In this thesis we are interested in proving that the approximate solution, obtained by the finite volume method, converges to the unique renormalized solution of elliptic and parabolic equations with L1 data. In the first part we study an elliptic convection-diffusion equation with L1 data. Mixing the strategy developed for renormalized solution and the finite volume method,we prove that the approximate solution converges to the unique renormalized solution. In the second part we investigate a nonlinear parabolic equation with L1 data. Using a discrete version of classical compactness results, we show that the results obtaines previously in the elliptic case hold true in the parabolic case. In the third part we prove similar results for a d...
In this paper, we are interested in the numerical simulation of the mathematical model of Keller-Se...
We prove the convergence of a finite volume method for a noncoercive linear elliptic problem, with r...
International audienceThe modelling of the heat diffusion coupled with electrical diffusion yields a...
On s’intéresse dans cette thèse à montrer que la solution approchée, par la méthode des volumes fini...
In the present paper by using the tools developed for finite volume schemes, we adapt the strategy u...
In this paper we study the convergence of a finite volume approximation of a convective diffusive el...
The first part of this work concerns non-coercive elliptic equations. We first prove existence and u...
International audienceIn this paper, we prove the convergence of a finite-volume scheme for the time...
In this paper we study the convergence of a finite volume approximation of a convective diffusive el...
We show here the convergence of the finite volume approximate solutions of a convection-diffusion eq...
Abstract. We study the approximation by finite volume methods of the model parabolic-elliptic proble...
Abstract. On one hand, the existence of a solution to degenerate parabolic equa-tions, without a non...
Thèse effectuée de Septembre 2004 à Décembre 2007The thesis is divided in two independent parts.In t...
Abstract. We prove the convergence of a nite volume method for a noncoercive linear elliptic problem...
We show here the convergence of the finite volume approximate solutions of a convection-diffusion eq...
In this paper, we are interested in the numerical simulation of the mathematical model of Keller-Se...
We prove the convergence of a finite volume method for a noncoercive linear elliptic problem, with r...
International audienceThe modelling of the heat diffusion coupled with electrical diffusion yields a...
On s’intéresse dans cette thèse à montrer que la solution approchée, par la méthode des volumes fini...
In the present paper by using the tools developed for finite volume schemes, we adapt the strategy u...
In this paper we study the convergence of a finite volume approximation of a convective diffusive el...
The first part of this work concerns non-coercive elliptic equations. We first prove existence and u...
International audienceIn this paper, we prove the convergence of a finite-volume scheme for the time...
In this paper we study the convergence of a finite volume approximation of a convective diffusive el...
We show here the convergence of the finite volume approximate solutions of a convection-diffusion eq...
Abstract. We study the approximation by finite volume methods of the model parabolic-elliptic proble...
Abstract. On one hand, the existence of a solution to degenerate parabolic equa-tions, without a non...
Thèse effectuée de Septembre 2004 à Décembre 2007The thesis is divided in two independent parts.In t...
Abstract. We prove the convergence of a nite volume method for a noncoercive linear elliptic problem...
We show here the convergence of the finite volume approximate solutions of a convection-diffusion eq...
In this paper, we are interested in the numerical simulation of the mathematical model of Keller-Se...
We prove the convergence of a finite volume method for a noncoercive linear elliptic problem, with r...
International audienceThe modelling of the heat diffusion coupled with electrical diffusion yields a...