We introduce a finite volume scheme for multi-dimensional drift-diffusion equations. Such equations arise from the theory of semiconductors and are composed of two continuity equations coupled with a Poisson equation. In the case that the continuity equations are non degenerate, we prove the convergence of the scheme and then the existence of solutions to the problem. The key point of the proof relies on the construction of an approximate gradient of the electric potential which allows us to deal with coupled terms in the continuity equations. Finally, a numerical example is given to show the efficiency of the scheme
AbstractWe study nonlinear finite element discretizations for the density gradient equation in the q...
We study nonlinear finite element discretizations for the density gradient equation in the quantum d...
ABSTRACT. We point out a simple 2D formula to reconstruct the discrete gradient on a polygon from th...
We introduce a finite volume scheme for multi-dimensional drift-diffusion equations. Such equations ...
Abstract. We introduce a finite volume scheme for multi-dimensional drift-diffusion equations. Such ...
International audienceThis paper is devoted to a finite volume discretization for multidimensional n...
International audienceIn this paper, we propose a finite volume discretization for multidimensional ...
In this paper, we propose a finite volume discretization for multidimensional nonlinear drift-diffus...
This paper focusses on finite volume schemes for solving multilayer diffusion problems. We develop a...
In this paper, we consider a drift-diffusion system with cross-coupling through the chemical potenti...
We regard drift-diffusion equations for semiconductor devices in Lebesgue spaces. To that end we ref...
International audienceA nonlinear discrete duality finite volume scheme is proposed for time-depende...
International audienceWe propose a finite volume scheme for convection-diffusion equations with nonl...
This paper contains an overview on numerical schemes for some of the most widely used fluid models ...
We present a finite volume scheme for the anisotropic diffusion equation. The scheme is based on a r...
AbstractWe study nonlinear finite element discretizations for the density gradient equation in the q...
We study nonlinear finite element discretizations for the density gradient equation in the quantum d...
ABSTRACT. We point out a simple 2D formula to reconstruct the discrete gradient on a polygon from th...
We introduce a finite volume scheme for multi-dimensional drift-diffusion equations. Such equations ...
Abstract. We introduce a finite volume scheme for multi-dimensional drift-diffusion equations. Such ...
International audienceThis paper is devoted to a finite volume discretization for multidimensional n...
International audienceIn this paper, we propose a finite volume discretization for multidimensional ...
In this paper, we propose a finite volume discretization for multidimensional nonlinear drift-diffus...
This paper focusses on finite volume schemes for solving multilayer diffusion problems. We develop a...
In this paper, we consider a drift-diffusion system with cross-coupling through the chemical potenti...
We regard drift-diffusion equations for semiconductor devices in Lebesgue spaces. To that end we ref...
International audienceA nonlinear discrete duality finite volume scheme is proposed for time-depende...
International audienceWe propose a finite volume scheme for convection-diffusion equations with nonl...
This paper contains an overview on numerical schemes for some of the most widely used fluid models ...
We present a finite volume scheme for the anisotropic diffusion equation. The scheme is based on a r...
AbstractWe study nonlinear finite element discretizations for the density gradient equation in the q...
We study nonlinear finite element discretizations for the density gradient equation in the quantum d...
ABSTRACT. We point out a simple 2D formula to reconstruct the discrete gradient on a polygon from th...