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Modeling Capacitive Discharge


Here, we address how to model the discharging of a capacitor that is connected to a set of electrical components, which can be modeled either with full geometric fidelity or in combination with a set of lumped components.

Background

It is possible to model the discharge of the electric energy stored within a capacitor using theElectromagnetic Waves, Transientinterface. The initial stored electric energy can either be computed using theElectrostaticsinterface, which solves for the electric fields within the structure of the capacitor, or alternatively, the capacitor can be modeled using theElectrical Circuitsinterface, where a lumped capacitor with an initial charge defines the initial stored electric energy. The objective of these models is to compute the electromagnetic fields and the losses. The electric and magnetic energy are computed, as well as the conversion into thermal energy and the radiated energy.

A capacitor model connected to electrical components surrounded by free space.

The structure being modeled. An explicitly modeled capacitor is connected to a transformer, which is then connected to aLumped Elementmodel of a capacitor equivalent. Supporting structures are omitted under the assumption that they are not electromagnetically relevant. The surrounding region of free space and a ground plane are modeled.

Modeling Approach

Discharge modeling involves two steps: first, setting up an electrostatics model that computes the electric fields around a charged capacitor and then using those fields as initial conditions in a transient electromagnetic model. You can follow along using the MPH-file attached to this article.

The Electrostatics Model

To model the initial charge, the modeling domain is partitioned to consider only the dielectric and a small volume of space around the capacitor where there will be significant electric fields. Within this domain, the boundary conditions are set toGroundon one of the capacitor plates, and a fixedElectric Potentialon the other plate. The interior of the connecting wires is not modeled. All other boundaries are set toZero Charge. The solution from this electrostatic model is used as the initial state for the transient electromagnetic problem, where the wires will be explicitly modeled.

A close-up view of the Model Builder with the Stationary node highlighted and the corresponding Settings window. A close-up view of the Model Builder with the Stationary node highlighted and the corresponding Settings window.

A separateStationarystudy is used to solve for the electrostatic fields in the dielectrics around the capacitor plates. Within this study, only theElectrostaticsinterface is solved for.

The Transient Electromagnetic Model

To model the transient behavior, theElectromagnetic Waves, Transientinterface is solved on all domains with the exception of a domain representing the lumpedElectrical Circuitelements. This cylindrical domain bridges a gap in the conductive wires. TheElectrical Circuitadds additional impedance to the system across this gap and is connected via theLumped Portfeature, of typeVia. TheLumped Portfeature is valid to use under the assumption that the electric field is uniform andparallel to the wirearound its perimeter. The cross-sectional boundaries of the wire on either end of theViaarePerfect Electric Conductor, implying an equipotential condition across these surfaces.

ThePerfect Electric Conductorboundary condition is applied on the bottom boundary of the model, representing a lossless ground plane. The remaining outside boundaries of the domain areScattering Boundary Conditions, which approximate an open boundary to free space. Electromagnetic waves will pass through these boundaries with minimal reflections.

TheInitial Valuesfeature defines the computed electrostatic fields as the initial value for the first time derivative of theMagnetic vector potentialfield.

A close-up view of the Model Builder with the Time Dependent node highlighted and the corresponding Settings window. A close-up view of the Model Builder with the Time Dependent node highlighted and the corresponding Settings window.

The study is set up to first solve for the initial electrostatic fields, then compute the electromagnetic fields, the lumped circuit, and a set of global equations for the power and energy. The initial values used to compute the electromagnetic fields are taken from the electrostatic initialization. It is also possible to save results only on some selections to reduce the amount of data stored.


A close-up view of the Model Builder with the Time-Dependent Solver node highlighted and the corresponding Settings window. A close-up view of the Model Builder with the Time-Dependent Solver node highlighted and the corresponding Settings window.

The Time-Dependent Solver settings are adjusted based on the maximum frequency of interest and the element size.Consistent initializationis on.

ATime Dependentstudy is used to solve for the electromagnetic fields over time. Based on the maximum frequency of interest, it is possible tomanually specify the time step, which reduces the computational cost. Since the global equations are used to store all integrated quantities, it is possible to reduce the amount of data that is stored in the model by only saving resultson a few selected domains, or none at all.

Results and Discussion

It is useful to examine the plot of energy as well as the relative losses. Note that:

  • The total energy of the system is nearly constant over time. In the limit of mesh and time-step refinement, this can be improved further.
  • The frequency content is initially high but reduces over time.
  • The fraction of total thermal losses in the conductors is relatively small. It is possible to ignore losses in the conductors altogether by omitting these domains from the analysis and modeling the boundaries of the conductors asPerfect Electric Conductorboundary conditions.
  • The model can instead be run with the lumped capacitor having an initial potential, and discharging into the modeled domains.
A 1D plot showing the magnetic, electric, dissipated, radiated, and total energy over time. A 1D plot showing the magnetic, electric, dissipated, radiated, and total energy over time.

Plot of the electric, magnetic, thermal, and radiated energy over time. The sum stays nearly constant.


A 1D plot showing the total thermal losses over time. A 1D plot showing the total thermal losses over time.

The thermal losses as a fraction of total losses.

Further Learning

To learn more about the techniques introduced here and explore new ones, check out the following resources:


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