Finite element methods for Maxwell’s equations

Monk, Peter; Zhang, Yangwen

doi:10.1090/conm/754/15143

otherContemporary mathematics - American Mathematical SocietyJan 1, 2020Closed access

Finite element methods for Maxwell’s equations

PMPeter Monk YZYangwen Zhang

University of Delaware

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Abstract

We survey finite element methods for approximating the time harmonic Maxwell equations. We concentrate on comparing error estimates for problems with spatially varying coefficients. For the conforming edge finite element methods, such estimates allow, at least, piecewise smooth coefficients. But for Discontinuous Galerkin (DG) methods, the state of the art of error analysis is less advanced (we consider three DG families of methods: Interior Penalty type, Hybridizable DG, and Trefftz type methods). Nevertheless, DG methods offer significant potential advantages compared to conforming methods.

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Keywords

Finite element method
Discontinuous Galerkin method
Maxwell's equations
Piecewise
Mathematics
Applied mathematics
Mixed finite element method
Penalty method

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