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Domain decomposition algorithms for time-harmonic Maxwell equations with damping

Ana Alonso RodriguezAlberto Valli — 2001

ESAIM: Mathematical Modelling and Numerical Analysis - Modélisation Mathématique et Analyse Numérique

Three non-overlapping domain decomposition methods are proposed for the numerical approximation of time-harmonic Maxwell equations with damping (i.e., in a conductor). For each method convergence is proved and, for the discrete problem, the rate of convergence of the iterative algorithm is shown to be independent of the number of degrees of freedom.

Domain Decomposition Algorithms for Time-Harmonic Maxwell Equations with Damping

Ana Alonso RodriguezAlberto Valli — 2010

ESAIM: Mathematical Modelling and Numerical Analysis

Three non-overlapping domain decomposition methods are proposed for the numerical approximation of time-harmonic Maxwell equations with damping (, in a conductor). For each method convergence is proved and, for the discrete problem, the rate of convergence of the iterative algorithm is shown to be independent of the number of degrees of freedom.

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