2008
Unconditionally stable integration of Maxwell's equations
Publication
Publication
Numerical integration of Maxwell''s equations is often based on explicit methods accepting a stability step size restriction. In literature evidence is given that there is also a need for unconditionally stable methods, as exemplified by the successful alternating direction implicit-finite difference time domain scheme. In this paper we discuss unconditionally stable integration for a general semi-discrete Maxwell system allowing non-Cartesian space grids as encountered in finite element discretizations. Such grids exclude the alternating direction implicit approach. Particular attention is given to the second-order trapezoidal rule implemented with preconditioned conjugate gradient iteration and to second-order exponential integration using Krylov subspace iteration for evaluating the arising phi-functions. A three-space dimensional test problem is used for numerical assessment and comparison with an economical second-order implicit-explicit integrator. We further pay attention to the Chebyshev series expansion for computing the exponential operator for skew-symmetric matrices
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CWI | |
Modelling, Analysis and Simulation [MAS] | |
Organisation | Computational Dynamics |
Verwer, J., & Botchev, M. A. (2008). Unconditionally stable integration of Maxwell's equations. Modelling, Analysis and Simulation [MAS]. CWI. |