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Stabilized DG-PSTD Method With Nonconformal Meshes for Electromagnetic Waves

Qiwei Zhan, Yuan Fang, Mingwei Zhuang, Mengqing Yuan, Qing Liu

2020IEEE Transactions on Antennas and Propagation50 citationsDOI

Abstract

We present a node-based discontinuous Galerkin (DG) pseudospectral time domain (PSTD) algorithm, with adaptive nonconformal unstructured meshes, for 3-D large-scale Maxwell's equations. This algorithm is a combination of a new DG algorithm and a PSTD method, where spectral accuracy is achieved via the PSTD algorithm, while the DG serves as a stable coupling for multiple domains with unstructured hexahedra. Time marching is efficient because the mass matrix in the DG-PSTD algorithm is exactly diagonal. The scheme is low-storage and scalable because the stiffness matrix is localized into a small shared matrix. Furthermore, arbitrary nonconformal meshes can be adaptively realized, increasing the flexibility of complex media modeling. Our numerical results corroborate the long-time stability, high efficiency, and high-order accuracy of the proposed solver. Finally, an adaptive application of 5G electromagnetic signal propagation demonstrates the efficiency and capability of the proposed high-order solver.

Topics & Concepts

Discontinuous Galerkin methodSolverPolygon meshComputer scienceAlgorithmMatrix (chemical analysis)Stiffness matrixCoupling (piping)HexahedronComputational scienceFinite element methodPhysicsComputer graphics (images)Composite materialEngineeringMechanical engineeringThermodynamicsProgramming languageMaterials scienceElectromagnetic Simulation and Numerical MethodsElectromagnetic Scattering and AnalysisAdvanced Numerical Methods in Computational Mathematics