ADob?}H?@@yGz?Fk>AX۠AyX۠ArEmb?}H?@@yGz?xuYa>AX۠AyX۠A~b?}H?@@yGz?ꤝ>AX۠AyX۠Akb?}H?@@yGz?Yӥ>AX۠AyX۠A;Flb?}H?@@yGz?&>AX۠AyX۠ABY)Ob?}H?@@yGz?63j5>AX۠AyX۠AB}mh2b?}H?@@yGz?b;>AX۠AyX۠Aeb?}H?@@yGz?^>AX۠AyX۠Am>a?}H?@@yGz?6rT>AX۠AyX۠AF8a?}H?@@yGz?zc >AX۠AyX۠A"Ka?}H?@@yGz?[ TƦ>AX۠AyX۠AVça?}H?@@yGz?OFs>AX۠AyX۠A`Ia?}H?@@yGz?:G7( >AX۠AyX۠A|Sra?}H?@@yGz?(.>AX۠AyX۠AvVxXa?}H?@@yGz?Q>AX۠AyX۠AƭNm>a?}H?@@yGz?  Gt>AX۠AyX۠AA"%a?}H?@@yGz?AX۠AyX۠AB. a?}H?@@yGz?`l>AX۠AyX۠A` g`?}H?@@yGz?̛eܧ>AX۠AyX۠Av*R`?}H?@@yGz?:$>AX۠AyX۠A:i>`?}H?@@yGz?h!>AX۠AyX۠AZ)`oة`?}H?@@yGz?*D>AX۠AyX۠Aٳ`?}H?@@yGz?Y9g>AX۠AyX۠A$yrz`?}H?@@yGz?5>AX۠AyX۠ASZ $c`?}H?@@yGz?by>AX۠AyX۠A 1L`?}H?@@yGz?wXϨ>AX۠AyX۠As J5`?}H?@@yGz?Ai >AX۠AyX۠A-`?}H?@@yGz?FFZ>AX۠AyX۠Ayao`?}H?@@yGz?vKw7>AX۠AyX۠A*e_?}H?@@yGz?<,Z>AX۠AyX۠An#_?}H?@@yGz?.|>AX۠AyX۠A T_?}H?@@yGz?hW>AX۠AyX۠A, 0#c_?}H?@@yGz?3K©>AX۠AyX۠A=8_?}H?@@yGz?Ec>AX۠AyX۠A#_?}H?@@yGz?#>AX۠AyX۠Aף^?}H?@@yGz?"gi*>AX۠AyX۠AI*^?}H?@@yGz?M>AX۠AyX۠A0n ^?}H?@@yGz? o>AX۠AyX۠Ak^?}H?@@yGz?lP4>AX۠AyX۠Ao+D^?}H?@@yGz?x=>AX۠AyX۠AV@c^?}H?@@yGz?Iת>AX۠AyX۠A h]?}H?@@yGz?Iך>O X۠AyX۠A hm?BO0?@@yGz?$E}\>O X۠AyX۠A Tt4m?BO0?@@yGz?m_b>O X۠AyX۠AO^m?BO0?@@yGz?UB0>O X۠AyX۠A.M%Qm?BO0?@@yGz?*$>O X۠AyX۠A( l?BO0?@@yGz?f3>O X۠AyX۠A3=(l?BO0?@@yGz?umx>O X۠AyX۠Aս?l?BO0?@@yGz?LGw׽>O X۠AyX۠A2 fk?BO0?@@yGz?*A>O X۠AyX۠Artk?BO0?@@yGz? H>O X۠AyX۠AȆʾvk?BO0?@@yGz?ct>O X۠AyX۠A 7>6k?BO0?@@yGz?˜Vӝ>O X۠AyX۠A#j?BO0?@@yGz?!!9>O X۠AyX۠AMuj?BO0?@@yGz?zS^>O X۠AyX۠A{j?BO0?@@yGz?X1>O X۠AyX۠A}?j?BO0?@@yGz?4>&>O X۠AyX۠A޿j?BO0?@@yGz?BÐ.>O X۠AyX۠A'Ipi?BO0?@@yGz?ʥs>O X۠AyX۠Acݑi?BO0?@@yGz?ZSd>O X۠AyX۠A1Yi?BO0?@@yGz?j>O X۠AyX۠A֝>^"i?BO0?@@yGz?B &">O X۠AyX۠A.h?BO0?@@yGz?;D>O X۠AyX۠A5Fh?BO0?@@yGz?k: g>O X۠AyX۠AI>`h?BO0?@@yGz?~:>O X۠AyX۠A*=Oh?BO0?@@yGz?ﬠ>O X۠AyX۠AiZVh?BO0?@@yGz?iݤϠ>O X۠AyX۠AKfg?BO0?@@yGz?(KY>O X۠AyX۠A]g?BO0?@@yGz?FX>O X۠AyX۠AsdZg?BO0?@@yGz?Ӱ7>O X۠AyX۠ArZg?BO0?@@yGz?"xZ>O X۠AyX۠A~0,g?BO0?@@yGz?[-}>O X۠AyX۠A =4f?BO0?@@yGz?⟡>O X۠AyX۠ADEf?BO0?@@yGz?mEu¡>O X۠AyX۠A^[:Vf?BO0?@@yGz?t(gL>O X۠AyX۠AHGnmxf?BO0?@@yGz?JlX>O X۠AyX۠AJ6-Mf?BO0?@@yGz?ӰI*>O X۠AyX۠AQ!"f?BO0?@@yGz?&:kM>O X۠AyX۠Ame?BO0?@@yGz?29, p>O X۠AyX۠A[(=e?BO0?@@yGz?b}Ւ>O X۠AyX۠A|>|e?BO0?@@yGz?q>O X۠AyX۠ADO X۠AyX۠Ay1¼Ve?BO0?@@yGz?NI>O X۠AyX۠Aw`/e?BO0?@@yGz?>O X۠AyX۠A]o@ e?BO0?@@yGz?*O]@>O X۠AyX۠APfSd?BO0?@@yGz?~c>O X۠AyX۠AVߠd?BO0?@@yGz?ZDž>O X۠AyX۠Ad?BO0?@@yGz?tݞ|>O X۠AyX۠Ajtd?BO0?@@yGz? 1ˣ>O X۠AyX۠A](EPd?BO0?@@yGz?Q<'>O X۠AyX۠AO r-d?BO0?@@yGz?kk{>O X۠AyX۠Ab9 d?BO0?@@yGz?.lP3>O X۠AyX۠ATc?BO0?@@yGz?]V>O X۠AyX۠A8"c?BO0?@@yGz? 7Ox>O X۠AyX۠A͜c?BO0?@@yGz?x)|@o>O X۠AyX۠AG揇c?BO0?@@yGz?X1$>O X۠AyX۠Av3nbc?BO0?@@yGz?T#>O X۠AyX۠A?^ Bc?BO0?@@yGz?ŷH>O X۠AyX۠Aoۄ"c?BO0?@@yGz?2C&>O X۠AyX۠Adwdpc?BO0?@@yGz?H>O X۠AyX۠ADob?BO0?@@yGz?Fk>O X۠AyX۠ArEmb?BO0?@@yGz?xuYa>O X۠AyX۠A~b?BO0?@@yGz?ꤝ>O X۠AyX۠Ajb?BO0?@@yGz?Yӥ>O X۠AyX۠A:Flb?BO0?@@yGz?&>O X۠AyX۠ACY)Ob?BO0?@@yGz?63j5>O X۠AyX۠AB}mh2b?BO0?@@yGz?b;>O X۠AyX۠Aeb?BO0?@@yGz?^>O X۠AyX۠Am>a?BO0?@@yGz?6rT>O X۠AyX۠AF8a?BO0?@@yGz?zc >O X۠AyX۠A"Ka?BO0?@@yGz?\ TƦ>O X۠AyX۠AVça?BO0?@@yGz?OFs>O X۠AyX۠A`Ia?BO0?@@yGz?:G7( >O X۠AyX۠A|Sra?BO0?@@yGz?(.>O X۠AyX۠AvVxXa?BO0?@@yGz?Q>O X۠AyX۠AƭNm>a?BO0?@@yGz?  Gt>O X۠AyX۠AA"%a?BO0?@@yGz?O X۠AyX۠AB. a?BO0?@@yGz?`l>O X۠AyX۠A` g`?BO0?@@yGz?˛eܧ>O X۠AyX۠Av*R`?BO0?@@yGz?:$>O X۠AyX۠A:i>`?BO0?@@yGz?h!>O X۠AyX۠AZ)`oة`?BO0?@@yGz?*D>O X۠AyX۠Aٳ`?BO0?@@yGz?Y9g>O X۠AyX۠A$yrz`?BO0?@@yGz?5>O X۠AyX۠ASZ $c`?BO0?@@yGz?by>O X۠AyX۠A 1L`?BO0?@@yGz?wXϨ>O X۠AyX۠As J5`?BO0?@@yGz?Ai >O X۠AyX۠A-`?BO0?@@yGz?FFZ>O X۠AyX۠Ayao`?BO0?@@yGz?vKw7>O X۠AyX۠A*e_?BO0?@@yGz?<,Z>O X۠AyX۠An#_?BO0?@@yGz?.|>O X۠AyX۠A T_?BO0?@@yGz?hW>O X۠AyX۠A, 0#c_?BO0?@@yGz?3K©>O X۠AyX۠A=8_?BO0?@@yGz?Dc>O X۠AyX۠A#_?BO0?@@yGz?#>O X۠AyX۠Aף^?BO0?@@yGz?"gi*>O X۠AyX۠AI*^?BO0?@@yGz?M>O X۠AyX۠A0n ^?BO0?@@yGz? o>O X۠AyX۠Ak^?BO0?@@yGz?kP4>O X۠AyX۠Ao+D^?BO0?@@yGz?x=>O X۠AyX۠AV@c^?BO0?@@yGz?Iת>O X۠AyX۠A h]?BO0?@@yGz?Iך>\ X۠AyX۠A hm??@@yGz?%E}\>\ X۠AyX۠A Tt4m??@@yGz?m_b>\ X۠AyX۠AO^m??@@yGz?UB0>\ X۠AyX۠A.M%Qm??@@yGz?*$>\ X۠AyX۠A( l??@@yGz?f3>\ X۠AyX۠A3=(l??@@yGz?tmx>\ X۠AyX۠Aս?l??@@yGz?KGw׽>\ X۠AyX۠A2 fk??@@yGz?*A>\ X۠AyX۠Artk??@@yGz? H>\ X۠AyX۠AȆʾvk??@@yGz?ct>\ X۠AyX۠A 7>6k??@@yGz?˜Vӝ>\ X۠AyX۠A#j??@@yGz?!!9>\ X۠AyX۠AMuj??@@yGz?zS^>\ X۠AyX۠A{j??@@yGz?X1>\ X۠AyX۠A}?j??@@yGz?5>&>\ X۠AyX۠A޿j??@@yGz?BÐ.>\ X۠AyX۠A'Ipi??@@yGz?ʥs>\ X۠AyX۠Acݑi??@@yGz?ZSd>\ X۠AyX۠A1Yi??@@yGz?j>\ X۠AyX۠Aם>^"i??@@yGz?B &">\ X۠AyX۠A.h??@@yGz?;D>\ X۠AyX۠A5Fh??@@yGz?k: g>\ X۠AyX۠AI>`h??@@yGz?~:>\ X۠AyX۠A+=Oh??@@yGz?ﬠ>\ X۠AyX۠AiZVh??@@yGz?iݤϠ>\ X۠AyX۠AKfg??@@yGz?(KY>\ X۠AyX۠A]g??@@yGz?FX>\ X۠AyX۠AsdZg??@@yGz?Ӱ7>\ X۠AyX۠ArZg??@@yGz?"xZ>\ X۠AyX۠A0,g??@@yGz?[-}>\ X۠AyX۠A=4f??@@yGz?⟡>\ X۠AyX۠ADEf??@@yGz?mEu¡>\ X۠AyX۠A^[:Vf??@@yGz?t(gL>\ X۠AyX۠AHGnmxf??@@yGz?JlX>\ X۠AyX۠AJ6-Mf??@@yGz?ӰI*>\ X۠AyX۠AQ!"f??@@yGz?&:kM>\ X۠AyX۠Ame??@@yGz?29, p>\ X۠AyX۠A[(=e??@@yGz?b}Ւ>\ X۠AyX۠A|>|e??@@yGz?q>\ X۠AyX۠AD\ X۠AyX۠Ay1¼Ve??@@yGz?NI>\ X۠AyX۠Av`/e??@@yGz?>\ X۠AyX۠A]o@ e??@@yGz?*O]@>\ X۠AyX۠AQfSd??@@yGz?~c>\ X۠AyX۠AVߠd??@@yGz?ZDž>\ X۠AyX۠Ad??@@yGz?uݞ|>\ X۠AyX۠Ajtd??@@yGz? 1ˣ>\ X۠AyX۠A](EPd??@@yGz?Q<'>\ X۠AyX۠AO r-d??@@yGz?kk{>\ X۠AyX۠Ab9 d??@@yGz?.lP3>\ X۠AyX۠ATc??@@yGz?]V>\ X۠AyX۠A8"c??@@yGz? 7Ox>\ X۠AyX۠A͜c??@@yGz?x)|@o>\ X۠AyX۠AF揇c??@@yGz?X1$>\ X۠AyX۠Aw3nbc??@@yGz?U#>\ X۠AyX۠A>^ Bc??@@yGz?ķH>\ X۠AyX۠Aoۄ"c??@@yGz?2C&>\ X۠AyX۠Adwdpc??@@yGz?H>\ X۠AyX۠ADob??@@yGz?Fk>\ X۠AyX۠ArEmb??@@yGz?xuYa>\ X۠AyX۠A~b??@@yGz?ꤝ>\ X۠AyX۠Akb??@@yGz?Yӥ>\ X۠AyX۠A;Flb??@@yGz?&>\ X۠AyX۠ABY)Ob??@@yGz?63j5>\ X۠AyX۠AB}mh2b??@@yGz?b;>\ X۠AyX۠Aeb??@@yGz?^>\ X۠AyX۠Am>a??@@yGz?6rT>\ X۠AyX۠AF8a??@@yGz?zc >\ X۠AyX۠A"Ka??@@yGz?[ TƦ>\ X۠AyX۠AVça??@@yGz?OFs>\ X۠AyX۠A`Ia??@@yGz?:G7( >\ X۠AyX۠A|Sra??@@yGz?(.>\ X۠AyX۠AvVxXa??@@yGz?Q>\ X۠AyX۠AƭNm>a??@@yGz?  Gt>\ X۠AyX۠AA"%a??@@yGz?\ X۠AyX۠AB. a??@@yGz?`l>\ X۠AyX۠A` g`??@@yGz?̛eܧ>\ X۠AyX۠Av*R`??@@yGz?:$>\ X۠AyX۠A:i>`??@@yGz?h!>\ X۠AyX۠AZ)`oة`??@@yGz?*D>\ X۠AyX۠Aٳ`??@@yGz?Y9g>\ X۠AyX۠A$yrz`??@@yGz?5>\ X۠AyX۠ASZ $c`??@@yGz?by>\ X۠AyX۠A 1L`??@@yGz?wXϨ>\ X۠AyX۠As J5`??@@yGz?Ai >\ X۠AyX۠A-`??@@yGz?FFZ>\ X۠AyX۠Ayao`??@@yGz?vKw7>\ X۠AyX۠A*e_??@@yGz?<,Z>\ X۠AyX۠An#_??@@yGz?.|>\ X۠AyX۠A T_??@@yGz?hW>\ X۠AyX۠A, 0#c_??@@yGz?3K©>\ X۠AyX۠A=8_??@@yGz?Ec>\ X۠AyX۠A#_??@@yGz?#>\ X۠AyX۠Aף^??@@yGz?"gi*>\ X۠AyX۠AI*^??@@yGz?M>\ X۠AyX۠A0n ^??@@yGz? o>\ X۠AyX۠Ak^??@@yGz?lP4>\ X۠AyX۠Ao+D^??@@yGz?x=>\ X۠AyX۠AV@c^??@@yGz?Iת>\ X۠AyX۠A h]??@@yGz?Iך>is X۠AyX۠A hm?@q1?@@yGz?$E}\>is X۠AyX۠A Tt4m?@q1?@@yGz?m_b>is X۠AyX۠AO^m?@q1?@@yGz?UB0>is X۠AyX۠A.M%Qm?@q1?@@yGz?*$>is X۠AyX۠A( l?@q1?@@yGz?f3>is X۠AyX۠A3=(l?@q1?@@yGz?umx>is X۠AyX۠Aս?l?@q1?@@yGz?LGw׽>is X۠AyX۠A2 fk?@q1?@@yGz?*A>is X۠AyX۠Artk?@q1?@@yGz? H>is X۠AyX۠AȆʾvk?@q1?@@yGz?ct>is X۠AyX۠A 7>6k?@q1?@@yGz?˜Vӝ>is X۠AyX۠A#j?@q1?@@yGz?!!9>is X۠AyX۠AMuj?@q1?@@yGz?zS^>is X۠AyX۠A{j?@q1?@@yGz?X1>is X۠AyX۠A}?j?@q1?@@yGz?4>&>is X۠AyX۠A޿j?@q1?@@yGz?BÐ.>is X۠AyX۠A'Ipi?@q1?@@yGz?ʥs>is X۠AyX۠Acݑi?@q1?@@yGz?ZSd>is X۠AyX۠A1Yi?@q1?@@yGz?j>is X۠AyX۠A֝>^"i?@q1?@@yGz?B &">is X۠AyX۠A.h?@q1?@@yGz?;D>is X۠AyX۠A5Fh?@q1?@@yGz?k: g>is X۠AyX۠AI>`h?@q1?@@yGz?~:>is X۠AyX۠A*=Oh?@q1?@@yGz?ﬠ>is X۠AyX۠AiZVh?@q1?@@yGz?iݤϠ>is X۠AyX۠AKfg?@q1?@@yGz?(KY>is X۠AyX۠A]g?@q1?@@yGz?FX>is X۠AyX۠AsdZg?@q1?@@yGz?Ӱ7>is X۠AyX۠ArZg?@q1?@@yGz?"xZ>is X۠AyX۠A~0,g?@q1?@@yGz?[-}>is X۠AyX۠A =4f?@q1?@@yGz?⟡>is X۠AyX۠ADEf?@q1?@@yGz?mEu¡>is X۠AyX۠A^[:Vf?@q1?@@yGz?t(gL>is X۠AyX۠AHGnmxf?@q1?@@yGz?JlX>is X۠AyX۠AJ6-Mf?@q1?@@yGz?ӰI*>is X۠AyX۠AQ!"f?@q1?@@yGz?&:kM>is X۠AyX۠Ame?@q1?@@yGz?29, p>is X۠AyX۠A[(=e?@q1?@@yGz?b}Ւ>is X۠AyX۠A|>|e?@q1?@@yGz?q>is X۠AyX۠ADis X۠AyX۠Ay1¼Ve?@q1?@@yGz?NI>is X۠AyX۠Aw`/e?@q1?@@yGz?>is X۠AyX۠A]o@ e?@q1?@@yGz?*O]@>is X۠AyX۠APfSd?@q1?@@yGz?~c>is X۠AyX۠AVߠd?@q1?@@yGz?ZDž>is X۠AyX۠Ad?@q1?@@yGz?tݞ|>is X۠AyX۠Ajtd?@q1?@@yGz? 1ˣ>is X۠AyX۠A](EPd?@q1?@@yGz?Q<'>is X۠AyX۠AO r-d?@q1?@@yGz?kk{>is X۠AyX۠Ab9 d?@q1?@@yGz?.lP3>is X۠AyX۠ATc?@q1?@@yGz?]V>is X۠AyX۠A8"c?@q1?@@yGz? 7Ox>is X۠AyX۠A͜c?@q1?@@yGz?x)|@o>is X۠AyX۠AG揇c?@q1?@@yGz?X1$>is X۠AyX۠Av3nbc?@q1?@@yGz?T#>is X۠AyX۠A?^ Bc?@q1?@@yGz?ŷH>is X۠AyX۠Aoۄ"c?@q1?@@yGz?2C&>is X۠AyX۠Adwdpc?@q1?@@yGz?H>is X۠AyX۠ADob?@q1?@@yGz?Fk>is X۠AyX۠ArEmb?@q1?@@yGz?xuYa>is X۠AyX۠A~b?@q1?@@yGz?ꤝ>is X۠AyX۠Ajb?@q1?@@yGz?Yӥ>is X۠AyX۠A:Flb?@q1?@@yGz?&>is X۠AyX۠ACY)Ob?@q1?@@yGz?63j5>is X۠AyX۠AB}mh2b?@q1?@@yGz?b;>is X۠AyX۠Aeb?@q1?@@yGz?^>is X۠AyX۠Am>a?@q1?@@yGz?6rT>is X۠AyX۠AF8a?@q1?@@yGz?zc >is X۠AyX۠A"Ka?@q1?@@yGz?\ TƦ>is X۠AyX۠AVça?@q1?@@yGz?OFs>is X۠AyX۠A`Ia?@q1?@@yGz?:G7( >is X۠AyX۠A|Sra?@q1?@@yGz?(.>is X۠AyX۠AvVxXa?@q1?@@yGz?Q>is X۠AyX۠AƭNm>a?@q1?@@yGz?  Gt>is X۠AyX۠AA"%a?@q1?@@yGz?is X۠AyX۠AB. a?@q1?@@yGz?`l>is X۠AyX۠A` g`?@q1?@@yGz?˛eܧ>is X۠AyX۠Av*R`?@q1?@@yGz?:$>is X۠AyX۠A:i>`?@q1?@@yGz?h!>is X۠AyX۠AZ)`oة`?@q1?@@yGz?*D>is X۠AyX۠Aٳ`?@q1?@@yGz?Y9g>is X۠AyX۠A$yrz`?@q1?@@yGz?5>is X۠AyX۠ASZ $c`?@q1?@@yGz?by>is X۠AyX۠A 1L`?@q1?@@yGz?wXϨ>is X۠AyX۠As J5`?@q1?@@yGz?Ai >is X۠AyX۠A-`?@q1?@@yGz?FFZ>is X۠AyX۠Ayao`?@q1?@@yGz?vKw7>is X۠AyX۠A*e_?@q1?@@yGz?<,Z>is X۠AyX۠An#_?@q1?@@yGz?.|>is X۠AyX۠A T_?@q1?@@yGz?hW>is X۠AyX۠A, 0#c_?@q1?@@yGz?3K©>is X۠AyX۠A=8_?@q1?@@yGz?Dc>is X۠AyX۠A#_?@q1?@@yGz?#>is X۠AyX۠Aף^?@q1?@@yGz?"gi*>is X۠AyX۠AI*^?@q1?@@yGz?M>is X۠AyX۠A0n ^?@q1?@@yGz? o>is X۠AyX۠Ak^?@q1?@@yGz?kP4>is X۠AyX۠Ao+D^?@q1?@@yGz?x=>is X۠AyX۠AV@c^?@q1?@@yGz?Iת>is X۠AyX۠A h]?@q1?@@yGz?Iך>wX۠AyX۠A hm?V?@@yGz?%E}\>wX۠AyX۠A Tt4m?V?@@yGz?m_b>wX۠AyX۠AO^m?V?@@yGz?UB0>wX۠AyX۠A.M%Qm?V?@@yGz?*$>wX۠AyX۠A( l?V?@@yGz?f3>wX۠AyX۠A3=(l?V?@@yGz?tmx>wX۠AyX۠Aս?l?V?@@yGz?KGw׽>wX۠AyX۠A2 fk?V?@@yGz?*A>wX۠AyX۠Artk?V?@@yGz? H>wX۠AyX۠AȆʾvk?V?@@yGz?ct>wX۠AyX۠A 7>6k?V?@@yGz?˜Vӝ>wX۠AyX۠A#j?V?@@yGz?!!9>wX۠AyX۠AMuj?V?@@yGz?zS^>wX۠AyX۠A{j?V?@@yGz?X1>wX۠AyX۠A}?j?V?@@yGz?5>&>wX۠AyX۠A޿j?V?@@yGz?BÐ.>wX۠AyX۠A'Ipi?V?@@yGz?ʥs>wX۠AyX۠Acݑi?V?@@yGz?ZSd>wX۠AyX۠A1Yi?V?@@yGz?j>wX۠AyX۠Aם>^"i?V?@@yGz?B &">wX۠AyX۠A.h?V?@@yGz?;D>wX۠AyX۠A5Fh?V?@@yGz?k: g>wX۠AyX۠AI>`h?V?@@yGz?~:>wX۠AyX۠A+=Oh?V?@@yGz?ﬠ>wX۠AyX۠AiZVh?V?@@yGz?iݤϠ>wX۠AyX۠AKfg?V?@@yGz?(KY>wX۠AyX۠A]g?V?@@yGz?FX>wX۠AyX۠AsdZg?V?@@yGz?Ӱ7>wX۠AyX۠ArZg?V?@@yGz?"xZ>wX۠AyX۠A0,g?V?@@yGz?[-}>wX۠AyX۠A=4f?V?@@yGz?⟡>wX۠AyX۠ADEf?V?@@yGz?mEu¡>wX۠AyX۠A^[:Vf?V?@@yGz?t(gL>wX۠AyX۠AHGnmxf?V?@@yGz?JlX>wX۠AyX۠AJ6-Mf?V?@@yGz?ӰI*>wX۠AyX۠AQ!"f?V?@@yGz?&:kM>wX۠AyX۠Ame?V?@@yGz?29, p>wX۠AyX۠A[(=e?V?@@yGz?b}Ւ>wX۠AyX۠A|>|e?V?@@yGz?q>wX۠AyX۠ADwX۠AyX۠Ay1¼Ve?V?@@yGz?NI>wX۠AyX۠Av`/e?V?@@yGz?>wX۠AyX۠A]o@ e?V?@@yGz?*O]@>wX۠AyX۠AQfSd?V?@@yGz?~c>wX۠AyX۠AVߠd?V?@@yGz?ZDž>wX۠AyX۠Ad?V?@@yGz?uݞ|>wX۠AyX۠Ajtd?V?@@yGz? 1ˣ>wX۠AyX۠A](EPd?V?@@yGz?Q<'>wX۠AyX۠AO r-d?V?@@yGz?kk{>wX۠AyX۠Ab9 d?V?@@yGz?.lP3>wX۠AyX۠ATc?V?@@yGz?]V>wX۠AyX۠A8"c?V?@@yGz? 7Ox>wX۠AyX۠A͜c?V?@@yGz?x)|@o>wX۠AyX۠AF揇c?V?@@yGz?X1$>wX۠AyX۠Aw3nbc?V?@@yGz?U#>wX۠AyX۠A>^ Bc?V?@@yGz?ķH>wX۠AyX۠Aoۄ"c?V?@@yGz?2C&>wX۠AyX۠Adwdpc?V?@@yGz?H>wX۠AyX۠ADob?V?@@yGz?Fk>wX۠AyX۠ArEmb?V?@@yGz?xuYa>wX۠AyX۠A~b?V?@@yGz?ꤝ>wX۠AyX۠Akb?V?@@yGz?Yӥ>wX۠AyX۠A;Flb?V?@@yGz?&>wX۠AyX۠ABY)Ob?V?@@yGz?63j5>wX۠AyX۠AB}mh2b?V?@@yGz?b;>wX۠AyX۠Aeb?V?@@yGz?^>wX۠AyX۠Am>a?V?@@yGz?6rT>wX۠AyX۠AF8a?V?@@yGz?zc >wX۠AyX۠A"Ka?V?@@yGz?[ TƦ>wX۠AyX۠AVça?V?@@yGz?OFs>wX۠AyX۠A`Ia?V?@@yGz?:G7( >wX۠AyX۠A|Sra?V?@@yGz?(.>wX۠AyX۠AvVxXa?V?@@yGz?Q>wX۠AyX۠AƭNm>a?V?@@yGz?  Gt>wX۠AyX۠AA"%a?V?@@yGz?wX۠AyX۠AB. a?V?@@yGz?`l>wX۠AyX۠A` g`?V?@@yGz?̛eܧ>wX۠AyX۠Av*R`?V?@@yGz?:$>wX۠AyX۠A:i>`?V?@@yGz?h!>wX۠AyX۠AZ)`oة`?V?@@yGz?*D>wX۠AyX۠Aٳ`?V?@@yGz?Y9g>wX۠AyX۠A$yrz`?V?@@yGz?5>wX۠AyX۠ASZ $c`?V?@@yGz?by>wX۠AyX۠A 1L`?V?@@yGz?wXϨ>wX۠AyX۠As J5`?V?@@yGz?Ai >wX۠AyX۠A-`?V?@@yGz?FFZ>wX۠AyX۠Ayao`?V?@@yGz?vKw7>wX۠AyX۠A*e_?V?@@yGz?<,Z>wX۠AyX۠An#_?V?@@yGz?.|>wX۠AyX۠A T_?V?@@yGz?hW>wX۠AyX۠A, 0#c_?V?@@yGz?3K©>wX۠AyX۠A=8_?V?@@yGz?Ec>wX۠AyX۠A#_?V?@@yGz?#>wX۠AyX۠Aף^?V?@@yGz?"gi*>wX۠AyX۠AI*^?V?@@yGz?M>wX۠AyX۠A0n ^?V?@@yGz? o>wX۠AyX۠Ak^?V?@@yGz?lP4>wX۠AyX۠Ao+D^?V?@@yGz?x=>wX۠AyX۠AV@c^?V?@@yGz?Iת>wX۠AyX۠A h]?V?@@yGz?Iך>aX۠AyX۠A hm?B?<?@@yGz?$E}\>aX۠AyX۠A Tt4m?B?<?@@yGz?m_b>aX۠AyX۠AO^m?B?<?@@yGz?UB0>aX۠AyX۠A.M%Qm?B?<?@@yGz?*$>aX۠AyX۠A( l?B?<?@@yGz?f3>aX۠AyX۠A3=(l?B?<?@@yGz?umx>aX۠AyX۠Aս?l?B?<?@@yGz?LGw׽>aX۠AyX۠A2 fk?B?<?@@yGz?*A>aX۠AyX۠Artk?B?<?@@yGz? H>aX۠AyX۠AȆʾvk?B?<?@@yGz?ct>aX۠AyX۠A 7>6k?B?<?@@yGz?˜Vӝ>aX۠AyX۠A#j?B?<?@@yGz?!!9>aX۠AyX۠AMuj?B?<?@@yGz?zS^>aX۠AyX۠A{j?B?<?@@yGz?X1>aX۠AyX۠A}?j?B?<?@@yGz?4>&>aX۠AyX۠A޿j?B?<?@@yGz?BÐ.>aX۠AyX۠A'Ipi?B?<?@@yGz?ʥs>aX۠AyX۠Acݑi?B?<?@@yGz?ZSd>aX۠AyX۠A1Yi?B?<?@@yGz?j>aX۠AyX۠A֝>^"i?B?<?@@yGz?B &">aX۠AyX۠A.h?B?<?@@yGz?;D>aX۠AyX۠A5Fh?B?<?@@yGz?k: g>aX۠AyX۠AI>`h?B?<?@@yGz?~:>aX۠AyX۠A*=Oh?B?<?@@yGz?ﬠ>aX۠AyX۠AiZVh?B?<?@@yGz?iݤϠ>aX۠AyX۠AKfg?B?<?@@yGz?(KY>aX۠AyX۠A]g?B?<?@@yGz?FX>aX۠AyX۠AsdZg?B?<?@@yGz?Ӱ7>aX۠AyX۠ArZg?B?<?@@yGz?"xZ>aX۠AyX۠A~0,g?B?<?@@yGz?[-}>aX۠AyX۠A =4f?B?<?@@yGz?⟡>aX۠AyX۠ADEf?B?<?@@yGz?mEu¡>aX۠AyX۠A^[:Vf?B?<?@@yGz?t(gL>aX۠AyX۠AHGnmxf?B?<?@@yGz?JlX>aX۠AyX۠AJ6-Mf?B?<?@@yGz?ӰI*>aX۠AyX۠AQ!"f?B?<?@@yGz?&:kM>aX۠AyX۠Ame?B?<?@@yGz?29, p>aX۠AyX۠A[(=e?B?<?@@yGz?b}Ւ>aX۠AyX۠A|>|e?B?<?@@yGz?q>aX۠AyX۠ADaX۠AyX۠Ay1¼Ve?B?<?@@yGz?NI>aX۠AyX۠Aw`/e?B?<?@@yGz?>aX۠AyX۠A]o@ e?B?<?@@yGz?*O]@>aX۠AyX۠APfSd?B?<?@@yGz?~c>aX۠AyX۠AVߠd?B?<?@@yGz?ZDž>aX۠AyX۠Ad?B?<?@@yGz?tݞ|>aX۠AyX۠Ajtd?B?<?@@yGz? 1ˣ>aX۠AyX۠A](EPd?B?<?@@yGz?Q<'>aX۠AyX۠AO r-d?B?<?@@yGz?kk{>aX۠AyX۠Ab9 d?B?<?@@yGz?.lP3>aX۠AyX۠ATc?B?<?@@yGz?]V>aX۠AyX۠A8"c?B?<?@@yGz? 7Ox>aX۠AyX۠A͜c?B?<?@@yGz?x)|@o>aX۠AyX۠AG揇c?B?<?@@yGz?X1$>aX۠AyX۠Av3nbc?B?<?@@yGz?T#>aX۠AyX۠A?^ Bc?B?<?@@yGz?ŷH>aX۠AyX۠Aoۄ"c?B?<?@@yGz?2C&>aX۠AyX۠Adwdpc?B?<?@@yGz?H>aX۠AyX۠ADob?B?<?@@yGz?Fk>aX۠AyX۠ArEmb?B?<?@@yGz?xuYa>aX۠AyX۠A~b?B?<?@@yGz?ꤝ>aX۠AyX۠Ajb?B?<?@@yGz?Yӥ>aX۠AyX۠A:Flb?B?<?@@yGz?&>aX۠AyX۠ACY)Ob?B?<?@@yGz?63j5>aX۠AyX۠AB}mh2b?B?<?@@yGz?b;>aX۠AyX۠Aeb?B?<?@@yGz?^>aX۠AyX۠Am>a?B?<?@@yGz?6rT>aX۠AyX۠AF8a?B?<?@@yGz?zc >aX۠AyX۠A"Ka?B?<?@@yGz?\ TƦ>aX۠AyX۠AVça?B?<?@@yGz?OFs>aX۠AyX۠A`Ia?B?<?@@yGz?:G7( >aX۠AyX۠A|Sra?B?<?@@yGz?(.>aX۠AyX۠AvVxXa?B?<?@@yGz?Q>aX۠AyX۠AƭNm>a?B?<?@@yGz?  Gt>aX۠AyX۠AA"%a?B?<?@@yGz?aX۠AyX۠AB. a?B?<?@@yGz?`l>aX۠AyX۠A` g`?B?<?@@yGz?˛eܧ>aX۠AyX۠Av*R`?B?<?@@yGz?:$>aX۠AyX۠A:i>`?B?<?@@yGz?h!>aX۠AyX۠AZ)`oة`?B?<?@@yGz?*D>aX۠AyX۠Aٳ`?B?<?@@yGz?Y9g>aX۠AyX۠A$yrz`?B?<?@@yGz?5>aX۠AyX۠ASZ $c`?B?<?@@yGz?by>aX۠AyX۠A 1L`?B?<?@@yGz?wXϨ>aX۠AyX۠As J5`?B?<?@@yGz?Ai >aX۠AyX۠A-`?B?<?@@yGz?FFZ>aX۠AyX۠Ayao`?B?<?@@yGz?vKw7>aX۠AyX۠A*e_?B?<?@@yGz?<,Z>aX۠AyX۠An#_?B?<?@@yGz?.|>aX۠AyX۠A T_?B?<?@@yGz?hW>aX۠AyX۠A, 0#c_?B?<?@@yGz?3K©>aX۠AyX۠A=8_?B?<?@@yGz?Dc>aX۠AyX۠A#_?B?<?@@yGz?#>aX۠AyX۠Aף^?B?<?@@yGz?"gi*>aX۠AyX۠AI*^?B?<?@@yGz?M>aX۠AyX۠A0n ^?B?<?@@yGz? o>aX۠AyX۠Ak^?B?<?@@yGz?kP4>aX۠AyX۠Ao+D^?B?<?@@yGz?x=>aX۠AyX۠AV@c^?B?<?@@yGz?Iת>aX۠AyX۠A h]?B?<?@@yGz?Iך>X۠AyX۠A hm?e!?@@yGz?%E}\>X۠AyX۠A Tt4m?e!?@@yGz?m_b>X۠AyX۠AO^m?e!?@@yGz?UB0>X۠AyX۠A.M%Qm?e!?@@yGz?*$>X۠AyX۠A( l?e!?@@yGz?f3>X۠AyX۠A3=(l?e!?@@yGz?tmx>X۠AyX۠Aս?l?e!?@@yGz?KGw׽>X۠AyX۠A2 fk?e!?@@yGz?*A>X۠AyX۠Artk?e!?@@yGz? H>X۠AyX۠AȆʾvk?e!?@@yGz?ct>X۠AyX۠A 7>6k?e!?@@yGz?˜Vӝ>X۠AyX۠A#j?e!?@@yGz?!!9>X۠AyX۠AMuj?e!?@@yGz?zS^>X۠AyX۠A{j?e!?@@yGz?X1>X۠AyX۠A}?j?e!?@@yGz?5>&>X۠AyX۠A޿j?e!?@@yGz?BÐ.>X۠AyX۠A'Ipi?e!?@@yGz?ʥs>X۠AyX۠Acݑi?e!?@@yGz?ZSd>X۠AyX۠A1Yi?e!?@@yGz?j>X۠AyX۠Aם>^"i?e!?@@yGz?B &">X۠AyX۠A.h?e!?@@yGz?;D>X۠AyX۠A5Fh?e!?@@yGz?k: g>X۠AyX۠AI>`h?e!?@@yGz?~:>X۠AyX۠A+=Oh?e!?@@yGz?ﬠ>X۠AyX۠AiZVh?e!?@@yGz?iݤϠ>X۠AyX۠AKfg?e!?@@yGz?(KY>X۠AyX۠A]g?e!?@@yGz?FX>X۠AyX۠AsdZg?e!?@@yGz?Ӱ7>X۠AyX۠ArZg?e!?@@yGz?"xZ>X۠AyX۠A0,g?e!?@@yGz?[-}>X۠AyX۠A=4f?e!?@@yGz?⟡>X۠AyX۠ADEf?e!?@@yGz?mEu¡>X۠AyX۠A^[:Vf?e!?@@yGz?t(gL>X۠AyX۠AHGnmxf?e!?@@yGz?JlX>X۠AyX۠AJ6-Mf?e!?@@yGz?ӰI*>X۠AyX۠AQ!"f?e!?@@yGz?&:kM>X۠AyX۠Ame?e!?@@yGz?29, p>X۠AyX۠A[(=e?e!?@@yGz?b}Ւ>X۠AyX۠A|>|e?e!?@@yGz?q>X۠AyX۠ADX۠AyX۠Ay1¼Ve?e!?@@yGz?NI>X۠AyX۠Av`/e?e!?@@yGz?>X۠AyX۠A]o@ e?e!?@@yGz?*O]@>X۠AyX۠AQfSd?e!?@@yGz?~c>X۠AyX۠AVߠd?e!?@@yGz?ZDž>X۠AyX۠Ad?e!?@@yGz?uݞ|>X۠AyX۠Ajtd?e!?@@yGz? 1ˣ>X۠AyX۠A](EPd?e!?@@yGz?Q<'>X۠AyX۠AO r-d?e!?@@yGz?kk{>X۠AyX۠Ab9 d?e!?@@yGz?.lP3>X۠AyX۠ATc?e!?@@yGz?]V>X۠AyX۠A8"c?e!?@@yGz? 7Ox>X۠AyX۠A͜c?e!?@@yGz?x)|@o>X۠AyX۠AF揇c?e!?@@yGz?X1$>X۠AyX۠Aw3nbc?e!?@@yGz?U#>X۠AyX۠A>^ Bc?e!?@@yGz?ķH>X۠AyX۠Aoۄ"c?e!?@@yGz?2C&>X۠AyX۠Adwdpc?e!?@@yGz?H>X۠AyX۠ADob?e!?@@yGz?Fk>X۠AyX۠ArEmb?e!?@@yGz?xuYa>X۠AyX۠A~b?e!?@@yGz?ꤝ>X۠AyX۠Akb?e!?@@yGz?Yӥ>X۠AyX۠A;Flb?e!?@@yGz?&>X۠AyX۠ABY)Ob?e!?@@yGz?63j5>X۠AyX۠AB}mh2b?e!?@@yGz?b;>X۠AyX۠Aeb?e!?@@yGz?^>X۠AyX۠Am>a?e!?@@yGz?6rT>X۠AyX۠AF8a?e!?@@yGz?zc >X۠AyX۠A"Ka?e!?@@yGz?[ TƦ>X۠AyX۠AVça?e!?@@yGz?OFs>X۠AyX۠A`Ia?e!?@@yGz?:G7( >X۠AyX۠A|Sra?e!?@@yGz?(.>X۠AyX۠AvVxXa?e!?@@yGz?Q>X۠AyX۠AƭNm>a?e!?@@yGz?  Gt>X۠AyX۠AA"%a?e!?@@yGz?X۠AyX۠AB. a?e!?@@yGz?`l>X۠AyX۠A` g`?e!?@@yGz?̛eܧ>X۠AyX۠Av*R`?e!?@@yGz?:$>X۠AyX۠A:i>`?e!?@@yGz?h!>X۠AyX۠AZ)`oة`?e!?@@yGz?*D>X۠AyX۠Aٳ`?e!?@@yGz?Y9g>X۠AyX۠A$yrz`?e!?@@yGz?5>X۠AyX۠ASZ $c`?e!?@@yGz?by>X۠AyX۠A 1L`?e!?@@yGz?wXϨ>X۠AyX۠As J5`?e!?@@yGz?Ai >X۠AyX۠A-`?e!?@@yGz?FFZ>X۠AyX۠Ayao`?e!?@@yGz?vKw7>X۠AyX۠A*e_?e!?@@yGz?<,Z>X۠AyX۠An#_?e!?@@yGz?.|>X۠AyX۠A T_?e!?@@yGz?hW>X۠AyX۠A, 0#c_?e!?@@yGz?3K©>X۠AyX۠A=8_?e!?@@yGz?Ec>X۠AyX۠A#_?e!?@@yGz?#>X۠AyX۠Aף^?e!?@@yGz?"gi*>X۠AyX۠AI*^?e!?@@yGz?M>X۠AyX۠A0n ^?e!?@@yGz? o>X۠AyX۠Ak^?e!?@@yGz?lP4>X۠AyX۠Ao+D^?e!?@@yGz?x=>X۠AyX۠AV@c^?e!?@@yGz?Iת>X۠AyX۠A h]?e!?@@yGz?Iך>OX۠AyX۠A hm?=?@@yGz?$E}\>OX۠AyX۠A Tt4m?=?@@yGz?m_b>OX۠AyX۠AO^m?=?@@yGz?UB0>OX۠AyX۠A.M%Qm?=?@@yGz?*$>OX۠AyX۠A( l?=?@@yGz?f3>OX۠AyX۠A3=(l?=?@@yGz?umx>OX۠AyX۠Aս?l?=?@@yGz?LGw׽>OX۠AyX۠A2 fk?=?@@yGz?*A>OX۠AyX۠Artk?=?@@yGz? H>OX۠AyX۠AȆʾvk?=?@@yGz?ct>OX۠AyX۠A 7>6k?=?@@yGz?˜Vӝ>OX۠AyX۠A#j?=?@@yGz?!!9>OX۠AyX۠AMuj?=?@@yGz?zS^>OX۠AyX۠A{j?=?@@yGz?X1>OX۠AyX۠A}?j?=?@@yGz?4>&>OX۠AyX۠A޿j?=?@@yGz?BÐ.>OX۠AyX۠A'Ipi?=?@@yGz?ʥs>OX۠AyX۠Acݑi?=?@@yGz?ZSd>OX۠AyX۠A1Yi?=?@@yGz?j>OX۠AyX۠A֝>^"i?=?@@yGz?B &">OX۠AyX۠A.h?=?@@yGz?;D>OX۠AyX۠A5Fh?=?@@yGz?k: g>OX۠AyX۠AI>`h?=?@@yGz?~:>OX۠AyX۠A*=Oh?=?@@yGz?ﬠ>OX۠AyX۠AiZVh?=?@@yGz?iݤϠ>OX۠AyX۠AKfg?=?@@yGz?(KY>OX۠AyX۠A]g?=?@@yGz?FX>OX۠AyX۠AsdZg?=?@@yGz?Ӱ7>OX۠AyX۠ArZg?=?@@yGz?"xZ>OX۠AyX۠A~0,g?=?@@yGz?[-}>OX۠AyX۠A =4f?=?@@yGz?⟡>OX۠AyX۠ADEf?=?@@yGz?mEu¡>OX۠AyX۠A^[:Vf?=?@@yGz?t(gL>OX۠AyX۠AHGnmxf?=?@@yGz?JlX>OX۠AyX۠AJ6-Mf?=?@@yGz?ӰI*>OX۠AyX۠AQ!"f?=?@@yGz?&:kM>OX۠AyX۠Ame?=?@@yGz?29, p>OX۠AyX۠A[(=e?=?@@yGz?b}Ւ>OX۠AyX۠A|>|e?=?@@yGz?q>OX۠AyX۠ADOX۠AyX۠Ay1¼Ve?=?@@yGz?NI>OX۠AyX۠Aw`/e?=?@@yGz?>OX۠AyX۠A]o@ e?=?@@yGz?*O]@>OX۠AyX۠APfSd?=?@@yGz?~c>OX۠AyX۠AVߠd?=?@@yGz?ZDž>OX۠AyX۠Ad?=?@@yGz?tݞ|>OX۠AyX۠Ajtd?=?@@yGz? 1ˣ>OX۠AyX۠A](EPd?=?@@yGz?Q<'>OX۠AyX۠AO r-d?=?@@yGz?kk{>OX۠AyX۠Ab9 d?=?@@yGz?.lP3>OX۠AyX۠ATc?=?@@yGz?]V>OX۠AyX۠A8"c?=?@@yGz? 7Ox>OX۠AyX۠A͜c?=?@@yGz?x)|@o>OX۠AyX۠AG揇c?=?@@yGz?X1$>OX۠AyX۠Av3nbc?=?@@yGz?T#>OX۠AyX۠A?^ Bc?=?@@yGz?ŷH>OX۠AyX۠Aoۄ"c?=?@@yGz?2C&>OX۠AyX۠Adwdpc?=?@@yGz?H>OX۠AyX۠ADob?=?@@yGz?Fk>OX۠AyX۠ArEmb?=?@@yGz?xuYa>OX۠AyX۠A~b?=?@@yGz?ꤝ>OX۠AyX۠Ajb?=?@@yGz?Yӥ>OX۠AyX۠A:Flb?=?@@yGz?&>OX۠AyX۠ACY)Ob?=?@@yGz?63j5>OX۠AyX۠AB}mh2b?=?@@yGz?b;>OX۠AyX۠Aeb?=?@@yGz?^>OX۠AyX۠Am>a?=?@@yGz?6rT>OX۠AyX۠AF8a?=?@@yGz?zc >OX۠AyX۠A"Ka?=?@@yGz?\ TƦ>OX۠AyX۠AVça?=?@@yGz?OFs>OX۠AyX۠A`Ia?=?@@yGz?:G7( >OX۠AyX۠A|Sra?=?@@yGz?(.>OX۠AyX۠AvVxXa?=?@@yGz?Q>OX۠AyX۠AƭNm>a?=?@@yGz?  Gt>OX۠AyX۠AA"%a?=?@@yGz?OX۠AyX۠AB. a?=?@@yGz?`l>OX۠AyX۠A` g`?=?@@yGz?˛eܧ>OX۠AyX۠Av*R`?=?@@yGz?:$>OX۠AyX۠A:i>`?=?@@yGz?h!>OX۠AyX۠AZ)`oة`?=?@@yGz?*D>OX۠AyX۠Aٳ`?=?@@yGz?Y9g>OX۠AyX۠A$yrz`?=?@@yGz?5>OX۠AyX۠ASZ $c`?=?@@yGz?by>OX۠AyX۠A 1L`?=?@@yGz?wXϨ>OX۠AyX۠As J5`?=?@@yGz?Ai >OX۠AyX۠A-`?=?@@yGz?FFZ>OX۠AyX۠Ayao`?=?@@yGz?vKw7>OX۠AyX۠A*e_?=?@@yGz?<,Z>OX۠AyX۠An#_?=?@@yGz?.|>OX۠AyX۠A T_?=?@@yGz?hW>OX۠AyX۠A, 0#c_?=?@@yGz?3K©>OX۠AyX۠A=8_?=?@@yGz?Dc>OX۠AyX۠A#_?=?@@yGz?#>OX۠AyX۠Aף^?=?@@yGz?"gi*>OX۠AyX۠AI*^?=?@@yGz?M>OX۠AyX۠A0n ^?=?@@yGz? o>OX۠AyX۠Ak^?=?@@yGz?kP4>OX۠AyX۠Ao+D^?=?@@yGz?x=>OX۠AyX۠AV@c^?=?@@yGz?Iת>OX۠AyX۠A h]?=?@@yGz?Iך>X۠AyX۠A hm?e?@@yGz?%E}\>X۠AyX۠A Tt4m?e?@@yGz?m_b>X۠AyX۠AO^m?e?@@yGz?UB0>X۠AyX۠A.M%Qm?e?@@yGz?*$>X۠AyX۠A( l?e?@@yGz?f3>X۠AyX۠A3=(l?e?@@yGz?tmx>X۠AyX۠Aս?l?e?@@yGz?KGw׽>X۠AyX۠A2 fk?e?@@yGz?*A>X۠AyX۠Artk?e?@@yGz? H>X۠AyX۠AȆʾvk?e?@@yGz?ct>X۠AyX۠A 7>6k?e?@@yGz?˜Vӝ>X۠AyX۠A#j?e?@@yGz?!!9>X۠AyX۠AMuj?e?@@yGz?zS^>X۠AyX۠A{j?e?@@yGz?X1>X۠AyX۠A}?j?e?@@yGz?5>&>X۠AyX۠A޿j?e?@@yGz?BÐ.>X۠AyX۠A'Ipi?e?@@yGz?ʥs>X۠AyX۠Acݑi?e?@@yGz?ZSd>X۠AyX۠A1Yi?e?@@yGz?j>X۠AyX۠Aם>^"i?e?@@yGz?B &">X۠AyX۠A.h?e?@@yGz?;D>X۠AyX۠A5Fh?e?@@yGz?k: g>X۠AyX۠AI>`h?e?@@yGz?~:>X۠AyX۠A+=Oh?e?@@yGz?ﬠ>X۠AyX۠AiZVh?e?@@yGz?iݤϠ>X۠AyX۠AKfg?e?@@yGz?(KY>X۠AyX۠A]g?e?@@yGz?FX>X۠AyX۠AsdZg?e?@@yGz?Ӱ7>X۠AyX۠ArZg?e?@@yGz?"xZ>X۠AyX۠A0,g?e?@@yGz?[-}>X۠AyX۠A=4f?e?@@yGz?⟡>X۠AyX۠ADEf?e?@@yGz?mEu¡>X۠AyX۠A^[:Vf?e?@@yGz?t(gL>X۠AyX۠AHGnmxf?e?@@yGz?JlX>X۠AyX۠AJ6-Mf?e?@@yGz?ӰI*>X۠AyX۠AQ!"f?e?@@yGz?&:kM>X۠AyX۠Ame?e?@@yGz?29, p>X۠AyX۠A[(=e?e?@@yGz?b}Ւ>X۠AyX۠A|>|e?e?@@yGz?q>X۠AyX۠ADX۠AyX۠Ay1¼Ve?e?@@yGz?NI>X۠AyX۠Av`/e?e?@@yGz?>X۠AyX۠A]o@ e?e?@@yGz?*O]@>X۠AyX۠AQfSd?e?@@yGz?~c>X۠AyX۠AVߠd?e?@@yGz?ZDž>X۠AyX۠Ad?e?@@yGz?uݞ|>X۠AyX۠Ajtd?e?@@yGz? 1ˣ>X۠AyX۠A](EPd?e?@@yGz?Q<'>X۠AyX۠AO r-d?e?@@yGz?kk{>X۠AyX۠Ab9 d?e?@@yGz?.lP3>X۠AyX۠ATc?e?@@yGz?]V>X۠AyX۠A8"c?e?@@yGz? 7Ox>X۠AyX۠A͜c?e?@@yGz?x)|@o>X۠AyX۠AF揇c?e?@@yGz?X1$>X۠AyX۠Aw3nbc?e?@@yGz?U#>X۠AyX۠A>^ Bc?e?@@yGz?ķH>X۠AyX۠Aoۄ"c?e?@@yGz?2C&>X۠AyX۠Adwdpc?e?@@yGz?H>X۠AyX۠ADob?e?@@yGz?Fk>X۠AyX۠ArEmb?e?@@yGz?xuYa>X۠AyX۠A~b?e?@@yGz?ꤝ>X۠AyX۠Akb?e?@@yGz?Yӥ>X۠AyX۠A;Flb?e?@@yGz?&>X۠AyX۠ABY)Ob?e?@@yGz?63j5>X۠AyX۠AB}mh2b?e?@@yGz?b;>X۠AyX۠Aeb?e?@@yGz?^>X۠AyX۠Am>a?e?@@yGz?6rT>X۠AyX۠AF8a?e?@@yGz?zc >X۠AyX۠A"Ka?e?@@yGz?[ TƦ>X۠AyX۠AVça?e?@@yGz?OFs>X۠AyX۠A`Ia?e?@@yGz?:G7( >X۠AyX۠A|Sra?e?@@yGz?(.>X۠AyX۠AvVxXa?e?@@yGz?Q>X۠AyX۠AƭNm>a?e?@@yGz?  Gt>X۠AyX۠AA"%a?e?@@yGz?X۠AyX۠AB. a?e?@@yGz?`l>X۠AyX۠A` g`?e?@@yGz?̛eܧ>X۠AyX۠Av*R`?e?@@yGz?:$>X۠AyX۠A:i>`?e?@@yGz?h!>X۠AyX۠AZ)`oة`?e?@@yGz?*D>X۠AyX۠Aٳ`?e?@@yGz?Y9g>X۠AyX۠A$yrz`?e?@@yGz?5>X۠AyX۠ASZ $c`?e?@@yGz?by>X۠AyX۠A 1L`?e?@@yGz?wXϨ>X۠AyX۠As J5`?e?@@yGz?Ai >X۠AyX۠A-`?e?@@yGz?FFZ>X۠AyX۠Ayao`?e?@@yGz?vKw7>X۠AyX۠A*e_?e?@@yGz?<,Z>X۠AyX۠An#_?e?@@yGz?.|>X۠AyX۠A T_?e?@@yGz?hW>X۠AyX۠A, 0#c_?e?@@yGz?3K©>X۠AyX۠A=8_?e?@@yGz?Ec>X۠AyX۠A#_?e?@@yGz?#>X۠AyX۠Aף^?e?@@yGz?"gi*>X۠AyX۠AI*^?e?@@yGz?M>X۠AyX۠A0n ^?e?@@yGz? o>X۠AyX۠Ak^?e?@@yGz?lP4>X۠AyX۠Ao+D^?e?@@yGz?x=>X۠AyX۠AV@c^?e?@@yGz?Iת>X۠AyX۠A h]?e?@@yGz?Iך>=X۠AyX۠A hm?;k?@@yGz?$E}\>=X۠AyX۠A Tt4m?;k?@@yGz?m_b>=X۠AyX۠AO^m?;k?@@yGz?UB0>=X۠AyX۠A.M%Qm?;k?@@yGz?*$>=X۠AyX۠A( l?;k?@@yGz?f3>=X۠AyX۠A3=(l?;k?@@yGz?umx>=X۠AyX۠Aս?l?;k?@@yGz?LGw׽>=X۠AyX۠A2 fk?;k?@@yGz?*A>=X۠AyX۠Artk?;k?@@yGz? H>=X۠AyX۠AȆʾvk?;k?@@yGz?ct>=X۠AyX۠A 7>6k?;k?@@yGz?˜Vӝ>=X۠AyX۠A#j?;k?@@yGz?!!9>=X۠AyX۠AMuj?;k?@@yGz?zS^>=X۠AyX۠A{j?;k?@@yGz?X1>=X۠AyX۠A}?j?;k?@@yGz?4>&>=X۠AyX۠A޿j?;k?@@yGz?BÐ.>=X۠AyX۠A'Ipi?;k?@@yGz?ʥs>=X۠AyX۠Acݑi?;k?@@yGz?ZSd>=X۠AyX۠A1Yi?;k?@@yGz?j>=X۠AyX۠A֝>^"i?;k?@@yGz?B &">=X۠AyX۠A.h?;k?@@yGz?;D>=X۠AyX۠A5Fh?;k?@@yGz?k: g>=X۠AyX۠AI>`h?;k?@@yGz?~:>=X۠AyX۠A*=Oh?;k?@@yGz?ﬠ>=X۠AyX۠AiZVh?;k?@@yGz?iݤϠ>=X۠AyX۠AKfg?;k?@@yGz?(KY>=X۠AyX۠A]g?;k?@@yGz?FX>=X۠AyX۠AsdZg?;k?@@yGz?Ӱ7>=X۠AyX۠ArZg?;k?@@yGz?"xZ>=X۠AyX۠A~0,g?;k?@@yGz?[-}>=X۠AyX۠A =4f?;k?@@yGz?⟡>=X۠AyX۠ADEf?;k?@@yGz?mEu¡>=X۠AyX۠A^[:Vf?;k?@@yGz?t(gL>=X۠AyX۠AHGnmxf?;k?@@yGz?JlX>=X۠AyX۠AJ6-Mf?;k?@@yGz?ӰI*>=X۠AyX۠AQ!"f?;k?@@yGz?&:kM>=X۠AyX۠Ame?;k?@@yGz?29, p>=X۠AyX۠A[(=e?;k?@@yGz?b}Ւ>=X۠AyX۠A|>|e?;k?@@yGz?q>=X۠AyX۠AD=X۠AyX۠Ay1¼Ve?;k?@@yGz?NI>=X۠AyX۠Aw`/e?;k?@@yGz?>=X۠AyX۠A]o@ e?;k?@@yGz?*O]@>=X۠AyX۠APfSd?;k?@@yGz?~c>=X۠AyX۠AVߠd?;k?@@yGz?ZDž>=X۠AyX۠Ad?;k?@@yGz?tݞ|>=X۠AyX۠Ajtd?;k?@@yGz? 1ˣ>=X۠AyX۠A](EPd?;k?@@yGz?Q<'>=X۠AyX۠AO r-d?;k?@@yGz?kk{>=X۠AyX۠Ab9 d?;k?@@yGz?.lP3>=X۠AyX۠ATc?;k?@@yGz?]V>=X۠AyX۠A8"c?;k?@@yGz? 7Ox>=X۠AyX۠A͜c?;k?@@yGz?x)|@o>=X۠AyX۠AG揇c?;k?@@yGz?X1$>=X۠AyX۠Av3nbc?;k?@@yGz?T#>=X۠AyX۠A?^ Bc?;k?@@yGz?ŷH>=X۠AyX۠Aoۄ"c?;k?@@yGz?2C&>=X۠AyX۠Adwdpc?;k?@@yGz?H>=X۠AyX۠ADob?;k?@@yGz?Fk>=X۠AyX۠ArEmb?;k?@@yGz?xuYa>=X۠AyX۠A~b?;k?@@yGz?ꤝ>=X۠AyX۠Ajb?;k?@@yGz?Yӥ>=X۠AyX۠A:Flb?;k?@@yGz?&>=X۠AyX۠ACY)Ob?;k?@@yGz?63j5>=X۠AyX۠AB}mh2b?;k?@@yGz?b;>=X۠AyX۠Aeb?;k?@@yGz?^>=X۠AyX۠Am>a?;k?@@yGz?6rT>=X۠AyX۠AF8a?;k?@@yGz?zc >=X۠AyX۠A"Ka?;k?@@yGz?\ TƦ>=X۠AyX۠AVça?;k?@@yGz?OFs>=X۠AyX۠A`Ia?;k?@@yGz?:G7( >=X۠AyX۠A|Sra?;k?@@yGz?(.>=X۠AyX۠AvVxXa?;k?@@yGz?Q>=X۠AyX۠AƭNm>a?;k?@@yGz?  Gt>=X۠AyX۠AA"%a?;k?@@yGz?=X۠AyX۠AB. a?;k?@@yGz?`l>=X۠AyX۠A` g`?;k?@@yGz?˛eܧ>=X۠AyX۠Av*R`?;k?@@yGz?:$>=X۠AyX۠A:i>`?;k?@@yGz?h!>=X۠AyX۠AZ)`oة`?;k?@@yGz?*D>=X۠AyX۠Aٳ`?;k?@@yGz?Y9g>=X۠AyX۠A$yrz`?;k?@@yGz?5>=X۠AyX۠ASZ $c`?;k?@@yGz?by>=X۠AyX۠A 1L`?;k?@@yGz?wXϨ>=X۠AyX۠As J5`?;k?@@yGz?Ai >=X۠AyX۠A-`?;k?@@yGz?FFZ>=X۠AyX۠Ayao`?;k?@@yGz?vKw7>=X۠AyX۠A*e_?;k?@@yGz?<,Z>=X۠AyX۠An#_?;k?@@yGz?.|>=X۠AyX۠A T_?;k?@@yGz?hW>=X۠AyX۠A, 0#c_?;k?@@yGz?3K©>=X۠AyX۠A=8_?;k?@@yGz?Dc>=X۠AyX۠A#_?;k?@@yGz?#>=X۠AyX۠Aף^?;k?@@yGz?"gi*>=X۠AyX۠AI*^?;k?@@yGz?M>=X۠AyX۠A0n ^?;k?@@yGz? o>=X۠AyX۠Ak^?;k?@@yGz?kP4>=X۠AyX۠Ao+D^?;k?@@yGz?x=>=X۠AyX۠AV@c^?;k?@@yGz?Iת>=X۠AyX۠A h]?;k?@@yGz?Iך>ǴW۠AyX۠A hm?GS?@@yGz?%E}\>ǴW۠AyX۠A Tt4m?GS?@@yGz?m_b>ǴW۠AyX۠AO^m?GS?@@yGz?UB0>ǴW۠AyX۠A.M%Qm?GS?@@yGz?*$>ǴW۠AyX۠A( l?GS?@@yGz?f3>ǴW۠AyX۠A3=(l?GS?@@yGz?tmx>ǴW۠AyX۠Aս?l?GS?@@yGz?KGw׽>ǴW۠AyX۠A2 fk?GS?@@yGz?*A>ǴW۠AyX۠Artk?GS?@@yGz? H>ǴW۠AyX۠AȆʾvk?GS?@@yGz?ct>ǴW۠AyX۠A 7>6k?GS?@@yGz?˜Vӝ>ǴW۠AyX۠A#j?GS?@@yGz?!!9>ǴW۠AyX۠AMuj?GS?@@yGz?zS^>ǴW۠AyX۠A{j?GS?@@yGz?X1>ǴW۠AyX۠A}?j?GS?@@yGz?5>&>ǴW۠AyX۠A޿j?GS?@@yGz?BÐ.>ǴW۠AyX۠A'Ipi?GS?@@yGz?ʥs>ǴW۠AyX۠Acݑi?GS?@@yGz?ZSd>ǴW۠AyX۠A1Yi?GS?@@yGz?j>ǴW۠AyX۠Aם>^"i?GS?@@yGz?B &">ǴW۠AyX۠A.h?GS?@@yGz?;D>ǴW۠AyX۠A5Fh?GS?@@yGz?k: g>ǴW۠AyX۠AI>`h?GS?@@yGz?~:>ǴW۠AyX۠A+=Oh?GS?@@yGz?ﬠ>ǴW۠AyX۠AiZVh?GS?@@yGz?iݤϠ>ǴW۠AyX۠AKfg?GS?@@yGz?(KY>ǴW۠AyX۠A]g?GS?@@yGz?FX>ǴW۠AyX۠AsdZg?GS?@@yGz?Ӱ7>ǴW۠AyX۠ArZg?GS?@@yGz?"xZ>ǴW۠AyX۠A0,g?GS?@@yGz?[-}>ǴW۠AyX۠A=4f?GS?@@yGz?⟡>ǴW۠AyX۠ADEf?GS?@@yGz?mEu¡>ǴW۠AyX۠A^[:Vf?GS?@@yGz?t(gL>ǴW۠AyX۠AHGnmxf?GS?@@yGz?JlX>ǴW۠AyX۠AJ6-Mf?GS?@@yGz?ӰI*>ǴW۠AyX۠AQ!"f?GS?@@yGz?&:kM>ǴW۠AyX۠Ame?GS?@@yGz?29, p>ǴW۠AyX۠A[(=e?GS?@@yGz?b}Ւ>ǴW۠AyX۠A|>|e?GS?@@yGz?q>ǴW۠AyX۠ADǴW۠AyX۠Ay1¼Ve?GS?@@yGz?NI>ǴW۠AyX۠Av`/e?GS?@@yGz?>ǴW۠AyX۠A]o@ e?GS?@@yGz?*O]@>ǴW۠AyX۠AQfSd?GS?@@yGz?~c>ǴW۠AyX۠AVߠd?GS?@@yGz?ZDž>ǴW۠AyX۠Ad?GS?@@yGz?uݞ|>ǴW۠AyX۠Ajtd?GS?@@yGz? 1ˣ>ǴW۠AyX۠A](EPd?GS?@@yGz?Q<'>ǴW۠AyX۠AO r-d?GS?@@yGz?kk{>ǴW۠AyX۠Ab9 d?GS?@@yGz?.lP3>ǴW۠AyX۠ATc?GS?@@yGz?]V>ǴW۠AyX۠A8"c?GS?@@yGz? 7Ox>ǴW۠AyX۠A͜c?GS?@@yGz?x)|@o>ǴW۠AyX۠AF揇c?GS?@@yGz?X1$>ǴW۠AyX۠Aw3nbc?GS?@@yGz?U#>ǴW۠AyX۠A>^ Bc?GS?@@yGz?ķH>ǴW۠AyX۠Aoۄ"c?GS?@@yGz?2C&>ǴW۠AyX۠Adwdpc?GS?@@yGz?H>ǴW۠AyX۠ADob?GS?@@yGz?Fk>ǴW۠AyX۠ArEmb?GS?@@yGz?xuYa>ǴW۠AyX۠A~b?GS?@@yGz?ꤝ>ǴW۠AyX۠Akb?GS?@@yGz?Yӥ>ǴW۠AyX۠A;Flb?GS?@@yGz?&>ǴW۠AyX۠ABY)Ob?GS?@@yGz?63j5>ǴW۠AyX۠AB}mh2b?GS?@@yGz?b;>ǴW۠AyX۠Aeb?GS?@@yGz?^>ǴW۠AyX۠Am>a?GS?@@yGz?6rT>ǴW۠AyX۠AF8a?GS?@@yGz?zc >ǴW۠AyX۠A"Ka?GS?@@yGz?[ TƦ>ǴW۠AyX۠AVça?GS?@@yGz?OFs>ǴW۠AyX۠A`Ia?GS?@@yGz?:G7( >ǴW۠AyX۠A|Sra?GS?@@yGz?(.>ǴW۠AyX۠AvVxXa?GS?@@yGz?Q>ǴW۠AyX۠AƭNm>a?GS?@@yGz?  Gt>ǴW۠AyX۠AA"%a?GS?@@yGz?ǴW۠AyX۠AB. a?GS?@@yGz?`l>ǴW۠AyX۠A` g`?GS?@@yGz?̛eܧ>ǴW۠AyX۠Av*R`?GS?@@yGz?:$>ǴW۠AyX۠A:i>`?GS?@@yGz?h!>ǴW۠AyX۠AZ)`oة`?GS?@@yGz?*D>ǴW۠AyX۠Aٳ`?GS?@@yGz?Y9g>ǴW۠AyX۠A$yrz`?GS?@@yGz?5>ǴW۠AyX۠ASZ $c`?GS?@@yGz?by>ǴW۠AyX۠A 1L`?GS?@@yGz?wXϨ>ǴW۠AyX۠As J5`?GS?@@yGz?Ai >ǴW۠AyX۠A-`?GS?@@yGz?FFZ>ǴW۠AyX۠Ayao`?GS?@@yGz?vKw7>ǴW۠AyX۠A*e_?GS?@@yGz?<,Z>ǴW۠AyX۠An#_?GS?@@yGz?.|>ǴW۠AyX۠A T_?GS?@@yGz?hW>ǴW۠AyX۠A, 0#c_?GS?@@yGz?3K©>ǴW۠AyX۠A=8_?GS?@@yGz?Ec>ǴW۠AyX۠A#_?GS?@@yGz?#>ǴW۠AyX۠Aף^?GS?@@yGz?"gi*>ǴW۠AyX۠AI*^?GS?@@yGz?M>ǴW۠AyX۠A0n ^?GS?@@yGz? o>ǴW۠AyX۠Ak^?GS?@@yGz?lP4>ǴW۠AyX۠Ao+D^?GS?@@yGz?x=>ǴW۠AyX۠AV@c^?GS?@@yGz?Iת>ǴW۠AyX۠A h]?GS?@@yGz?Iך>+W۠AyX۠A hm?::?@@yGz?$E}\>+W۠AyX۠A Tt4m?::?@@yGz?m_b>+W۠AyX۠AO^m?::?@@yGz?UB0>+W۠AyX۠A.M%Qm?::?@@yGz?*$>+W۠AyX۠A( l?::?@@yGz?f3>+W۠AyX۠A3=(l?::?@@yGz?umx>+W۠AyX۠Aս?l?::?@@yGz?LGw׽>+W۠AyX۠A2 fk?::?@@yGz?*A>+W۠AyX۠Artk?::?@@yGz? H>+W۠AyX۠AȆʾvk?::?@@yGz?ct>+W۠AyX۠A 7>6k?::?@@yGz?˜Vӝ>+W۠AyX۠A#j?::?@@yGz?!!9>+W۠AyX۠AMuj?::?@@yGz?zS^>+W۠AyX۠A{j?::?@@yGz?X1>+W۠AyX۠A}?j?::?@@yGz?4>&>+W۠AyX۠A޿j?::?@@yGz?BÐ.>+W۠AyX۠A'Ipi?::?@@yGz?ʥs>+W۠AyX۠Acݑi?::?@@yGz?ZSd>+W۠AyX۠A1Yi?::?@@yGz?j>+W۠AyX۠A֝>^"i?::?@@yGz?B &">+W۠AyX۠A.h?::?@@yGz?;D>+W۠AyX۠A5Fh?::?@@yGz?k: g>+W۠AyX۠AI>`h?::?@@yGz?~:>+W۠AyX۠A*=Oh?::?@@yGz?ﬠ>+W۠AyX۠AiZVh?::?@@yGz?iݤϠ>+W۠AyX۠AKfg?::?@@yGz?(KY>+W۠AyX۠A]g?::?@@yGz?FX>+W۠AyX۠AsdZg?::?@@yGz?Ӱ7>+W۠AyX۠ArZg?::?@@yGz?"xZ>+W۠AyX۠A~0,g?::?@@yGz?[-}>+W۠AyX۠A =4f?::?@@yGz?⟡>+W۠AyX۠ADEf?::?@@yGz?mEu¡>+W۠AyX۠A^[:Vf?::?@@yGz?t(gL>+W۠AyX۠AHGnmxf?::?@@yGz?JlX>+W۠AyX۠AJ6-Mf?::?@@yGz?ӰI*>+W۠AyX۠AQ!"f?::?@@yGz?&:kM>+W۠AyX۠Ame?::?@@yGz?29, p>+W۠AyX۠A[(=e?::?@@yGz?b}Ւ>+W۠AyX۠A|>|e?::?@@yGz?q>+W۠AyX۠AD+W۠AyX۠Ay1¼Ve?::?@@yGz?NI>+W۠AyX۠Aw`/e?::?@@yGz?>+W۠AyX۠A]o@ e?::?@@yGz?*O]@>+W۠AyX۠APfSd?::?@@yGz?~c>+W۠AyX۠AVߠd?::?@@yGz?ZDž>+W۠AyX۠Ad?::?@@yGz?tݞ|>+W۠AyX۠Ajtd?::?@@yGz? 1ˣ>+W۠AyX۠A](EPd?::?@@yGz?Q<'>+W۠AyX۠AO r-d?::?@@yGz?kk{>+W۠AyX۠Ab9 d?::?@@yGz?.lP3>+W۠AyX۠ATc?::?@@yGz?]V>+W۠AyX۠A8"c?::?@@yGz? 7Ox>+W۠AyX۠A͜c?::?@@yGz?x)|@o>+W۠AyX۠AG揇c?::?@@yGz?X1$>+W۠AyX۠Av3nbc?::?@@yGz?T#>+W۠AyX۠A?^ Bc?::?@@yGz?ŷH>+W۠AyX۠Aoۄ"c?::?@@yGz?2C&>+W۠AyX۠Adwdpc?::?@@yGz?H>+W۠AyX۠ADob?::?@@yGz?Fk>+W۠AyX۠ArEmb?::?@@yGz?xuYa>+W۠AyX۠A~b?::?@@yGz?ꤝ>+W۠AyX۠Ajb?::?@@yGz?Yӥ>+W۠AyX۠A:Flb?::?@@yGz?&>+W۠AyX۠ACY)Ob?::?@@yGz?63j5>+W۠AyX۠AB}mh2b?::?@@yGz?b;>+W۠AyX۠Aeb?::?@@yGz?^>+W۠AyX۠Am>a?::?@@yGz?6rT>+W۠AyX۠AF8a?::?@@yGz?zc >+W۠AyX۠A"Ka?::?@@yGz?\ TƦ>+W۠AyX۠AVça?::?@@yGz?OFs>+W۠AyX۠A`Ia?::?@@yGz?:G7( >+W۠AyX۠A|Sra?::?@@yGz?(.>+W۠AyX۠AvVxXa?::?@@yGz?Q>+W۠AyX۠AƭNm>a?::?@@yGz?  Gt>+W۠AyX۠AA"%a?::?@@yGz?+W۠AyX۠AB. a?::?@@yGz?`l>+W۠AyX۠A` g`?::?@@yGz?˛eܧ>+W۠AyX۠Av*R`?::?@@yGz?:$>+W۠AyX۠A:i>`?::?@@yGz?h!>+W۠AyX۠AZ)`oة`?::?@@yGz?*D>+W۠AyX۠Aٳ`?::?@@yGz?Y9g>+W۠AyX۠A$yrz`?::?@@yGz?5>+W۠AyX۠ASZ $c`?::?@@yGz?by>+W۠AyX۠A 1L`?::?@@yGz?wXϨ>+W۠AyX۠As J5`?::?@@yGz?Ai >+W۠AyX۠A-`?::?@@yGz?FFZ>+W۠AyX۠Ayao`?::?@@yGz?vKw7>+W۠AyX۠A*e_?::?@@yGz?<,Z>+W۠AyX۠An#_?::?@@yGz?.|>+W۠AyX۠A T_?::?@@yGz?hW>+W۠AyX۠A, 0#c_?::?@@yGz?3K©>+W۠AyX۠A=8_?::?@@yGz?Dc>+W۠AyX۠A#_?::?@@yGz?#>+W۠AyX۠Aף^?::?@@yGz?"gi*>+W۠AyX۠AI*^?::?@@yGz?M>+W۠AyX۠A0n ^?::?@@yGz? o>+W۠AyX۠Ak^?::?@@yGz?kP4>+W۠AyX۠Ao+D^?::?@@yGz?x=>+W۠AyX۠AV@c^?::?@@yGz?Iת>+W۠AyX۠A h]?::?@@yGz?Iך>W۠AyX۠A hm?7)"?@@yGz?%E}\>W۠AyX۠A Tt4m?7)"?@@yGz?m_b>W۠AyX۠AO^m?7)"?@@yGz?UB0>W۠AyX۠A.M%Qm?7)"?@@yGz?*$>W۠AyX۠A( l?7)"?@@yGz?f3>W۠AyX۠A3=(l?7)"?@@yGz?tmx>W۠AyX۠Aս?l?7)"?@@yGz?KGw׽>W۠AyX۠A2 fk?7)"?@@yGz?*A>W۠AyX۠Artk?7)"?@@yGz? H>W۠AyX۠AȆʾvk?7)"?@@yGz?ct>W۠AyX۠A 7>6k?7)"?@@yGz?˜Vӝ>W۠AyX۠A#j?7)"?@@yGz?!!9>W۠AyX۠AMuj?7)"?@@yGz?zS^>W۠AyX۠A{j?7)"?@@yGz?X1>W۠AyX۠A}?j?7)"?@@yGz?5>&>W۠AyX۠A޿j?7)"?@@yGz?BÐ.>W۠AyX۠A'Ipi?7)"?@@yGz?ʥs>W۠AyX۠Acݑi?7)"?@@yGz?ZSd>W۠AyX۠A1Yi?7)"?@@yGz?j>W۠AyX۠Aם>^"i?7)"?@@yGz?B &">W۠AyX۠A.h?7)"?@@yGz?;D>W۠AyX۠A5Fh?7)"?@@yGz?k: g>W۠AyX۠AI>`h?7)"?@@yGz?~:>W۠AyX۠A+=Oh?7)"?@@yGz?ﬠ>W۠AyX۠AiZVh?7)"?@@yGz?iݤϠ>W۠AyX۠AKfg?7)"?@@yGz?(KY>W۠AyX۠A]g?7)"?@@yGz?FX>W۠AyX۠AsdZg?7)"?@@yGz?Ӱ7>W۠AyX۠ArZg?7)"?@@yGz?"xZ>W۠AyX۠A0,g?7)"?@@yGz?[-}>W۠AyX۠A=4f?7)"?@@yGz?⟡>W۠AyX۠ADEf?7)"?@@yGz?mEu¡>W۠AyX۠A^[:Vf?7)"?@@yGz?t(gL>W۠AyX۠AHGnmxf?7)"?@@yGz?JlX>W۠AyX۠AJ6-Mf?7)"?@@yGz?ӰI*>W۠AyX۠AQ!"f?7)"?@@yGz?&:kM>W۠AyX۠Ame?7)"?@@yGz?29, p>W۠AyX۠A[(=e?7)"?@@yGz?b}Ւ>W۠AyX۠A|>|e?7)"?@@yGz?q>W۠AyX۠ADW۠AyX۠Ay1¼Ve?7)"?@@yGz?NI>W۠AyX۠Av`/e?7)"?@@yGz?>W۠AyX۠A]o@ e?7)"?@@yGz?*O]@>W۠AyX۠AQfSd?7)"?@@yGz?~c>W۠AyX۠AVߠd?7)"?@@yGz?ZDž>W۠AyX۠Ad?7)"?@@yGz?uݞ|>W۠AyX۠Ajtd?7)"?@@yGz? 1ˣ>W۠AyX۠A](EPd?7)"?@@yGz?Q<'>W۠AyX۠AO r-d?7)"?@@yGz?kk{>W۠AyX۠Ab9 d?7)"?@@yGz?.lP3>W۠AyX۠ATc?7)"?@@yGz?]V>W۠AyX۠A8"c?7)"?@@yGz? 7Ox>W۠AyX۠A͜c?7)"?@@yGz?x)|@o>W۠AyX۠AF揇c?7)"?@@yGz?X1$>W۠AyX۠Aw3nbc?7)"?@@yGz?U#>W۠AyX۠A>^ Bc?7)"?@@yGz?ķH>W۠AyX۠Aoۄ"c?7)"?@@yGz?2C&>W۠AyX۠Adwdpc?7)"?@@yGz?H>W۠AyX۠ADob?7)"?@@yGz?Fk>W۠AyX۠ArEmb?7)"?@@yGz?xuYa>W۠AyX۠A~b?7)"?@@yGz?ꤝ>W۠AyX۠Akb?7)"?@@yGz?Yӥ>W۠AyX۠A;Flb?7)"?@@yGz?&>W۠AyX۠ABY)Ob?7)"?@@yGz?63j5>W۠AyX۠AB}mh2b?7)"?@@yGz?b;>W۠AyX۠Aeb?7)"?@@yGz?^>W۠AyX۠Am>a?7)"?@@yGz?6rT>W۠AyX۠AF8a?7)"?@@yGz?zc >W۠AyX۠A"Ka?7)"?@@yGz?[ TƦ>W۠AyX۠AVça?7)"?@@yGz?OFs>W۠AyX۠A`Ia?7)"?@@yGz?:G7( >W۠AyX۠A|Sra?7)"?@@yGz?(.>W۠AyX۠AvVxXa?7)"?@@yGz?Q>W۠AyX۠AƭNm>a?7)"?@@yGz?  Gt>W۠AyX۠AA"%a?7)"?@@yGz?W۠AyX۠AB. a?7)"?@@yGz?`l>W۠AyX۠A` g`?7)"?@@yGz?̛eܧ>W۠AyX۠Av*R`?7)"?@@yGz?:$>W۠AyX۠A:i>`?7)"?@@yGz?h!>W۠AyX۠AZ)`oة`?7)"?@@yGz?*D>W۠AyX۠Aٳ`?7)"?@@yGz?Y9g>W۠AyX۠A$yrz`?7)"?@@yGz?5>W۠AyX۠ASZ $c`?7)"?@@yGz?by>W۠AyX۠A 1L`?7)"?@@yGz?wXϨ>W۠AyX۠As J5`?7)"?@@yGz?Ai >W۠AyX۠A-`?7)"?@@yGz?FFZ>W۠AyX۠Ayao`?7)"?@@yGz?vKw7>W۠AyX۠A*e_?7)"?@@yGz?<,Z>W۠AyX۠An#_?7)"?@@yGz?.|>W۠AyX۠A T_?7)"?@@yGz?hW>W۠AyX۠A, 0#c_?7)"?@@yGz?3K©>W۠AyX۠A=8_?7)"?@@yGz?Ec>W۠AyX۠A#_?7)"?@@yGz?#>W۠AyX۠Aף^?7)"?@@yGz?"gi*>W۠AyX۠AI*^?7)"?@@yGz?M>W۠AyX۠A0n ^?7)"?@@yGz? o>W۠AyX۠Ak^?7)"?@@yGz?lP4>W۠AyX۠Ao+D^?7)"?@@yGz?x=>W۠AyX۠AV@c^?7)"?@@yGz?Iת>W۠AyX۠A h]?7)"?@@yGz?Iך>W۠AyX۠A hm?Z8h ?@@yGz?$E}\>W۠AyX۠A Tt4m?Z8h ?@@yGz?m_b>W۠AyX۠AO^m?Z8h ?@@yGz?UB0>W۠AyX۠A.M%Qm?Z8h ?@@yGz?*$>W۠AyX۠A( l?Z8h ?@@yGz?f3>W۠AyX۠A3=(l?Z8h ?@@yGz?umx>W۠AyX۠Aս?l?Z8h ?@@yGz?LGw׽>W۠AyX۠A2 fk?Z8h ?@@yGz?*A>W۠AyX۠Artk?Z8h ?@@yGz? H>W۠AyX۠AȆʾvk?Z8h ?@@yGz?ct>W۠AyX۠A 7>6k?Z8h ?@@yGz?˜Vӝ>W۠AyX۠A#j?Z8h ?@@yGz?!!9>W۠AyX۠AMuj?Z8h ?@@yGz?zS^>W۠AyX۠A{j?Z8h ?@@yGz?X1>W۠AyX۠A}?j?Z8h ?@@yGz?4>&>W۠AyX۠A޿j?Z8h ?@@yGz?BÐ.>W۠AyX۠A'Ipi?Z8h ?@@yGz?ʥs>W۠AyX۠Acݑi?Z8h ?@@yGz?ZSd>W۠AyX۠A1Yi?Z8h ?@@yGz?j>W۠AyX۠A֝>^"i?Z8h ?@@yGz?B &">W۠AyX۠A.h?Z8h ?@@yGz?;D>W۠AyX۠A5Fh?Z8h ?@@yGz?k: g>W۠AyX۠AI>`h?Z8h ?@@yGz?~:>W۠AyX۠A*=Oh?Z8h ?@@yGz?ﬠ>W۠AyX۠AiZVh?Z8h ?@@yGz?iݤϠ>W۠AyX۠AKfg?Z8h ?@@yGz?(KY>W۠AyX۠A]g?Z8h ?@@yGz?FX>W۠AyX۠AsdZg?Z8h ?@@yGz?Ӱ7>W۠AyX۠ArZg?Z8h ?@@yGz?"xZ>W۠AyX۠A~0,g?Z8h ?@@yGz?[-}>W۠AyX۠A =4f?Z8h ?@@yGz?⟡>W۠AyX۠ADEf?Z8h ?@@yGz?mEu¡>W۠AyX۠A^[:Vf?Z8h ?@@yGz?t(gL>W۠AyX۠AHGnmxf?Z8h ?@@yGz?JlX>W۠AyX۠AJ6-Mf?Z8h ?@@yGz?ӰI*>W۠AyX۠AQ!"f?Z8h ?@@yGz?&:kM>W۠AyX۠Ame?Z8h ?@@yGz?29, p>W۠AyX۠A[(=e?Z8h ?@@yGz?b}Ւ>W۠AyX۠A|>|e?Z8h ?@@yGz?q>W۠AyX۠ADW۠AyX۠Ay1¼Ve?Z8h ?@@yGz?NI>W۠AyX۠Aw`/e?Z8h ?@@yGz?>W۠AyX۠A]o@ e?Z8h ?@@yGz?*O]@>W۠AyX۠APfSd?Z8h ?@@yGz?~c>W۠AyX۠AVߠd?Z8h ?@@yGz?ZDž>W۠AyX۠Ad?Z8h ?@@yGz?tݞ|>W۠AyX۠Ajtd?Z8h ?@@yGz? 1ˣ>W۠AyX۠A](EPd?Z8h ?@@yGz?Q<'>W۠AyX۠AO r-d?Z8h ?@@yGz?kk{>W۠AyX۠Ab9 d?Z8h ?@@yGz?.lP3>W۠AyX۠ATc?Z8h ?@@yGz?]V>W۠AyX۠A8"c?Z8h ?@@yGz? 7Ox>W۠AyX۠A͜c?Z8h ?@@yGz?x)|@o>W۠AyX۠AG揇c?Z8h ?@@yGz?X1$>W۠AyX۠Av3nbc?Z8h ?@@yGz?T#>W۠AyX۠A?^ Bc?Z8h ?@@yGz?ŷH>W۠AyX۠Aoۄ"c?Z8h ?@@yGz?2C&>W۠AyX۠Adwdpc?Z8h ?@@yGz?H>W۠AyX۠ADob?Z8h ?@@yGz?Fk>W۠AyX۠ArEmb?Z8h ?@@yGz?xuYa>W۠AyX۠A~b?Z8h ?@@yGz?ꤝ>W۠AyX۠Ajb?Z8h ?@@yGz?Yӥ>W۠AyX۠A:Flb?Z8h ?@@yGz?&>W۠AyX۠ACY)Ob?Z8h ?@@yGz?63j5>W۠AyX۠AB}mh2b?Z8h ?@@yGz?b;>W۠AyX۠Aeb?Z8h ?@@yGz?^>W۠AyX۠Am>a?Z8h ?@@yGz?6rT>W۠AyX۠AF8a?Z8h ?@@yGz?zc >W۠AyX۠A"Ka?Z8h ?@@yGz?\ TƦ>W۠AyX۠AVça?Z8h ?@@yGz?OFs>W۠AyX۠A`Ia?Z8h ?@@yGz?:G7( >W۠AyX۠A|Sra?Z8h ?@@yGz?(.>W۠AyX۠AvVxXa?Z8h ?@@yGz?Q>W۠AyX۠AƭNm>a?Z8h ?@@yGz?  Gt>W۠AyX۠AA"%a?Z8h ?@@yGz?W۠AyX۠AB. a?Z8h ?@@yGz?`l>W۠AyX۠A` g`?Z8h ?@@yGz?˛eܧ>W۠AyX۠Av*R`?Z8h ?@@yGz?:$>W۠AyX۠A:i>`?Z8h ?@@yGz?h!>W۠AyX۠AZ)`oة`?Z8h ?@@yGz?*D>W۠AyX۠Aٳ`?Z8h ?@@yGz?Y9g>W۠AyX۠A$yrz`?Z8h ?@@yGz?5>W۠AyX۠ASZ $c`?Z8h ?@@yGz?by>W۠AyX۠A 1L`?Z8h ?@@yGz?wXϨ>W۠AyX۠As J5`?Z8h ?@@yGz?Ai >W۠AyX۠A-`?Z8h ?@@yGz?FFZ>W۠AyX۠Ayao`?Z8h ?@@yGz?vKw7>W۠AyX۠A*e_?Z8h ?@@yGz?<,Z>W۠AyX۠An#_?Z8h ?@@yGz?.|>W۠AyX۠A T_?Z8h ?@@yGz?hW>W۠AyX۠A, 0#c_?Z8h ?@@yGz?3K©>W۠AyX۠A=8_?Z8h ?@@yGz?Dc>W۠AyX۠A#_?Z8h ?@@yGz?#>W۠AyX۠Aף^?Z8h ?@@yGz?"gi*>W۠AyX۠AI*^?Z8h ?@@yGz?M>W۠AyX۠A0n ^?Z8h ?@@yGz? o>W۠AyX۠Ak^?Z8h ?@@yGz?kP4>W۠AyX۠Ao+D^?Z8h ?@@yGz?x=>W۠AyX۠AV@c^?Z8h ?@@yGz?Iת>W۠AyX۠A h]?Z8h ?@@yGz?Iך>W۠AyX۠A hm?}M ?@@yGz?%E}\>W۠AyX۠A Tt4m?}M ?@@yGz?m_b>W۠AyX۠AO^m?}M ?@@yGz?UB0>W۠AyX۠A.M%Qm?}M ?@@yGz?*$>W۠AyX۠A( l?}M ?@@yGz?f3>W۠AyX۠A3=(l?}M ?@@yGz?tmx>W۠AyX۠Aս?l?}M ?@@yGz?KGw׽>W۠AyX۠A2 fk?}M ?@@yGz?*A>W۠AyX۠Artk?}M ?@@yGz? H>W۠AyX۠AȆʾvk?}M ?@@yGz?ct>W۠AyX۠A 7>6k?}M ?@@yGz?˜Vӝ>W۠AyX۠A#j?}M ?@@yGz?!!9>W۠AyX۠AMuj?}M ?@@yGz?zS^>W۠AyX۠A{j?}M ?@@yGz?X1>W۠AyX۠A}?j?}M ?@@yGz?5>&>W۠AyX۠A޿j?}M ?@@yGz?BÐ.>W۠AyX۠A'Ipi?}M ?@@yGz?ʥs>W۠AyX۠Acݑi?}M ?@@yGz?ZSd>W۠AyX۠A1Yi?}M ?@@yGz?j>W۠AyX۠Aם>^"i?}M ?@@yGz?B &">W۠AyX۠A.h?}M ?@@yGz?;D>W۠AyX۠A5Fh?}M ?@@yGz?k: g>W۠AyX۠AI>`h?}M ?@@yGz?~:>W۠AyX۠A+=Oh?}M ?@@yGz?ﬠ>W۠AyX۠AiZVh?}M ?@@yGz?iݤϠ>W۠AyX۠AKfg?}M ?@@yGz?(KY>W۠AyX۠A]g?}M ?@@yGz?FX>W۠AyX۠AsdZg?}M ?@@yGz?Ӱ7>W۠AyX۠ArZg?}M ?@@yGz?"xZ>W۠AyX۠A0,g?}M ?@@yGz?[-}>W۠AyX۠A=4f?}M ?@@yGz?⟡>W۠AyX۠ADEf?}M ?@@yGz?mEu¡>W۠AyX۠A^[:Vf?}M ?@@yGz?t(gL>W۠AyX۠AHGnmxf?}M ?@@yGz?JlX>W۠AyX۠AJ6-Mf?}M ?@@yGz?ӰI*>W۠AyX۠AQ!"f?}M ?@@yGz?&:kM>W۠AyX۠Ame?}M ?@@yGz?29, p>W۠AyX۠A[(=e?}M ?@@yGz?b}Ւ>W۠AyX۠A|>|e?}M ?@@yGz?q>W۠AyX۠ADW۠AyX۠Ay1¼Ve?}M ?@@yGz?NI>W۠AyX۠Av`/e?}M ?@@yGz?>W۠AyX۠A]o@ e?}M ?@@yGz?*O]@>W۠AyX۠AQfSd?}M ?@@yGz?~c>W۠AyX۠AVߠd?}M ?@@yGz?ZDž>W۠AyX۠Ad?}M ?@@yGz?uݞ|>W۠AyX۠Ajtd?}M ?@@yGz? 1ˣ>W۠AyX۠A](EPd?}M ?@@yGz?Q<'>W۠AyX۠AO r-d?}M ?@@yGz?kk{>W۠AyX۠Ab9 d?}M ?@@yGz?.lP3>W۠AyX۠ATc?}M ?@@yGz?]V>W۠AyX۠A8"c?}M ?@@yGz? 7Ox>W۠AyX۠A͜c?}M ?@@yGz?x)|@o>W۠AyX۠AF揇c?}M ?@@yGz?X1$>W۠AyX۠Aw3nbc?}M ?@@yGz?U#>W۠AyX۠A>^ Bc?}M ?@@yGz?ķH>W۠AyX۠Aoۄ"c?}M ?@@yGz?2C&>W۠AyX۠Adwdpc?}M ?@@yGz?H>W۠AyX۠ADob?}M ?@@yGz?Fk>W۠AyX۠ArEmb?}M ?@@yGz?xuYa>W۠AyX۠A~b?}M ?@@yGz?ꤝ>W۠AyX۠Akb?}M ?@@yGz?Yӥ>W۠AyX۠A;Flb?}M ?@@yGz?&>W۠AyX۠ABY)Ob?}M ?@@yGz?63j5>W۠AyX۠AB}mh2b?}M ?@@yGz?b;>W۠AyX۠Aeb?}M ?@@yGz?^>W۠AyX۠Am>a?}M ?@@yGz?6rT>W۠AyX۠AF8a?}M ?@@yGz?zc >W۠AyX۠A"Ka?}M ?@@yGz?[ TƦ>W۠AyX۠AVça?}M ?@@yGz?OFs>W۠AyX۠A`Ia?}M ?@@yGz?:G7( >W۠AyX۠A|Sra?}M ?@@yGz?(.>W۠AyX۠AvVxXa?}M ?@@yGz?Q>W۠AyX۠AƭNm>a?}M ?@@yGz?  Gt>W۠AyX۠AA"%a?}M ?@@yGz?W۠AyX۠AB. a?}M ?@@yGz?`l>W۠AyX۠A` g`?}M ?@@yGz?̛eܧ>W۠AyX۠Av*R`?}M ?@@yGz?:$>W۠AyX۠A:i>`?}M ?@@yGz?h!>W۠AyX۠AZ)`oة`?}M ?@@yGz?*D>W۠AyX۠Aٳ`?}M ?@@yGz?Y9g>W۠AyX۠A$yrz`?}M ?@@yGz?5>W۠AyX۠ASZ $c`?}M ?@@yGz?by>W۠AyX۠A 1L`?}M ?@@yGz?wXϨ>W۠AyX۠As J5`?}M ?@@yGz?Ai >W۠AyX۠A-`?}M ?@@yGz?FFZ>W۠AyX۠Ayao`?}M ?@@yGz?vKw7>W۠AyX۠A*e_?}M ?@@yGz?<,Z>W۠AyX۠An#_?}M ?@@yGz?.|>W۠AyX۠A T_?}M ?@@yGz?hW>W۠AyX۠A, 0#c_?}M ?@@yGz?3K©>W۠AyX۠A=8_?}M ?@@yGz?Ec>W۠AyX۠A#_?}M ?@@yGz?#>W۠AyX۠Aף^?}M ?@@yGz?"gi*>W۠AyX۠AI*^?}M ?@@yGz?M>W۠AyX۠A0n ^?}M ?@@yGz? o>W۠AyX۠Ak^?}M ?@@yGz?lP4>W۠AyX۠Ao+D^?}M ?@@yGz?x=>W۠AyX۠AV@c^?}M ?@@yGz?Iת>W۠AyX۠A h]?}M ?@@yGz?Iך> W۠AyX۠A hm?ˠ63|?@@yGz?$E}\> W۠AyX۠A Tt4m?ˠ63|?@@yGz?m_b> W۠AyX۠AO^m?ˠ63|?@@yGz?UB0> W۠AyX۠A.M%Qm?ˠ63|?@@yGz?*$> W۠AyX۠A( l?ˠ63|?@@yGz?f3> W۠AyX۠A3=(l?ˠ63|?@@yGz?umx> W۠AyX۠Aս?l?ˠ63|?@@yGz?LGw׽> W۠AyX۠A2 fk?ˠ63|?@@yGz?*A> W۠AyX۠Artk?ˠ63|?@@yGz? H> W۠AyX۠AȆʾvk?ˠ63|?@@yGz?ct> W۠AyX۠A 7>6k?ˠ63|?@@yGz?˜Vӝ> W۠AyX۠A#j?ˠ63|?@@yGz?!!9> W۠AyX۠AMuj?ˠ63|?@@yGz?zS^> W۠AyX۠A{j?ˠ63|?@@yGz?X1> W۠AyX۠A}?j?ˠ63|?@@yGz?4>&> W۠AyX۠A޿j?ˠ63|?@@yGz?BÐ.> W۠AyX۠A'Ipi?ˠ63|?@@yGz?ʥs> W۠AyX۠Acݑi?ˠ63|?@@yGz?ZSd> W۠AyX۠A1Yi?ˠ63|?@@yGz?j> W۠AyX۠A֝>^"i?ˠ63|?@@yGz?B &"> W۠AyX۠A.h?ˠ63|?@@yGz?;D> W۠AyX۠A5Fh?ˠ63|?@@yGz?k: g> W۠AyX۠AI>`h?ˠ63|?@@yGz?~:> W۠AyX۠A*=Oh?ˠ63|?@@yGz?ﬠ> W۠AyX۠AiZVh?ˠ63|?@@yGz?iݤϠ> W۠AyX۠AKfg?ˠ63|?@@yGz?(KY> W۠AyX۠A]g?ˠ63|?@@yGz?FX> W۠AyX۠AsdZg?ˠ63|?@@yGz?Ӱ7> W۠AyX۠ArZg?ˠ63|?@@yGz?"xZ> W۠AyX۠A~0,g?ˠ63|?@@yGz?[-}> W۠AyX۠A =4f?ˠ63|?@@yGz?⟡> W۠AyX۠ADEf?ˠ63|?@@yGz?mEu¡> W۠AyX۠A^[:Vf?ˠ63|?@@yGz?t(gL> W۠AyX۠AHGnmxf?ˠ63|?@@yGz?JlX> W۠AyX۠AJ6-Mf?ˠ63|?@@yGz?ӰI*> W۠AyX۠AQ!"f?ˠ63|?@@yGz?&:kM> W۠AyX۠Ame?ˠ63|?@@yGz?29, p> W۠AyX۠A[(=e?ˠ63|?@@yGz?b}Ւ> W۠AyX۠A|>|e?ˠ63|?@@yGz?q> W۠AyX۠AD W۠AyX۠Ay1¼Ve?ˠ63|?@@yGz?NI> W۠AyX۠Aw`/e?ˠ63|?@@yGz?> W۠AyX۠A]o@ e?ˠ63|?@@yGz?*O]@> W۠AyX۠APfSd?ˠ63|?@@yGz?~c> W۠AyX۠AVߠd?ˠ63|?@@yGz?ZDž> W۠AyX۠Ad?ˠ63|?@@yGz?tݞ|> W۠AyX۠Ajtd?ˠ63|?@@yGz? 1ˣ> W۠AyX۠A](EPd?ˠ63|?@@yGz?Q<'> W۠AyX۠AO r-d?ˠ63|?@@yGz?kk{> W۠AyX۠Ab9 d?ˠ63|?@@yGz?.lP3> W۠AyX۠ATc?ˠ63|?@@yGz?]V> W۠AyX۠A8"c?ˠ63|?@@yGz? 7Ox> W۠AyX۠A͜c?ˠ63|?@@yGz?x)|@o> W۠AyX۠AG揇c?ˠ63|?@@yGz?X1$> W۠AyX۠Av3nbc?ˠ63|?@@yGz?T#> W۠AyX۠A?^ Bc?ˠ63|?@@yGz?ŷH> W۠AyX۠Aoۄ"c?ˠ63|?@@yGz?2C&> W۠AyX۠Adwdpc?ˠ63|?@@yGz?H> W۠AyX۠ADob?ˠ63|?@@yGz?Fk> W۠AyX۠ArEmb?ˠ63|?@@yGz?xuYa> W۠AyX۠A~b?ˠ63|?@@yGz?ꤝ> W۠AyX۠Ajb?ˠ63|?@@yGz?Yӥ> W۠AyX۠A:Flb?ˠ63|?@@yGz?&> W۠AyX۠ACY)Ob?ˠ63|?@@yGz?63j5> W۠AyX۠AB}mh2b?ˠ63|?@@yGz?b;> W۠AyX۠Aeb?ˠ63|?@@yGz?^> W۠AyX۠Am>a?ˠ63|?@@yGz?6rT> W۠AyX۠AF8a?ˠ63|?@@yGz?zc > W۠AyX۠A"Ka?ˠ63|?@@yGz?\ TƦ> W۠AyX۠AVça?ˠ63|?@@yGz?OFs> W۠AyX۠A`Ia?ˠ63|?@@yGz?:G7( > W۠AyX۠A|Sra?ˠ63|?@@yGz?(.> W۠AyX۠AvVxXa?ˠ63|?@@yGz?Q> W۠AyX۠AƭNm>a?ˠ63|?@@yGz?  Gt> W۠AyX۠AA"%a?ˠ63|?@@yGz? W۠AyX۠AB. a?ˠ63|?@@yGz?`l> W۠AyX۠A` g`?ˠ63|?@@yGz?˛eܧ> W۠AyX۠Av*R`?ˠ63|?@@yGz?:$> W۠AyX۠A:i>`?ˠ63|?@@yGz?h!> W۠AyX۠AZ)`oة`?ˠ63|?@@yGz?*D> W۠AyX۠Aٳ`?ˠ63|?@@yGz?Y9g> W۠AyX۠A$yrz`?ˠ63|?@@yGz?5> W۠AyX۠ASZ $c`?ˠ63|?@@yGz?by> W۠AyX۠A 1L`?ˠ63|?@@yGz?wXϨ> W۠AyX۠As J5`?ˠ63|?@@yGz?Ai > W۠AyX۠A-`?ˠ63|?@@yGz?FFZ> W۠AyX۠Ayao`?ˠ63|?@@yGz?vKw7> W۠AyX۠A*e_?ˠ63|?@@yGz?<,Z> W۠AyX۠An#_?ˠ63|?@@yGz?.|> W۠AyX۠A T_?ˠ63|?@@yGz?hW> W۠AyX۠A, 0#c_?ˠ63|?@@yGz?3K©> W۠AyX۠A=8_?ˠ63|?@@yGz?Dc> W۠AyX۠A#_?ˠ63|?@@yGz?#> W۠AyX۠Aף^?ˠ63|?@@yGz?"gi*> W۠AyX۠AI*^?ˠ63|?@@yGz?M> W۠AyX۠A0n ^?ˠ63|?@@yGz? o> W۠AyX۠Ak^?ˠ63|?@@yGz?kP4> W۠AyX۠Ao+D^?ˠ63|?@@yGz?x=> W۠AyX۠AV@c^?ˠ63|?@@yGz?Iת> W۠AyX۠A h]?ˠ63|?@@yGz?Iך>W۠AyX۠A hm?õ?@@yGz?%E}\>W۠AyX۠A Tt4m?õ?@@yGz?m_b>W۠AyX۠AO^m?õ?@@yGz?UB0>W۠AyX۠A.M%Qm?õ?@@yGz?*$>W۠AyX۠A( l?õ?@@yGz?f3>W۠AyX۠A3=(l?õ?@@yGz?tmx>W۠AyX۠Aս?l?õ?@@yGz?KGw׽>W۠AyX۠A2 fk?õ?@@yGz?*A>W۠AyX۠Artk?õ?@@yGz? H>W۠AyX۠AȆʾvk?õ?@@yGz?ct>W۠AyX۠A 7>6k?õ?@@yGz?˜Vӝ>W۠AyX۠A#j?õ?@@yGz?!!9>W۠AyX۠AMuj?õ?@@yGz?zS^>W۠AyX۠A{j?õ?@@yGz?X1>W۠AyX۠A}?j?õ?@@yGz?5>&>W۠AyX۠A޿j?õ?@@yGz?BÐ.>W۠AyX۠A'Ipi?õ?@@yGz?ʥs>W۠AyX۠Acݑi?õ?@@yGz?ZSd>W۠AyX۠A1Yi?õ?@@yGz?j>W۠AyX۠Aם>^"i?õ?@@yGz?B &">W۠AyX۠A.h?õ?@@yGz?;D>W۠AyX۠A5Fh?õ?@@yGz?k: g>W۠AyX۠AI>`h?õ?@@yGz?~:>W۠AyX۠A+=Oh?õ?@@yGz?ﬠ>W۠AyX۠AiZVh?õ?@@yGz?iݤϠ>W۠AyX۠AKfg?õ?@@yGz?(KY>W۠AyX۠A]g?õ?@@yGz?FX>W۠AyX۠AsdZg?õ?@@yGz?Ӱ7>W۠AyX۠ArZg?õ?@@yGz?"xZ>W۠AyX۠A0,g?õ?@@yGz?[-}>W۠AyX۠A=4f?õ?@@yGz?⟡>W۠AyX۠ADEf?õ?@@yGz?mEu¡>W۠AyX۠A^[:Vf?õ?@@yGz?t(gL>W۠AyX۠AHGnmxf?õ?@@yGz?JlX>W۠AyX۠AJ6-Mf?õ?@@yGz?ӰI*>W۠AyX۠AQ!"f?õ?@@yGz?&:kM>W۠AyX۠Ame?õ?@@yGz?29, p>W۠AyX۠A[(=e?õ?@@yGz?b}Ւ>W۠AyX۠A|>|e?õ?@@yGz?q>W۠AyX۠ADW۠AyX۠Ay1¼Ve?õ?@@yGz?NI>W۠AyX۠Av`/e?õ?@@yGz?>W۠AyX۠A]o@ e?õ?@@yGz?*O]@>W۠AyX۠AQfSd?õ?@@yGz?~c>W۠AyX۠AVߠd?õ?@@yGz?ZDž>W۠AyX۠Ad?õ?@@yGz?uݞ|>W۠AyX۠Ajtd?õ?@@yGz? 1ˣ>W۠AyX۠A](EPd?õ?@@yGz?Q<'>W۠AyX۠AO r-d?õ?@@yGz?kk{>W۠AyX۠Ab9 d?õ?@@yGz?.lP3>W۠AyX۠ATc?õ?@@yGz?]V>W۠AyX۠A8"c?õ?@@yGz? 7Ox>W۠AyX۠A͜c?õ?@@yGz?x)|@o>W۠AyX۠AF揇c?õ?@@yGz?X1$>W۠AyX۠Aw3nbc?õ?@@yGz?U#>W۠AyX۠A>^ Bc?õ?@@yGz?ķH>W۠AyX۠Aoۄ"c?õ?@@yGz?2C&>W۠AyX۠Adwdpc?õ?@@yGz?H>W۠AyX۠ADob?õ?@@yGz?Fk>W۠AyX۠ArEmb?õ?@@yGz?xuYa>W۠AyX۠A~b?õ?@@yGz?ꤝ>W۠AyX۠Akb?õ?@@yGz?Yӥ>W۠AyX۠A;Flb?õ?@@yGz?&>W۠AyX۠ABY)Ob?õ?@@yGz?63j5>W۠AyX۠AB}mh2b?õ?@@yGz?b;>W۠AyX۠Aeb?õ?@@yGz?^>W۠AyX۠Am>a?õ?@@yGz?6rT>W۠AyX۠AF8a?õ?@@yGz?zc >W۠AyX۠A"Ka?õ?@@yGz?[ TƦ>W۠AyX۠AVça?õ?@@yGz?OFs>W۠AyX۠A`Ia?õ?@@yGz?:G7( >W۠AyX۠A|Sra?õ?@@yGz?(.>W۠AyX۠AvVxXa?õ?@@yGz?Q>W۠AyX۠AƭNm>a?õ?@@yGz?  Gt>W۠AyX۠AA"%a?õ?@@yGz?W۠AyX۠AB. a?õ?@@yGz?`l>W۠AyX۠A` g`?õ?@@yGz?̛eܧ>W۠AyX۠Av*R`?õ?@@yGz?:$>W۠AyX۠A:i>`?õ?@@yGz?h!>W۠AyX۠AZ)`oة`?õ?@@yGz?*D>W۠AyX۠Aٳ`?õ?@@yGz?Y9g>W۠AyX۠A$yrz`?õ?@@yGz?5>W۠AyX۠ASZ $c`?õ?@@yGz?by>W۠AyX۠A 1L`?õ?@@yGz?wXϨ>W۠AyX۠As J5`?õ?@@yGz?Ai >W۠AyX۠A-`?õ?@@yGz?FFZ>W۠AyX۠Ayao`?õ?@@yGz?vKw7>W۠AyX۠A*e_?õ?@@yGz?<,Z>W۠AyX۠An#_?õ?@@yGz?.|>W۠AyX۠A T_?õ?@@yGz?hW>W۠AyX۠A, 0#c_?õ?@@yGz?3K©>W۠AyX۠A=8_?õ?@@yGz?Ec>W۠AyX۠A#_?õ?@@yGz?#>W۠AyX۠Aף^?õ?@@yGz?"gi*>W۠AyX۠AI*^?õ?@@yGz?M>W۠AyX۠A0n ^?õ?@@yGz? o>W۠AyX۠Ak^?õ?@@yGz?lP4>W۠AyX۠Ao+D^?õ?@@yGz?x=>W۠AyX۠AV@c^?õ?@@yGz?Iת>W۠AyX۠A h]?õ?@@yGz?Iך>$W۠AyX۠A hm?4]?@@yGz?$E}\>$W۠AyX۠A Tt4m?4]?@@yGz?m_b>$W۠AyX۠AO^m?4]?@@yGz?UB0>$W۠AyX۠A.M%Qm?4]?@@yGz?*$>$W۠AyX۠A( l?4]?@@yGz?f3>$W۠AyX۠A3=(l?4]?@@yGz?umx>$W۠AyX۠Aս?l?4]?@@yGz?LGw׽>$W۠AyX۠A2 fk?4]?@@yGz?*A>$W۠AyX۠Artk?4]?@@yGz? H>$W۠AyX۠AȆʾvk?4]?@@yGz?ct>$W۠AyX۠A 7>6k?4]?@@yGz?˜Vӝ>$W۠AyX۠A#j?4]?@@yGz?!!9>$W۠AyX۠AMuj?4]?@@yGz?zS^>$W۠AyX۠A{j?4]?@@yGz?X1>$W۠AyX۠A}?j?4]?@@yGz?4>&>$W۠AyX۠A޿j?4]?@@yGz?BÐ.>$W۠AyX۠A'Ipi?4]?@@yGz?ʥs>$W۠AyX۠Acݑi?4]?@@yGz?ZSd>$W۠AyX۠A1Yi?4]?@@yGz?j>$W۠AyX۠A֝>^"i?4]?@@yGz?B &">$W۠AyX۠A.h?4]?@@yGz?;D>$W۠AyX۠A5Fh?4]?@@yGz?k: g>$W۠AyX۠AI>`h?4]?@@yGz?~:>$W۠AyX۠A*=Oh?4]?@@yGz?ﬠ>$W۠AyX۠AiZVh?4]?@@yGz?iݤϠ>$W۠AyX۠AKfg?4]?@@yGz?(KY>$W۠AyX۠A]g?4]?@@yGz?FX>$W۠AyX۠AsdZg?4]?@@yGz?Ӱ7>$W۠AyX۠ArZg?4]?@@yGz?"xZ>$W۠AyX۠A~0,g?4]?@@yGz?[-}>$W۠AyX۠A =4f?4]?@@yGz?⟡>$W۠AyX۠ADEf?4]?@@yGz?mEu¡>$W۠AyX۠A^[:Vf?4]?@@yGz?t(gL>$W۠AyX۠AHGnmxf?4]?@@yGz?JlX>$W۠AyX۠AJ6-Mf?4]?@@yGz?ӰI*>$W۠AyX۠AQ!"f?4]?@@yGz?&:kM>$W۠AyX۠Ame?4]?@@yGz?29, p>$W۠AyX۠A[(=e?4]?@@yGz?b}Ւ>$W۠AyX۠A|>|e?4]?@@yGz?q>$W۠AyX۠AD$W۠AyX۠Ay1¼Ve?4]?@@yGz?NI>$W۠AyX۠Aw`/e?4]?@@yGz?>$W۠AyX۠A]o@ e?4]?@@yGz?*O]@>$W۠AyX۠APfSd?4]?@@yGz?~c>$W۠AyX۠AVߠd?4]?@@yGz?ZDž>$W۠AyX۠Ad?4]?@@yGz?tݞ|>$W۠AyX۠Ajtd?4]?@@yGz? 1ˣ>$W۠AyX۠A](EPd?4]?@@yGz?Q<'>$W۠AyX۠AO r-d?4]?@@yGz?kk{>$W۠AyX۠Ab9 d?4]?@@yGz?.lP3>$W۠AyX۠ATc?4]?@@yGz?]V>$W۠AyX۠A8"c?4]?@@yGz? 7Ox>$W۠AyX۠A͜c?4]?@@yGz?x)|@o>$W۠AyX۠AG揇c?4]?@@yGz?X1$>$W۠AyX۠Av3nbc?4]?@@yGz?T#>$W۠AyX۠A?^ Bc?4]?@@yGz?ŷH>$W۠AyX۠Aoۄ"c?4]?@@yGz?2C&>$W۠AyX۠Adwdpc?4]?@@yGz?H>$W۠AyX۠ADob?4]?@@yGz?Fk>$W۠AyX۠ArEmb?4]?@@yGz?xuYa>$W۠AyX۠A~b?4]?@@yGz?ꤝ>$W۠AyX۠Ajb?4]?@@yGz?Yӥ>$W۠AyX۠A:Flb?4]?@@yGz?&>$W۠AyX۠ACY)Ob?4]?@@yGz?63j5>$W۠AyX۠AB}mh2b?4]?@@yGz?b;>$W۠AyX۠Aeb?4]?@@yGz?^>$W۠AyX۠Am>a?4]?@@yGz?6rT>$W۠AyX۠AF8a?4]?@@yGz?zc >$W۠AyX۠A"Ka?4]?@@yGz?\ TƦ>$W۠AyX۠AVça?4]?@@yGz?OFs>$W۠AyX۠A`Ia?4]?@@yGz?:G7( >$W۠AyX۠A|Sra?4]?@@yGz?(.>$W۠AyX۠AvVxXa?4]?@@yGz?Q>$W۠AyX۠AƭNm>a?4]?@@yGz?  Gt>$W۠AyX۠AA"%a?4]?@@yGz?$W۠AyX۠AB. a?4]?@@yGz?`l>$W۠AyX۠A` g`?4]?@@yGz?˛eܧ>$W۠AyX۠Av*R`?4]?@@yGz?:$>$W۠AyX۠A:i>`?4]?@@yGz?h!>$W۠AyX۠AZ)`oة`?4]?@@yGz?*D>$W۠AyX۠Aٳ`?4]?@@yGz?Y9g>$W۠AyX۠A$yrz`?4]?@@yGz?5>$W۠AyX۠ASZ $c`?4]?@@yGz?by>$W۠AyX۠A 1L`?4]?@@yGz?wXϨ>$W۠AyX۠As J5`?4]?@@yGz?Ai >$W۠AyX۠A-`?4]?@@yGz?FFZ>$W۠AyX۠Ayao`?4]?@@yGz?vKw7>$W۠AyX۠A*e_?4]?@@yGz?<,Z>$W۠AyX۠An#_?4]?@@yGz?.|>$W۠AyX۠A T_?4]?@@yGz?hW>$W۠AyX۠A, 0#c_?4]?@@yGz?3K©>$W۠AyX۠A=8_?4]?@@yGz?Dc>$W۠AyX۠A#_?4]?@@yGz?#>$W۠AyX۠Aף^?4]?@@yGz?"gi*>$W۠AyX۠AI*^?4]?@@yGz?M>$W۠AyX۠A0n ^?4]?@@yGz? o>$W۠AyX۠Ak^?4]?@@yGz?kP4>$W۠AyX۠Ao+D^?4]?@@yGz?x=>$W۠AyX۠AV@c^?4]?@@yGz?Iת>$W۠AyX۠A h]?4]?@@yGz?Iך>1mW۠AyX۠A hm? Ύ?@@yGz?%E}\>1mW۠AyX۠A Tt4m? Ύ?@@yGz?m_b>1mW۠AyX۠AO^m? Ύ?@@yGz?UB0>1mW۠AyX۠A.M%Qm? Ύ?@@yGz?*$>1mW۠AyX۠A( l? Ύ?@@yGz?f3>1mW۠AyX۠A3=(l? Ύ?@@yGz?tmx>1mW۠AyX۠Aս?l? Ύ?@@yGz?KGw׽>1mW۠AyX۠A2 fk? Ύ?@@yGz?*A>1mW۠AyX۠Artk? Ύ?@@yGz? H>1mW۠AyX۠AȆʾvk? Ύ?@@yGz?ct>1mW۠AyX۠A 7>6k? Ύ?@@yGz?˜Vӝ>1mW۠AyX۠A#j? Ύ?@@yGz?!!9>1mW۠AyX۠AMuj? Ύ?@@yGz?zS^>1mW۠AyX۠A{j? Ύ?@@yGz?X1>1mW۠AyX۠A}?j? Ύ?@@yGz?5>&>1mW۠AyX۠A޿j? Ύ?@@yGz?BÐ.>1mW۠AyX۠A'Ipi? Ύ?@@yGz?ʥs>1mW۠AyX۠Acݑi? Ύ?@@yGz?ZSd>1mW۠AyX۠A1Yi? Ύ?@@yGz?j>1mW۠AyX۠Aם>^"i? Ύ?@@yGz?B &">1mW۠AyX۠A.h? Ύ?@@yGz?;D>1mW۠AyX۠A5Fh? Ύ?@@yGz?k: g>1mW۠AyX۠AI>`h? Ύ?@@yGz?~:>1mW۠AyX۠A+=Oh? Ύ?@@yGz?ﬠ>1mW۠AyX۠AiZVh? Ύ?@@yGz?iݤϠ>1mW۠AyX۠AKfg? Ύ?@@yGz?(KY>1mW۠AyX۠A]g? Ύ?@@yGz?FX>1mW۠AyX۠AsdZg? Ύ?@@yGz?Ӱ7>1mW۠AyX۠ArZg? Ύ?@@yGz?"xZ>1mW۠AyX۠A0,g? Ύ?@@yGz?[-}>1mW۠AyX۠A=4f? Ύ?@@yGz?⟡>1mW۠AyX۠ADEf? Ύ?@@yGz?mEu¡>1mW۠AyX۠A^[:Vf? Ύ?@@yGz?t(gL>1mW۠AyX۠AHGnmxf? Ύ?@@yGz?JlX>1mW۠AyX۠AJ6-Mf? Ύ?@@yGz?ӰI*>1mW۠AyX۠AQ!"f? Ύ?@@yGz?&:kM>1mW۠AyX۠Ame? Ύ?@@yGz?29, p>1mW۠AyX۠A[(=e? Ύ?@@yGz?b}Ւ>1mW۠AyX۠A|>|e? Ύ?@@yGz?q>1mW۠AyX۠AD1mW۠AyX۠Ay1¼Ve? Ύ?@@yGz?NI>1mW۠AyX۠Av`/e? Ύ?@@yGz?>1mW۠AyX۠A]o@ e? Ύ?@@yGz?*O]@>1mW۠AyX۠AQfSd? Ύ?@@yGz?~c>1mW۠AyX۠AVߠd? Ύ?@@yGz?ZDž>1mW۠AyX۠Ad? Ύ?@@yGz?uݞ|>1mW۠AyX۠Ajtd? Ύ?@@yGz? 1ˣ>1mW۠AyX۠A](EPd? Ύ?@@yGz?Q<'>1mW۠AyX۠AO r-d? Ύ?@@yGz?kk{>1mW۠AyX۠Ab9 d? Ύ?@@yGz?.lP3>1mW۠AyX۠ATc? Ύ?@@yGz?]V>1mW۠AyX۠A8"c? Ύ?@@yGz? 7Ox>1mW۠AyX۠A͜c? Ύ?@@yGz?x)|@o>1mW۠AyX۠AF揇c? Ύ?@@yGz?X1$>1mW۠AyX۠Aw3nbc? Ύ?@@yGz?U#>1mW۠AyX۠A>^ Bc? Ύ?@@yGz?ķH>1mW۠AyX۠Aoۄ"c? Ύ?@@yGz?2C&>1mW۠AyX۠Adwdpc? Ύ?@@yGz?H>1mW۠AyX۠ADob? Ύ?@@yGz?Fk>1mW۠AyX۠ArEmb? Ύ?@@yGz?xuYa>1mW۠AyX۠A~b? Ύ?@@yGz?ꤝ>1mW۠AyX۠Akb? Ύ?@@yGz?Yӥ>1mW۠AyX۠A;Flb? Ύ?@@yGz?&>1mW۠AyX۠ABY)Ob? Ύ?@@yGz?63j5>1mW۠AyX۠AB}mh2b? Ύ?@@yGz?b;>1mW۠AyX۠Aeb? Ύ?@@yGz?^>1mW۠AyX۠Am>a? Ύ?@@yGz?6rT>1mW۠AyX۠AF8a? Ύ?@@yGz?zc >1mW۠AyX۠A"Ka? Ύ?@@yGz?[ TƦ>1mW۠AyX۠AVça? Ύ?@@yGz?OFs>1mW۠AyX۠A`Ia? Ύ?@@yGz?:G7( >1mW۠AyX۠A|Sra? Ύ?@@yGz?(.>1mW۠AyX۠AvVxXa? Ύ?@@yGz?Q>1mW۠AyX۠AƭNm>a? Ύ?@@yGz?  Gt>1mW۠AyX۠AA"%a? Ύ?@@yGz?1mW۠AyX۠AB. a? Ύ?@@yGz?`l>1mW۠AyX۠A` g`? Ύ?@@yGz?̛eܧ>1mW۠AyX۠Av*R`? Ύ?@@yGz?:$>1mW۠AyX۠A:i>`? Ύ?@@yGz?h!>1mW۠AyX۠AZ)`oة`? Ύ?@@yGz?*D>1mW۠AyX۠Aٳ`? Ύ?@@yGz?Y9g>1mW۠AyX۠A$yrz`? Ύ?@@yGz?5>1mW۠AyX۠ASZ $c`? Ύ?@@yGz?by>1mW۠AyX۠A 1L`? Ύ?@@yGz?wXϨ>1mW۠AyX۠As J5`? Ύ?@@yGz?Ai >1mW۠AyX۠A-`? Ύ?@@yGz?FFZ>1mW۠AyX۠Ayao`? Ύ?@@yGz?vKw7>1mW۠AyX۠A*e_? Ύ?@@yGz?<,Z>1mW۠AyX۠An#_? Ύ?@@yGz?.|>1mW۠AyX۠A T_? Ύ?@@yGz?hW>1mW۠AyX۠A, 0#c_? Ύ?@@yGz?3K©>1mW۠AyX۠A=8_? Ύ?@@yGz?Ec>1mW۠AyX۠A#_? Ύ?@@yGz?#>1mW۠AyX۠Aף^? Ύ?@@yGz?"gi*>1mW۠AyX۠AI*^? Ύ?@@yGz?M>1mW۠AyX۠A0n ^? Ύ?@@yGz? o>1mW۠AyX۠Ak^? Ύ?@@yGz?lP4>1mW۠AyX۠Ao+D^? Ύ?@@yGz?x=>1mW۠AyX۠AV@c^? Ύ?@@yGz?Iת>1mW۠AyX۠A h]? Ύ?@@yGz?Iך>?W۠AyX۠A hm?,3?v?@@yGz?$E}\>?W۠AyX۠A Tt4m?,3?v?@@yGz?m_b>?W۠AyX۠AO^m?,3?v?@@yGz?UB0>?W۠AyX۠A.M%Qm?,3?v?@@yGz?*$>?W۠AyX۠A( l?,3?v?@@yGz?f3>?W۠AyX۠A3=(l?,3?v?@@yGz?umx>?W۠AyX۠Aս?l?,3?v?@@yGz?LGw׽>?W۠AyX۠A2 fk?,3?v?@@yGz?*A>?W۠AyX۠Artk?,3?v?@@yGz? H>?W۠AyX۠AȆʾvk?,3?v?@@yGz?ct>?W۠AyX۠A 7>6k?,3?v?@@yGz?˜Vӝ>?W۠AyX۠A#j?,3?v?@@yGz?!!9>?W۠AyX۠AMuj?,3?v?@@yGz?zS^>?W۠AyX۠A{j?,3?v?@@yGz?X1>?W۠AyX۠A}?j?,3?v?@@yGz?4>&>?W۠AyX۠A޿j?,3?v?@@yGz?BÐ.>?W۠AyX۠A'Ipi?,3?v?@@yGz?ʥs>?W۠AyX۠Acݑi?,3?v?@@yGz?ZSd>?W۠AyX۠A1Yi?,3?v?@@yGz?j>?W۠AyX۠A֝>^"i?,3?v?@@yGz?B &">?W۠AyX۠A.h?,3?v?@@yGz?;D>?W۠AyX۠A5Fh?,3?v?@@yGz?k: g>?W۠AyX۠AI>`h?,3?v?@@yGz?~:>?W۠AyX۠A*=Oh?,3?v?@@yGz?ﬠ>?W۠AyX۠AiZVh?,3?v?@@yGz?iݤϠ>?W۠AyX۠AKfg?,3?v?@@yGz?(KY>?W۠AyX۠A]g?,3?v?@@yGz?FX>?W۠AyX۠AsdZg?,3?v?@@yGz?Ӱ7>?W۠AyX۠ArZg?,3?v?@@yGz?"xZ>?W۠AyX۠A~0,g?,3?v?@@yGz?[-}>?W۠AyX۠A =4f?,3?v?@@yGz?⟡>?W۠AyX۠ADEf?,3?v?@@yGz?mEu¡>?W۠AyX۠A^[:Vf?,3?v?@@yGz?t(gL>?W۠AyX۠AHGnmxf?,3?v?@@yGz?JlX>?W۠AyX۠AJ6-Mf?,3?v?@@yGz?ӰI*>?W۠AyX۠AQ!"f?,3?v?@@yGz?&:kM>?W۠AyX۠Ame?,3?v?@@yGz?29, p>?W۠AyX۠A[(=e?,3?v?@@yGz?b}Ւ>?W۠AyX۠A|>|e?,3?v?@@yGz?q>?W۠AyX۠AD?W۠AyX۠Ay1¼Ve?,3?v?@@yGz?NI>?W۠AyX۠Aw`/e?,3?v?@@yGz?>?W۠AyX۠A]o@ e?,3?v?@@yGz?*O]@>?W۠AyX۠APfSd?,3?v?@@yGz?~c>?W۠AyX۠AVߠd?,3?v?@@yGz?ZDž>?W۠AyX۠Ad?,3?v?@@yGz?tݞ|>?W۠AyX۠Ajtd?,3?v?@@yGz? 1ˣ>?W۠AyX۠A](EPd?,3?v?@@yGz?Q<'>?W۠AyX۠AO r-d?,3?v?@@yGz?kk{>?W۠AyX۠Ab9 d?,3?v?@@yGz?.lP3>?W۠AyX۠ATc?,3?v?@@yGz?]V>?W۠AyX۠A8"c?,3?v?@@yGz? 7Ox>?W۠AyX۠A͜c?,3?v?@@yGz?x)|@o>?W۠AyX۠AG揇c?,3?v?@@yGz?X1$>?W۠AyX۠Av3nbc?,3?v?@@yGz?T#>?W۠AyX۠A?^ Bc?,3?v?@@yGz?ŷH>?W۠AyX۠Aoۄ"c?,3?v?@@yGz?2C&>?W۠AyX۠Adwdpc?,3?v?@@yGz?H>?W۠AyX۠ADob?,3?v?@@yGz?Fk>?W۠AyX۠ArEmb?,3?v?@@yGz?xuYa>?W۠AyX۠A~b?,3?v?@@yGz?ꤝ>?W۠AyX۠Ajb?,3?v?@@yGz?Yӥ>?W۠AyX۠A:Flb?,3?v?@@yGz?&>?W۠AyX۠ACY)Ob?,3?v?@@yGz?63j5>?W۠AyX۠AB}mh2b?,3?v?@@yGz?b;>?W۠AyX۠Aeb?,3?v?@@yGz?^>?W۠AyX۠Am>a?,3?v?@@yGz?6rT>?W۠AyX۠AF8a?,3?v?@@yGz?zc >?W۠AyX۠A"Ka?,3?v?@@yGz?\ TƦ>?W۠AyX۠AVça?,3?v?@@yGz?OFs>?W۠AyX۠A`Ia?,3?v?@@yGz?:G7( >?W۠AyX۠A|Sra?,3?v?@@yGz?(.>?W۠AyX۠AvVxXa?,3?v?@@yGz?Q>?W۠AyX۠AƭNm>a?,3?v?@@yGz?  Gt>?W۠AyX۠AA"%a?,3?v?@@yGz??W۠AyX۠AB. a?,3?v?@@yGz?`l>?W۠AyX۠A` g`?,3?v?@@yGz?˛eܧ>?W۠AyX۠Av*R`?,3?v?@@yGz?:$>?W۠AyX۠A:i>`?,3?v?@@yGz?h!>?W۠AyX۠AZ)`oة`?,3?v?@@yGz?*D>?W۠AyX۠Aٳ`?,3?v?@@yGz?Y9g>?W۠AyX۠A$yrz`?,3?v?@@yGz?5>?W۠AyX۠ASZ $c`?,3?v?@@yGz?by>?W۠AyX۠A 1L`?,3?v?@@yGz?wXϨ>?W۠AyX۠As J5`?,3?v?@@yGz?Ai >?W۠AyX۠A-`?,3?v?@@yGz?FFZ>?W۠AyX۠Ayao`?,3?v?@@yGz?vKw7>?W۠AyX۠A*e_?,3?v?@@yGz?<,Z>?W۠AyX۠An#_?,3?v?@@yGz?.|>?W۠AyX۠A T_?,3?v?@@yGz?hW>?W۠AyX۠A, 0#c_?,3?v?@@yGz?3K©>?W۠AyX۠A=8_?,3?v?@@yGz?Dc>?W۠AyX۠A#_?,3?v?@@yGz?#>?W۠AyX۠Aף^?,3?v?@@yGz?"gi*>?W۠AyX۠AI*^?,3?v?@@yGz?M>?W۠AyX۠A0n ^?,3?v?@@yGz? o>?W۠AyX۠Ak^?,3?v?@@yGz?kP4>?W۠AyX۠Ao+D^?,3?v?@@yGz?x=>?W۠AyX۠AV@c^?,3?v?@@yGz?Iת>?W۠AyX۠A h]?,3?v?@@yGz?Iך>L[W۠AyX۠A hm?O]?@@yGz?%E}\>L[W۠AyX۠A Tt4m?O]?@@yGz?m_b>L[W۠AyX۠AO^m?O]?@@yGz?UB0>L[W۠AyX۠A.M%Qm?O]?@@yGz?*$>L[W۠AyX۠A( l?O]?@@yGz?f3>L[W۠AyX۠A3=(l?O]?@@yGz?tmx>L[W۠AyX۠Aս?l?O]?@@yGz?KGw׽>L[W۠AyX۠A2 fk?O]?@@yGz?*A>L[W۠AyX۠Artk?O]?@@yGz? H>L[W۠AyX۠AȆʾvk?O]?@@yGz?ct>L[W۠AyX۠A 7>6k?O]?@@yGz?˜Vӝ>L[W۠AyX۠A#j?O]?@@yGz?!!9>L[W۠AyX۠AMuj?O]?@@yGz?zS^>L[W۠AyX۠A{j?O]?@@yGz?X1>L[W۠AyX۠A}?j?O]?@@yGz?5>&>L[W۠AyX۠A޿j?O]?@@yGz?BÐ.>L[W۠AyX۠A'Ipi?O]?@@yGz?ʥs>L[W۠AyX۠Acݑi?O]?@@yGz?ZSd>L[W۠AyX۠A1Yi?O]?@@yGz?j>L[W۠AyX۠Aם>^"i?O]?@@yGz?B &">L[W۠AyX۠A.h?O]?@@yGz?;D>L[W۠AyX۠A5Fh?O]?@@yGz?k: g>L[W۠AyX۠AI>`h?O]?@@yGz?~:>L[W۠AyX۠A+=Oh?O]?@@yGz?ﬠ>L[W۠AyX۠AiZVh?O]?@@yGz?iݤϠ>L[W۠AyX۠AKfg?O]?@@yGz?(KY>L[W۠AyX۠A]g?O]?@@yGz?FX>L[W۠AyX۠AsdZg?O]?@@yGz?Ӱ7>L[W۠AyX۠ArZg?O]?@@yGz?"xZ>L[W۠AyX۠A0,g?O]?@@yGz?[-}>L[W۠AyX۠A=4f?O]?@@yGz?⟡>L[W۠AyX۠ADEf?O]?@@yGz?mEu¡>L[W۠AyX۠A^[:Vf?O]?@@yGz?t(gL>L[W۠AyX۠AHGnmxf?O]?@@yGz?JlX>L[W۠AyX۠AJ6-Mf?O]?@@yGz?ӰI*>L[W۠AyX۠AQ!"f?O]?@@yGz?&:kM>L[W۠AyX۠Ame?O]?@@yGz?29, p>L[W۠AyX۠A[(=e?O]?@@yGz?b}Ւ>L[W۠AyX۠A|>|e?O]?@@yGz?q>L[W۠AyX۠ADL[W۠AyX۠Ay1¼Ve?O]?@@yGz?NI>L[W۠AyX۠Av`/e?O]?@@yGz?>L[W۠AyX۠A]o@ e?O]?@@yGz?*O]@>L[W۠AyX۠AQfSd?O]?@@yGz?~c>L[W۠AyX۠AVߠd?O]?@@yGz?ZDž>L[W۠AyX۠Ad?O]?@@yGz?uݞ|>L[W۠AyX۠Ajtd?O]?@@yGz? 1ˣ>L[W۠AyX۠A](EPd?O]?@@yGz?Q<'>L[W۠AyX۠AO r-d?O]?@@yGz?kk{>L[W۠AyX۠Ab9 d?O]?@@yGz?.lP3>L[W۠AyX۠ATc?O]?@@yGz?]V>L[W۠AyX۠A8"c?O]?@@yGz? 7Ox>L[W۠AyX۠A͜c?O]?@@yGz?x)|@o>L[W۠AyX۠AF揇c?O]?@@yGz?X1$>L[W۠AyX۠Aw3nbc?O]?@@yGz?U#>L[W۠AyX۠A>^ Bc?O]?@@yGz?ķH>L[W۠AyX۠Aoۄ"c?O]?@@yGz?2C&>L[W۠AyX۠Adwdpc?O]?@@yGz?H>L[W۠AyX۠ADob?O]?@@yGz?Fk>L[W۠AyX۠ArEmb?O]?@@yGz?xuYa>L[W۠AyX۠A~b?O]?@@yGz?ꤝ>L[W۠AyX۠Akb?O]?@@yGz?Yӥ>L[W۠AyX۠A;Flb?O]?@@yGz?&>L[W۠AyX۠ABY)Ob?O]?@@yGz?63j5>L[W۠AyX۠AB}mh2b?O]?@@yGz?b;>L[W۠AyX۠Aeb?O]?@@yGz?^>L[W۠AyX۠Am>a?O]?@@yGz?6rT>L[W۠AyX۠AF8a?O]?@@yGz?zc >L[W۠AyX۠A"Ka?O]?@@yGz?[ TƦ>L[W۠AyX۠AVça?O]?@@yGz?OFs>L[W۠AyX۠A`Ia?O]?@@yGz?:G7( >L[W۠AyX۠A|Sra?O]?@@yGz?(.>L[W۠AyX۠AvVxXa?O]?@@yGz?Q>L[W۠AyX۠AƭNm>a?O]?@@yGz?  Gt>L[W۠AyX۠AA"%a?O]?@@yGz?L[W۠AyX۠AB. a?O]?@@yGz?`l>L[W۠AyX۠A` g`?O]?@@yGz?̛eܧ>L[W۠AyX۠Av*R`?O]?@@yGz?:$>L[W۠AyX۠A:i>`?O]?@@yGz?h!>L[W۠AyX۠AZ)`oة`?O]?@@yGz?*D>L[W۠AyX۠Aٳ`?O]?@@yGz?Y9g>L[W۠AyX۠A$yrz`?O]?@@yGz?5>L[W۠AyX۠ASZ $c`?O]?@@yGz?by>L[W۠AyX۠A 1L`?O]?@@yGz?wXϨ>L[W۠AyX۠As J5`?O]?@@yGz?Ai >L[W۠AyX۠A-`?O]?@@yGz?FFZ>L[W۠AyX۠Ayao`?O]?@@yGz?vKw7>L[W۠AyX۠A*e_?O]?@@yGz?<,Z>L[W۠AyX۠An#_?O]?@@yGz?.|>L[W۠AyX۠A T_?O]?@@yGz?hW>L[W۠AyX۠A, 0#c_?O]?@@yGz?3K©>L[W۠AyX۠A=8_?O]?@@yGz?Ec>L[W۠AyX۠A#_?O]?@@yGz?#>L[W۠AyX۠Aף^?O]?@@yGz?"gi*>L[W۠AyX۠AI*^?O]?@@yGz?M>L[W۠AyX۠A0n ^?O]?@@yGz? o>L[W۠AyX۠Ak^?O]?@@yGz?lP4>L[W۠AyX۠Ao+D^?O]?@@yGz?x=>L[W۠AyX۠AV@c^?O]?@@yGz?Iת>L[W۠AyX۠A h]?O]?@@yGz?Iך>YW۠AyX۠A hm?r1!E?@@yGz?$E}\>YW۠AyX۠A Tt4m?r1!E?@@yGz?m_b>YW۠AyX۠AO^m?r1!E?@@yGz?UB0>YW۠AyX۠A.M%Qm?r1!E?@@yGz?*$>YW۠AyX۠A( l?r1!E?@@yGz?f3>YW۠AyX۠A3=(l?r1!E?@@yGz?umx>YW۠AyX۠Aս?l?r1!E?@@yGz?LGw׽>YW۠AyX۠A2 fk?r1!E?@@yGz?*A>YW۠AyX۠Artk?r1!E?@@yGz? H>YW۠AyX۠AȆʾvk?r1!E?@@yGz?ct>YW۠AyX۠A 7>6k?r1!E?@@yGz?˜Vӝ>YW۠AyX۠A#j?r1!E?@@yGz?!!9>YW۠AyX۠AMuj?r1!E?@@yGz?zS^>YW۠AyX۠A{j?r1!E?@@yGz?X1>YW۠AyX۠A}?j?r1!E?@@yGz?4>&>YW۠AyX۠A޿j?r1!E?@@yGz?BÐ.>YW۠AyX۠A'Ipi?r1!E?@@yGz?ʥs>YW۠AyX۠Acݑi?r1!E?@@yGz?ZSd>YW۠AyX۠A1Yi?r1!E?@@yGz?j>YW۠AyX۠A֝>^"i?r1!E?@@yGz?B &">YW۠AyX۠A.h?r1!E?@@yGz?;D>YW۠AyX۠A5Fh?r1!E?@@yGz?k: g>YW۠AyX۠AI>`h?r1!E?@@yGz?~:>YW۠AyX۠A*=Oh?r1!E?@@yGz?ﬠ>YW۠AyX۠AiZVh?r1!E?@@yGz?iݤϠ>YW۠AyX۠AKfg?r1!E?@@yGz?(KY>YW۠AyX۠A]g?r1!E?@@yGz?FX>YW۠AyX۠AsdZg?r1!E?@@yGz?Ӱ7>YW۠AyX۠ArZg?r1!E?@@yGz?"xZ>YW۠AyX۠A~0,g?r1!E?@@yGz?[-}>YW۠AyX۠A =4f?r1!E?@@yGz?⟡>YW۠AyX۠ADEf?r1!E?@@yGz?mEu¡>YW۠AyX۠A^[:Vf?r1!E?@@yGz?t(gL>YW۠AyX۠AHGnmxf?r1!E?@@yGz?JlX>YW۠AyX۠AJ6-Mf?r1!E?@@yGz?ӰI*>YW۠AyX۠AQ!"f?r1!E?@@yGz?&:kM>YW۠AyX۠Ame?r1!E?@@yGz?29, p>YW۠AyX۠A[(=e?r1!E?@@yGz?b}Ւ>YW۠AyX۠A|>|e?r1!E?@@yGz?q>YW۠AyX۠ADYW۠AyX۠Ay1¼Ve?r1!E?@@yGz?NI>YW۠AyX۠Aw`/e?r1!E?@@yGz?>YW۠AyX۠A]o@ e?r1!E?@@yGz?*O]@>YW۠AyX۠APfSd?r1!E?@@yGz?~c>YW۠AyX۠AVߠd?r1!E?@@yGz?ZDž>YW۠AyX۠Ad?r1!E?@@yGz?tݞ|>YW۠AyX۠Ajtd?r1!E?@@yGz? 1ˣ>YW۠AyX۠A](EPd?r1!E?@@yGz?Q<'>YW۠AyX۠AO r-d?r1!E?@@yGz?kk{>YW۠AyX۠Ab9 d?r1!E?@@yGz?.lP3>YW۠AyX۠ATc?r1!E?@@yGz?]V>YW۠AyX۠A8"c?r1!E?@@yGz? 7Ox>YW۠AyX۠A͜c?r1!E?@@yGz?x)|@o>YW۠AyX۠AG揇c?r1!E?@@yGz?X1$>YW۠AyX۠Av3nbc?r1!E?@@yGz?T#>YW۠AyX۠A?^ Bc?r1!E?@@yGz?ŷH>YW۠AyX۠Aoۄ"c?r1!E?@@yGz?2C&>YW۠AyX۠Adwdpc?r1!E?@@yGz?H>YW۠AyX۠ADob?r1!E?@@yGz?Fk>YW۠AyX۠ArEmb?r1!E?@@yGz?xuYa>YW۠AyX۠A~b?r1!E?@@yGz?ꤝ>YW۠AyX۠Ajb?r1!E?@@yGz?Yӥ>YW۠AyX۠A:Flb?r1!E?@@yGz?&>YW۠AyX۠ACY)Ob?r1!E?@@yGz?63j5>YW۠AyX۠AB}mh2b?r1!E?@@yGz?b;>YW۠AyX۠Aeb?r1!E?@@yGz?^>YW۠AyX۠Am>a?r1!E?@@yGz?6rT>YW۠AyX۠AF8a?r1!E?@@yGz?zc >YW۠AyX۠A"Ka?r1!E?@@yGz?\ TƦ>YW۠AyX۠AVça?r1!E?@@yGz?OFs>YW۠AyX۠A`Ia?r1!E?@@yGz?:G7( >YW۠AyX۠A|Sra?r1!E?@@yGz?(.>YW۠AyX۠AvVxXa?r1!E?@@yGz?Q>YW۠AyX۠AƭNm>a?r1!E?@@yGz?  Gt>YW۠AyX۠AA"%a?r1!E?@@yGz?YW۠AyX۠AB. a?r1!E?@@yGz?`l>YW۠AyX۠A` g`?r1!E?@@yGz?˛eܧ>YW۠AyX۠Av*R`?r1!E?@@yGz?:$>YW۠AyX۠A:i>`?r1!E?@@yGz?h!>YW۠AyX۠AZ)`oة`?r1!E?@@yGz?*D>YW۠AyX۠Aٳ`?r1!E?@@yGz?Y9g>YW۠AyX۠A$yrz`?r1!E?@@yGz?5>YW۠AyX۠ASZ $c`?r1!E?@@yGz?by>YW۠AyX۠A 1L`?r1!E?@@yGz?wXϨ>YW۠AyX۠As J5`?r1!E?@@yGz?Ai >YW۠AyX۠A-`?r1!E?@@yGz?FFZ>YW۠AyX۠Ayao`?r1!E?@@yGz?vKw7>YW۠AyX۠A*e_?r1!E?@@yGz?<,Z>YW۠AyX۠An#_?r1!E?@@yGz?.|>YW۠AyX۠A T_?r1!E?@@yGz?hW>YW۠AyX۠A, 0#c_?r1!E?@@yGz?3K©>YW۠AyX۠A=8_?r1!E?@@yGz?Dc>YW۠AyX۠A#_?r1!E?@@yGz?#>YW۠AyX۠Aף^?r1!E?@@yGz?"gi*>YW۠AyX۠AI*^?r1!E?@@yGz?M>YW۠AyX۠A0n ^?r1!E?@@yGz? o>YW۠AyX۠Ak^?r1!E?@@yGz?kP4>YW۠AyX۠Ao+D^?r1!E?@@yGz?x=>YW۠AyX۠AV@c^?r1!E?@@yGz?Iת>YW۠AyX۠A h]?r1!E?@@yGz?Iך>gIW۠AyX۠A hm?y,?@@yGz?%E}\>gIW۠AyX۠A Tt4m?y,?@@yGz?m_b>gIW۠AyX۠AO^m?y,?@@yGz?UB0>gIW۠AyX۠A.M%Qm?y,?@@yGz?*$>gIW۠AyX۠A( l?y,?@@yGz?f3>gIW۠AyX۠A3=(l?y,?@@yGz?tmx>gIW۠AyX۠Aս?l?y,?@@yGz?KGw׽>gIW۠AyX۠A2 fk?y,?@@yGz?*A>gIW۠AyX۠Artk?y,?@@yGz? H>gIW۠AyX۠AȆʾvk?y,?@@yGz?ct>gIW۠AyX۠A 7>6k?y,?@@yGz?˜Vӝ>gIW۠AyX۠A#j?y,?@@yGz?!!9>gIW۠AyX۠AMuj?y,?@@yGz?zS^>gIW۠AyX۠A{j?y,?@@yGz?X1>gIW۠AyX۠A}?j?y,?@@yGz?5>&>gIW۠AyX۠A޿j?y,?@@yGz?BÐ.>gIW۠AyX۠A'Ipi?y,?@@yGz?ʥs>gIW۠AyX۠Acݑi?y,?@@yGz?ZSd>gIW۠AyX۠A1Yi?y,?@@yGz?j>gIW۠AyX۠Aם>^"i?y,?@@yGz?B &">gIW۠AyX۠A.h?y,?@@yGz?;D>gIW۠AyX۠A5Fh?y,?@@yGz?k: g>gIW۠AyX۠AI>`h?y,?@@yGz?~:>gIW۠AyX۠A+=Oh?y,?@@yGz?ﬠ>gIW۠AyX۠AiZVh?y,?@@yGz?iݤϠ>gIW۠AyX۠AKfg?y,?@@yGz?(KY>gIW۠AyX۠A]g?y,?@@yGz?FX>gIW۠AyX۠AsdZg?y,?@@yGz?Ӱ7>gIW۠AyX۠ArZg?y,?@@yGz?"xZ>gIW۠AyX۠A0,g?y,?@@yGz?[-}>gIW۠AyX۠A=4f?y,?@@yGz?⟡>gIW۠AyX۠ADEf?y,?@@yGz?mEu¡>gIW۠AyX۠A^[:Vf?y,?@@yGz?t(gL>gIW۠AyX۠AHGnmxf?y,?@@yGz?JlX>gIW۠AyX۠AJ6-Mf?y,?@@yGz?ӰI*>gIW۠AyX۠AQ!"f?y,?@@yGz?&:kM>gIW۠AyX۠Ame?y,?@@yGz?29, p>gIW۠AyX۠A[(=e?y,?@@yGz?b}Ւ>gIW۠AyX۠A|>|e?y,?@@yGz?q>gIW۠AyX۠ADgIW۠AyX۠Ay1¼Ve?y,?@@yGz?NI>gIW۠AyX۠Av`/e?y,?@@yGz?>gIW۠AyX۠A]o@ e?y,?@@yGz?*O]@>gIW۠AyX۠AQfSd?y,?@@yGz?~c>gIW۠AyX۠AVߠd?y,?@@yGz?ZDž>gIW۠AyX۠Ad?y,?@@yGz?uݞ|>gIW۠AyX۠Ajtd?y,?@@yGz? 1ˣ>gIW۠AyX۠A](EPd?y,?@@yGz?Q<'>gIW۠AyX۠AO r-d?y,?@@yGz?kk{>gIW۠AyX۠Ab9 d?y,?@@yGz?.lP3>gIW۠AyX۠ATc?y,?@@yGz?]V>gIW۠AyX۠A8"c?y,?@@yGz? 7Ox>gIW۠AyX۠A͜c?y,?@@yGz?x)|@o>gIW۠AyX۠AF揇c?y,?@@yGz?X1$>gIW۠AyX۠Aw3nbc?y,?@@yGz?U#>gIW۠AyX۠A>^ Bc?y,?@@yGz?ķH>gIW۠AyX۠Aoۄ"c?y,?@@yGz?2C&>gIW۠AyX۠Adwdpc?y,?@@yGz?H>gIW۠AyX۠ADob?y,?@@yGz?Fk>gIW۠AyX۠ArEmb?y,?@@yGz?xuYa>gIW۠AyX۠A~b?y,?@@yGz?ꤝ>gIW۠AyX۠Akb?y,?@@yGz?Yӥ>gIW۠AyX۠A;Flb?y,?@@yGz?&>gIW۠AyX۠ABY)Ob?y,?@@yGz?63j5>gIW۠AyX۠AB}mh2b?y,?@@yGz?b;>gIW۠AyX۠Aeb?y,?@@yGz?^>gIW۠AyX۠Am>a?y,?@@yGz?6rT>gIW۠AyX۠AF8a?y,?@@yGz?zc >gIW۠AyX۠A"Ka?y,?@@yGz?[ TƦ>gIW۠AyX۠AVça?y,?@@yGz?OFs>gIW۠AyX۠A`Ia?y,?@@yGz?:G7( >gIW۠AyX۠A|Sra?y,?@@yGz?(.>gIW۠AyX۠AvVxXa?y,?@@yGz?Q>gIW۠AyX۠AƭNm>a?y,?@@yGz?  Gt>gIW۠AyX۠AA"%a?y,?@@yGz?gIW۠AyX۠AB. a?y,?@@yGz?`l>gIW۠AyX۠A` g`?y,?@@yGz?̛eܧ>gIW۠AyX۠Av*R`?y,?@@yGz?:$>gIW۠AyX۠A:i>`?y,?@@yGz?h!>gIW۠AyX۠AZ)`oة`?y,?@@yGz?*D>gIW۠AyX۠Aٳ`?y,?@@yGz?Y9g>gIW۠AyX۠A$yrz`?y,?@@yGz?5>gIW۠AyX۠ASZ $c`?y,?@@yGz?by>gIW۠AyX۠A 1L`?y,?@@yGz?wXϨ>gIW۠AyX۠As J5`?y,?@@yGz?Ai >gIW۠AyX۠A-`?y,?@@yGz?FFZ>gIW۠AyX۠Ayao`?y,?@@yGz?vKw7>gIW۠AyX۠A*e_?y,?@@yGz?<,Z>gIW۠AyX۠An#_?y,?@@yGz?.|>gIW۠AyX۠A T_?y,?@@yGz?hW>gIW۠AyX۠A, 0#c_?y,?@@yGz?3K©>gIW۠AyX۠A=8_?y,?@@yGz?Ec>gIW۠AyX۠A#_?y,?@@yGz?#>gIW۠AyX۠Aף^?y,?@@yGz?"gi*>gIW۠AyX۠AI*^?y,?@@yGz?M>gIW۠AyX۠A0n ^?y,?@@yGz? o>gIW۠AyX۠Ak^?y,?@@yGz?lP4>gIW۠AyX۠Ao+D^?y,?@@yGz?x=>gIW۠AyX۠AV@c^?y,?@@yGz?Iת>gIW۠AyX۠A h]?y,?@@yGz?Iך>tW۠AyX۠A hm?/_?@@yGz?$E}\>tW۠AyX۠A Tt4m?/_?@@yGz?m_b>tW۠AyX۠AO^m?/_?@@yGz?UB0>tW۠AyX۠A.M%Qm?/_?@@yGz?*$>tW۠AyX۠A( l?/_?@@yGz?f3>tW۠AyX۠A3=(l?/_?@@yGz?umx>tW۠AyX۠Aս?l?/_?@@yGz?LGw׽>tW۠AyX۠A2 fk?/_?@@yGz?*A>tW۠AyX۠Artk?/_?@@yGz? H>tW۠AyX۠AȆʾvk?/_?@@yGz?ct>tW۠AyX۠A 7>6k?/_?@@yGz?˜Vӝ>tW۠AyX۠A#j?/_?@@yGz?!!9>tW۠AyX۠AMuj?/_?@@yGz?zS^>tW۠AyX۠A{j?/_?@@yGz?X1>tW۠AyX۠A}?j?/_?@@yGz?4>&>tW۠AyX۠A޿j?/_?@@yGz?BÐ.>tW۠AyX۠A'Ipi?/_?@@yGz?ʥs>tW۠AyX۠Acݑi?/_?@@yGz?ZSd>tW۠AyX۠A1Yi?/_?@@yGz?j>tW۠AyX۠A֝>^"i?/_?@@yGz?B &">tW۠AyX۠A.h?/_?@@yGz?;D>tW۠AyX۠A5Fh?/_?@@yGz?k: g>tW۠AyX۠AI>`h?/_?@@yGz?~:>tW۠AyX۠A*=Oh?/_?@@yGz?ﬠ>tW۠AyX۠AiZVh?/_?@@yGz?iݤϠ>tW۠AyX۠AKfg?/_?@@yGz?(KY>tW۠AyX۠A]g?/_?@@yGz?FX>tW۠AyX۠AsdZg?/_?@@yGz?Ӱ7>tW۠AyX۠ArZg?/_?@@yGz?"xZ>tW۠AyX۠A~0,g?/_?@@yGz?[-}>tW۠AyX۠A =4f?/_?@@yGz?⟡>tW۠AyX۠ADEf?/_?@@yGz?mEu¡>tW۠AyX۠A^[:Vf?/_?@@yGz?t(gL>tW۠AyX۠AHGnmxf?/_?@@yGz?JlX>tW۠AyX۠AJ6-Mf?/_?@@yGz?ӰI*>tW۠AyX۠AQ!"f?/_?@@yGz?&:kM>tW۠AyX۠Ame?/_?@@yGz?29, p>tW۠AyX۠A[(=e?/_?@@yGz?b}Ւ>tW۠AyX۠A|>|e?/_?@@yGz?q>tW۠AyX۠ADtW۠AyX۠Ay1¼Ve?/_?@@yGz?NI>tW۠AyX۠Aw`/e?/_?@@yGz?>tW۠AyX۠A]o@ e?/_?@@yGz?*O]@>tW۠AyX۠APfSd?/_?@@yGz?~c>tW۠AyX۠AVߠd?/_?@@yGz?ZDž>tW۠AyX۠Ad?/_?@@yGz?tݞ|>tW۠AyX۠Ajtd?/_?@@yGz? 1ˣ>tW۠AyX۠A](EPd?/_?@@yGz?Q<'>tW۠AyX۠AO r-d?/_?@@yGz?kk{>tW۠AyX۠Ab9 d?/_?@@yGz?.lP3>tW۠AyX۠ATc?/_?@@yGz?]V>tW۠AyX۠A8"c?/_?@@yGz? 7Ox>tW۠AyX۠A͜c?/_?@@yGz?x)|@o>tW۠AyX۠AG揇c?/_?@@yGz?X1$>tW۠AyX۠Av3nbc?/_?@@yGz?T#>tW۠AyX۠A?^ Bc?/_?@@yGz?ŷH>tW۠AyX۠Aoۄ"c?/_?@@yGz?2C&>tW۠AyX۠Adwdpc?/_?@@yGz?H>tW۠AyX۠ADob?/_?@@yGz?Fk>tW۠AyX۠ArEmb?/_?@@yGz?xuYa>tW۠AyX۠A~b?/_?@@yGz?ꤝ>tW۠AyX۠Ajb?/_?@@yGz?Yӥ>tW۠AyX۠A:Flb?/_?@@yGz?&>tW۠AyX۠ACY)Ob?/_?@@yGz?63j5>tW۠AyX۠AB}mh2b?/_?@@yGz?b;>tW۠AyX۠Aeb?/_?@@yGz?^>tW۠AyX۠Am>a?/_?@@yGz?6rT>tW۠AyX۠AF8a?/_?@@yGz?zc >tW۠AyX۠A"Ka?/_?@@yGz?\ TƦ>tW۠AyX۠AVça?/_?@@yGz?OFs>tW۠AyX۠A`Ia?/_?@@yGz?:G7( >tW۠AyX۠A|Sra?/_?@@yGz?(.>tW۠AyX۠AvVxXa?/_?@@yGz?Q>tW۠AyX۠AƭNm>a?/_?@@yGz?  Gt>tW۠AyX۠AA"%a?/_?@@yGz?tW۠AyX۠AB. a?/_?@@yGz?`l>tW۠AyX۠A` g`?/_?@@yGz?˛eܧ>tW۠AyX۠Av*R`?/_?@@yGz?:$>tW۠AyX۠A:i>`?/_?@@yGz?h!>tW۠AyX۠AZ)`oة`?/_?@@yGz?*D>tW۠AyX۠Aٳ`?/_?@@yGz?Y9g>tW۠AyX۠A$yrz`?/_?@@yGz?5>tW۠AyX۠ASZ $c`?/_?@@yGz?by>tW۠AyX۠A 1L`?/_?@@yGz?wXϨ>tW۠AyX۠As J5`?/_?@@yGz?Ai >tW۠AyX۠A-`?/_?@@yGz?FFZ>tW۠AyX۠Ayao`?/_?@@yGz?vKw7>tW۠AyX۠A*e_?/_?@@yGz?<,Z>tW۠AyX۠An#_?/_?@@yGz?.|>tW۠AyX۠A T_?/_?@@yGz?hW>tW۠AyX۠A, 0#c_?/_?@@yGz?3K©>tW۠AyX۠A=8_?/_?@@yGz?Dc>tW۠AyX۠A#_?/_?@@yGz?#>tW۠AyX۠Aף^?/_?@@yGz?"gi*>tW۠AyX۠AI*^?/_?@@yGz?M>tW۠AyX۠A0n ^?/_?@@yGz? o>tW۠AyX۠Ak^?/_?@@yGz?kP4>tW۠AyX۠Ao+D^?/_?@@yGz?x=>tW۠AyX۠AV@c^?/_?@@yGz?Iת>tW۠AyX۠A h]?/_?@@yGz?Iך>7W۠AyX۠A hm?ۮDt?@@yGz?%E}\>7W۠AyX۠A Tt4m?ۮDt?@@yGz?m_b>7W۠AyX۠AO^m?ۮDt?@@yGz?UB0>7W۠AyX۠A.M%Qm?ۮDt?@@yGz?*$>7W۠AyX۠A( l?ۮDt?@@yGz?f3>7W۠AyX۠A3=(l?ۮDt?@@yGz?tmx>7W۠AyX۠Aս?l?ۮDt?@@yGz?KGw׽>7W۠AyX۠A2 fk?ۮDt?@@yGz?*A>7W۠AyX۠Artk?ۮDt?@@yGz? H>7W۠AyX۠AȆʾvk?ۮDt?@@yGz?ct>7W۠AyX۠A 7>6k?ۮDt?@@yGz?˜Vӝ>7W۠AyX۠A#j?ۮDt?@@yGz?!!9>7W۠AyX۠AMuj?ۮDt?@@yGz?zS^>7W۠AyX۠A{j?ۮDt?@@yGz?X1>7W۠AyX۠A}?j?ۮDt?@@yGz?5>&>7W۠AyX۠A޿j?ۮDt?@@yGz?BÐ.>7W۠AyX۠A'Ipi?ۮDt?@@yGz?ʥs>7W۠AyX۠Acݑi?ۮDt?@@yGz?ZSd>7W۠AyX۠A1Yi?ۮDt?@@yGz?j>7W۠AyX۠Aם>^"i?ۮDt?@@yGz?B &">7W۠AyX۠A.h?ۮDt?@@yGz?;D>7W۠AyX۠A5Fh?ۮDt?@@yGz?k: g>7W۠AyX۠AI>`h?ۮDt?@@yGz?~:>7W۠AyX۠A+=Oh?ۮDt?@@yGz?ﬠ>7W۠AyX۠AiZVh?ۮDt?@@yGz?iݤϠ>7W۠AyX۠AKfg?ۮDt?@@yGz?(KY>7W۠AyX۠A]g?ۮDt?@@yGz?FX>7W۠AyX۠AsdZg?ۮDt?@@yGz?Ӱ7>7W۠AyX۠ArZg?ۮDt?@@yGz?"xZ>7W۠AyX۠A0,g?ۮDt?@@yGz?[-}>7W۠AyX۠A=4f?ۮDt?@@yGz?⟡>7W۠AyX۠ADEf?ۮDt?@@yGz?mEu¡>7W۠AyX۠A^[:Vf?ۮDt?@@yGz?t(gL>7W۠AyX۠AHGnmxf?ۮDt?@@yGz?JlX>7W۠AyX۠AJ6-Mf?ۮDt?@@yGz?ӰI*>7W۠AyX۠AQ!"f?ۮDt?@@yGz?&:kM>7W۠AyX۠Ame?ۮDt?@@yGz?29, p>7W۠AyX۠A[(=e?ۮDt?@@yGz?b}Ւ>7W۠AyX۠A|>|e?ۮDt?@@yGz?q>7W۠AyX۠AD7W۠AyX۠Ay1¼Ve?ۮDt?@@yGz?NI>7W۠AyX۠Av`/e?ۮDt?@@yGz?>7W۠AyX۠A]o@ e?ۮDt?@@yGz?*O]@>7W۠AyX۠AQfSd?ۮDt?@@yGz?~c>7W۠AyX۠AVߠd?ۮDt?@@yGz?ZDž>7W۠AyX۠Ad?ۮDt?@@yGz?uݞ|>7W۠AyX۠Ajtd?ۮDt?@@yGz? 1ˣ>7W۠AyX۠A](EPd?ۮDt?@@yGz?Q<'>7W۠AyX۠AO r-d?ۮDt?@@yGz?kk{>7W۠AyX۠Ab9 d?ۮDt?@@yGz?.lP3>7W۠AyX۠ATc?ۮDt?@@yGz?]V>7W۠AyX۠A8"c?ۮDt?@@yGz? 7Ox>7W۠AyX۠A͜c?ۮDt?@@yGz?x)|@o>7W۠AyX۠AF揇c?ۮDt?@@yGz?X1$>7W۠AyX۠Aw3nbc?ۮDt?@@yGz?U#>7W۠AyX۠A>^ Bc?ۮDt?@@yGz?ķH>7W۠AyX۠Aoۄ"c?ۮDt?@@yGz?2C&>7W۠AyX۠Adwdpc?ۮDt?@@yGz?H>7W۠AyX۠ADob?ۮDt?@@yGz?Fk>7W۠AyX۠ArEmb?ۮDt?@@yGz?xuYa>7W۠AyX۠A~b?ۮDt?@@yGz?ꤝ>7W۠AyX۠Akb?ۮDt?@@yGz?Yӥ>7W۠AyX۠A;Flb?ۮDt?@@yGz?&>7W۠AyX۠ABY)Ob?ۮDt?@@yGz?63j5>7W۠AyX۠AB}mh2b?ۮDt?@@yGz?b;>7W۠AyX۠Aeb?ۮDt?@@yGz?^>7W۠AyX۠Am>a?ۮDt?@@yGz?6rT>7W۠AyX۠AF8a?ۮDt?@@yGz?zc >7W۠AyX۠A"Ka?ۮDt?@@yGz?[ TƦ>7W۠AyX۠AVça?ۮDt?@@yGz?OFs>7W۠AyX۠A`Ia?ۮDt?@@yGz?:G7( >7W۠AyX۠A|Sra?ۮDt?@@yGz?(.>7W۠AyX۠AvVxXa?ۮDt?@@yGz?Q>7W۠AyX۠AƭNm>a?ۮDt?@@yGz?  Gt>7W۠AyX۠AA"%a?ۮDt?@@yGz?7W۠AyX۠AB. a?ۮDt?@@yGz?`l>7W۠AyX۠A` g`?ۮDt?@@yGz?̛eܧ>7W۠AyX۠Av*R`?ۮDt?@@yGz?:$>7W۠AyX۠A:i>`?ۮDt?@@yGz?h!>7W۠AyX۠AZ)`oة`?ۮDt?@@yGz?*D>7W۠AyX۠Aٳ`?ۮDt?@@yGz?Y9g>7W۠AyX۠A$yrz`?ۮDt?@@yGz?5>7W۠AyX۠ASZ $c`?ۮDt?@@yGz?by>7W۠AyX۠A 1L`?ۮDt?@@yGz?wXϨ>7W۠AyX۠As J5`?ۮDt?@@yGz?Ai >7W۠AyX۠A-`?ۮDt?@@yGz?FFZ>7W۠AyX۠Ayao`?ۮDt?@@yGz?vKw7>7W۠AyX۠A*e_?ۮDt?@@yGz?<,Z>7W۠AyX۠An#_?ۮDt?@@yGz?.|>7W۠AyX۠A T_?ۮDt?@@yGz?hW>7W۠AyX۠A, 0#c_?ۮDt?@@yGz?3K©>7W۠AyX۠A=8_?ۮDt?@@yGz?Ec>7W۠AyX۠A#_?ۮDt?@@yGz?#>7W۠AyX۠Aף^?ۮDt?@@yGz?"gi*>7W۠AyX۠AI*^?ۮDt?@@yGz?M>7W۠AyX۠A0n ^?ۮDt?@@yGz? o>7W۠AyX۠Ak^?ۮDt?@@yGz?lP4>7W۠AyX۠Ao+D^?ۮDt?@@yGz?x=>7W۠AyX۠AV@c^?ۮDt?@@yGz?Iת>7W۠AyX۠A h]?ۮDt?@@yGz?Iך>W۠AyX۠A hm?-*?@@yGz?$E}\>W۠AyX۠A Tt4m?-*?@@yGz?m_b>W۠AyX۠AO^m?-*?@@yGz?UB0>W۠AyX۠A.M%Qm?-*?@@yGz?*$>W۠AyX۠A( l?-*?@@yGz?f3>W۠AyX۠A3=(l?-*?@@yGz?umx>W۠AyX۠Aս?l?-*?@@yGz?LGw׽>W۠AyX۠A2 fk?-*?@@yGz?*A>W۠AyX۠Artk?-*?@@yGz? H>W۠AyX۠AȆʾvk?-*?@@yGz?ct>W۠AyX۠A 7>6k?-*?@@yGz?˜Vӝ>W۠AyX۠A#j?-*?@@yGz?!!9>W۠AyX۠AMuj?-*?@@yGz?zS^>W۠AyX۠A{j?-*?@@yGz?X1>W۠AyX۠A}?j?-*?@@yGz?4>&>W۠AyX۠A޿j?-*?@@yGz?BÐ.>W۠AyX۠A'Ipi?-*?@@yGz?ʥs>W۠AyX۠Acݑi?-*?@@yGz?ZSd>W۠AyX۠A1Yi?-*?@@yGz?j>W۠AyX۠A֝>^"i?-*?@@yGz?B &">W۠AyX۠A.h?-*?@@yGz?;D>W۠AyX۠A5Fh?-*?@@yGz?k: g>W۠AyX۠AI>`h?-*?@@yGz?~:>W۠AyX۠A*=Oh?-*?@@yGz?ﬠ>W۠AyX۠AiZVh?-*?@@yGz?iݤϠ>W۠AyX۠AKfg?-*?@@yGz?(KY>W۠AyX۠A]g?-*?@@yGz?FX>W۠AyX۠AsdZg?-*?@@yGz?Ӱ7>W۠AyX۠ArZg?-*?@@yGz?"xZ>W۠AyX۠A~0,g?-*?@@yGz?[-}>W۠AyX۠A =4f?-*?@@yGz?⟡>W۠AyX۠ADEf?-*?@@yGz?mEu¡>W۠AyX۠A^[:Vf?-*?@@yGz?t(gL>W۠AyX۠AHGnmxf?-*?@@yGz?JlX>W۠AyX۠AJ6-Mf?-*?@@yGz?ӰI*>W۠AyX۠AQ!"f?-*?@@yGz?&:kM>W۠AyX۠Ame?-*?@@yGz?29, p>W۠AyX۠A[(=e?-*?@@yGz?b}Ւ>W۠AyX۠A|>|e?-*?@@yGz?q>W۠AyX۠ADW۠AyX۠Ay1¼Ve?-*?@@yGz?NI>W۠AyX۠Aw`/e?-*?@@yGz?>W۠AyX۠A]o@ e?-*?@@yGz?*O]@>W۠AyX۠APfSd?-*?@@yGz?~c>W۠AyX۠AVߠd?-*?@@yGz?ZDž>W۠AyX۠Ad?-*?@@yGz?tݞ|>W۠AyX۠Ajtd?-*?@@yGz? 1ˣ>W۠AyX۠A](EPd?-*?@@yGz?Q<'>W۠AyX۠AO r-d?-*?@@yGz?kk{>W۠AyX۠Ab9 d?-*?@@yGz?.lP3>W۠AyX۠ATc?-*?@@yGz?]V>W۠AyX۠A8"c?-*?@@yGz? 7Ox>W۠AyX۠A͜c?-*?@@yGz?x)|@o>W۠AyX۠AG揇c?-*?@@yGz?X1$>W۠AyX۠Av3nbc?-*?@@yGz?T#>W۠AyX۠A?^ Bc?-*?@@yGz?ŷH>W۠AyX۠Aoۄ"c?-*?@@yGz?2C&>W۠AyX۠Adwdpc?-*?@@yGz?H>W۠AyX۠ADob?-*?@@yGz?Fk>W۠AyX۠ArEmb?-*?@@yGz?xuYa>W۠AyX۠A~b?-*?@@yGz?ꤝ>W۠AyX۠Ajb?-*?@@yGz?Yӥ>W۠AyX۠A:Flb?-*?@@yGz?&>W۠AyX۠ACY)Ob?-*?@@yGz?63j5>W۠AyX۠AB}mh2b?-*?@@yGz?b;>W۠AyX۠Aeb?-*?@@yGz?^>W۠AyX۠Am>a?-*?@@yGz?6rT>W۠AyX۠AF8a?-*?@@yGz?zc >W۠AyX۠A"Ka?-*?@@yGz?\ TƦ>W۠AyX۠AVça?-*?@@yGz?OFs>W۠AyX۠A`Ia?-*?@@yGz?:G7( >W۠AyX۠A|Sra?-*?@@yGz?(.>W۠AyX۠AvVxXa?-*?@@yGz?Q>W۠AyX۠AƭNm>a?-*?@@yGz?  Gt>W۠AyX۠AA"%a?-*?@@yGz?W۠AyX۠AB. a?-*?@@yGz?`l>W۠AyX۠A` g`?-*?@@yGz?˛eܧ>W۠AyX۠Av*R`?-*?@@yGz?:$>W۠AyX۠A:i>`?-*?@@yGz?h!>W۠AyX۠AZ)`oة`?-*?@@yGz?*D>W۠AyX۠Aٳ`?-*?@@yGz?Y9g>W۠AyX۠A$yrz`?-*?@@yGz?5>W۠AyX۠ASZ $c`?-*?@@yGz?by>W۠AyX۠A 1L`?-*?@@yGz?wXϨ>W۠AyX۠As J5`?-*?@@yGz?Ai >W۠AyX۠A-`?-*?@@yGz?FFZ>W۠AyX۠Ayao`?-*?@@yGz?vKw7>W۠AyX۠A*e_?-*?@@yGz?<,Z>W۠AyX۠An#_?-*?@@yGz?.|>W۠AyX۠A T_?-*?@@yGz?hW>W۠AyX۠A, 0#c_?-*?@@yGz?3K©>W۠AyX۠A=8_?-*?@@yGz?Dc>W۠AyX۠A#_?-*?@@yGz?#>W۠AyX۠Aף^?-*?@@yGz?"gi*>W۠AyX۠AI*^?-*?@@yGz?M>W۠AyX۠A0n ^?-*?@@yGz? o>W۠AyX۠Ak^?-*?@@yGz?kP4>W۠AyX۠Ao+D^?-*?@@yGz?x=>W۠AyX۠AV@c^?-*?@@yGz?Iת>W۠AyX۠A h]?-*?@@yGz?Iך>%W۠AyX۠A hm?"V?@@yGz?%E}\>%W۠AyX۠A Tt4m?"V?@@yGz?m_b>%W۠AyX۠AO^m?"V?@@yGz?UB0>%W۠AyX۠A.M%Qm?"V?@@yGz?*$>%W۠AyX۠A( l?"V?@@yGz?f3>%W۠AyX۠A3=(l?"V?@@yGz?tmx>%W۠AyX۠Aս?l?"V?@@yGz?KGw׽>%W۠AyX۠A2 fk?"V?@@yGz?*A>%W۠AyX۠Artk?"V?@@yGz? H>%W۠AyX۠AȆʾvk?"V?@@yGz?ct>%W۠AyX۠A 7>6k?"V?@@yGz?˜Vӝ>%W۠AyX۠A#j?"V?@@yGz?!!9>%W۠AyX۠AMuj?"V?@@yGz?zS^>%W۠AyX۠A{j?"V?@@yGz?X1>%W۠AyX۠A}?j?"V?@@yGz?5>&>%W۠AyX۠A޿j?"V?@@yGz?BÐ.>%W۠AyX۠A'Ipi?"V?@@yGz?ʥs>%W۠AyX۠Acݑi?"V?@@yGz?ZSd>%W۠AyX۠A1Yi?"V?@@yGz?j>%W۠AyX۠Aם>^"i?"V?@@yGz?B &">%W۠AyX۠A.h?"V?@@yGz?;D>%W۠AyX۠A5Fh?"V?@@yGz?k: g>%W۠AyX۠AI>`h?"V?@@yGz?~:>%W۠AyX۠A+=Oh?"V?@@yGz?ﬠ>%W۠AyX۠AiZVh?"V?@@yGz?iݤϠ>%W۠AyX۠AKfg?"V?@@yGz?(KY>%W۠AyX۠A]g?"V?@@yGz?FX>%W۠AyX۠AsdZg?"V?@@yGz?Ӱ7>%W۠AyX۠ArZg?"V?@@yGz?"xZ>%W۠AyX۠A0,g?"V?@@yGz?[-}>%W۠AyX۠A=4f?"V?@@yGz?⟡>%W۠AyX۠ADEf?"V?@@yGz?mEu¡>%W۠AyX۠A^[:Vf?"V?@@yGz?t(gL>%W۠AyX۠AHGnmxf?"V?@@yGz?JlX>%W۠AyX۠AJ6-Mf?"V?@@yGz?ӰI*>%W۠AyX۠AQ!"f?"V?@@yGz?&:kM>%W۠AyX۠Ame?"V?@@yGz?29, p>%W۠AyX۠A[(=e?"V?@@yGz?b}Ւ>%W۠AyX۠A|>|e?"V?@@yGz?q>%W۠AyX۠AD%W۠AyX۠Ay1¼Ve?"V?@@yGz?NI>%W۠AyX۠Av`/e?"V?@@yGz?>%W۠AyX۠A]o@ e?"V?@@yGz?*O]@>%W۠AyX۠AQfSd?"V?@@yGz?~c>%W۠AyX۠AVߠd?"V?@@yGz?ZDž>%W۠AyX۠Ad?"V?@@yGz?uݞ|>%W۠AyX۠Ajtd?"V?@@yGz? 1ˣ>%W۠AyX۠A](EPd?"V?@@yGz?Q<'>%W۠AyX۠AO r-d?"V?@@yGz?kk{>%W۠AyX۠Ab9 d?"V?@@yGz?.lP3>%W۠AyX۠ATc?"V?@@yGz?]V>%W۠AyX۠A8"c?"V?@@yGz? 7Ox>%W۠AyX۠A͜c?"V?@@yGz?x)|@o>%W۠AyX۠AF揇c?"V?@@yGz?X1$>%W۠AyX۠Aw3nbc?"V?@@yGz?U#>%W۠AyX۠A>^ Bc?"V?@@yGz?ķH>%W۠AyX۠Aoۄ"c?"V?@@yGz?2C&>%W۠AyX۠Adwdpc?"V?@@yGz?H>%W۠AyX۠ADob?"V?@@yGz?Fk>%W۠AyX۠ArEmb?"V?@@yGz?xuYa>%W۠AyX۠A~b?"V?@@yGz?ꤝ>%W۠AyX۠Akb?"V?@@yGz?Yӥ>%W۠AyX۠A;Flb?"V?@@yGz?&>%W۠AyX۠ABY)Ob?"V?@@yGz?63j5>%W۠AyX۠AB}mh2b?"V?@@yGz?b;>%W۠AyX۠Aeb?"V?@@yGz?^>%W۠AyX۠Am>a?"V?@@yGz?6rT>%W۠AyX۠AF8a?"V?@@yGz?zc >%W۠AyX۠A"Ka?"V?@@yGz?[ TƦ>%W۠AyX۠AVça?"V?@@yGz?OFs>%W۠AyX۠A`Ia?"V?@@yGz?:G7( >%W۠AyX۠A|Sra?"V?@@yGz?(.>%W۠AyX۠AvVxXa?"V?@@yGz?Q>%W۠AyX۠AƭNm>a?"V?@@yGz?  Gt>%W۠AyX۠AA"%a?"V?@@yGz?%W۠AyX۠AB. a?"V?@@yGz?`l>%W۠AyX۠A` g`?"V?@@yGz?̛eܧ>%W۠AyX۠Av*R`?"V?@@yGz?:$>%W۠AyX۠A:i>`?"V?@@yGz?h!>%W۠AyX۠AZ)`oة`?"V?@@yGz?*D>%W۠AyX۠Aٳ`?"V?@@yGz?Y9g>%W۠AyX۠A$yrz`?"V?@@yGz?5>%W۠AyX۠ASZ $c`?"V?@@yGz?by>%W۠AyX۠A 1L`?"V?@@yGz?wXϨ>%W۠AyX۠As J5`?"V?@@yGz?Ai >%W۠AyX۠A-`?"V?@@yGz?FFZ>%W۠AyX۠Ayao`?"V?@@yGz?vKw7>%W۠AyX۠A*e_?"V?@@yGz?<,Z>%W۠AyX۠An#_?"V?@@yGz?.|>%W۠AyX۠A T_?"V?@@yGz?hW>%W۠AyX۠A, 0#c_?"V?@@yGz?3K©>%W۠AyX۠A=8_?"V?@@yGz?Ec>%W۠AyX۠A#_?"V?@@yGz?#>%W۠AyX۠Aף^?"V?@@yGz?"gi*>%W۠AyX۠AI*^?"V?@@yGz?M>%W۠AyX۠A0n ^?"V?@@yGz? o>%W۠AyX۠Ak^?"V?@@yGz?lP4>%W۠AyX۠Ao+D^?"V?@@yGz?x=>%W۠AyX۠AV@c^?"V?@@yGz?Iת>%W۠AyX۠A h]?"V?@@yGz?Iך>W۠AyX۠A hm? E,Ʊ?@@yGz?$E}\>W۠AyX۠A Tt4m? E,Ʊ?@@yGz?m_b>W۠AyX۠AO^m? E,Ʊ?@@yGz?UB0>W۠AyX۠A.M%Qm? E,Ʊ?@@yGz?*$>W۠AyX۠A( l? E,Ʊ?@@yGz?f3>W۠AyX۠A3=(l? E,Ʊ?@@yGz?umx>W۠AyX۠Aս?l? E,Ʊ?@@yGz?LGw׽>W۠AyX۠A2 fk? E,Ʊ?@@yGz?*A>W۠AyX۠Artk? E,Ʊ?@@yGz? H>W۠AyX۠AȆʾvk? E,Ʊ?@@yGz?ct>W۠AyX۠A 7>6k? E,Ʊ?@@yGz?˜Vӝ>W۠AyX۠A#j? E,Ʊ?@@yGz?!!9>W۠AyX۠AMuj? E,Ʊ?@@yGz?zS^>W۠AyX۠A{j? E,Ʊ?@@yGz?X1>W۠AyX۠A}?j? E,Ʊ?@@yGz?4>&>W۠AyX۠A޿j? E,Ʊ?@@yGz?BÐ.>W۠AyX۠A'Ipi? E,Ʊ?@@yGz?ʥs>W۠AyX۠Acݑi? E,Ʊ?@@yGz?ZSd>W۠AyX۠A1Yi? E,Ʊ?@@yGz?j>W۠AyX۠A֝>^"i? E,Ʊ?@@yGz?B &">W۠AyX۠A.h? E,Ʊ?@@yGz?;D>W۠AyX۠A5Fh? E,Ʊ?@@yGz?k: g>W۠AyX۠AI>`h? E,Ʊ?@@yGz?~:>W۠AyX۠A*=Oh? E,Ʊ?@@yGz?ﬠ>W۠AyX۠AiZVh? E,Ʊ?@@yGz?iݤϠ>W۠AyX۠AKfg? E,Ʊ?@@yGz?(KY>W۠AyX۠A]g? E,Ʊ?@@yGz?FX>W۠AyX۠AsdZg? E,Ʊ?@@yGz?Ӱ7>W۠AyX۠ArZg? E,Ʊ?@@yGz?"xZ>W۠AyX۠A~0,g? E,Ʊ?@@yGz?[-}>W۠AyX۠A =4f? E,Ʊ?@@yGz?⟡>W۠AyX۠ADEf? E,Ʊ?@@yGz?mEu¡>W۠AyX۠A^[:Vf? E,Ʊ?@@yGz?t(gL>W۠AyX۠AHGnmxf? E,Ʊ?@@yGz?JlX>W۠AyX۠AJ6-Mf? E,Ʊ?@@yGz?ӰI*>W۠AyX۠AQ!"f? E,Ʊ?@@yGz?&:kM>W۠AyX۠Ame? E,Ʊ?@@yGz?29, p>W۠AyX۠A[(=e? E,Ʊ?@@yGz?b}Ւ>W۠AyX۠A|>|e? E,Ʊ?@@yGz?q>W۠AyX۠ADW۠AyX۠Ay1¼Ve? E,Ʊ?@@yGz?NI>W۠AyX۠Aw`/e? E,Ʊ?@@yGz?>W۠AyX۠A]o@ e? E,Ʊ?@@yGz?*O]@>W۠AyX۠APfSd? E,Ʊ?@@yGz?~c>W۠AyX۠AVߠd? E,Ʊ?@@yGz?ZDž>W۠AyX۠Ad? E,Ʊ?@@yGz?tݞ|>W۠AyX۠Ajtd? E,Ʊ?@@yGz? 1ˣ>W۠AyX۠A](EPd? E,Ʊ?@@yGz?Q<'>W۠AyX۠AO r-d? E,Ʊ?@@yGz?kk{>W۠AyX۠Ab9 d? E,Ʊ?@@yGz?.lP3>W۠AyX۠ATc? E,Ʊ?@@yGz?]V>W۠AyX۠A8"c? E,Ʊ?@@yGz? 7Ox>W۠AyX۠A͜c? E,Ʊ?@@yGz?x)|@o>W۠AyX۠AG揇c? E,Ʊ?@@yGz?X1$>W۠AyX۠Av3nbc? E,Ʊ?@@yGz?T#>W۠AyX۠A?^ Bc? E,Ʊ?@@yGz?ŷH>W۠AyX۠Aoۄ"c? E,Ʊ?@@yGz?2C&>W۠AyX۠Adwdpc? E,Ʊ?@@yGz?H>W۠AyX۠ADob? E,Ʊ?@@yGz?Fk>W۠AyX۠ArEmb? E,Ʊ?@@yGz?xuYa>W۠AyX۠A~b? E,Ʊ?@@yGz?ꤝ>W۠AyX۠Ajb? E,Ʊ?@@yGz?Yӥ>W۠AyX۠A:Flb? E,Ʊ?@@yGz?&>W۠AyX۠ACY)Ob? E,Ʊ?@@yGz?63j5>W۠AyX۠AB}mh2b? E,Ʊ?@@yGz?b;>W۠AyX۠Aeb? E,Ʊ?@@yGz?^>W۠AyX۠Am>a? E,Ʊ?@@yGz?6rT>W۠AyX۠AF8a? E,Ʊ?@@yGz?zc >W۠AyX۠A"Ka? E,Ʊ?@@yGz?\ TƦ>W۠AyX۠AVça? E,Ʊ?@@yGz?OFs>W۠AyX۠A`Ia? E,Ʊ?@@yGz?:G7( >W۠AyX۠A|Sra? E,Ʊ?@@yGz?(.>W۠AyX۠AvVxXa? E,Ʊ?@@yGz?Q>W۠AyX۠AƭNm>a? E,Ʊ?@@yGz?  Gt>W۠AyX۠AA"%a? E,Ʊ?@@yGz?W۠AyX۠AB. a? E,Ʊ?@@yGz?`l>W۠AyX۠A` g`? E,Ʊ?@@yGz?˛eܧ>W۠AyX۠Av*R`? E,Ʊ?@@yGz?:$>W۠AyX۠A:i>`? E,Ʊ?@@yGz?h!>W۠AyX۠AZ)`oة`? E,Ʊ?@@yGz?*D>W۠AyX۠Aٳ`? E,Ʊ?@@yGz?Y9g>W۠AyX۠A$yrz`? E,Ʊ?@@yGz?5>W۠AyX۠ASZ $c`? E,Ʊ?@@yGz?by>W۠AyX۠A 1L`? E,Ʊ?@@yGz?wXϨ>W۠AyX۠As J5`? E,Ʊ?@@yGz?Ai >W۠AyX۠A-`? E,Ʊ?@@yGz?FFZ>W۠AyX۠Ayao`? E,Ʊ?@@yGz?vKw7>W۠AyX۠A*e_? E,Ʊ?@@yGz?<,Z>W۠AyX۠An#_? E,Ʊ?@@yGz?.|>W۠AyX۠A T_? E,Ʊ?@@yGz?hW>W۠AyX۠A, 0#c_? E,Ʊ?@@yGz?3K©>W۠AyX۠A=8_? E,Ʊ?@@yGz?Dc>W۠AyX۠A#_? E,Ʊ?@@yGz?#>W۠AyX۠Aף^? E,Ʊ?@@yGz?"gi*>W۠AyX۠AI*^? E,Ʊ?@@yGz?M>W۠AyX۠A0n ^? E,Ʊ?@@yGz? o>W۠AyX۠Ak^? E,Ʊ?@@yGz?kP4>W۠AyX۠Ao+D^? E,Ʊ?@@yGz?x=>W۠AyX۠AV@c^? E,Ʊ?@@yGz?Iת>W۠AyX۠A h]? E,Ʊ?@@yGz?Iך>W۠AyX۠A hm?h7?@@yGz?%E}\>W۠AyX۠A Tt4m?h7?@@yGz?m_b>W۠AyX۠AO^m?h7?@@yGz?UB0>W۠AyX۠A.M%Qm?h7?@@yGz?*$>W۠AyX۠A( l?h7?@@yGz?f3>W۠AyX۠A3=(l?h7?@@yGz?tmx>W۠AyX۠Aս?l?h7?@@yGz?KGw׽>W۠AyX۠A2 fk?h7?@@yGz?*A>W۠AyX۠Artk?h7?@@yGz? H>W۠AyX۠AȆʾvk?h7?@@yGz?ct>W۠AyX۠A 7>6k?h7?@@yGz?˜Vӝ>W۠AyX۠A#j?h7?@@yGz?!!9>W۠AyX۠AMuj?h7?@@yGz?zS^>W۠AyX۠A{j?h7?@@yGz?X1>W۠AyX۠A}?j?h7?@@yGz?5>&>W۠AyX۠A޿j?h7?@@yGz?BÐ.>W۠AyX۠A'Ipi?h7?@@yGz?ʥs>W۠AyX۠Acݑi?h7?@@yGz?ZSd>W۠AyX۠A1Yi?h7?@@yGz?j>W۠AyX۠Aם>^"i?h7?@@yGz?B &">W۠AyX۠A.h?h7?@@yGz?;D>W۠AyX۠A5Fh?h7?@@yGz?k: g>W۠AyX۠AI>`h?h7?@@yGz?~:>W۠AyX۠A+=Oh?h7?@@yGz?ﬠ>W۠AyX۠AiZVh?h7?@@yGz?iݤϠ>W۠AyX۠AKfg?h7?@@yGz?(KY>W۠AyX۠A]g?h7?@@yGz?FX>W۠AyX۠AsdZg?h7?@@yGz?Ӱ7>W۠AyX۠ArZg?h7?@@yGz?"xZ>W۠AyX۠A0,g?h7?@@yGz?[-}>W۠AyX۠A=4f?h7?@@yGz?⟡>W۠AyX۠ADEf?h7?@@yGz?mEu¡>W۠AyX۠A^[:Vf?h7?@@yGz?t(gL>W۠AyX۠AHGnmxf?h7?@@yGz?JlX>W۠AyX۠AJ6-Mf?h7?@@yGz?ӰI*>W۠AyX۠AQ!"f?h7?@@yGz?&:kM>W۠AyX۠Ame?h7?@@yGz?29, p>W۠AyX۠A[(=e?h7?@@yGz?b}Ւ>W۠AyX۠A|>|e?h7?@@yGz?q>W۠AyX۠ADW۠AyX۠Ay1¼Ve?h7?@@yGz?NI>W۠AyX۠Av`/e?h7?@@yGz?>W۠AyX۠A]o@ e?h7?@@yGz?*O]@>W۠AyX۠AQfSd?h7?@@yGz?~c>W۠AyX۠AVߠd?h7?@@yGz?ZDž>W۠AyX۠Ad?h7?@@yGz?uݞ|>W۠AyX۠Ajtd?h7?@@yGz? 1ˣ>W۠AyX۠A](EPd?h7?@@yGz?Q<'>W۠AyX۠AO r-d?h7?@@yGz?kk{>W۠AyX۠Ab9 d?h7?@@yGz?.lP3>W۠AyX۠ATc?h7?@@yGz?]V>W۠AyX۠A8"c?h7?@@yGz? 7Ox>W۠AyX۠A͜c?h7?@@yGz?x)|@o>W۠AyX۠AF揇c?h7?@@yGz?X1$>W۠AyX۠Aw3nbc?h7?@@yGz?U#>W۠AyX۠A>^ Bc?h7?@@yGz?ķH>W۠AyX۠Aoۄ"c?h7?@@yGz?2C&>W۠AyX۠Adwdpc?h7?@@yGz?H>W۠AyX۠ADob?h7?@@yGz?Fk>W۠AyX۠ArEmb?h7?@@yGz?xuYa>W۠AyX۠A~b?h7?@@yGz?ꤝ>W۠AyX۠Akb?h7?@@yGz?Yӥ>W۠AyX۠A;Flb?h7?@@yGz?&>W۠AyX۠ABY)Ob?h7?@@yGz?63j5>W۠AyX۠AB}mh2b?h7?@@yGz?b;>W۠AyX۠Aeb?h7?@@yGz?^>W۠AyX۠Am>a?h7?@@yGz?6rT>W۠AyX۠AF8a?h7?@@yGz?zc >W۠AyX۠A"Ka?h7?@@yGz?[ TƦ>W۠AyX۠AVça?h7?@@yGz?OFs>W۠AyX۠A`Ia?h7?@@yGz?:G7( >W۠AyX۠A|Sra?h7?@@yGz?(.>W۠AyX۠AvVxXa?h7?@@yGz?Q>W۠AyX۠AƭNm>a?h7?@@yGz?  Gt>W۠AyX۠AA"%a?h7?@@yGz?W۠AyX۠AB. a?h7?@@yGz?`l>W۠AyX۠A` g`?h7?@@yGz?̛eܧ>W۠AyX۠Av*R`?h7?@@yGz?:$>W۠AyX۠A:i>`?h7?@@yGz?h!>W۠AyX۠AZ)`oة`?h7?@@yGz?*D>W۠AyX۠Aٳ`?h7?@@yGz?Y9g>W۠AyX۠A$yrz`?h7?@@yGz?5>W۠AyX۠ASZ $c`?h7?@@yGz?by>W۠AyX۠A 1L`?h7?@@yGz?wXϨ>W۠AyX۠As J5`?h7?@@yGz?Ai >W۠AyX۠A-`?h7?@@yGz?FFZ>W۠AyX۠Ayao`?h7?@@yGz?vKw7>W۠AyX۠A*e_?h7?@@yGz?<,Z>W۠AyX۠An#_?h7?@@yGz?.|>W۠AyX۠A T_?h7?@@yGz?hW>W۠AyX۠A, 0#c_?h7?@@yGz?3K©>W۠AyX۠A=8_?h7?@@yGz?Ec>W۠AyX۠A#_?h7?@@yGz?#>W۠AyX۠Aף^?h7?@@yGz?"gi*>W۠AyX۠AI*^?h7?@@yGz?M>W۠AyX۠A0n ^?h7?@@yGz? o>W۠AyX۠Ak^?h7?@@yGz?lP4>W۠AyX۠Ao+D^?h7?@@yGz?x=>W۠AyX۠AV@c^?h7?@@yGz?Iת>W۠AyX۠A h]?h7?@@yGz?Iך>ĊW۠AyX۠A hm?*?@@yGz?$E}\>ĊW۠AyX۠A Tt4m?*?@@yGz?m_b>ĊW۠AyX۠AO^m?*?@@yGz?UB0>ĊW۠AyX۠A.M%Qm?*?@@yGz?*$>ĊW۠AyX۠A( l?*?@@yGz?f3>ĊW۠AyX۠A3=(l?*?@@yGz?umx>ĊW۠AyX۠Aս?l?*?@@yGz?LGw׽>ĊW۠AyX۠A2 fk?*?@@yGz?*A>ĊW۠AyX۠Artk?*?@@yGz? H>ĊW۠AyX۠AȆʾvk?*?@@yGz?ct>ĊW۠AyX۠A 7>6k?*?@@yGz?˜Vӝ>ĊW۠AyX۠A#j?*?@@yGz?!!9>ĊW۠AyX۠AMuj?*?@@yGz?zS^>ĊW۠AyX۠A{j?*?@@yGz?X1>ĊW۠AyX۠A}?j?*?@@yGz?4>&>ĊW۠AyX۠A޿j?*?@@yGz?BÐ.>ĊW۠AyX۠A'Ipi?*?@@yGz?ʥs>ĊW۠AyX۠Acݑi?*?@@yGz?ZSd>ĊW۠AyX۠A1Yi?*?@@yGz?j>ĊW۠AyX۠A֝>^"i?*?@@yGz?B &">ĊW۠AyX۠A.h?*?@@yGz?;D>ĊW۠AyX۠A5Fh?*?@@yGz?k: g>ĊW۠AyX۠AI>`h?*?@@yGz?~:>ĊW۠AyX۠A*=Oh?*?@@yGz?ﬠ>ĊW۠AyX۠AiZVh?*?@@yGz?iݤϠ>ĊW۠AyX۠AKfg?*?@@yGz?(KY>ĊW۠AyX۠A]g?*?@@yGz?FX>ĊW۠AyX۠AsdZg?*?@@yGz?Ӱ7>ĊW۠AyX۠ArZg?*?@@yGz?"xZ>ĊW۠AyX۠A~0,g?*?@@yGz?[-}>ĊW۠AyX۠A =4f?*?@@yGz?⟡>ĊW۠AyX۠ADEf?*?@@yGz?mEu¡>ĊW۠AyX۠A^[:Vf?*?@@yGz?t(gL>ĊW۠AyX۠AHGnmxf?*?@@yGz?JlX>ĊW۠AyX۠AJ6-Mf?*?@@yGz?ӰI*>ĊW۠AyX۠AQ!"f?*?@@yGz?&:kM>ĊW۠AyX۠Ame?*?@@yGz?29, p>ĊW۠AyX۠A[(=e?*?@@yGz?b}Ւ>ĊW۠AyX۠A|>|e?*?@@yGz?q>ĊW۠AyX۠ADĊW۠AyX۠Ay1¼Ve?*?@@yGz?NI>ĊW۠AyX۠Aw`/e?*?@@yGz?>ĊW۠AyX۠A]o@ e?*?@@yGz?*O]@>ĊW۠AyX۠APfSd?*?@@yGz?~c>ĊW۠AyX۠AVߠd?*?@@yGz?ZDž>ĊW۠AyX۠Ad?*?@@yGz?tݞ|>ĊW۠AyX۠Ajtd?*?@@yGz? 1ˣ>ĊW۠AyX۠A](EPd?*?@@yGz?Q<'>ĊW۠AyX۠AO r-d?*?@@yGz?kk{>ĊW۠AyX۠Ab9 d?*?@@yGz?.lP3>ĊW۠AyX۠ATc?*?@@yGz?]V>ĊW۠AyX۠A8"c?*?@@yGz? 7Ox>ĊW۠AyX۠A͜c?*?@@yGz?x)|@o>ĊW۠AyX۠AG揇c?*?@@yGz?X1$>ĊW۠AyX۠Av3nbc?*?@@yGz?T#>ĊW۠AyX۠A?^ Bc?*?@@yGz?ŷH>ĊW۠AyX۠Aoۄ"c?*?@@yGz?2C&>ĊW۠AyX۠Adwdpc?*?@@yGz?H>ĊW۠AyX۠ADob?*?@@yGz?Fk>ĊW۠AyX۠ArEmb?*?@@yGz?xuYa>ĊW۠AyX۠A~b?*?@@yGz?ꤝ>ĊW۠AyX۠Ajb?*?@@yGz?Yӥ>ĊW۠AyX۠A:Flb?*?@@yGz?&>ĊW۠AyX۠ACY)Ob?*?@@yGz?63j5>ĊW۠AyX۠AB}mh2b?*?@@yGz?b;>ĊW۠AyX۠Aeb?*?@@yGz?^>ĊW۠AyX۠Am>a?*?@@yGz?6rT>ĊW۠AyX۠AF8a?*?@@yGz?zc >ĊW۠AyX۠A"Ka?*?@@yGz?\ TƦ>ĊW۠AyX۠AVça?*?@@yGz?OFs>ĊW۠AyX۠A`Ia?*?@@yGz?:G7( >ĊW۠AyX۠A|Sra?*?@@yGz?(.>ĊW۠AyX۠AvVxXa?*?@@yGz?Q>ĊW۠AyX۠AƭNm>a?*?@@yGz?  Gt>ĊW۠AyX۠AA"%a?*?@@yGz?ĊW۠AyX۠AB. a?*?@@yGz?`l>ĊW۠AyX۠A` g`?*?@@yGz?˛eܧ>ĊW۠AyX۠Av*R`?*?@@yGz?:$>ĊW۠AyX۠A:i>`?*?@@yGz?h!>ĊW۠AyX۠AZ)`oة`?*?@@yGz?*D>ĊW۠AyX۠Aٳ`?*?@@yGz?Y9g>ĊW۠AyX۠A$yrz`?*?@@yGz?5>ĊW۠AyX۠ASZ $c`?*?@@yGz?by>ĊW۠AyX۠A 1L`?*?@@yGz?wXϨ>ĊW۠AyX۠As J5`?*?@@yGz?Ai >ĊW۠AyX۠A-`?*?@@yGz?FFZ>ĊW۠AyX۠Ayao`?*?@@yGz?vKw7>ĊW۠AyX۠A*e_?*?@@yGz?<,Z>ĊW۠AyX۠An#_?*?@@yGz?.|>ĊW۠AyX۠A T_?*?@@yGz?hW>ĊW۠AyX۠A, 0#c_?*?@@yGz?3K©>ĊW۠AyX۠A=8_?*?@@yGz?Dc>ĊW۠AyX۠A#_?*?@@yGz?#>ĊW۠AyX۠Aף^?*?@@yGz?"gi*>ĊW۠AyX۠AI*^?*?@@yGz?M>ĊW۠AyX۠A0n ^?*?@@yGz? o>ĊW۠AyX۠Ak^?*?@@yGz?kP4>ĊW۠AyX۠Ao+D^?*?@@yGz?x=>ĊW۠AyX۠AV@c^?*?@@yGz?Iת>ĊW۠AyX۠A h]?*?@@yGz?Iך>W۠AyX۠A hm?h?@@yGz?%E}\>W۠AyX۠A Tt4m?h?@@yGz?m_b>W۠AyX۠AO^m?h?@@yGz?UB0>W۠AyX۠A.M%Qm?h?@@yGz?*$>W۠AyX۠A( l?h?@@yGz?f3>W۠AyX۠A3=(l?h?@@yGz?tmx>W۠AyX۠Aս?l?h?@@yGz?KGw׽>W۠AyX۠A2 fk?h?@@yGz?*A>W۠AyX۠Artk?h?@@yGz? H>W۠AyX۠AȆʾvk?h?@@yGz?ct>W۠AyX۠A 7>6k?h?@@yGz?˜Vӝ>W۠AyX۠A#j?h?@@yGz?!!9>W۠AyX۠AMuj?h?@@yGz?zS^>W۠AyX۠A{j?h?@@yGz?X1>W۠AyX۠A}?j?h?@@yGz?5>&>W۠AyX۠A޿j?h?@@yGz?BÐ.>W۠AyX۠A'Ipi?h?@@yGz?ʥs>W۠AyX۠Acݑi?h?@@yGz?ZSd>W۠AyX۠A1Yi?h?@@yGz?j>W۠AyX۠Aם>^"i?h?@@yGz?B &">W۠AyX۠A.h?h?@@yGz?;D>W۠AyX۠A5Fh?h?@@yGz?k: g>W۠AyX۠AI>`h?h?@@yGz?~:>W۠AyX۠A+=Oh?h?@@yGz?ﬠ>W۠AyX۠AiZVh?h?@@yGz?iݤϠ>W۠AyX۠AKfg?h?@@yGz?(KY>W۠AyX۠A]g?h?@@yGz?FX>W۠AyX۠AsdZg?h?@@yGz?Ӱ7>W۠AyX۠ArZg?h?@@yGz?"xZ>W۠AyX۠A0,g?h?@@yGz?[-}>W۠AyX۠A=4f?h?@@yGz?⟡>W۠AyX۠ADEf?h?@@yGz?mEu¡>W۠AyX۠A^[:Vf?h?@@yGz?t(gL>W۠AyX۠AHGnmxf?h?@@yGz?JlX>W۠AyX۠AJ6-Mf?h?@@yGz?ӰI*>W۠AyX۠AQ!"f?h?@@yGz?&:kM>W۠AyX۠Ame?h?@@yGz?29, p>W۠AyX۠A[(=e?h?@@yGz?b}Ւ>W۠AyX۠A|>|e?h?@@yGz?q>W۠AyX۠ADW۠AyX۠Ay1¼Ve?h?@@yGz?NI>W۠AyX۠Av`/e?h?@@yGz?>W۠AyX۠A]o@ e?h?@@yGz?*O]@>W۠AyX۠AQfSd?h?@@yGz?~c>W۠AyX۠AVߠd?h?@@yGz?ZDž>W۠AyX۠Ad?h?@@yGz?uݞ|>W۠AyX۠Ajtd?h?@@yGz? 1ˣ>W۠AyX۠A](EPd?h?@@yGz?Q<'>W۠AyX۠AO r-d?h?@@yGz?kk{>W۠AyX۠Ab9 d?h?@@yGz?.lP3>W۠AyX۠ATc?h?@@yGz?]V>W۠AyX۠A8"c?h?@@yGz? 7Ox>W۠AyX۠A͜c?h?@@yGz?x)|@o>W۠AyX۠AF揇c?h?@@yGz?X1$>W۠AyX۠Aw3nbc?h?@@yGz?U#>W۠AyX۠A>^ Bc?h?@@yGz?ķH>W۠AyX۠Aoۄ"c?h?@@yGz?2C&>W۠AyX۠Adwdpc?h?@@yGz?H>W۠AyX۠ADob?h?@@yGz?Fk>W۠AyX۠ArEmb?h?@@yGz?xuYa>W۠AyX۠A~b?h?@@yGz?ꤝ>W۠AyX۠Akb?h?@@yGz?Yӥ>W۠AyX۠A;Flb?h?@@yGz?&>W۠AyX۠ABY)Ob?h?@@yGz?63j5>W۠AyX۠AB}mh2b?h?@@yGz?b;>W۠AyX۠Aeb?h?@@yGz?^>W۠AyX۠Am>a?h?@@yGz?6rT>W۠AyX۠AF8a?h?@@yGz?zc >W۠AyX۠A"Ka?h?@@yGz?[ TƦ>W۠AyX۠AVça?h?@@yGz?OFs>W۠AyX۠A`Ia?h?@@yGz?:G7( >W۠AyX۠A|Sra?h?@@yGz?(.>W۠AyX۠AvVxXa?h?@@yGz?Q>W۠AyX۠AƭNm>a?h?@@yGz?  Gt>W۠AyX۠AA"%a?h?@@yGz?W۠AyX۠AB. a?h?@@yGz?`l>W۠AyX۠A` g`?h?@@yGz?̛eܧ>W۠AyX۠Av*R`?h?@@yGz?:$>W۠AyX۠A:i>`?h?@@yGz?h!>W۠AyX۠AZ)`oة`?h?@@yGz?*D>W۠AyX۠Aٳ`?h?@@yGz?Y9g>W۠AyX۠A$yrz`?h?@@yGz?5>W۠AyX۠ASZ $c`?h?@@yGz?by>W۠AyX۠A 1L`?h?@@yGz?wXϨ>W۠AyX۠As J5`?h?@@yGz?Ai >W۠AyX۠A-`?h?@@yGz?FFZ>W۠AyX۠Ayao`?h?@@yGz?vKw7>W۠AyX۠A*e_?h?@@yGz?<,Z>W۠AyX۠An#_?h?@@yGz?.|>W۠AyX۠A T_?h?@@yGz?hW>W۠AyX۠A, 0#c_?h?@@yGz?3K©>W۠AyX۠A=8_?h?@@yGz?Ec>W۠AyX۠A#_?h?@@yGz?#>W۠AyX۠Aף^?h?@@yGz?"gi*>W۠AyX۠AI*^?h?@@yGz?M>W۠AyX۠A0n ^?h?@@yGz? o>W۠AyX۠Ak^?h?@@yGz?lP4>W۠AyX۠Ao+D^?h?@@yGz?x=>W۠AyX۠AV@c^?h?@@yGz?Iת>W۠AyX۠A h]?h?@@yGz?Iך>xW۠AyX۠A hm? (O?@@yGz?$E}\>xW۠AyX۠A Tt4m? (O?@@yGz?m_b>xW۠AyX۠AO^m? (O?@@yGz?UB0>xW۠AyX۠A.M%Qm? (O?@@yGz?*$>xW۠AyX۠A( l? (O?@@yGz?f3>xW۠AyX۠A3=(l? (O?@@yGz?umx>xW۠AyX۠Aս?l? (O?@@yGz?LGw׽>xW۠AyX۠A2 fk? (O?@@yGz?*A>xW۠AyX۠Artk? (O?@@yGz? H>xW۠AyX۠AȆʾvk? (O?@@yGz?ct>xW۠AyX۠A 7>6k? (O?@@yGz?˜Vӝ>xW۠AyX۠A#j? (O?@@yGz?!!9>xW۠AyX۠AMuj? (O?@@yGz?zS^>xW۠AyX۠A{j? (O?@@yGz?X1>xW۠AyX۠A}?j? (O?@@yGz?4>&>xW۠AyX۠A޿j? (O?@@yGz?BÐ.>xW۠AyX۠A'Ipi? (O?@@yGz?ʥs>xW۠AyX۠Acݑi? (O?@@yGz?ZSd>xW۠AyX۠A1Yi? (O?@@yGz?j>xW۠AyX۠A֝>^"i? (O?@@yGz?B &">xW۠AyX۠A.h? (O?@@yGz?;D>xW۠AyX۠A5Fh? (O?@@yGz?k: g>xW۠AyX۠AI>`h? (O?@@yGz?~:>xW۠AyX۠A*=Oh? (O?@@yGz?ﬠ>xW۠AyX۠AiZVh? (O?@@yGz?iݤϠ>xW۠AyX۠AKfg? (O?@@yGz?(KY>xW۠AyX۠A]g? (O?@@yGz?FX>xW۠AyX۠AsdZg? (O?@@yGz?Ӱ7>xW۠AyX۠ArZg? (O?@@yGz?"xZ>xW۠AyX۠A~0,g? (O?@@yGz?[-}>xW۠AyX۠A =4f? (O?@@yGz?⟡>xW۠AyX۠ADEf? (O?@@yGz?mEu¡>xW۠AyX۠A^[:Vf? (O?@@yGz?t(gL>xW۠AyX۠AHGnmxf? (O?@@yGz?JlX>xW۠AyX۠AJ6-Mf? (O?@@yGz?ӰI*>xW۠AyX۠AQ!"f? (O?@@yGz?&:kM>xW۠AyX۠Ame? (O?@@yGz?29, p>xW۠AyX۠A[(=e? (O?@@yGz?b}Ւ>xW۠AyX۠A|>|e? (O?@@yGz?q>xW۠AyX۠ADxW۠AyX۠Ay1¼Ve? (O?@@yGz?NI>xW۠AyX۠Aw`/e? (O?@@yGz?>xW۠AyX۠A]o@ e? (O?@@yGz?*O]@>xW۠AyX۠APfSd? (O?@@yGz?~c>xW۠AyX۠AVߠd? (O?@@yGz?ZDž>xW۠AyX۠Ad? (O?@@yGz?tݞ|>xW۠AyX۠Ajtd? (O?@@yGz? 1ˣ>xW۠AyX۠A](EPd? (O?@@yGz?Q<'>xW۠AyX۠AO r-d? (O?@@yGz?kk{>xW۠AyX۠Ab9 d? (O?@@yGz?.lP3>xW۠AyX۠ATc? (O?@@yGz?]V>xW۠AyX۠A8"c? (O?@@yGz? 7Ox>xW۠AyX۠A͜c? (O?@@yGz?x)|@o>xW۠AyX۠AG揇c? (O?@@yGz?X1$>xW۠AyX۠Av3nbc? (O?@@yGz?T#>xW۠AyX۠A?^ Bc? (O?@@yGz?ŷH>xW۠AyX۠Aoۄ"c? (O?@@yGz?2C&>xW۠AyX۠Adwdpc? (O?@@yGz?H>xW۠AyX۠ADob? (O?@@yGz?Fk>xW۠AyX۠ArEmb? (O?@@yGz?xuYa>xW۠AyX۠A~b? (O?@@yGz?ꤝ>xW۠AyX۠Ajb? (O?@@yGz?Yӥ>xW۠AyX۠A:Flb? (O?@@yGz?&>xW۠AyX۠ACY)Ob? (O?@@yGz?63j5>xW۠AyX۠AB}mh2b? (O?@@yGz?b;>xW۠AyX۠Aeb? (O?@@yGz?^>xW۠AyX۠Am>a? (O?@@yGz?6rT>xW۠AyX۠AF8a? (O?@@yGz?zc >xW۠AyX۠A"Ka? (O?@@yGz?\ TƦ>xW۠AyX۠AVça? (O?@@yGz?OFs>xW۠AyX۠A`Ia? (O?@@yGz?:G7( >xW۠AyX۠A|Sra? (O?@@yGz?(.>xW۠AyX۠AvVxXa? (O?@@yGz?Q>xW۠AyX۠AƭNm>a? (O?@@yGz?  Gt>xW۠AyX۠AA"%a? (O?@@yGz?xW۠AyX۠AB. a? (O?@@yGz?`l>xW۠AyX۠A` g`? (O?@@yGz?˛eܧ>xW۠AyX۠Av*R`? (O?@@yGz?:$>xW۠AyX۠A:i>`? (O?@@yGz?h!>xW۠AyX۠AZ)`oة`? (O?@@yGz?*D>xW۠AyX۠Aٳ`? (O?@@yGz?Y9g>xW۠AyX۠A$yrz`? (O?@@yGz?5>xW۠AyX۠ASZ $c`? (O?@@yGz?by>xW۠AyX۠A 1L`? (O?@@yGz?wXϨ>xW۠AyX۠As J5`? (O?@@yGz?Ai >xW۠AyX۠A-`? (O?@@yGz?FFZ>xW۠AyX۠Ayao`? (O?@@yGz?vKw7>xW۠AyX۠A*e_? (O?@@yGz?<,Z>xW۠AyX۠An#_? (O?@@yGz?.|>xW۠AyX۠A T_? (O?@@yGz?hW>xW۠AyX۠A, 0#c_? (O?@@yGz?3K©>xW۠AyX۠A=8_? (O?@@yGz?Dc>xW۠AyX۠A#_? (O?@@yGz?#>xW۠AyX۠Aף^? (O?@@yGz?"gi*>xW۠AyX۠AI*^? (O?@@yGz?M>xW۠AyX۠A0n ^? (O?@@yGz? o>xW۠AyX۠Ak^? (O?@@yGz?kP4>xW۠AyX۠Ao+D^? (O?@@yGz?x=>xW۠AyX۠AV@c^? (O?@@yGz?Iת>xW۠AyX۠A h]? (O?@@yGz?Iך>W۠AyX۠A hm?%p6?@@yGz?%E}\>W۠AyX۠A Tt4m?%p6?@@yGz?m_b>W۠AyX۠AO^m?%p6?@@yGz?UB0>W۠AyX۠A.M%Qm?%p6?@@yGz?*$>W۠AyX۠A( l?%p6?@@yGz?f3>W۠AyX۠A3=(l?%p6?@@yGz?tmx>W۠AyX۠Aս?l?%p6?@@yGz?KGw׽>W۠AyX۠A2 fk?%p6?@@yGz?*A>W۠AyX۠Artk?%p6?@@yGz? H>W۠AyX۠AȆʾvk?%p6?@@yGz?ct>W۠AyX۠A 7>6k?%p6?@@yGz?˜Vӝ>W۠AyX۠A#j?%p6?@@yGz?!!9>W۠AyX۠AMuj?%p6?@@yGz?zS^>W۠AyX۠A{j?%p6?@@yGz?X1>W۠AyX۠A}?j?%p6?@@yGz?5>&>W۠AyX۠A޿j?%p6?@@yGz?BÐ.>W۠AyX۠A'Ipi?%p6?@@yGz?ʥs>W۠AyX۠Acݑi?%p6?@@yGz?ZSd>W۠AyX۠A1Yi?%p6?@@yGz?j>W۠AyX۠Aם>^"i?%p6?@@yGz?B &">W۠AyX۠A.h?%p6?@@yGz?;D>W۠AyX۠A5Fh?%p6?@@yGz?k: g>W۠AyX۠AI>`h?%p6?@@yGz?~:>W۠AyX۠A+=Oh?%p6?@@yGz?ﬠ>W۠AyX۠AiZVh?%p6?@@yGz?iݤϠ>W۠AyX۠AKfg?%p6?@@yGz?(KY>W۠AyX۠A]g?%p6?@@yGz?FX>W۠AyX۠AsdZg?%p6?@@yGz?Ӱ7>W۠AyX۠ArZg?%p6?@@yGz?"xZ>W۠AyX۠A0,g?%p6?@@yGz?[-}>W۠AyX۠A=4f?%p6?@@yGz?⟡>W۠AyX۠ADEf?%p6?@@yGz?mEu¡>W۠AyX۠A^[:Vf?%p6?@@yGz?t(gL>W۠AyX۠AHGnmxf?%p6?@@yGz?JlX>W۠AyX۠AJ6-Mf?%p6?@@yGz?ӰI*>W۠AyX۠AQ!"f?%p6?@@yGz?&:kM>W۠AyX۠Ame?%p6?@@yGz?29, p>W۠AyX۠A[(=e?%p6?@@yGz?b}Ւ>W۠AyX۠A|>|e?%p6?@@yGz?q>W۠AyX۠ADW۠AyX۠Ay1¼Ve?%p6?@@yGz?NI>W۠AyX۠Av`/e?%p6?@@yGz?>W۠AyX۠A]o@ e?%p6?@@yGz?*O]@>W۠AyX۠AQfSd?%p6?@@yGz?~c>W۠AyX۠AVߠd?%p6?@@yGz?ZDž>W۠AyX۠Ad?%p6?@@yGz?uݞ|>W۠AyX۠Ajtd?%p6?@@yGz? 1ˣ>W۠AyX۠A](EPd?%p6?@@yGz?Q<'>W۠AyX۠AO r-d?%p6?@@yGz?kk{>W۠AyX۠Ab9 d?%p6?@@yGz?.lP3>W۠AyX۠ATc?%p6?@@yGz?]V>W۠AyX۠A8"c?%p6?@@yGz? 7Ox>W۠AyX۠A͜c?%p6?@@yGz?x)|@o>W۠AyX۠AF揇c?%p6?@@yGz?X1$>W۠AyX۠Aw3nbc?%p6?@@yGz?U#>W۠AyX۠A>^ Bc?%p6?@@yGz?ķH>W۠AyX۠Aoۄ"c?%p6?@@yGz?2C&>W۠AyX۠Adwdpc?%p6?@@yGz?H>W۠AyX۠ADob?%p6?@@yGz?Fk>W۠AyX۠ArEmb?%p6?@@yGz?xuYa>W۠AyX۠A~b?%p6?@@yGz?ꤝ>W۠AyX۠Akb?%p6?@@yGz?Yӥ>W۠AyX۠A;Flb?%p6?@@yGz?&>W۠AyX۠ABY)Ob?%p6?@@yGz?63j5>W۠AyX۠AB}mh2b?%p6?@@yGz?b;>W۠AyX۠Aeb?%p6?@@yGz?^>W۠AyX۠Am>a?%p6?@@yGz?6rT>W۠AyX۠AF8a?%p6?@@yGz?zc >W۠AyX۠A"Ka?%p6?@@yGz?[ TƦ>W۠AyX۠AVça?%p6?@@yGz?OFs>W۠AyX۠A`Ia?%p6?@@yGz?:G7( >W۠AyX۠A|Sra?%p6?@@yGz?(.>W۠AyX۠AvVxXa?%p6?@@yGz?Q>W۠AyX۠AƭNm>a?%p6?@@yGz?  Gt>W۠AyX۠AA"%a?%p6?@@yGz?W۠AyX۠AB. a?%p6?@@yGz?`l>W۠AyX۠A` g`?%p6?@@yGz?̛eܧ>W۠AyX۠Av*R`?%p6?@@yGz?:$>W۠AyX۠A:i>`?%p6?@@yGz?h!>W۠AyX۠AZ)`oة`?%p6?@@yGz?*D>W۠AyX۠Aٳ`?%p6?@@yGz?Y9g>W۠AyX۠A$yrz`?%p6?@@yGz?5>W۠AyX۠ASZ $c`?%p6?@@yGz?by>W۠AyX۠A 1L`?%p6?@@yGz?wXϨ>W۠AyX۠As J5`?%p6?@@yGz?Ai >W۠AyX۠A-`?%p6?@@yGz?FFZ>W۠AyX۠Ayao`?%p6?@@yGz?vKw7>W۠AyX۠A*e_?%p6?@@yGz?<,Z>W۠AyX۠An#_?%p6?@@yGz?.|>W۠AyX۠A T_?%p6?@@yGz?hW>W۠AyX۠A, 0#c_?%p6?@@yGz?3K©>W۠AyX۠A=8_?%p6?@@yGz?Ec>W۠AyX۠A#_?%p6?@@yGz?#>W۠AyX۠Aף^?%p6?@@yGz?"gi*>W۠AyX۠AI*^?%p6?@@yGz?M>W۠AyX۠A0n ^?%p6?@@yGz? o>W۠AyX۠Ak^?%p6?@@yGz?lP4>W۠AyX۠Ao+D^?%p6?@@yGz?x=>W۠AyX۠AV@c^?%p6?@@yGz?Iת>W۠AyX۠A h]?%p6?@@yGz?Iך>fW۠AyX۠A hm?*'Vl?@@yGz?$E}\>fW۠AyX۠A Tt4m?*'Vl?@@yGz?m_b>fW۠AyX۠AO^m?*'Vl?@@yGz?UB0>fW۠AyX۠A.M%Qm?*'Vl?@@yGz?*$>fW۠AyX۠A( l?*'Vl?@@yGz?f3>fW۠AyX۠A3=(l?*'Vl?@@yGz?umx>fW۠AyX۠Aս?l?*'Vl?@@yGz?LGw׽>fW۠AyX۠A2 fk?*'Vl?@@yGz?*A>fW۠AyX۠Artk?*'Vl?@@yGz? H>fW۠AyX۠AȆʾvk?*'Vl?@@yGz?ct>fW۠AyX۠A 7>6k?*'Vl?@@yGz?˜Vӝ>fW۠AyX۠A#j?*'Vl?@@yGz?!!9>fW۠AyX۠AMuj?*'Vl?@@yGz?zS^>fW۠AyX۠A{j?*'Vl?@@yGz?X1>fW۠AyX۠A}?j?*'Vl?@@yGz?4>&>fW۠AyX۠A޿j?*'Vl?@@yGz?BÐ.>fW۠AyX۠A'Ipi?*'Vl?@@yGz?ʥs>fW۠AyX۠Acݑi?*'Vl?@@yGz?ZSd>fW۠AyX۠A1Yi?*'Vl?@@yGz?j>fW۠AyX۠A֝>^"i?*'Vl?@@yGz?B &">fW۠AyX۠A.h?*'Vl?@@yGz?;D>fW۠AyX۠A5Fh?*'Vl?@@yGz?k: g>fW۠AyX۠AI>`h?*'Vl?@@yGz?~:>fW۠AyX۠A*=Oh?*'Vl?@@yGz?ﬠ>fW۠AyX۠AiZVh?*'Vl?@@yGz?iݤϠ>fW۠AyX۠AKfg?*'Vl?@@yGz?(KY>fW۠AyX۠A]g?*'Vl?@@yGz?FX>fW۠AyX۠AsdZg?*'Vl?@@yGz?Ӱ7>fW۠AyX۠ArZg?*'Vl?@@yGz?"xZ>fW۠AyX۠A~0,g?*'Vl?@@yGz?[-}>fW۠AyX۠A =4f?*'Vl?@@yGz?⟡>fW۠AyX۠ADEf?*'Vl?@@yGz?mEu¡>fW۠AyX۠A^[:Vf?*'Vl?@@yGz?t(gL>fW۠AyX۠AHGnmxf?*'Vl?@@yGz?JlX>fW۠AyX۠AJ6-Mf?*'Vl?@@yGz?ӰI*>fW۠AyX۠AQ!"f?*'Vl?@@yGz?&:kM>fW۠AyX۠Ame?*'Vl?@@yGz?29, p>fW۠AyX۠A[(=e?*'Vl?@@yGz?b}Ւ>fW۠AyX۠A|>|e?*'Vl?@@yGz?q>fW۠AyX۠ADfW۠AyX۠Ay1¼Ve?*'Vl?@@yGz?NI>fW۠AyX۠Aw`/e?*'Vl?@@yGz?>fW۠AyX۠A]o@ e?*'Vl?@@yGz?*O]@>fW۠AyX۠APfSd?*'Vl?@@yGz?~c>fW۠AyX۠AVߠd?*'Vl?@@yGz?ZDž>fW۠AyX۠Ad?*'Vl?@@yGz?tݞ|>fW۠AyX۠Ajtd?*'Vl?@@yGz? 1ˣ>fW۠AyX۠A](EPd?*'Vl?@@yGz?Q<'>fW۠AyX۠AO r-d?*'Vl?@@yGz?kk{>fW۠AyX۠Ab9 d?*'Vl?@@yGz?.lP3>fW۠AyX۠ATc?*'Vl?@@yGz?]V>fW۠AyX۠A8"c?*'Vl?@@yGz? 7Ox>fW۠AyX۠A͜c?*'Vl?@@yGz?x)|@o>fW۠AyX۠AG揇c?*'Vl?@@yGz?X1$>fW۠AyX۠Av3nbc?*'Vl?@@yGz?T#>fW۠AyX۠A?^ Bc?*'Vl?@@yGz?ŷH>fW۠AyX۠Aoۄ"c?*'Vl?@@yGz?2C&>fW۠AyX۠Adwdpc?*'Vl?@@yGz?H>fW۠AyX۠ADob?*'Vl?@@yGz?Fk>fW۠AyX۠ArEmb?*'Vl?@@yGz?xuYa>fW۠AyX۠A~b?*'Vl?@@yGz?ꤝ>fW۠AyX۠Ajb?*'Vl?@@yGz?Yӥ>fW۠AyX۠A:Flb?*'Vl?@@yGz?&>fW۠AyX۠ACY)Ob?*'Vl?@@yGz?63j5>fW۠AyX۠AB}mh2b?*'Vl?@@yGz?b;>fW۠AyX۠Aeb?*'Vl?@@yGz?^>fW۠AyX۠Am>a?*'Vl?@@yGz?6rT>fW۠AyX۠AF8a?*'Vl?@@yGz?zc >fW۠AyX۠A"Ka?*'Vl?@@yGz?\ TƦ>fW۠AyX۠AVça?*'Vl?@@yGz?OFs>fW۠AyX۠A`Ia?*'Vl?@@yGz?:G7( >fW۠AyX۠A|Sra?*'Vl?@@yGz?(.>fW۠AyX۠AvVxXa?*'Vl?@@yGz?Q>fW۠AyX۠AƭNm>a?*'Vl?@@yGz?  Gt>fW۠AyX۠AA"%a?*'Vl?@@yGz?fW۠AyX۠AB. a?*'Vl?@@yGz?`l>fW۠AyX۠A` g`?*'Vl?@@yGz?˛eܧ>fW۠AyX۠Av*R`?*'Vl?@@yGz?:$>fW۠AyX۠A:i>`?*'Vl?@@yGz?h!>fW۠AyX۠AZ)`oة`?*'Vl?@@yGz?*D>fW۠AyX۠Aٳ`?*'Vl?@@yGz?Y9g>fW۠AyX۠A$yrz`?*'Vl?@@yGz?5>fW۠AyX۠ASZ $c`?*'Vl?@@yGz?by>fW۠AyX۠A 1L`?*'Vl?@@yGz?wXϨ>fW۠AyX۠As J5`?*'Vl?@@yGz?Ai >fW۠AyX۠A-`?*'Vl?@@yGz?FFZ>fW۠AyX۠Ayao`?*'Vl?@@yGz?vKw7>fW۠AyX۠A*e_?*'Vl?@@yGz?<,Z>fW۠AyX۠An#_?*'Vl?@@yGz?.|>fW۠AyX۠A T_?*'Vl?@@yGz?hW>fW۠AyX۠A, 0#c_?*'Vl?@@yGz?3K©>fW۠AyX۠A=8_?*'Vl?@@yGz?Dc>fW۠AyX۠A#_?*'Vl?@@yGz?#>fW۠AyX۠Aף^?*'Vl?@@yGz?"gi*>fW۠AyX۠AI*^?*'Vl?@@yGz?M>fW۠AyX۠A0n ^?*'Vl?@@yGz? o>fW۠AyX۠Ak^?*'Vl?@@yGz?kP4>fW۠AyX۠Ao+D^?*'Vl?@@yGz?x=>fW۠AyX۠AV@c^?*'Vl?@@yGz?Iת>fW۠AyX۠A h]?*'Vl?@@yGz?Iך>W۠AyX۠A hm?0:;?@@yGz?%E}\>W۠AyX۠A Tt4m?0:;?@@yGz?m_b>W۠AyX۠AO^m?0:;?@@yGz?UB0>W۠AyX۠A.M%Qm?0:;?@@yGz?*$>W۠AyX۠A( l?0:;?@@yGz?f3>W۠AyX۠A3=(l?0:;?@@yGz?tmx>W۠AyX۠Aս?l?0:;?@@yGz?KGw׽>W۠AyX۠A2 fk?0:;?@@yGz?*A>W۠AyX۠Artk?0:;?@@yGz? H>W۠AyX۠AȆʾvk?0:;?@@yGz?ct>W۠AyX۠A 7>6k?0:;?@@yGz?˜Vӝ>W۠AyX۠A#j?0:;?@@yGz?!!9>W۠AyX۠AMuj?0:;?@@yGz?zS^>W۠AyX۠A{j?0:;?@@yGz?X1>W۠AyX۠A}?j?0:;?@@yGz?5>&>W۠AyX۠A޿j?0:;?@@yGz?BÐ.>W۠AyX۠A'Ipi?0:;?@@yGz?ʥs>W۠AyX۠Acݑi?0:;?@@yGz?ZSd>W۠AyX۠A1Yi?0:;?@@yGz?j>W۠AyX۠Aם>^"i?0:;?@@yGz?B &">W۠AyX۠A.h?0:;?@@yGz?;D>W۠AyX۠A5Fh?0:;?@@yGz?k: g>W۠AyX۠AI>`h?0:;?@@yGz?~:>W۠AyX۠A+=Oh?0:;?@@yGz?ﬠ>W۠AyX۠AiZVh?0:;?@@yGz?iݤϠ>W۠AyX۠AKfg?0:;?@@yGz?(KY>W۠AyX۠A]g?0:;?@@yGz?FX>W۠AyX۠AsdZg?0:;?@@yGz?Ӱ7>W۠AyX۠ArZg?0:;?@@yGz?"xZ>W۠AyX۠A0,g?0:;?@@yGz?[-}>W۠AyX۠A=4f?0:;?@@yGz?⟡>W۠AyX۠ADEf?0:;?@@yGz?mEu¡>W۠AyX۠A^[:Vf?0:;?@@yGz?t(gL>W۠AyX۠AHGnmxf?0:;?@@yGz?JlX>W۠AyX۠AJ6-Mf?0:;?@@yGz?ӰI*>W۠AyX۠AQ!"f?0:;?@@yGz?&:kM>W۠AyX۠Ame?0:;?@@yGz?29, p>W۠AyX۠A[(=e?0:;?@@yGz?b}Ւ>W۠AyX۠A|>|e?0:;?@@yGz?q>W۠AyX۠ADW۠AyX۠Ay1¼Ve?0:;?@@yGz?NI>W۠AyX۠Av`/e?0:;?@@yGz?>W۠AyX۠A]o@ e?0:;?@@yGz?*O]@>W۠AyX۠AQfSd?0:;?@@yGz?~c>W۠AyX۠AVߠd?0:;?@@yGz?ZDž>W۠AyX۠Ad?0:;?@@yGz?uݞ|>W۠AyX۠Ajtd?0:;?@@yGz? 1ˣ>W۠AyX۠A](EPd?0:;?@@yGz?Q<'>W۠AyX۠AO r-d?0:;?@@yGz?kk{>W۠AyX۠Ab9 d?0:;?@@yGz?.lP3>W۠AyX۠ATc?0:;?@@yGz?]V>W۠AyX۠A8"c?0:;?@@yGz? 7Ox>W۠AyX۠A͜c?0:;?@@yGz?x)|@o>W۠AyX۠AF揇c?0:;?@@yGz?X1$>W۠AyX۠Aw3nbc?0:;?@@yGz?U#>W۠AyX۠A>^ Bc?0:;?@@yGz?ķH>W۠AyX۠Aoۄ"c?0:;?@@yGz?2C&>W۠AyX۠Adwdpc?0:;?@@yGz?H>W۠AyX۠ADob?0:;?@@yGz?Fk>W۠AyX۠ArEmb?0:;?@@yGz?xuYa>W۠AyX۠A~b?0:;?@@yGz?ꤝ>W۠AyX۠Akb?0:;?@@yGz?Yӥ>W۠AyX۠A;Flb?0:;?@@yGz?&>W۠AyX۠ABY)Ob?0:;?@@yGz?63j5>W۠AyX۠AB}mh2b?0:;?@@yGz?b;>W۠AyX۠Aeb?0:;?@@yGz?^>W۠AyX۠Am>a?0:;?@@yGz?6rT>W۠AyX۠AF8a?0:;?@@yGz?zc >W۠AyX۠A"Ka?0:;?@@yGz?[ TƦ>W۠AyX۠AVça?0:;?@@yGz?OFs>W۠AyX۠A`Ia?0:;?@@yGz?:G7( >W۠AyX۠A|Sra?0:;?@@yGz?(.>W۠AyX۠AvVxXa?0:;?@@yGz?Q>W۠AyX۠AƭNm>a?0:;?@@yGz?  Gt>W۠AyX۠AA"%a?0:;?@@yGz?W۠AyX۠AB. a?0:;?@@yGz?`l>W۠AyX۠A` g`?0:;?@@yGz?̛eܧ>W۠AyX۠Av*R`?0:;?@@yGz?:$>W۠AyX۠A:i>`?0:;?@@yGz?h!>W۠AyX۠AZ)`oة`?0:;?@@yGz?*D>W۠AyX۠Aٳ`?0:;?@@yGz?Y9g>W۠AyX۠A$yrz`?0:;?@@yGz?5>W۠AyX۠ASZ $c`?0:;?@@yGz?by>W۠AyX۠A 1L`?0:;?@@yGz?wXϨ>W۠AyX۠As J5`?0:;?@@yGz?Ai >W۠AyX۠A-`?0:;?@@yGz?FFZ>W۠AyX۠Ayao`?0:;?@@yGz?vKw7>W۠AyX۠A*e_?0:;?@@yGz?<,Z>W۠AyX۠An#_?0:;?@@yGz?.|>W۠AyX۠A T_?0:;?@@yGz?hW>W۠AyX۠A, 0#c_?0:;?@@yGz?3K©>W۠AyX۠A=8_?0:;?@@yGz?Ec>W۠AyX۠A#_?0:;?@@yGz?#>W۠AyX۠Aף^?0:;?@@yGz?"gi*>W۠AyX۠AI*^?0:;?@@yGz?M>W۠AyX۠A0n ^?0:;?@@yGz? o>W۠AyX۠Ak^?0:;?@@yGz?lP4>W۠AyX۠Ao+D^?0:;?@@yGz?x=>W۠AyX۠AV@c^?0:;?@@yGz?Iת>W۠AyX۠A h]?0:;?@@yGz?Iך>UW۠AyX۠A hm?5]%!N?@@yGz?$E}\>UW۠AyX۠A Tt4m?5]%!N?@@yGz?m_b>UW۠AyX۠AO^m?5]%!N?@@yGz?UB0>UW۠AyX۠A.M%Qm?5]%!N?@@yGz?*$>UW۠AyX۠A( l?5]%!N?@@yGz?f3>UW۠AyX۠A3=(l?5]%!N?@@yGz?umx>UW۠AyX۠Aս?l?5]%!N?@@yGz?LGw׽>UW۠AyX۠A2 fk?5]%!N?@@yGz?*A>UW۠AyX۠Artk?5]%!N?@@yGz? H>UW۠AyX۠AȆʾvk?5]%!N?@@yGz?ct>UW۠AyX۠A 7>6k?5]%!N?@@yGz?˜Vӝ>UW۠AyX۠A#j?5]%!N?@@yGz?!!9>UW۠AyX۠AMuj?5]%!N?@@yGz?zS^>UW۠AyX۠A{j?5]%!N?@@yGz?X1>UW۠AyX۠A}?j?5]%!N?@@yGz?4>&>UW۠AyX۠A޿j?5]%!N?@@yGz?BÐ.>UW۠AyX۠A'Ipi?5]%!N?@@yGz?ʥs>UW۠AyX۠Acݑi?5]%!N?@@yGz?ZSd>UW۠AyX۠A1Yi?5]%!N?@@yGz?j>UW۠AyX۠A֝>^"i?5]%!N?@@yGz?B &">UW۠AyX۠A.h?5]%!N?@@yGz?;D>UW۠AyX۠A5Fh?5]%!N?@@yGz?k: g>UW۠AyX۠AI>`h?5]%!N?@@yGz?~:>UW۠AyX۠A*=Oh?5]%!N?@@yGz?ﬠ>UW۠AyX۠AiZVh?5]%!N?@@yGz?iݤϠ>UW۠AyX۠AKfg?5]%!N?@@yGz?(KY>UW۠AyX۠A]g?5]%!N?@@yGz?FX>UW۠AyX۠AsdZg?5]%!N?@@yGz?Ӱ7>UW۠AyX۠ArZg?5]%!N?@@yGz?"xZ>UW۠AyX۠A~0,g?5]%!N?@@yGz?[-}>UW۠AyX۠A =4f?5]%!N?@@yGz?⟡>UW۠AyX۠ADEf?5]%!N?@@yGz?mEu¡>UW۠AyX۠A^[:Vf?5]%!N?@@yGz?t(gL>UW۠AyX۠AHGnmxf?5]%!N?@@yGz?JlX>UW۠AyX۠AJ6-Mf?5]%!N?@@yGz?ӰI*>UW۠AyX۠AQ!"f?5]%!N?@@yGz?&:kM>UW۠AyX۠Ame?5]%!N?@@yGz?29, p>UW۠AyX۠A[(=e?5]%!N?@@yGz?b}Ւ>UW۠AyX۠A|>|e?5]%!N?@@yGz?q>UW۠AyX۠ADUW۠AyX۠Ay1¼Ve?5]%!N?@@yGz?NI>UW۠AyX۠Aw`/e?5]%!N?@@yGz?>UW۠AyX۠A]o@ e?5]%!N?@@yGz?*O]@>UW۠AyX۠APfSd?5]%!N?@@yGz?~c>UW۠AyX۠AVߠd?5]%!N?@@yGz?ZDž>UW۠AyX۠Ad?5]%!N?@@yGz?tݞ|>UW۠AyX۠Ajtd?5]%!N?@@yGz? 1ˣ>UW۠AyX۠A](EPd?5]%!N?@@yGz?Q<'>UW۠AyX۠AO r-d?5]%!N?@@yGz?kk{>UW۠AyX۠Ab9 d?5]%!N?@@yGz?.lP3>UW۠AyX۠ATc?5]%!N?@@yGz?]V>UW۠AyX۠A8"c?5]%!N?@@yGz? 7Ox>UW۠AyX۠A͜c?5]%!N?@@yGz?x)|@o>UW۠AyX۠AG揇c?5]%!N?@@yGz?X1$>UW۠AyX۠Av3nbc?5]%!N?@@yGz?T#>UW۠AyX۠A?^ Bc?5]%!N?@@yGz?ŷH>UW۠AyX۠Aoۄ"c?5]%!N?@@yGz?2C&>UW۠AyX۠Adwdpc?5]%!N?@@yGz?H>UW۠AyX۠ADob?5]%!N?@@yGz?Fk>UW۠AyX۠ArEmb?5]%!N?@@yGz?xuYa>UW۠AyX۠A~b?5]%!N?@@yGz?ꤝ>UW۠AyX۠Ajb?5]%!N?@@yGz?Yӥ>UW۠AyX۠A:Flb?5]%!N?@@yGz?&>UW۠AyX۠ACY)Ob?5]%!N?@@yGz?63j5>UW۠AyX۠AB}mh2b?5]%!N?@@yGz?b;>UW۠AyX۠Aeb?5]%!N?@@yGz?^>UW۠AyX۠Am>a?5]%!N?@@yGz?6rT>UW۠AyX۠AF8a?5]%!N?@@yGz?zc >UW۠AyX۠A"Ka?5]%!N?@@yGz?\ TƦ>UW۠AyX۠AVça?5]%!N?@@yGz?OFs>UW۠AyX۠A`Ia?5]%!N?@@yGz?:G7( >UW۠AyX۠A|Sra?5]%!N?@@yGz?(.>UW۠AyX۠AvVxXa?5]%!N?@@yGz?Q>UW۠AyX۠AƭNm>a?5]%!N?@@yGz?  Gt>UW۠AyX۠AA"%a?5]%!N?@@yGz?UW۠AyX۠AB. a?5]%!N?@@yGz?`l>UW۠AyX۠A` g`?5]%!N?@@yGz?˛eܧ>UW۠AyX۠Av*R`?5]%!N?@@yGz?:$>UW۠AyX۠A:i>`?5]%!N?@@yGz?h!>UW۠AyX۠AZ)`oة`?5]%!N?@@yGz?*D>UW۠AyX۠Aٳ`?5]%!N?@@yGz?Y9g>UW۠AyX۠A$yrz`?5]%!N?@@yGz?5>UW۠AyX۠ASZ $c`?5]%!N?@@yGz?by>UW۠AyX۠A 1L`?5]%!N?@@yGz?wXϨ>UW۠AyX۠As J5`?5]%!N?@@yGz?Ai >UW۠AyX۠A-`?5]%!N?@@yGz?FFZ>UW۠AyX۠Ayao`?5]%!N?@@yGz?vKw7>UW۠AyX۠A*e_?5]%!N?@@yGz?<,Z>UW۠AyX۠An#_?5]%!N?@@yGz?.|>UW۠AyX۠A T_?5]%!N?@@yGz?hW>UW۠AyX۠A, 0#c_?5]%!N?@@yGz?3K©>UW۠AyX۠A=8_?5]%!N?@@yGz?Dc>UW۠AyX۠A#_?5]%!N?@@yGz?#>UW۠AyX۠Aף^?5]%!N?@@yGz?"gi*>UW۠AyX۠AI*^?5]%!N?@@yGz?M>UW۠AyX۠A0n ^?5]%!N?@@yGz? o>UW۠AyX۠Ak^?5]%!N?@@yGz?kP4>UW۠AyX۠Ao+D^?5]%!N?@@yGz?x=>UW۠AyX۠AV@c^?5]%!N?@@yGz?Iת>UW۠AyX۠A h]?5]%!N?@@yGz?Iך>!W۠AyX۠A hm?9?@@yGz?%E}\>!W۠AyX۠A Tt4m?9?@@yGz?m_b>!W۠AyX۠AO^m?9?@@yGz?UB0>!W۠AyX۠A.M%Qm?9?@@yGz?*$>!W۠AyX۠A( l?9?@@yGz?f3>!W۠AyX۠A3=(l?9?@@yGz?tmx>!W۠AyX۠Aս?l?9?@@yGz?KGw׽>!W۠AyX۠A2 fk?9?@@yGz?*A>!W۠AyX۠Artk?9?@@yGz? H>!W۠AyX۠AȆʾvk?9?@@yGz?ct>!W۠AyX۠A 7>6k?9?@@yGz?˜Vӝ>!W۠AyX۠A#j?9?@@yGz?!!9>!W۠AyX۠AMuj?9?@@yGz?zS^>!W۠AyX۠A{j?9?@@yGz?X1>!W۠AyX۠A}?j?9?@@yGz?5>&>!W۠AyX۠A޿j?9?@@yGz?BÐ.>!W۠AyX۠A'Ipi?9?@@yGz?ʥs>!W۠AyX۠Acݑi?9?@@yGz?ZSd>!W۠AyX۠A1Yi?9?@@yGz?j>!W۠AyX۠Aם>^"i?9?@@yGz?B &">!W۠AyX۠A.h?9?@@yGz?;D>!W۠AyX۠A5Fh?9?@@yGz?k: g>!W۠AyX۠AI>`h?9?@@yGz?~:>!W۠AyX۠A+=Oh?9?@@yGz?ﬠ>!W۠AyX۠AiZVh?9?@@yGz?iݤϠ>!W۠AyX۠AKfg?9?@@yGz?(KY>!W۠AyX۠A]g?9?@@yGz?FX>!W۠AyX۠AsdZg?9?@@yGz?Ӱ7>!W۠AyX۠ArZg?9?@@yGz?"xZ>!W۠AyX۠A0,g?9?@@yGz?[-}>!W۠AyX۠A=4f?9?@@yGz?⟡>!W۠AyX۠ADEf?9?@@yGz?mEu¡>!W۠AyX۠A^[:Vf?9?@@yGz?t(gL>!W۠AyX۠AHGnmxf?9?@@yGz?JlX>!W۠AyX۠AJ6-Mf?9?@@yGz?ӰI*>!W۠AyX۠AQ!"f?9?@@yGz?&:kM>!W۠AyX۠Ame?9?@@yGz?29, p>!W۠AyX۠A[(=e?9?@@yGz?b}Ւ>!W۠AyX۠A|>|e?9?@@yGz?q>!W۠AyX۠AD!W۠AyX۠Ay1¼Ve?9?@@yGz?NI>!W۠AyX۠Av`/e?9?@@yGz?>!W۠AyX۠A]o@ e?9?@@yGz?*O]@>!W۠AyX۠AQfSd?9?@@yGz?~c>!W۠AyX۠AVߠd?9?@@yGz?ZDž>!W۠AyX۠Ad?9?@@yGz?uݞ|>!W۠AyX۠Ajtd?9?@@yGz? 1ˣ>!W۠AyX۠A](EPd?9?@@yGz?Q<'>!W۠AyX۠AO r-d?9?@@yGz?kk{>!W۠AyX۠Ab9 d?9?@@yGz?.lP3>!W۠AyX۠ATc?9?@@yGz?]V>!W۠AyX۠A8"c?9?@@yGz? 7Ox>!W۠AyX۠A͜c?9?@@yGz?x)|@o>!W۠AyX۠AF揇c?9?@@yGz?X1$>!W۠AyX۠Aw3nbc?9?@@yGz?U#>!W۠AyX۠A>^ Bc?9?@@yGz?ķH>!W۠AyX۠Aoۄ"c?9?@@yGz?2C&>!W۠AyX۠Adwdpc?9?@@yGz?H>!W۠AyX۠ADob?9?@@yGz?Fk>!W۠AyX۠ArEmb?9?@@yGz?xuYa>!W۠AyX۠A~b?9?@@yGz?ꤝ>!W۠AyX۠Akb?9?@@yGz?Yӥ>!W۠AyX۠A;Flb?9?@@yGz?&>!W۠AyX۠ABY)Ob?9?@@yGz?63j5>!W۠AyX۠AB}mh2b?9?@@yGz?b;>!W۠AyX۠Aeb?9?@@yGz?^>!W۠AyX۠Am>a?9?@@yGz?6rT>!W۠AyX۠AF8a?9?@@yGz?zc >!W۠AyX۠A"Ka?9?@@yGz?[ TƦ>!W۠AyX۠AVça?9?@@yGz?OFs>!W۠AyX۠A`Ia?9?@@yGz?:G7( >!W۠AyX۠A|Sra?9?@@yGz?(.>!W۠AyX۠AvVxXa?9?@@yGz?Q>!W۠AyX۠AƭNm>a?9?@@yGz?  Gt>!W۠AyX۠AA"%a?9?@@yGz?!W۠AyX۠AB. a?9?@@yGz?`l>!W۠AyX۠A` g`?9?@@yGz?̛eܧ>!W۠AyX۠Av*R`?9?@@yGz?:$>!W۠AyX۠A:i>`?9?@@yGz?h!>!W۠AyX۠AZ)`oة`?9?@@yGz?*D>!W۠AyX۠Aٳ`?9?@@yGz?Y9g>!W۠AyX۠A$yrz`?9?@@yGz?5>!W۠AyX۠ASZ $c`?9?@@yGz?by>!W۠AyX۠A 1L`?9?@@yGz?wXϨ>!W۠AyX۠As J5`?9?@@yGz?Ai >!W۠AyX۠A-`?9?@@yGz?FFZ>!W۠AyX۠Ayao`?9?@@yGz?vKw7>!W۠AyX۠A*e_?9?@@yGz?<,Z>!W۠AyX۠An#_?9?@@yGz?.|>!W۠AyX۠A T_?9?@@yGz?hW>!W۠AyX۠A, 0#c_?9?@@yGz?3K©>!W۠AyX۠A=8_?9?@@yGz?Ec>!W۠AyX۠A#_?9?@@yGz?#>!W۠AyX۠Aף^?9?@@yGz?"gi*>!W۠AyX۠AI*^?9?@@yGz?M>!W۠AyX۠A0n ^?9?@@yGz? o>!W۠AyX۠Ak^?9?@@yGz?lP4>!W۠AyX۠Ao+D^?9?@@yGz?x=>!W۠AyX۠AV@c^?9?@@yGz?Iת>!W۠AyX۠A h]?9?@@yGz?Iך>/CW۠AyX۠A hm?>#/?@@yGz?$E}\>/CW۠AyX۠A Tt4m?>#/?@@yGz?m_b>/CW۠AyX۠AO^m?>#/?@@yGz?UB0>/CW۠AyX۠A.M%Qm?>#/?@@yGz?*$>/CW۠AyX۠A( l?>#/?@@yGz?f3>/CW۠AyX۠A3=(l?>#/?@@yGz?umx>/CW۠AyX۠Aս?l?>#/?@@yGz?LGw׽>/CW۠AyX۠A2 fk?>#/?@@yGz?*A>/CW۠AyX۠Artk?>#/?@@yGz? H>/CW۠AyX۠AȆʾvk?>#/?@@yGz?ct>/CW۠AyX۠A 7>6k?>#/?@@yGz?˜Vӝ>/CW۠AyX۠A#j?>#/?@@yGz?!!9>/CW۠AyX۠AMuj?>#/?@@yGz?zS^>/CW۠AyX۠A{j?>#/?@@yGz?X1>/CW۠AyX۠A}?j?>#/?@@yGz?4>&>/CW۠AyX۠A޿j?>#/?@@yGz?BÐ.>/CW۠AyX۠A'Ipi?>#/?@@yGz?ʥs>/CW۠AyX۠Acݑi?>#/?@@yGz?ZSd>/CW۠AyX۠A1Yi?>#/?@@yGz?j>/CW۠AyX۠A֝>^"i?>#/?@@yGz?B &">/CW۠AyX۠A.h?>#/?@@yGz?;D>/CW۠AyX۠A5Fh?>#/?@@yGz?k: g>/CW۠AyX۠AI>`h?>#/?@@yGz?~:>/CW۠AyX۠A*=Oh?>#/?@@yGz?ﬠ>/CW۠AyX۠AiZVh?>#/?@@yGz?iݤϠ>/CW۠AyX۠AKfg?>#/?@@yGz?(KY>/CW۠AyX۠A]g?>#/?@@yGz?FX>/CW۠AyX۠AsdZg?>#/?@@yGz?Ӱ7>/CW۠AyX۠ArZg?>#/?@@yGz?"xZ>/CW۠AyX۠A~0,g?>#/?@@yGz?[-}>/CW۠AyX۠A =4f?>#/?@@yGz?⟡>/CW۠AyX۠ADEf?>#/?@@yGz?mEu¡>/CW۠AyX۠A^[:Vf?>#/?@@yGz?t(gL>/CW۠AyX۠AHGnmxf?>#/?@@yGz?JlX>/CW۠AyX۠AJ6-Mf?>#/?@@yGz?ӰI*>/CW۠AyX۠AQ!"f?>#/?@@yGz?&:kM>/CW۠AyX۠Ame?>#/?@@yGz?29, p>/CW۠AyX۠A[(=e?>#/?@@yGz?b}Ւ>/CW۠AyX۠A|>|e?>#/?@@yGz?q>/CW۠AyX۠AD#/?@@yGz??آ>/CW۠AyX۠Ay1¼Ve?>#/?@@yGz?NI>/CW۠AyX۠Aw`/e?>#/?@@yGz?>/CW۠AyX۠A]o@ e?>#/?@@yGz?*O]@>/CW۠AyX۠APfSd?>#/?@@yGz?~c>/CW۠AyX۠AVߠd?>#/?@@yGz?ZDž>/CW۠AyX۠Ad?>#/?@@yGz?tݞ|>/CW۠AyX۠Ajtd?>#/?@@yGz? 1ˣ>/CW۠AyX۠A](EPd?>#/?@@yGz?Q<'>/CW۠AyX۠AO r-d?>#/?@@yGz?kk{>/CW۠AyX۠Ab9 d?>#/?@@yGz?.lP3>/CW۠AyX۠ATc?>#/?@@yGz?]V>/CW۠AyX۠A8"c?>#/?@@yGz? 7Ox>/CW۠AyX۠A͜c?>#/?@@yGz?x)|@o>/CW۠AyX۠AG揇c?>#/?@@yGz?X1$>/CW۠AyX۠Av3nbc?>#/?@@yGz?T#>/CW۠AyX۠A?^ Bc?>#/?@@yGz?ŷH>/CW۠AyX۠Aoۄ"c?>#/?@@yGz?2C&>/CW۠AyX۠Adwdpc?>#/?@@yGz?H>/CW۠AyX۠ADob?>#/?@@yGz?Fk>/CW۠AyX۠ArEmb?>#/?@@yGz?xuYa>/CW۠AyX۠A~b?>#/?@@yGz?ꤝ>/CW۠AyX۠Ajb?>#/?@@yGz?Yӥ>/CW۠AyX۠A:Flb?>#/?@@yGz?&>/CW۠AyX۠ACY)Ob?>#/?@@yGz?63j5>/CW۠AyX۠AB}mh2b?>#/?@@yGz?b;>/CW۠AyX۠Aeb?>#/?@@yGz?^>/CW۠AyX۠Am>a?>#/?@@yGz?6rT>/CW۠AyX۠AF8a?>#/?@@yGz?zc >/CW۠AyX۠A"Ka?>#/?@@yGz?\ TƦ>/CW۠AyX۠AVça?>#/?@@yGz?OFs>/CW۠AyX۠A`Ia?>#/?@@yGz?:G7( >/CW۠AyX۠A|Sra?>#/?@@yGz?(.>/CW۠AyX۠AvVxXa?>#/?@@yGz?Q>/CW۠AyX۠AƭNm>a?>#/?@@yGz?  Gt>/CW۠AyX۠AA"%a?>#/?@@yGz?/CW۠AyX۠AB. a?>#/?@@yGz?`l>/CW۠AyX۠A` g`?>#/?@@yGz?˛eܧ>/CW۠AyX۠Av*R`?>#/?@@yGz?:$>/CW۠AyX۠A:i>`?>#/?@@yGz?h!>/CW۠AyX۠AZ)`oة`?>#/?@@yGz?*D>/CW۠AyX۠Aٳ`?>#/?@@yGz?Y9g>/CW۠AyX۠A$yrz`?>#/?@@yGz?5>/CW۠AyX۠ASZ $c`?>#/?@@yGz?by>/CW۠AyX۠A 1L`?>#/?@@yGz?wXϨ>/CW۠AyX۠As J5`?>#/?@@yGz?Ai >/CW۠AyX۠A-`?>#/?@@yGz?FFZ>/CW۠AyX۠Ayao`?>#/?@@yGz?vKw7>/CW۠AyX۠A*e_?>#/?@@yGz?<,Z>/CW۠AyX۠An#_?>#/?@@yGz?.|>/CW۠AyX۠A T_?>#/?@@yGz?hW>/CW۠AyX۠A, 0#c_?>#/?@@yGz?3K©>/CW۠AyX۠A=8_?>#/?@@yGz?Dc>/CW۠AyX۠A#_?>#/?@@yGz?#>/CW۠AyX۠Aף^?>#/?@@yGz?"gi*>/CW۠AyX۠AI*^?>#/?@@yGz?M>/CW۠AyX۠A0n ^?>#/?@@yGz? o>/CW۠AyX۠Ak^?>#/?@@yGz?kP4>/CW۠AyX۠Ao+D^?>#/?@@yGz?x=>/CW۠AyX۠AV@c^?>#/?@@yGz?Iת>/CW۠AyX۠A h]?>#/?@@yGz?Iך>6k?CƢѠ?@@yGz?˜Vӝ>&>^"i?CƢѠ?@@yGz?B &">`h?CƢѠ?@@yGz?~:>|e?CƢѠ?@@yGz?q>^ Bc?EƢѠ?@@yGz?ķH>a?CƢѠ?@@yGz?6rT>a?CƢѠ?@@yGz?  Gt>`?CƢѠ?@@yGz?h!>I1W۠AyX۠A hm?J!?@@yGz?$E}\>I1W۠AyX۠A Tt4m?G!?@@yGz?m_b>I1W۠AyX۠AO^m?G!?@@yGz?UB0>I1W۠AyX۠A.M%Qm?G!?@@yGz?*$>I1W۠AyX۠A( l?G!?@@yGz?f3>I1W۠AyX۠A3=(l?G!?@@yGz?umx>I1W۠AyX۠Aս?l?G!?@@yGz?LGw׽>I1W۠AyX۠A2 fk?J!?@@yGz?*A>I1W۠AyX۠Artk?G!?@@yGz? H>I1W۠AyX۠AȆʾvk?G!?@@yGz?ct>I1W۠AyX۠A 7>6k?G!?@@yGz?˜Vӝ>I1W۠AyX۠A#j?G!?@@yGz?!!9>I1W۠AyX۠AMuj?G!?@@yGz?zS^>I1W۠AyX۠A{j?J!?@@yGz?X1>I1W۠AyX۠A}?j?G!?@@yGz?4>&>I1W۠AyX۠A޿j?G!?@@yGz?BÐ.>I1W۠AyX۠A'Ipi?J!?@@yGz?ʥs>I1W۠AyX۠Acݑi?G!?@@yGz?ZSd>I1W۠AyX۠A1Yi?G!?@@yGz?j>I1W۠AyX۠A֝>^"i?G!?@@yGz?B &">I1W۠AyX۠A.h?G!?@@yGz?;D>I1W۠AyX۠A5Fh?G!?@@yGz?k: g>I1W۠AyX۠AI>`h?G!?@@yGz?~:>I1W۠AyX۠A*=Oh?G!?@@yGz?ﬠ>I1W۠AyX۠AiZVh?J!?@@yGz?iݤϠ>I1W۠AyX۠AKfg?G!?@@yGz?(KY>I1W۠AyX۠A]g?J!?@@yGz?FX>I1W۠AyX۠AsdZg?G!?@@yGz?Ӱ7>I1W۠AyX۠ArZg?G!?@@yGz?"xZ>I1W۠AyX۠A~0,g?G!?@@yGz?[-}>I1W۠AyX۠A =4f?G!?@@yGz?⟡>I1W۠AyX۠ADEf?G!?@@yGz?mEu¡>I1W۠AyX۠A^[:Vf?G!?@@yGz?t(gL>I1W۠AyX۠AHGnmxf?G!?@@yGz?JlX>I1W۠AyX۠AJ6-Mf?G!?@@yGz?ӰI*>I1W۠AyX۠AQ!"f?G!?@@yGz?&:kM>I1W۠AyX۠Ame?G!?@@yGz?29, p>I1W۠AyX۠A[(=e?G!?@@yGz?b}Ւ>I1W۠AyX۠A|>|e?G!?@@yGz?q>I1W۠AyX۠ADI1W۠AyX۠Ay1¼Ve?G!?@@yGz?NI>I1W۠AyX۠Aw`/e?G!?@@yGz?>I1W۠AyX۠A]o@ e?J!?@@yGz?*O]@>I1W۠AyX۠APfSd?G!?@@yGz?~c>I1W۠AyX۠AVߠd?G!?@@yGz?ZDž>I1W۠AyX۠Ad?G!?@@yGz?tݞ|>I1W۠AyX۠Ajtd?G!?@@yGz? 1ˣ>I1W۠AyX۠A](EPd?G!?@@yGz?Q<'>I1W۠AyX۠AO r-d?G!?@@yGz?kk{>I1W۠AyX۠Ab9 d?G!?@@yGz?.lP3>I1W۠AyX۠ATc?G!?@@yGz?]V>I1W۠AyX۠A8"c?G!?@@yGz? 7Ox>I1W۠AyX۠A͜c?G!?@@yGz?x)|@o>I1W۠AyX۠AG揇c?G!?@@yGz?X1$>I1W۠AyX۠Av3nbc?G!?@@yGz?T#>I1W۠AyX۠A?^ Bc?J!?@@yGz?ŷH>I1W۠AyX۠Aoۄ"c?G!?@@yGz?2C&>I1W۠AyX۠Adwdpc?G!?@@yGz?H>I1W۠AyX۠ADob?G!?@@yGz?Fk>I1W۠AyX۠ArEmb?G!?@@yGz?xuYa>I1W۠AyX۠A~b?G!?@@yGz?ꤝ>I1W۠AyX۠Ajb?G!?@@yGz?Yӥ>I1W۠AyX۠A:Flb?G!?@@yGz?&>I1W۠AyX۠ACY)Ob?G!?@@yGz?63j5>I1W۠AyX۠AB}mh2b?G!?@@yGz?b;>I1W۠AyX۠Aeb?G!?@@yGz?^>I1W۠AyX۠Am>a?G!?@@yGz?6rT>I1W۠AyX۠AF8a?G!?@@yGz?zc >I1W۠AyX۠A"Ka?G!?@@yGz?\ TƦ>I1W۠AyX۠AVça?G!?@@yGz?OFs>I1W۠AyX۠A`Ia?G!?@@yGz?:G7( >I1W۠AyX۠A|Sra?G!?@@yGz?(.>I1W۠AyX۠AvVxXa?G!?@@yGz?Q>I1W۠AyX۠AƭNm>a?G!?@@yGz?  Gt>I1W۠AyX۠AA"%a?G!?@@yGz?I1W۠AyX۠AB. a?G!?@@yGz?`l>I1W۠AyX۠A` g`?G!?@@yGz?˛eܧ>I1W۠AyX۠Av*R`?G!?@@yGz?:$>I1W۠AyX۠A:i>`?G!?@@yGz?h!>I1W۠AyX۠AZ)`oة`?G!?@@yGz?*D>I1W۠AyX۠Aٳ`?G!?@@yGz?Y9g>I1W۠AyX۠A$yrz`?G!?@@yGz?5>I1W۠AyX۠ASZ $c`?G!?@@yGz?by>I1W۠AyX۠A 1L`?G!?@@yGz?wXϨ>I1W۠AyX۠As J5`?G!?@@yGz?Ai >I1W۠AyX۠A-`?G!?@@yGz?FFZ>I1W۠AyX۠Ayao`?G!?@@yGz?vKw7>I1W۠AyX۠A*e_?J!?@@yGz?<,Z>I1W۠AyX۠An#_?J!?@@yGz?.|>I1W۠AyX۠A T_?G!?@@yGz?hW>I1W۠AyX۠A, 0#c_?J!?@@yGz?3K©>I1W۠AyX۠A=8_?J!?@@yGz?Dc>I1W۠AyX۠A#_?J!?@@yGz?#>I1W۠AyX۠Aף^?G!?@@yGz?"gi*>I1W۠AyX۠AI*^?G!?@@yGz?M>I1W۠AyX۠A0n ^?G!?@@yGz? o>I1W۠AyX۠Ak^?G!?@@yGz?kP4>I1W۠AyX۠Ao+D^?G!?@@yGz?x=>I1W۠AyX۠AV@c^?J!?@@yGz?Iת>I1W۠AyX۠A h]?J!?@@yGz?Iך>WW۠AyX۠A hm?O r?@@yGz?%E}\>WW۠AyX۠A Tt4m?L r?@@yGz?m_b>WW۠AyX۠AO^m?L r?@@yGz?UB0>WW۠AyX۠A.M%Qm?L r?@@yGz?*$>WW۠AyX۠A( l?L r?@@yGz?f3>WW۠AyX۠A3=(l?L r?@@yGz?tmx>WW۠AyX۠Aս?l?L r?@@yGz?KGw׽>WW۠AyX۠A2 fk?O r?@@yGz?*A>WW۠AyX۠Artk?L r?@@yGz? H>WW۠AyX۠AȆʾvk?L r?@@yGz?ct>WW۠AyX۠A 7>6k?L r?@@yGz?˜Vӝ>WW۠AyX۠A#j?L r?@@yGz?!!9>WW۠AyX۠AMuj?L r?@@yGz?zS^>WW۠AyX۠A{j?O r?@@yGz?X1>WW۠AyX۠A}?j?L r?@@yGz?5>&>WW۠AyX۠A޿j?L r?@@yGz?BÐ.>WW۠AyX۠A'Ipi?O r?@@yGz?ʥs>WW۠AyX۠Acݑi?L r?@@yGz?ZSd>WW۠AyX۠A1Yi?L r?@@yGz?j>WW۠AyX۠Aם>^"i?L r?@@yGz?B &">WW۠AyX۠A.h?L r?@@yGz?;D>WW۠AyX۠A5Fh?L r?@@yGz?k: g>WW۠AyX۠AI>`h?L r?@@yGz?~:>WW۠AyX۠A+=Oh?L r?@@yGz?ﬠ>WW۠AyX۠AiZVh?O r?@@yGz?iݤϠ>WW۠AyX۠AKfg?L r?@@yGz?(KY>WW۠AyX۠A]g?O r?@@yGz?FX>WW۠AyX۠AsdZg?L r?@@yGz?Ӱ7>WW۠AyX۠ArZg?L r?@@yGz?"xZ>WW۠AyX۠A0,g?L r?@@yGz?[-}>WW۠AyX۠A=4f?L r?@@yGz?⟡>WW۠AyX۠ADEf?L r?@@yGz?mEu¡>WW۠AyX۠A^[:Vf?L r?@@yGz?t(gL>WW۠AyX۠AHGnmxf?L r?@@yGz?JlX>WW۠AyX۠AJ6-Mf?L r?@@yGz?ӰI*>WW۠AyX۠AQ!"f?L r?@@yGz?&:kM>WW۠AyX۠Ame?L r?@@yGz?29, p>WW۠AyX۠A[(=e?L r?@@yGz?b}Ւ>WW۠AyX۠A|>|e?L r?@@yGz?q>WW۠AyX۠ADWW۠AyX۠Ay1¼Ve?L r?@@yGz?NI>WW۠AyX۠Av`/e?L r?@@yGz?>WW۠AyX۠A]o@ e?O r?@@yGz?*O]@>WW۠AyX۠AQfSd?L r?@@yGz?~c>WW۠AyX۠AVߠd?L r?@@yGz?ZDž>WW۠AyX۠Ad?L r?@@yGz?uݞ|>WW۠AyX۠Ajtd?L r?@@yGz? 1ˣ>WW۠AyX۠A](EPd?L r?@@yGz?Q<'>WW۠AyX۠AO r-d?L r?@@yGz?kk{>WW۠AyX۠Ab9 d?L r?@@yGz?.lP3>WW۠AyX۠ATc?L r?@@yGz?]V>WW۠AyX۠A8"c?L r?@@yGz? 7Ox>WW۠AyX۠A͜c?L r?@@yGz?x)|@o>WW۠AyX۠AF揇c?L r?@@yGz?X1$>WW۠AyX۠Aw3nbc?L r?@@yGz?U#>WW۠AyX۠A>^ Bc?O r?@@yGz?ķH>WW۠AyX۠Aoۄ"c?L r?@@yGz?2C&>WW۠AyX۠Adwdpc?L r?@@yGz?H>WW۠AyX۠ADob?L r?@@yGz?Fk>WW۠AyX۠ArEmb?L r?@@yGz?xuYa>WW۠AyX۠A~b?L r?@@yGz?ꤝ>WW۠AyX۠Akb?L r?@@yGz?Yӥ>WW۠AyX۠A;Flb?L r?@@yGz?&>WW۠AyX۠ABY)Ob?L r?@@yGz?63j5>WW۠AyX۠AB}mh2b?L r?@@yGz?b;>WW۠AyX۠Aeb?L r?@@yGz?^>WW۠AyX۠Am>a?L r?@@yGz?6rT>WW۠AyX۠AF8a?L r?@@yGz?zc >WW۠AyX۠A"Ka?L r?@@yGz?[ TƦ>WW۠AyX۠AVça?L r?@@yGz?OFs>WW۠AyX۠A`Ia?L r?@@yGz?:G7( >WW۠AyX۠A|Sra?L r?@@yGz?(.>WW۠AyX۠AvVxXa?L r?@@yGz?Q>WW۠AyX۠AƭNm>a?L r?@@yGz?  Gt>WW۠AyX۠AA"%a?L r?@@yGz?WW۠AyX۠AB. a?L r?@@yGz?`l>WW۠AyX۠A` g`?L r?@@yGz?̛eܧ>WW۠AyX۠Av*R`?L r?@@yGz?:$>WW۠AyX۠A:i>`?L r?@@yGz?h!>WW۠AyX۠AZ)`oة`?L r?@@yGz?*D>WW۠AyX۠Aٳ`?L r?@@yGz?Y9g>WW۠AyX۠A$yrz`?L r?@@yGz?5>WW۠AyX۠ASZ $c`?L r?@@yGz?by>WW۠AyX۠A 1L`?L r?@@yGz?wXϨ>WW۠AyX۠As J5`?L r?@@yGz?Ai >WW۠AyX۠A-`?L r?@@yGz?FFZ>WW۠AyX۠Ayao`?L r?@@yGz?vKw7>WW۠AyX۠A*e_?O r?@@yGz?<,Z>WW۠AyX۠An#_?O r?@@yGz?.|>WW۠AyX۠A T_?L r?@@yGz?hW>WW۠AyX۠A, 0#c_?O r?@@yGz?3K©>WW۠AyX۠A=8_?O r?@@yGz?Ec>WW۠AyX۠A#_?O r?@@yGz?#>WW۠AyX۠Aף^?L r?@@yGz?"gi*>WW۠AyX۠AI*^?L r?@@yGz?M>WW۠AyX۠A0n ^?L r?@@yGz? o>WW۠AyX۠Ak^?L r?@@yGz?lP4>WW۠AyX۠Ao+D^?L r?@@yGz?x=>WW۠AyX۠AV@c^?O r?@@yGz?Iת>WW۠AyX۠A h]?O r?oIxޱIxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱIxޱIxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱIxޱIxޱJxޱJxޱJxޱJxޱIxޱIxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱIxޱIxޱJxޱJxޱIxޱIxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱIxޱIxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱIxޱIxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱIxޱIxޱIxޱIxޱJxޱJxޱIxޱIxޱIxޱIxޱIxޱIxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱIxޱIxޱIxޱIxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ JxޱJxޱJxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ JxޱJxޱJxޱ Jxޱ Jxޱ Jxޱ JxޱJxޱJxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ JxޱJxޱJxޱ Jxޱ JxޱJxޱJxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ JxޱJxޱJxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ JxޱJxޱJxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ JxޱJxޱJxޱJxޱJxޱ Jxޱ JxޱJxޱJxޱJxޱJxޱJxޱJxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ JxޱJxޱJxޱJxޱJxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ JxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱ Jxޱ JxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱ Jxޱ JxޱJxޱJxޱJxޱJxޱ Jxޱ JxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱ Jxޱ JxޱJxޱJxޱ Jxޱ JxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱ Jxޱ JxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱ Jxޱ JxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱ Jxޱ Jxޱ Jxޱ JxޱJxޱJxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ JxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱ Jxޱ Jxޱ Jxޱ JxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ JxޱJxޱJxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ JxޱJxޱJxޱ Jxޱ Jxޱ Jxޱ JxޱJxޱJxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ JxޱJxޱJxޱ Jxޱ JxޱJxޱJxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ JxޱJxޱJxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ JxޱJxޱJxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ JxޱJxޱJxޱJxޱJxޱ Jxޱ JxޱJxޱJxޱJxޱJxޱJxޱJxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ JxޱJxޱJxޱJxޱJxޱ Jxޱ Jxޱ"Jxޱ!Jxޱ"Jxޱ!Jxޱ"Jxޱ!Jxޱ"Jxޱ!Jxޱ"Jxޱ!Jxޱ"Jxޱ!Jxޱ Jxޱ Jxޱ"Jxޱ!Jxޱ"Jxޱ!Jxޱ"Jxޱ!Jxޱ"Jxޱ!Jxޱ"Jxޱ!Jxޱ Jxޱ Jxޱ"Jxޱ!Jxޱ"Jxޱ!Jxޱ Jxޱ Jxޱ"Jxޱ!Jxޱ"Jxޱ!Jxޱ"Jxޱ!Jxޱ"Jxޱ!Jxޱ"Jxޱ!Jxޱ"Jxޱ!Jxޱ"Jxޱ!Jxޱ Jxޱ Jxޱ"Jxޱ!Jxޱ Jxޱ Jxޱ"Jxޱ!Jxޱ"Jxޱ!Jxޱ"Jxޱ!Jxޱ"Jxޱ!Jxޱ"Jxޱ!Jxޱ"Jxޱ!Jxޱ"Jxޱ!Jxޱ"Jxޱ!Jxޱ"Jxޱ!Jxޱ"Jxޱ!Jxޱ"Jxޱ!Jxޱ"Jxޱ!Jxޱ"Jxޱ!Jxޱ"Jxޱ!Jxޱ"Jxޱ!Jxޱ Jxޱ Jxޱ"Jxޱ!Jxޱ"Jxޱ!Jxޱ"Jxޱ!Jxޱ"Jxޱ!Jxޱ"Jxޱ!Jxޱ"Jxޱ!Jxޱ"Jxޱ!Jxޱ"Jxޱ!Jxޱ"Jxޱ!Jxޱ"Jxޱ!Jxޱ"Jxޱ!Jxޱ"Jxޱ!Jxޱ Jxޱ Jxޱ"Jxޱ!Jxޱ"Jxޱ!Jxޱ"Jxޱ!Jxޱ"Jxޱ!Jxޱ"Jxޱ!Jxޱ"Jxޱ!Jxޱ"Jxޱ!Jxޱ"Jxޱ!Jxޱ"Jxޱ!Jxޱ"Jxޱ!Jxޱ"Jxޱ!Jxޱ"Jxޱ!Jxޱ"Jxޱ!Jxޱ"Jxޱ!Jxޱ"Jxޱ!Jxޱ"Jxޱ!Jxޱ"Jxޱ!Jxޱ"Jxޱ!Jxޱ"Jxޱ!Jxޱ"Jxޱ!Jxޱ"Jxޱ!Jxޱ"Jxޱ!Jxޱ"Jxޱ!Jxޱ"Jxޱ!Jxޱ"Jxޱ!Jxޱ"Jxޱ!Jxޱ"Jxޱ!Jxޱ"Jxޱ!Jxޱ"Jxޱ!Jxޱ"Jxޱ!Jxޱ"Jxޱ!Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ"Jxޱ!Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ"Jxޱ!Jxޱ"Jxޱ!Jxޱ"Jxޱ!Jxޱ"Jxޱ!Jxޱ"Jxޱ!Jxޱ Jxޱ Jxޱ Jxޱ Jxޱ"Jxޱ!Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ"Jxޱ!Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ"Jxޱ!Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ"Jxޱ!Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ"Jxޱ!Jxޱ#Jxޱ#Jxޱ"Jxޱ!Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ"Jxޱ!Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ"Jxޱ!Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ"Jxޱ!Jxޱ"Jxޱ!Jxޱ#Jxޱ#Jxޱ"Jxޱ!Jxޱ"Jxޱ!Jxޱ"Jxޱ!Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ"Jxޱ!Jxޱ"Jxޱ!Jxޱ#Jxޱ#Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ#Jxޱ#Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ#Jxޱ#Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ#Jxޱ#Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ#Jxޱ#Jxޱ$Jxޱ$Jxޱ#Jxޱ#Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ#Jxޱ#Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ#Jxޱ#Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ$Jxޱ$Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ#Jxޱ#Jxޱ#Jxޱ#Jxޱ$Jxޱ$Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ$Jxޱ$Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ$Jxޱ$Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ$Jxޱ$Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ$Jxޱ$Jxޱ%Jxޱ%Jxޱ$Jxޱ$Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ$Jxޱ$Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ$Jxޱ$Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ%Jxޱ%Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ$Jxޱ$Jxޱ$Jxޱ$Jxޱ%Jxޱ%Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ%Jxޱ%Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ%Jxޱ%Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ%Jxޱ%Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ%Jxޱ%Jxޱ&Jxޱ&Jxޱ%Jxޱ%Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ%Jxޱ%Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ%Jxޱ%Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ&Jxޱ&Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ%Jxޱ%Jxޱ%Jxޱ%Jxޱ&Jxޱ&Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ&Jxޱ&Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ&Jxޱ&Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ&Jxޱ&Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ&Jxޱ&Jxޱ'Jxޱ'Jxޱ&Jxޱ&Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ&Jxޱ&Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ&Jxޱ&Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ'Jxޱ'Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ&Jxޱ&Jxޱ&Jxޱ&Jxޱ'Jxޱ'Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ'Jxޱ'Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ'Jxޱ'Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ'Jxޱ'Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ'Jxޱ'Jxޱ(Jxޱ(Jxޱ'Jxޱ'Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ'Jxޱ'Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ'Jxޱ'Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ(Jxޱ(Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ'Jxޱ'Jxޱ'Jxޱ'Jxޱ(Jxޱ(Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ(Jxޱ(Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ(Jxޱ(Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ(Jxޱ(Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ(Jxޱ(Jxޱ)Jxޱ)Jxޱ(Jxޱ(Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ(Jxޱ(Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ(Jxޱ(Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ)Jxޱ)Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ(Jxޱ(Jxޱ(Jxޱ(Jxޱ)Jxޱ)Jxޱ+Jxޱ*Jxޱ+Jxޱ*Jxޱ+Jxޱ*Jxޱ+Jxޱ*Jxޱ+Jxޱ*Jxޱ+Jxޱ*Jxޱ)Jxޱ)Jxޱ+Jxޱ*Jxޱ+Jxޱ*Jxޱ+Jxޱ*Jxޱ+Jxޱ*Jxޱ+Jxޱ*Jxޱ)Jxޱ)Jxޱ+Jxޱ*Jxޱ+Jxޱ*Jxޱ)Jxޱ)Jxޱ+Jxޱ*Jxޱ+Jxޱ*Jxޱ+Jxޱ*Jxޱ+Jxޱ*Jxޱ+Jxޱ*Jxޱ+Jxޱ*Jxޱ+Jxޱ*Jxޱ)Jxޱ)Jxޱ+Jxޱ*Jxޱ)Jxޱ)Jxޱ+Jxޱ*Jxޱ+Jxޱ*Jxޱ+Jxޱ*Jxޱ+Jxޱ*Jxޱ+Jxޱ*Jxޱ+Jxޱ*Jxޱ+Jxޱ*Jxޱ+Jxޱ*Jxޱ+Jxޱ*Jxޱ+Jxޱ*Jxޱ+Jxޱ*Jxޱ+Jxޱ*Jxޱ+Jxޱ*Jxޱ+Jxޱ*Jxޱ+Jxޱ*Jxޱ)Jxޱ)Jxޱ+Jxޱ*Jxޱ+Jxޱ*Jxޱ+Jxޱ*Jxޱ+Jxޱ*Jxޱ+Jxޱ*Jxޱ+Jxޱ*Jxޱ+Jxޱ*Jxޱ+Jxޱ*Jxޱ+Jxޱ*Jxޱ+Jxޱ*Jxޱ+Jxޱ*Jxޱ+Jxޱ*Jxޱ)Jxޱ)Jxޱ+Jxޱ*Jxޱ+Jxޱ*Jxޱ+Jxޱ*Jxޱ+Jxޱ*Jxޱ+Jxޱ*Jxޱ+Jxޱ*Jxޱ+Jxޱ*Jxޱ+Jxޱ*Jxޱ+Jxޱ*Jxޱ+Jxޱ*Jxޱ+Jxޱ*Jxޱ+Jxޱ*Jxޱ+Jxޱ*Jxޱ+Jxޱ*Jxޱ+Jxޱ*Jxޱ+Jxޱ*Jxޱ+Jxޱ*Jxޱ+Jxޱ*Jxޱ+Jxޱ*Jxޱ+Jxޱ*Jxޱ+Jxޱ*Jxޱ+Jxޱ*Jxޱ+Jxޱ*Jxޱ+Jxޱ*Jxޱ+Jxޱ*Jxޱ+Jxޱ*Jxޱ+Jxޱ*Jxޱ+Jxޱ*Jxޱ+Jxޱ*Jxޱ+Jxޱ*Jxޱ+Jxޱ*Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ+Jxޱ*Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ+Jxޱ*Jxޱ+Jxޱ*Jxޱ+Jxޱ*Jxޱ+Jxޱ*Jxޱ+Jxޱ*Jxޱ)Jxޱ)Jxޱ)Jxޱ)Jxޱ+Jxޱ*Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ+Jxޱ*Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ+Jxޱ*Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ+Jxޱ*Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ+Jxޱ*Jxޱ,Jxޱ,Jxޱ+Jxޱ*Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ+Jxޱ*Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ+Jxޱ*Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ+Jxޱ*Jxޱ+Jxޱ*Jxޱ,Jxޱ,Jxޱ+Jxޱ*Jxޱ+Jxޱ*Jxޱ+Jxޱ*Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ+Jxޱ*Jxޱ+Jxޱ*Jxޱ,Jxޱ,Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ,Jxޱ,Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ,Jxޱ,Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ,Jxޱ,Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ,Jxޱ,Jxޱ-Jxޱ-Jxޱ,Jxޱ,Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ,Jxޱ,Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ,Jxޱ,Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ-Jxޱ-Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ,Jxޱ,Jxޱ,Jxޱ,Jxޱ-Jxޱ-Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ-Jxޱ-Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ-Jxޱ-Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ-Jxޱ-Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ-Jxޱ-Jxޱ.Jxޱ.Jxޱ-Jxޱ-Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ-Jxޱ-Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ-Jxޱ-Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ.Jxޱ.Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ-Jxޱ-Jxޱ-Jxޱ-Jxޱ.Jxޱ.Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ.Jxޱ.Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ.Jxޱ.Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ.Jxޱ.Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ.Jxޱ.Jxޱ/Jxޱ/Jxޱ.Jxޱ.Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ.Jxޱ.Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ.Jxޱ.Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ/Jxޱ/Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ.Jxޱ.Jxޱ.Jxޱ.Jxޱ/Jxޱ/Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ/Jxޱ/Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ/Jxޱ/Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ/Jxޱ/Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ/Jxޱ/Jxޱ0Jxޱ0Jxޱ/Jxޱ/Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ/Jxޱ/Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ/Jxޱ/Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ0Jxޱ0Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ/Jxޱ/Jxޱ/Jxޱ/Jxޱ0Jxޱ0Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ0Jxޱ0Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ0Jxޱ0Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ0Jxޱ0Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ0Jxޱ0Jxޱ1Jxޱ1Jxޱ0Jxޱ0Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ0Jxޱ0Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ0Jxޱ0Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ1Jxޱ1Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ0Jxޱ0Jxޱ0Jxޱ0Jxޱ1Jxޱ1Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ1Jxޱ1Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ1Jxޱ1Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ1Jxޱ1Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ1Jxޱ1Jxޱ2Jxޱ2Jxޱ1Jxޱ1Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ1Jxޱ1Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ1Jxޱ1Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ2Jxޱ2Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ1Jxޱ1Jxޱ1Jxޱ1Jxޱ2Jxޱ2Jxޱ4Jxޱ3Jxޱ4Jxޱ3Jxޱ4Jxޱ3Jxޱ4Jxޱ3Jxޱ4Jxޱ3Jxޱ4Jxޱ3Jxޱ2Jxޱ2Jxޱ4Jxޱ3Jxޱ4Jxޱ3Jxޱ4Jxޱ3Jxޱ4Jxޱ3Jxޱ4Jxޱ3Jxޱ2Jxޱ2Jxޱ4Jxޱ3Jxޱ4Jxޱ3Jxޱ2Jxޱ2Jxޱ4Jxޱ3Jxޱ4Jxޱ3Jxޱ4Jxޱ3Jxޱ4Jxޱ3Jxޱ4Jxޱ3Jxޱ4Jxޱ3Jxޱ4Jxޱ3Jxޱ2Jxޱ2Jxޱ4Jxޱ3Jxޱ2Jxޱ2Jxޱ4Jxޱ3Jxޱ4Jxޱ3Jxޱ4Jxޱ3Jxޱ4Jxޱ3Jxޱ4Jxޱ3Jxޱ4Jxޱ3Jxޱ4Jxޱ3Jxޱ4Jxޱ3Jxޱ4Jxޱ3Jxޱ4Jxޱ3Jxޱ4Jxޱ3Jxޱ4Jxޱ3Jxޱ4Jxޱ3Jxޱ4Jxޱ3Jxޱ4Jxޱ3Jxޱ2Jxޱ2Jxޱ4Jxޱ3Jxޱ4Jxޱ3Jxޱ4Jxޱ3Jxޱ4Jxޱ3Jxޱ4Jxޱ3Jxޱ4Jxޱ3Jxޱ4Jxޱ3Jxޱ4Jxޱ3Jxޱ4Jxޱ3Jxޱ4Jxޱ3Jxޱ4Jxޱ3Jxޱ4Jxޱ3Jxޱ2Jxޱ2Jxޱ4Jxޱ3Jxޱ4Jxޱ3Jxޱ4Jxޱ3Jxޱ4Jxޱ3Jxޱ4Jxޱ3Jxޱ4Jxޱ3Jxޱ4Jxޱ3Jxޱ4Jxޱ3Jxޱ4Jxޱ3Jxޱ4Jxޱ3Jxޱ4Jxޱ3Jxޱ4Jxޱ3Jxޱ4Jxޱ3Jxޱ4Jxޱ3Jxޱ4Jxޱ3Jxޱ4Jxޱ3Jxޱ4Jxޱ3Jxޱ4Jxޱ3Jxޱ4Jxޱ3Jxޱ4Jxޱ3Jxޱ4Jxޱ3Jxޱ4Jxޱ3Jxޱ4Jxޱ3Jxޱ4Jxޱ3Jxޱ4Jxޱ3Jxޱ4Jxޱ3Jxޱ4Jxޱ3Jxޱ4Jxޱ3Jxޱ4Jxޱ3Jxޱ4Jxޱ3Jxޱ4Jxޱ3Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ4Jxޱ3Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ4Jxޱ3Jxޱ4Jxޱ3Jxޱ4Jxޱ3Jxޱ4Jxޱ3Jxޱ4Jxޱ3Jxޱ2Jxޱ2Jxޱ2Jxޱ2Jxޱ4Jxޱ3Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ4Jxޱ3Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ4Jxޱ3Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ4Jxޱ3Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ4Jxޱ3Jxޱ5Jxޱ5Jxޱ4Jxޱ3Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ4Jxޱ3Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ4Jxޱ3Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ4Jxޱ3Jxޱ4Jxޱ3Jxޱ5Jxޱ5Jxޱ4Jxޱ3Jxޱ4Jxޱ3Jxޱ4Jxޱ3Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ4Jxޱ3Jxޱ4Jxޱ3Jxޱ5Jxޱ5Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ5Jxޱ5Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ5Jxޱ5Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ5Jxޱ5Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ5Jxޱ5Jxޱ6Jxޱ6Jxޱ5Jxޱ5Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ5Jxޱ5Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ5Jxޱ5Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ6Jxޱ6Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ5Jxޱ5Jxޱ5Jxޱ5Jxޱ6Jxޱ6Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ6Jxޱ6Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ6Jxޱ6Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ6Jxޱ6Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ6Jxޱ6Jxޱ7Jxޱ7Jxޱ6Jxޱ6Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ6Jxޱ6Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ6Jxޱ6Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ7Jxޱ7Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ6Jxޱ6Jxޱ6Jxޱ6Jxޱ7Jxޱ7Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ7Jxޱ7Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ7Jxޱ7Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ7Jxޱ7Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ7Jxޱ7Jxޱ8Jxޱ8Jxޱ7Jxޱ7Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ7Jxޱ7Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ7Jxޱ7Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ8Jxޱ8Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ7Jxޱ7Jxޱ7Jxޱ7Jxޱ8Jxޱ8Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ8Jxޱ8Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ8Jxޱ8Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ8Jxޱ8Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ8Jxޱ8Jxޱ9Jxޱ9Jxޱ8Jxޱ8Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ8Jxޱ8Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ8Jxޱ8Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ9Jxޱ9Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ8Jxޱ8Jxޱ8Jxޱ8Jxޱ9Jxޱ9Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ9Jxޱ9Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ9Jxޱ9Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ9Jxޱ9Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ9Jxޱ9Jxޱ:Jxޱ:Jxޱ9Jxޱ9Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ9Jxޱ9Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ9Jxޱ9Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ:Jxޱ:Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ9Jxޱ9Jxޱ9Jxޱ9Jxޱ:Jxޱ:Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ:Jxޱ:Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ:Jxޱ:Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ:Jxޱ:Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ:Jxޱ:Jxޱ;Jxޱ;Jxޱ:Jxޱ:Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ:Jxޱ:Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ:Jxޱ:Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ;Jxޱ;Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ:Jxޱ:Jxޱ:Jxޱ:Jxޱ;Jxޱ;Jxޱ=Jxޱ<Jxޱ=Jxޱ<Jxޱ=Jxޱ<Jxޱ=Jxޱ<Jxޱ=Jxޱ<Jxޱ=Jxޱ<Jxޱ;Jxޱ;Jxޱ=Jxޱ<Jxޱ=Jxޱ<Jxޱ=Jxޱ<Jxޱ=Jxޱ<Jxޱ=Jxޱ<Jxޱ;Jxޱ;Jxޱ=Jxޱ<Jxޱ=Jxޱ<Jxޱ;Jxޱ;Jxޱ=Jxޱ<Jxޱ=Jxޱ<Jxޱ=Jxޱ<Jxޱ=Jxޱ<Jxޱ=Jxޱ<Jxޱ=Jxޱ<Jxޱ=Jxޱ<Jxޱ;Jxޱ;Jxޱ=Jxޱ<Jxޱ;Jxޱ;Jxޱ=Jxޱ<Jxޱ=Jxޱ<Jxޱ=Jxޱ<Jxޱ=Jxޱ<Jxޱ=Jxޱ<Jxޱ=Jxޱ<Jxޱ=Jxޱ<Jxޱ=Jxޱ<Jxޱ=Jxޱ<Jxޱ=Jxޱ<Jxޱ=Jxޱ<Jxޱ=Jxޱ<Jxޱ=Jxޱ<Jxޱ=Jxޱ<Jxޱ=Jxޱ<Jxޱ;Jxޱ;Jxޱ=Jxޱ<Jxޱ=Jxޱ<Jxޱ=Jxޱ<Jxޱ=Jxޱ<Jxޱ=Jxޱ<Jxޱ=Jxޱ<Jxޱ=Jxޱ<Jxޱ=Jxޱ<Jxޱ=Jxޱ<Jxޱ=Jxޱ<Jxޱ=Jxޱ<Jxޱ=Jxޱ<Jxޱ;Jxޱ;Jxޱ=Jxޱ<Jxޱ=Jxޱ<Jxޱ=Jxޱ<Jxޱ=Jxޱ<Jxޱ=Jxޱ<Jxޱ=Jxޱ<Jxޱ=Jxޱ<Jxޱ=Jxޱ<Jxޱ=Jxޱ<Jxޱ=Jxޱ<Jxޱ=Jxޱ<Jxޱ=Jxޱ<Jxޱ=Jxޱ<Jxޱ=Jxޱ<Jxޱ=Jxޱ<Jxޱ=Jxޱ<Jxޱ=Jxޱ<Jxޱ=Jxޱ<Jxޱ=Jxޱ<Jxޱ=Jxޱ<Jxޱ=Jxޱ<Jxޱ=Jxޱ<Jxޱ=Jxޱ<Jxޱ=Jxޱ<Jxޱ=Jxޱ<Jxޱ=Jxޱ<Jxޱ=Jxޱ<Jxޱ=Jxޱ<Jxޱ=Jxޱ<Jxޱ=Jxޱ<Jxޱ=Jxޱ<Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ=Jxޱ<Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ=Jxޱ<Jxޱ=Jxޱ<Jxޱ=Jxޱ<Jxޱ=Jxޱ<Jxޱ=Jxޱ<Jxޱ;Jxޱ;Jxޱ;Jxޱ;Jxޱ=Jxޱ<Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ=Jxޱ<Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ=Jxޱ<Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ=Jxޱ<Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ=Jxޱ<Jxޱ>Jxޱ>Jxޱ=Jxޱ<Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ=Jxޱ<Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ=Jxޱ<Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ=Jxޱ<Jxޱ=Jxޱ<Jxޱ>Jxޱ>Jxޱ=Jxޱ<Jxޱ=Jxޱ<Jxޱ=Jxޱ<Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ=Jxޱ<Jxޱ=Jxޱ<Jxޱ>Jxޱ>Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ>Jxޱ>Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ>Jxޱ>Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ>Jxޱ>Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ>Jxޱ>Jxޱ?Jxޱ?Jxޱ>Jxޱ>Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ>Jxޱ>Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ>Jxޱ>Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ?Jxޱ?Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ>Jxޱ>Jxޱ>Jxޱ>Jxޱ?Jxޱ?Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ?Jxޱ?Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ?Jxޱ?Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ?Jxޱ?Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ?Jxޱ?Jxޱ@Jxޱ@Jxޱ?Jxޱ?Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ?Jxޱ?Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ?Jxޱ?Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ@Jxޱ@Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ?Jxޱ?Jxޱ?Jxޱ?Jxޱ@Jxޱ@JxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱ@Jxޱ@JxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱ@Jxޱ@JxޱAJxޱAJxޱAJxޱAJxޱ@Jxޱ@JxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱ@Jxޱ@JxޱAJxޱAJxޱ@Jxޱ@JxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱ@Jxޱ@JxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱ@Jxޱ@JxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱ@Jxޱ@Jxޱ@Jxޱ@JxޱAJxޱAJxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@Jxޱ@JxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱ@Jxޱ@Jxޱ@Jxޱ@JxޱAJxޱAJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱAJxޱAJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱAJxޱAJxޱBJxޱBJxޱBJxޱBJxޱAJxޱAJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱAJxޱAJxޱBJxޱBJxޱAJxޱAJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱAJxޱAJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱAJxޱAJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱAJxޱAJxޱAJxޱAJxޱBJxޱBJxޱAJxޱAJxޱAJxޱAJxޱAJxޱAJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱAJxޱAJxޱAJxޱAJxޱBJxޱBJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱBJxޱBJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱBJxޱBJxޱCJxޱCJxޱCJxޱCJxޱBJxޱBJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱBJxޱBJxޱCJxޱCJxޱBJxޱBJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱBJxޱBJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱBJxޱBJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱBJxޱBJxޱBJxޱBJxޱCJxޱCJxޱBJxޱBJxޱBJxޱBJxޱBJxޱBJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱBJxޱBJxޱBJxޱBJxޱCJxޱCJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱCJxޱCJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱCJxޱCJxޱDJxޱDJxޱDJxޱDJxޱCJxޱCJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱCJxޱCJxޱDJxޱDJxޱCJxޱCJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱCJxޱCJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱCJxޱCJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱCJxޱCJxޱCJxޱCJxޱDJxޱDJxޱCJxޱCJxޱCJxޱCJxޱCJxޱCJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱCJxޱCJxޱCJxޱCJxޱDJxޱDJxޱFJxޱEJxޱFJxޱEJxޱFJxޱEJxޱFJxޱEJxޱFJxޱEJxޱFJxޱEJxޱDJxޱDJxޱFJxޱEJxޱFJxޱEJxޱFJxޱEJxޱFJxޱEJxޱFJxޱEJxޱDJxޱDJxޱFJxޱEJxޱFJxޱEJxޱDJxޱDJxޱFJxޱEJxޱFJxޱEJxޱFJxޱEJxޱFJxޱEJxޱFJxޱEJxޱFJxޱEJxޱFJxޱEJxޱDJxޱDJxޱFJxޱEJxޱDJxޱDJxޱFJxޱEJxޱFJxޱEJxޱFJxޱEJxޱFJxޱEJxޱFJxޱEJxޱFJxޱEJxޱFJxޱEJxޱFJxޱEJxޱFJxޱEJxޱFJxޱEJxޱFJxޱEJxޱFJxޱEJxޱFJxޱEJxޱFJxޱEJxޱFJxޱEJxޱDJxޱDJxޱFJxޱEJxޱFJxޱEJxޱFJxޱEJxޱFJxޱEJxޱFJxޱEJxޱFJxޱEJxޱFJxޱEJxޱFJxޱEJxޱFJxޱEJxޱFJxޱEJxޱFJxޱEJxޱFJxޱEJxޱDJxޱDJxޱFJxޱEJxޱFJxޱEJxޱFJxޱEJxޱFJxޱEJxޱFJxޱEJxޱFJxޱEJxޱFJxޱEJxޱFJxޱEJxޱFJxޱEJxޱFJxޱEJxޱFJxޱEJxޱFJxޱEJxޱFJxޱEJxޱFJxޱEJxޱFJxޱEJxޱFJxޱEJxޱFJxޱEJxޱFJxޱEJxޱFJxޱEJxޱFJxޱEJxޱFJxޱEJxޱFJxޱEJxޱFJxޱEJxޱFJxޱEJxޱFJxޱEJxޱFJxޱEJxޱFJxޱEJxޱFJxޱEJxޱFJxޱEJxޱFJxޱEJxޱFJxޱEJxޱDJxޱDJxޱDJxޱDJxޱFJxޱEJxޱDJxޱDJxޱDJxޱDJxޱDJxޱDJxޱFJxޱEJxޱFJxޱEJxޱFJxޱEJxޱFJxޱEJxޱFJxޱEJxޱDJxޱDJxޱDJxDJxޱFJxޱEJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱFJxޱEJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱFJxޱEJxޱGJxޱGJxޱGJxޱGJxޱFJxޱEJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱFJxޱEJxޱGJxޱGJxޱFJxޱEJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱFJxޱEJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱFJxޱEJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱFJxޱEJxޱFJxޱEJxޱGJxޱGJxޱFJxޱEJxޱFJxޱEJxޱFJxޱEJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱFJxޱEJxޱFJxޱEJxޱGJxޱGJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱGJxޱGJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱGJxޱGJxޱHJxޱHJxޱHJxޱHJxޱGJxޱGJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱGJxޱGJxޱHJxޱHJxޱGJxޱGJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱGJxޱGJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱGJxޱGJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱGJxޱGJxޱGJxޱGJxޱHJxޱHJxޱGJxޱGJxޱGJxޱGJxޱGJxޱGJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱGJxޱGJxޱGJxޱGJxޱHJxޱHJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱHJxޱHJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱHJxޱHJxޱIJxޱIJxޱIJxޱIJxޱHJxޱHJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱHJxޱHJxޱIJxޱIJxޱHJxޱHJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱHJxޱHJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱHJxޱHJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱHJxޱHJxޱHJxޱHJxޱIJxޱIJxޱHJxޱHJxޱHJxޱHJxޱHJxޱHJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱHJxޱHJxޱHJxޱHJxޱIJxޱIJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱIJxޱIJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱIJxޱIJxޱJJxޱJJxޱJJxޱJJxޱIJxޱIJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱIJxޱIJxޱJJxޱJJxޱIJxޱIJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱIJxޱIJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱIJxޱIJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱIJxޱIJxޱIJxޱIJxޱJJxޱJJxޱIJxޱIJxޱIJxޱIJxޱIJxޱIJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱIJxޱIJxޱIJxޱIJxޱJJxޱJJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱJJxޱJJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱJJxޱJJxޱKJxޱKJxޱKJxޱKJxޱJJxޱJJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱJJxޱJJxޱKJxޱKJxޱJJxޱJJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱJJxޱJJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱJJxޱJJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱJJxޱJJxޱJJxޱJJxޱKJxޱKJxޱJJxޱJJxޱJJxޱJJxޱJJxޱJJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱJJxޱJJxޱJJxޱJJxޱKJxޱKJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱKJxޱKJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱKJxޱKJxޱLJxޱLJxޱLJxޱLJxޱKJxޱKJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱKJxޱKJxޱLJxޱLJxޱKJxޱKJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱKJxޱKJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱKJxޱKJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱKJxޱKJxޱKJxޱKJxޱLJxޱLJxޱKJxޱKJxޱKJxޱKJxޱKJxޱKJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱKJxޱKJxޱKJxޱKJxޱLJxޱLJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱLJxޱLJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱLJxޱLJxޱMJxޱMJxޱMJxޱMJxޱLJxޱLJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱLJxޱLJxޱMJxޱMJxޱLJxޱLJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱLJxޱLJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱLJxޱLJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱLJxޱLJxޱLJxޱLJxޱMJxޱMJxޱLJxޱLJxޱLJxޱLJxޱLJxޱLJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱLJxޱLJxޱLJxޱLJxޱMJxޱMJxޱOJxޱNJxޱOJxޱNJxޱOJxޱNJxޱOJxޱNJxޱOJxޱNJxޱOJxޱNJxޱMJxޱMJxޱOJxޱNJxޱOJxޱNJxޱOJxޱNJxޱOJxޱNJxޱOJxޱNJxޱMJxޱMJxޱOJxޱNJxޱOJxޱNJxޱMJxޱMJxޱOJxޱNJxޱOJxޱNJxޱOJxޱNJxޱOJxޱNJxޱOJxޱNJxޱOJxޱNJxޱOJxޱNJxޱMJxޱMJxޱOJxޱNJxޱMJxޱMJxޱOJxޱNJxޱOJxޱNJxޱOJxޱNJxޱOJxޱNJxޱOJxޱNJxޱOJxޱNJxޱOJxޱNJxޱOJxޱNJxޱOJxޱNJxޱOJxޱNJxޱOJxޱNJxޱOJxޱNJxޱOJxޱNJxޱOJxޱNJxޱOJxޱNJxޱMJxޱMJxޱOJxޱNJxޱOJxޱNJxޱOJxޱNJxޱOJxޱNJxޱOJxޱNJxޱOJxޱNJxޱOJxޱNJxޱOJxޱNJxޱOJxޱNJxޱOJxޱNJxޱOJxޱNJxޱOJxޱNJxޱMJxޱMJxޱOJxޱNJxޱOJxޱNJxޱOJxޱNJxޱOJxޱNJxޱOJxޱNJxޱOJxޱNJxޱOJxޱNJxޱOJxޱNJxޱOJxޱNJxޱOJxޱNJxޱOJxޱNJxޱOJxޱNJxޱOJxޱNJxޱOJxޱNJxޱOJxޱNJxޱOJxޱNJxޱOJxޱNJxޱOJxޱNJxޱOJxޱNJxޱOJxޱNJxޱOJxޱNJxޱOJxޱNJxޱOJxޱNJxޱOJxޱNJxޱOJxޱNJxޱOJxޱNJxޱOJxޱNJxޱOJxޱNJxޱOJxޱNJxޱOJxޱNJxޱOJxޱNJxޱMJxޱMJxޱMJxޱMJxޱOJxޱNJxޱMJxޱMJxޱMJxޱMJxޱMJxޱMJxޱOJxޱNJxޱOJxޱNJxޱOJxޱNJxޱOJxޱNJxޱOJxޱNJxޱMJxޱMJxޱMJxޱMJxޱOJxޱNJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱOJxޱNJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱOJxޱNJxޱPJxޱPJxޱPJxޱPJxޱOJxޱNJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱOJxޱNJxޱPJxޱPJxޱOJxޱNJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱOJxޱNJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱOJxޱNJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱOJxޱNJxޱOJxޱNJxޱPJxޱPJxޱOJxޱNJxޱOJxޱNJxޱOJxޱNJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱOJxޱNJxޱOJxޱNJxޱPJxޱPJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱPJxޱPJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱPJxޱPJxޱQJxޱQJxޱQJxޱQJxޱPJxޱPJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱPJxޱPJxޱQJxޱQJxޱPJxޱPJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱPJxޱPJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱPJxޱPJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱPJxޱPJxޱPJxޱPJxޱQJxޱQJxޱPJxޱPJxޱPJxޱPJxޱPJxޱPJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱPJxޱPJxޱPJxޱPJxޱQJxޱQJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱQJxޱQJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱQJxޱQJxޱRJxޱRJxޱRJxޱRJxޱQJxޱQJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱQJxޱQJxޱRJxޱRJxޱQJxޱQJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱQJxޱQJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱQJxޱQJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱQJxޱQJxޱQJxޱQJxޱRJxޱRJxޱQJxޱQJxޱQJxޱQJxޱQJxޱQJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱQJxޱQJxޱQJxޱQJxޱRJxޱRJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱRJxޱRJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱRJxޱRJxޱSJxޱSJxޱSJxޱSJxޱRJxޱRJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱRJxޱRJxޱSJxޱSJxޱRJxޱRJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱRJxޱRJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱRJxޱRJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱRJxޱRJxޱRJxޱRJxޱSJxޱSJxޱRJxޱRJxޱRJxޱRJxޱRJxޱRJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱRJxޱRJxޱRJxޱRJxޱSJxޱSJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱSJxޱSJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱSJxޱSJxޱTJxޱTJxޱTJxޱTJxޱSJxޱSJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱSJxޱSJxޱTJxޱTJxޱSJxޱSJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱSJxޱSJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱSJxޱSJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱSJxޱSJxޱSJxޱSJxޱTJxޱTJxޱSJxޱSJxޱSJxޱSJxޱSJxޱSJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱSJxޱSJxޱSJxޱSJxޱTJxޱTJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱTJxޱTJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱTJxޱTJxޱUJxޱUJxޱUJxޱUJxޱTJxޱTJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱTJxޱTJxޱUJxޱUJxޱTJxޱTJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱTJxޱTJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱTJxޱTJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱTJxޱTJxޱTJxޱTJxޱUJxޱUJxޱTJxޱTJxޱTJxޱTJxޱTJxޱTJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱTJxޱTJxޱTJxޱTJxޱUJxޱUJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱUJxޱUJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱUJxޱUJxޱVJxޱVJxޱVJxޱVJxޱUJxޱUJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱUJxޱUJxޱVJxޱVJxޱUJxޱUJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱUJxޱUJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱUJxޱUJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱUJxޱUJxޱUJxޱUJxޱVJxޱVJxޱUJxޱUJxޱUJxޱUJxޱUJxޱUJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱUJxޱUJxޱUJxޱUJxޱVJxޱVJxޱXJxޱWJxޱXJxޱWJxޱXJxޱWJxޱXJxޱWJxޱXJxޱWJxޱXJxޱWJxޱVJxޱVJxޱXJxޱWJxޱXJxޱWJxޱXJxޱWJxޱXJxޱWJxޱXJxޱWJxޱVJxޱVJxޱXJxޱWJxޱXJxޱWJxޱVJxޱVJxޱXJxޱWJxޱXJxޱWJxޱXJxޱWJxޱXJxޱWJxޱXJxޱWJxޱXJxޱWJxޱXJxޱWJxޱVJxޱVJxޱXJxޱWJxޱVJxޱVJxޱXJxޱWJxޱXJxޱWJxޱXJxޱWJxޱXJxޱWJxޱXJxޱWJxޱXJxޱWJxޱXJxޱWJxޱXJxޱWJxޱXJxޱWJxޱXJxޱWJxޱXJxޱWJxޱXJxޱWJxޱXJxޱWJxޱXJxޱWJxޱXJxޱWJxޱVJxޱVJxޱXJxޱWJxޱXJxޱWJxޱXJxޱWJxޱXJxޱWJxޱXJxޱWJxޱXJxޱWJxޱXJxޱWJxޱXJxޱWJxޱXJxޱWJxޱXJxޱWJxޱXJxޱWJxޱXJxޱWJxޱVJxޱVJxޱXJxޱWJxޱXJxޱWJxޱXJxޱWJxޱXJxޱWJxޱXJxޱWJxޱXJxޱWJxޱXJxޱWJxޱXJxޱWJxޱXJxޱWJxޱXJxޱWJxޱXJxޱWJxޱXJxޱWJxޱXJxޱWJxޱXJxޱWJxޱXJxޱWJxޱXJxޱWJxޱXJxޱWJxޱXJxޱWJxXJxޱWJxޱXJxޱWJxޱXJxޱWJxޱXJxޱWJxޱXJxޱWJxޱXJxޱWJxޱXJxޱWJxޱXJxޱWJxޱXJxޱWJxޱXJxޱWJxޱXJxޱWJxޱXJxޱWJxޱXJxޱWJxޱVJxޱVJxޱVJxޱVJxޱXJxޱWJxޱVJxޱVJxޱVJxޱVJxޱVJxޱVJxޱXJxޱWJxޱXJxޱWJxޱXJxޱWJxޱXJxޱWJxޱXJxޱWJxޱVJxޱVJxޱVJxޱVJxޱXJxޱWJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱXJxޱWJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱXJxޱWJxޱYJxޱYJxޱYJxޱYJxޱXJxޱWJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱXJxޱWJxޱYJxޱYJxޱXJxޱWJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱXJxޱWJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱXJxޱWJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱXJxޱWJxޱXJxޱWJxޱYJxޱYJxޱXJxޱWJxޱXJxޱWJxޱXJxޱWJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱXJxޱWJxޱXJxޱWJxޱYJxޱYJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱYJxޱYJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱYJxޱYJxޱZJxޱZJxޱZJxޱZJxޱYJxޱYJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱYJxޱYJxޱZJxޱZJxޱYJxޱYJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱYJxޱYJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱYJxޱYJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱYJxޱYJxޱYJxޱYJxޱZJxޱZJxޱYJxޱYJxޱYJxޱYJxޱYJxޱYJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱYJxޱYJxޱYJxޱYJxޱZJxޱZJxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[JxޱZJxޱZJxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[JxޱZJxޱZJxޱ[Jxޱ[Jxޱ[Jxޱ[JxޱZJxޱZJxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[JxޱZJxޱZJxޱ[Jxޱ[JxޱZJxޱZJxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[JxޱZJxޱZJxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[JxޱZJxޱZJxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[JxޱZJxޱZJxޱZJxޱZJxޱ[Jxޱ[JxޱZJxޱZJxޱZJxޱZJxޱZJxޱZJxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[JxޱZJxޱZJxޱZJxޱZJxޱ[Jxޱ[Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ[Jxޱ[Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ[Jxޱ[Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ[Jxޱ[Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ[Jxޱ[Jxޱ\Jxޱ\Jxޱ[Jxޱ[Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ[Jxޱ[Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ[Jxޱ[Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ\Jxޱ\Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ[Jxޱ[Jxޱ[Jxޱ[Jxޱ\Jxޱ\Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ\Jxޱ\Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ\Jxޱ\Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ\Jxޱ\Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ\Jxޱ\Jxޱ]Jxޱ]Jxޱ\Jxޱ\Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ\Jxޱ\Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ\Jxޱ\Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ]Jxޱ]Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ\Jxޱ\Jxޱ\Jxޱ\Jxޱ]Jxޱ]Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ]Jxޱ]Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ]Jxޱ]Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ]Jxޱ]Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ]Jxޱ]Jxޱ^Jxޱ^Jxޱ]Jxޱ]Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ]Jxޱ]Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ]Jxޱ]Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ^Jxޱ^Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ]Jxޱ]Jxޱ]Jxޱ]Jxޱ^Jxޱ^Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ^Jxޱ^Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ^Jxޱ^Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ^Jxޱ^Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ^Jxޱ^Jxޱ_Jxޱ_Jxޱ^Jxޱ^Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ^Jxޱ^Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ^Jxޱ^Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ_Jxޱ_Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ^Jxޱ^Jxޱ^Jxޱ^Jxޱ_Jxޱ_JxޱaJxޱ`JxޱaJxޱ`JxޱaJxޱ`JxޱaJxޱ`JxޱaJxޱ`JxޱaJxޱ`Jxޱ_Jxޱ_JxޱaJxޱ`JxޱaJxޱ`JxޱaJxޱ`JxޱaJxޱ`JxޱaJxޱ`Jxޱ_Jxޱ_JxޱaJxޱ`JxޱaJxޱ`Jxޱ_Jxޱ_JxޱaJxޱ`JxޱaJxޱ`JxޱaJxޱ`JxޱaJxޱ`JxޱaJxޱ`JxޱaJxޱ`JxޱaJxޱ`Jxޱ_Jxޱ_JxޱaJxޱ`Jxޱ_Jxޱ_JxޱaJxޱ`JxޱaJxޱ`JxޱaJxޱ`JxޱaJxޱ`JxޱaJxޱ`JxޱaJxޱ`JxޱaJxޱ`JxޱaJxޱ`JxޱaJxޱ`JxޱaJxޱ`JxޱaJxޱ`JxޱaJxޱ`JxޱaJxޱ`JxޱaJxޱ`JxޱaJxޱ`Jxޱ_Jxޱ_JxޱaJxޱ`JxޱaJxޱ`JxޱaJxޱ`JxޱaJxޱ`JxޱaJxޱ`JxޱaJxޱ`JxޱaJxޱ`JxޱaJxޱ`JxޱaJxޱ`JxޱaJxޱ`JxޱaJxޱ`JxޱaJxޱ`Jxޱ_Jxޱ_JxޱaJxޱ`JxޱaJxޱ`JxޱaJxޱ`JxޱaJxޱ`JxޱaJxޱ`JxޱaJxޱ`JxޱaJxޱ`JxޱaJxޱ`JxޱaJxޱ`JxޱaJxޱ`JxޱaJxޱ`JxޱaJxޱ`JxޱaJxޱ`JxޱaJxޱ`JxޱaJxޱ`JxޱaJxޱ`JxޱaJxޱ`JxޱaJxޱ`JxޱaJxޱ`JxޱaJxޱ`JxޱaJxޱ`JxޱaJxޱ`JxޱaJxޱ`JxޱaJxޱ`JxޱaJxޱ`JxޱaJxޱ`JxޱaJxޱ`JxޱaJxޱ`JxޱaJxޱ`JxޱaJxޱ`JxޱaJxޱ`Jxޱ_Jxޱ_Jxޱ_Jxޱ_JxޱaJxޱ`Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_Jxޱ_JxޱaJxޱ`JxޱaJxޱ`JxޱaJxޱ`JxޱaJxޱ`JxޱaJxޱ`Jxޱ_Jxޱ_Jxޱ_Jxޱ_JxޱaJxޱ`JxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱaJxޱ`JxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱaJxޱ`JxޱbJxޱbJxޱbJxޱbJxޱaJxޱ`JxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱaJxޱ`JxޱbJxޱbJxޱaJxޱ`JxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱaJxޱ`JxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱaJxޱ`JxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱaJxޱ`JxޱaJxޱ`JxޱbJxޱbJxޱaJxޱ`JxޱaJxޱ`JxޱaJxޱ`JxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱaJxޱ`JxޱaJxޱ`JxޱbJxޱbJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱbJxޱbJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱbJxޱbJxޱcJxޱcJxޱcJxޱcJxޱbJxޱbJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱbJxޱbJxޱcJxޱcJxޱbJxޱbJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱbJxޱbJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱbJxޱbJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱbJxޱbJxޱbJxޱbJxޱcJxޱcJxޱbJxޱbJxޱbJxޱbJxޱbJxޱbJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱbJxޱbJxޱbJxޱbJxޱcJxޱcJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱcJxޱcJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱcJxޱcJxޱdJxޱdJxޱdJxޱdJxޱcJxޱcJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱcJxޱcJxޱdJxޱdJxޱcJxޱcJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱcJxޱcJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱcJxޱcJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱcJxޱcJxޱcJxޱcJxޱdJxޱdJxޱcJxޱcJxޱcJxޱcJxޱcJxޱcJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱcJxޱcJxޱcJxޱcJxޱdJxޱdJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱdJxޱdJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱdJxޱdJxޱeJxޱeJxޱeJxޱeJxޱdJxޱdJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱdJxޱdJxޱeJxޱeJxޱdJxޱdJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱdJxޱdJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱdJxޱdJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱdJxޱdJxޱdJxޱdJxޱeJxޱeJxޱdJxޱdJxޱdJxޱdJxޱdJxޱdJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱdJxޱdJxޱdJxޱdJxޱeJxޱeJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱeJxޱeJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱeJxޱeJxޱfJxޱfJxޱfJxޱfJxޱeJxޱeJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱeJxޱeJxޱfJxޱfJxޱeJxޱeJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱeJxޱeJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱeJxޱeJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱeJxޱeJxޱeJxޱeJxޱfJxޱfJxޱeJxޱeJxޱeJxޱeJxޱeJxޱeJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱeJxޱeJxޱeJxޱeJxޱfJxޱfJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱfJxޱfJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱfJxޱfJxޱgJxޱgJxޱgJxޱgJxޱfJxޱfJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱfJxޱfJxޱgJxޱgJxޱfJxޱfJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱfJxޱfJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱfJxޱfJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱfJxޱfJxޱfJxޱfJxޱgJxޱgJxޱfJxޱfJxޱfJxޱfJxޱfJxޱfJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱfJxޱfJxޱfJxޱfJxޱgJxޱgJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱgJxޱgJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱgJxޱgJxޱhJxޱhJxޱhJxޱhJxޱgJxޱgJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱgJxޱgJxޱhJxޱhJxޱgJxޱgJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱgJxޱgJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱgJxޱgJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱgJxޱgJxޱgJxޱgJxޱhJxޱhJxޱgJxޱgJxޱgJxޱgJxޱgJxޱgJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱgJxޱgJxޱgJxޱgJxޱhJxޱhJxޱjJxޱiJxޱjJxޱiJxޱjJxޱiJxޱjJxޱiJxޱjJxޱiJxޱjJxޱiJxޱhJxޱhJxޱjJxޱiJxޱjJxޱiJxޱjJxޱiJxޱjJxޱiJxޱjJxޱiJxޱhJxޱhJxޱjJxޱiJxޱjJxޱiJxޱhJxޱhJxޱjJxޱiJxޱjJxޱiJxޱjJxޱiJxޱjJxޱiJxޱjJxޱiJxޱjJxޱiJxޱjJxޱiJxޱhJxޱhJxޱjJxޱiJxޱhJxޱhJxޱjJxޱiJxޱjJxޱiJxޱjJxޱiJxޱjJxޱiJxޱjJxޱiJxޱjJxޱiJxޱjJxޱiJxޱjJxޱiJxޱjJxޱiJxޱjJxޱiJxޱjJxޱiJxޱjJxޱiJxޱjJxޱiJxޱjJxޱiJxޱjJxޱiJxޱhJxޱhJxޱjJxޱiJxޱjJxޱiJxޱjJxޱiJxޱjJxޱiJxޱjJxޱiJxޱjJxޱiJxޱjJxޱiJxޱjJxޱiJxޱjJxޱiJxޱjJxޱiJxޱjJxޱiJxޱjJxޱiJxޱhJxޱhJxޱjJxޱiJxޱjJxޱiJxޱjJxޱiJxޱjJxޱiJxޱjJxޱiJxޱjJxޱiJxޱjJxޱiJxޱjJxޱiJxޱjJxޱiJxޱjJxޱiJxޱjJxޱiJxޱjJxޱiJxޱjJxޱiJxޱjJxޱiJxޱjJxޱiJxޱjJxޱiJxޱjJxޱiJxޱjJxޱiJxޱjJxޱiJxޱjJxޱiJxޱjJxޱiJxޱjJxޱiJxޱjJxޱiJxޱjJxޱiJxޱjJxޱiJxޱjJxޱiJxޱjJxޱiJxޱjJxޱiJxޱjJxޱiJxޱjJxޱiJxޱjJxޱiJxޱhJxޱhJxޱhJxޱhJxޱjJxޱiJxޱhJxޱhJxޱhJxޱhJxޱhJxޱhJxޱjJxޱiJxޱjJxޱiJxޱjJxޱiJxޱjJxޱiJxޱjJxޱiJxޱhJxޱhJxޱhJxޱhJxޱjJxޱiJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱjJxޱiJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱjJxޱiJxޱkJxޱkJxޱkJxޱkJxޱjJxޱiJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱjJxޱiJxޱkJxޱkJxޱjJxޱiJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱjJxޱiJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱjJxޱiJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱjJxޱiJxޱjJxޱiJxޱkJxޱkJxޱjJxޱiJxޱjJxޱiJxޱjJxޱiJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱjJxޱiJxޱjJxޱiJxޱkJxޱkJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱkJxޱkJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱkJxޱkJxޱlJxޱlJxޱlJxޱlJxޱkJxޱkJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱkJxޱkJxޱlJxޱlJxޱkJxޱkJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱkJxޱkJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱkJxޱkJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱkJxޱkJxޱkJxޱkJxޱlJxޱlJxޱkJxޱkJxޱkJxޱkJxޱkJxޱkJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱkJxޱkJxޱkJxޱkJxޱlJxޱlJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱlJxޱlJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱlJxޱlJxޱmJxޱmJxޱmJxޱmJxޱlJxޱlJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱlJxޱlJxޱmJxޱmJxޱlJxޱlJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱlJxޱlJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱlJxޱlJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱlJxޱlJxޱlJxޱlJxޱmJxޱmJxޱlJxޱlJxޱlJxޱlJxޱlJxޱlJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱlJxޱlJxޱlJxޱlJxޱmJxޱmJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱmJxޱmJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱmJxޱmJxޱnJxޱnJxޱnJxޱnJxޱmJxޱmJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱmJxޱmJxޱnJxޱnJxޱmJxޱmJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱmJxޱmJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱmJxޱmJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱmJxޱmJxޱmJxޱmJxޱnJxޱnJxޱmJxޱmJxޱmJxޱmJxޱmJxޱmJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱmJxޱmJxޱmJxޱmJxޱnJxޱnJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱnJxޱnJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱnJxޱnJxޱoJxޱoJxޱoJxޱoJxޱnJxޱnJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱnJxޱnJxޱoJxޱoJxޱnJxޱnJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱnJxޱnJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱnJxޱnJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱnJxޱnJxޱnJxޱnJxޱoJxޱoJxޱnJxޱnJxޱnJxޱnJxޱnJxޱnJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱnJxޱnJxޱnJxޱnJxޱoJxޱoJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱoJxޱoJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱoJxޱoJxޱpJxޱpJxޱpJxޱpJxޱoJxޱoJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱoJxޱoJxޱpJxޱpJxޱoJxޱoJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱoJxޱoJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱoJxޱoJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱoJxޱoJxޱoJxޱoJxޱpJxޱpJxޱoJxޱoJxޱoJxޱoJxޱoJxޱoJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱoJxޱoJxޱoJxޱoJxޱpJxޱpJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱpJxޱpJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱpJxޱpJxޱqJxޱqJxޱqJxޱqJxޱpJxޱpJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱpJxޱpJxޱqJxޱqJxޱpJxޱpJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱpJxޱpJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱpJxޱpJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱpJxޱpJxޱpJxޱpJxޱqJxޱqJxޱpJxޱpJxޱpJxޱpJxޱpJxޱpJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱpJxޱpJxޱpJxޱpJxޱqJxޱqJxޱsJxޱrJxޱsJxޱrJxޱsJxޱrJxޱsJxޱrJxޱsJxޱrJxޱsJxޱrJxޱqJxޱqJxޱsJxޱrJxޱsJxޱrJxޱsJxޱrJxޱsJxޱrJxޱsJxޱrJxޱqJxޱqJxޱsJxޱrJxޱsJxޱrJxޱqJxޱqJxޱsJxޱrJxޱsJxޱrJxޱsJxޱrJxޱsJxޱrJxޱsJxޱrJxޱsJxޱrJxޱsJxޱrJxޱqJxޱqJxޱsJxޱrJxޱqJxޱqJxޱsJxޱrJxޱsJxޱrJxޱsJxޱrJxޱsJxޱrJxޱsJxޱrJxޱsJxޱrJxޱsJxޱrJxޱsJxޱrJxޱsJxޱrJxޱsJxޱrJxޱsJxޱrJxޱsJxޱrJxޱsJxޱrJxޱsJxޱrJxޱsJxޱrJxޱqJxޱqJxޱsJxޱrJxޱsJxޱrJxޱsJxޱrJxޱsJxޱrJxޱsJxޱrJxޱsJxޱrJxޱsJxޱrJxޱsJxޱrJxޱsJxޱrJxޱsJxޱrJxޱsJxޱrJxޱsJxޱrJxޱqJxޱqJxޱsJxޱrJxޱsJxޱrJxޱsJxޱrJxޱsJxޱrJxޱsJxޱrJxޱsJxޱrJxޱsJxޱrJxޱsJxޱrJxޱsJxޱrJxޱsJxޱrJxޱsJxޱrJxޱsJxޱrJxޱsJxޱrJxޱsJxޱrJxޱsJxޱrJxޱsJxޱrJxޱsJxޱrJxޱsJxޱrJxޱsJxޱrJxޱsJxޱrJxޱsJxޱrJxޱsJxޱrJxޱsJxޱrJxޱsJxޱrJxޱsJxޱrJxޱsJxޱrJxޱsJxޱrJxޱsJxޱrJxޱsJxޱrJxޱsJxޱrJxޱsJxޱrJxޱqJxޱqJxޱqJxޱqJxޱsJxޱrJxޱqJxޱqJxޱqJxޱqJxޱqJxޱqJxޱsJxޱrJxޱsJxޱrJxޱsJxޱrJxޱsJxޱrJxޱsJxޱrJxޱqJxޱqJxޱqJxޱqJxޱsJxޱrJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱsJxޱrJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱsJxޱrJxޱtJxޱtJxޱtJxޱtJxޱsJxޱrJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱsJxޱrJxޱtJxޱtJxޱsJxޱrJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱsJxޱrJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱsJxޱrJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱsJxޱrJxޱsJxޱrJxޱtJxޱtJxޱsJxޱrJxޱsJxޱrJxޱsJxޱrJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱsJxޱrJxޱsJxޱrJxޱtJxޱtJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱtJxޱtJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱtJxޱtJxޱuJxޱuJxޱuJxޱuJxޱtJxޱtJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱtJxޱtJxޱuJxޱuJxޱtJxޱtJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱtJxޱtJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱtJxޱtJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱtJxޱtJxޱtJxޱtJxޱuJxޱuJxޱtJxޱtJxޱtJxޱtJxޱtJxޱtJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱtJxޱtJxޱtJxޱtJxޱuJxޱuJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱuJxޱuJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱuJxޱuJxޱvJxޱvJxޱvJxޱvJxޱuJxޱuJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱuJxޱuJxޱvJxޱvJxޱuJxޱuJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱuJxޱuJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱuJxޱuJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱuJxޱuJxޱuJxޱuJxޱvJxޱvJxޱuJxޱuJxޱuJxޱuJxޱuJxޱuJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱuJxޱuJxޱuJxޱuJxޱvJxޱvJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱvJxޱvJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱvJxޱvJxޱwJxޱwJxޱwJxޱwJxޱvJxޱvJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱvJxޱvJxޱwJxޱwJxޱvJxޱvJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱvJxޱvJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱvJxޱvJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱvJxޱvJxޱvJxޱvJxޱwJxޱwJxޱvJxޱvJxޱvJxޱvJxޱvJxޱvJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱvJxޱvJxޱvJxޱvJxޱwJxޱwJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱwJxޱwJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱwJxޱwJxޱxJxޱxJxޱxJxޱxJxޱwJxޱwJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱwJxޱwJxޱxJxޱxJxޱwJxޱwJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱwJxޱwJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱwJxޱwJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱwJxޱwJxޱwJxޱwJxޱxJxޱxJxޱwJxޱwJxޱwJxޱwJxޱwJxޱwJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱwJxޱwJxޱwJxޱwJxޱxJxޱxJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱxJxޱxJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱxJxޱxJxޱyJxޱyJxޱyJxޱyJxޱxJxޱxJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱxJxޱxJxޱyJxޱyJxޱxJxޱxJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱxJxޱxJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱxJxޱxJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱxJxޱxJxޱxJxޱxJxޱyJxޱyJxޱxJxޱxJxޱxJxޱxJxޱxJxޱxJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱxJxޱxJxޱxJxޱxJxޱyJxޱyJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱyJxޱyJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱyJxޱyJxޱzJxޱzJxޱzJxޱzJxޱyJxޱyJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱyJxޱyJxޱzJxޱzJxޱyJxޱyJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱyJxޱyJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱyJxޱyJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱyJxޱyJxޱyJxޱyJxޱzJxޱzJxޱyJxޱyJxޱyJxޱyJxޱyJxޱyJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱyJxޱyJxޱyJxޱyJxޱzJxޱzJxޱ|Jxޱ{Jxޱ|Jxޱ{Jxޱ|Jxޱ{Jxޱ|Jxޱ{Jxޱ|Jxޱ{Jxޱ|Jxޱ{JxޱzJxޱzJxޱ|Jxޱ{Jxޱ|Jxޱ{Jxޱ|Jxޱ{Jxޱ|Jxޱ{Jxޱ|Jxޱ{JxޱzJxޱzJxޱ|Jxޱ{Jxޱ|Jxޱ{JxޱzJxޱzJxޱ|Jxޱ{Jxޱ|Jxޱ{Jxޱ|Jxޱ{Jxޱ|Jxޱ{Jxޱ|Jxޱ{Jxޱ|Jxޱ{Jxޱ|Jxޱ{JxޱzJxޱzJxޱ|Jxޱ{JxޱzJxޱzJxޱ|Jxޱ{Jxޱ|Jxޱ{Jxޱ|Jxޱ{Jxޱ|Jxޱ{Jxޱ|Jxޱ{Jxޱ|Jxޱ{Jxޱ|Jxޱ{Jxޱ|Jxޱ{Jxޱ|Jxޱ{Jxޱ|Jxޱ{Jxޱ|Jxޱ{Jxޱ|Jxޱ{Jxޱ|Jxޱ{Jxޱ|Jxޱ{Jxޱ|Jxޱ{JxޱzJxޱzJxޱ|Jxޱ{Jxޱ|Jxޱ{Jxޱ|Jxޱ{Jxޱ|Jxޱ{Jxޱ|Jxޱ{Jxޱ|Jxޱ{Jxޱ|Jxޱ{Jxޱ|Jxޱ{Jxޱ|Jxޱ{Jxޱ|Jxޱ{Jxޱ|Jxޱ{Jxޱ|Jxޱ{JxޱzJxޱzJxޱ|Jxޱ{Jxޱ|Jxޱ{Jxޱ|Jxޱ{Jxޱ|Jxޱ{Jxޱ|Jxޱ{Jxޱ|Jxޱ{Jxޱ|Jxޱ{Jxޱ|Jxޱ{Jxޱ|Jxޱ{Jxޱ|Jxޱ{Jxޱ|Jxޱ{Jxޱ|Jxޱ{Jxޱ|Jxޱ{Jxޱ|Jxޱ{Jxޱ|Jxޱ{Jxޱ|Jxޱ{Jxޱ|Jxޱ{Jxޱ|Jxޱ{Jxޱ|Jxޱ{Jxޱ|Jxޱ{Jxޱ|Jxޱ{Jxޱ|Jxޱ{Jxޱ|Jxޱ{Jxޱ|Jxޱ{Jxޱ|Jxޱ{Jxޱ|Jxޱ{Jxޱ|Jxޱ{Jxޱ|Jxޱ{Jxޱ|Jxޱ{Jxޱ|Jxޱ{Jxޱ|Jxޱ{JxޱzJxޱzJxޱzJxޱzJxޱ|Jxޱ{JxޱzJxޱzJxޱzJxޱzJxޱzJxޱzJxޱ|Jxޱ{Jxޱ|Jxޱ{Jxޱ|Jxޱ{Jxޱ|Jxޱ{Jxޱ|Jxޱ{JxޱzJxޱzJxޱzJxޱzJxޱ|Jxޱ{Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ|Jxޱ{Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ|Jxޱ{Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ|Jxޱ{Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ|Jxޱ{Jxޱ}Jxޱ}Jxޱ|Jxޱ{Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ|Jxޱ{Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ|Jxޱ{Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ|Jxޱ{Jxޱ|Jxޱ{Jxޱ}Jxޱ}Jxޱ|Jxޱ{Jxޱ|Jxޱ{Jxޱ|Jxޱ{Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ|Jxޱ{Jxޱ|Jxޱ{Jxޱ}Jxޱ}Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ}Jxޱ}Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ}Jxޱ}Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ}Jxޱ}Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ}Jxޱ}Jxޱ~Jxޱ~Jxޱ}Jxޱ}Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ}Jxޱ}Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ}Jxޱ}Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ~Jxޱ~Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ}Jxޱ}Jxޱ}Jxޱ}Jxޱ~Jxޱ~JxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱ~Jxޱ~JxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱ~Jxޱ~JxޱJxޱJxޱJxޱJxޱ~Jxޱ~JxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱ~Jxޱ~JxޱJxޱJxޱ~Jxޱ~JxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱ7JȵJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱ~Jxޱ~JxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱ~Jxޱ~JxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱ~Jxޱ~Jxޱ~Jxޱ~JxޱJxޱJxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~Jxޱ~JxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱ~Jxޱ~Jxޱ~Jxޱ~JxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱJxޱooooPKآK#7J#PK"nX modelinfo.xml? PK%D?PK"nX fileids.xml PK I2PK"nXclusterignore.xmlM PKPRMPK"nX guimodel.xml MAINWINDOW geom1 pgeom_gop DRAW DRAW PK*PK?"nXҠ fileversionPK?"nXFQSusedlicenses.txtPK?"nX]jTeTsavepoint1/model.zipPK?"nXq}Enn SUdmodel.xmlPK?"nX{ bmodel.xmlPK?"nXJIImsavepoint1/savepoint.xmlPK?"nXkHG mesh1.mphbinPK?"nXR W geometry7.mphbinPK?"nX;Ha geometry8.mphbinPK?"nXg }9j geometry2.mphbinPK?"nX03fe j xmesh1.mphbinPK?"nX ggeommanager1.mphbinPK?"nXG: solution1.mphbinPK?"nXWsolutionstatic1.mphbinPK?"nXآK#7J#solutionblock1.mphbinPK?"nX%D? jEAmodelinfo.xmlPK?"nX I2 HAfileids.xmlPK?"nXPRM)LAclusterignore.xmlPK?"nX* LAguimodel.xmlPKOA