We study stability and convergence of hp-streamline diffusion (SD) finite element, and Nitsche's schemes for the three dimensional, relativistic (3 spatial dimension and 3 velocities), time dependent Vlasov-Maxwell system and Maxwell's equations, respectively. For the hp scheme for the Vlasov-Maxwell system, assuming that the exact solution is in the Sobolev space of order s, we derive global {\sl a priori} error bound of order s+1/2 in h/p, where h is the mesh parameter and p is the spectral order. This estimate is based on the local version with hK= diam K being the diameter of the {\sl phase-space-time} element K and pK is the spectral order (the degree of approximating finite element polynomial) for K. As for the Nitsche's scheme, by a ...
We study the new streamline diffusion finite element method for treating the three dimensional coupl...
International audienceIn this article we introduce numerical schemes for the Vlasov-Maxwell equation...
This article is the first of a series where we develop and analyze finite element space discretizati...
We study stability and convergence of hp-streamline diffusion (SD) finite element, and Nitsche\u27s ...
We study stability and convergence of hp-streamline diffusion (SD) finite element, and Nitsche\u27s ...
We study stability and convergence of hp-streamline diffusion (SD) finite element method for therela...
This thesis treats finite element schemes for two kind of problems, the Valsov-Maxwellsystem and the...
This work is a swift introduction to the nature of governing laws involved in the Maxwell equations....
We study streamline diffusion schemes applied for numerical solution of the one and one-half dimensi...
In this paper we investigate the basic ingredients for global superconvergence strategy of stream...
This paper concerns a posteriori error analysis for the streamline diffusion(SD) finite element meth...
Abstract. Discontinuous Galerkin methods are developed for solving the Vlasov-Maxwell system, method...
We discuss the development, analysis, implementation, and numerical assessment of a spectral method ...
Cette thèse propose l’étude d’une méthode numérique permettant de simuler un plasma. On considère un...
We derive error estimates in the L-2 norms, for the streamline diffusion (SD) and discontinuous Gale...
We study the new streamline diffusion finite element method for treating the three dimensional coupl...
International audienceIn this article we introduce numerical schemes for the Vlasov-Maxwell equation...
This article is the first of a series where we develop and analyze finite element space discretizati...
We study stability and convergence of hp-streamline diffusion (SD) finite element, and Nitsche\u27s ...
We study stability and convergence of hp-streamline diffusion (SD) finite element, and Nitsche\u27s ...
We study stability and convergence of hp-streamline diffusion (SD) finite element method for therela...
This thesis treats finite element schemes for two kind of problems, the Valsov-Maxwellsystem and the...
This work is a swift introduction to the nature of governing laws involved in the Maxwell equations....
We study streamline diffusion schemes applied for numerical solution of the one and one-half dimensi...
In this paper we investigate the basic ingredients for global superconvergence strategy of stream...
This paper concerns a posteriori error analysis for the streamline diffusion(SD) finite element meth...
Abstract. Discontinuous Galerkin methods are developed for solving the Vlasov-Maxwell system, method...
We discuss the development, analysis, implementation, and numerical assessment of a spectral method ...
Cette thèse propose l’étude d’une méthode numérique permettant de simuler un plasma. On considère un...
We derive error estimates in the L-2 norms, for the streamline diffusion (SD) and discontinuous Gale...
We study the new streamline diffusion finite element method for treating the three dimensional coupl...
International audienceIn this article we introduce numerical schemes for the Vlasov-Maxwell equation...
This article is the first of a series where we develop and analyze finite element space discretizati...