On Nitsche approach for a finite element scheme for Maxwell equations
Mohammad Asadzadeh (Chalmers & University of Gothenburg)
Abstract: We show improved convergence for a $h-p$, streamline diffusion (SD), Nitsche's scheme for the Vlasov-Maxwell (VM) system. The standard Galerkin for VM equations, as 1st order hyperbolic, suffers from the draw-back of poor convergence. We have improved this convergence rate using:
(i) The SD method that adds artificial diffusion to the system.
(ii) The $h-p$ approach to gain adaptivity feature.
(iii) Combined, differentiated, Maxwell equations to render the first order hyperbolic system to a second order hyperbolic equation (not applicable to Vlasov part).
(iv) Add of {\sl symmetry} and {\sl penalty} terms to reach final step of Nitsche's scheme.
Numerical examples are justifying the theory.
numerical analysisoptimization and control
Audience: researchers in the topic
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| Organizers: | David Cohen*, Annika Lang* |
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