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An Adaptive High-Order Transient Algorithm to Solve Large-Scale Anisotropic Maxwell’s Equations

Qiwei Zhan, Yiyao Wang, Yuan Fang, Qiang Ren, Shiyou Yang, Wen‐Yan Yin, Qing Liu

2021IEEE Transactions on Antennas and Propagation50 citationsDOI

Abstract

This article presents a stabilized nodal discontinuous Galerkin pseudospectral time-domain (DG-PSTD) algorithm for fully anisotropic electromagnetic waves. This solver permits arbitrary high-order basis functions and adaptive hexahedral elements, thus very efficient for large-scale wave propagation in complex media. Maxwell’s equations are reformulated in a unified hyperbolic form, where a localized anisotropic Riemann solver is derived to serve as a numerical flux to exchange information across adjacent elements in the DG-PSTD scheme. This local analysis method also helps impose the time-domain anisotropic plane wave incidence in the total/scattering field framework. Numerical validations and applications demonstrate the efficiency, accuracy, and capability of this new high-order solver for 3-D large-scale generally anisotropic electromagnetic media.

Topics & Concepts

Electromagnetic field solverDiscontinuous Galerkin methodSolverMaxwell's equationsRiemann solverHexahedronBasis functionElectromagnetic fieldPhysicsComputer scienceMathematical analysisMathematicsMathematical optimizationInhomogeneous electromagnetic wave equationFinite volume methodFinite element methodOptical fieldMechanicsThermodynamicsQuantum mechanicsElectromagnetic Simulation and Numerical MethodsElectromagnetic Scattering and AnalysisAdvanced Numerical Methods in Computational Mathematics