In this work, we suggest different Finite Volume methods (namely cell-center, conforming Finite Volume-Element non-conforming Finite Volume-Element methods) for problems where singularities arise. First of all, we are interested in two dimensional corner singularities that occur for some elliptic problems (Laplace problem, Stokes and Navier-Stokes systems). In fact, when we consider an elliptic problem on a non-convex domain of R², singularities can corrupt initial order of convergence of numerical methods (like Finite Difference, Finite Element or Finite Volume methods). So we show for the different methods studied therein how a scattered mesh refinement can restore optimal order of convergence. Then we deal with boundary layers that come ...
. This paper is concerned with the effective numerical treatment of elliptic boundary value problems...
Finite element methods are conventionally used for solving linear elasticity equations. These method...
AbstractThe convergence of the classical finite element method (FEM) and boundary element method (BE...
In this work, we suggest different Finite Volume methods (namely cell-center, conforming Finite Volu...
International audienceIt is well known that the solution of the Laplace equation in a non convexpoly...
AbstractThe accuracy of a finite element numerical approximation of the solution of a partial differ...
In this paper, the behaviour of non-conforming methods is studied in the case of the approximation o...
We consider a new formulation for finite volume element methods, which is satisfied by known finite...
We present a new scheme for the discretization of heterogeneous anisotropic diffusion problems on ge...
This paper is concerned with a specific finite element strategy for solving elliptic boundary value ...
We aim to develop a finite volume method which applies to a greater class of meshes than other finit...
AbstractWe consider the numerical approximation of a singularly perturbed reaction-diffusion problem...
International audienceWe focus on the Discrete Duality Finite Volume (DDFV) method whose particulari...
Abstract. We study spatially semidiscrete and fully discrete finite volume el-ement approximations o...
Abstract. We consider a new formulation for finite volume element methods, which is satisfied by kno...
. This paper is concerned with the effective numerical treatment of elliptic boundary value problems...
Finite element methods are conventionally used for solving linear elasticity equations. These method...
AbstractThe convergence of the classical finite element method (FEM) and boundary element method (BE...
In this work, we suggest different Finite Volume methods (namely cell-center, conforming Finite Volu...
International audienceIt is well known that the solution of the Laplace equation in a non convexpoly...
AbstractThe accuracy of a finite element numerical approximation of the solution of a partial differ...
In this paper, the behaviour of non-conforming methods is studied in the case of the approximation o...
We consider a new formulation for finite volume element methods, which is satisfied by known finite...
We present a new scheme for the discretization of heterogeneous anisotropic diffusion problems on ge...
This paper is concerned with a specific finite element strategy for solving elliptic boundary value ...
We aim to develop a finite volume method which applies to a greater class of meshes than other finit...
AbstractWe consider the numerical approximation of a singularly perturbed reaction-diffusion problem...
International audienceWe focus on the Discrete Duality Finite Volume (DDFV) method whose particulari...
Abstract. We study spatially semidiscrete and fully discrete finite volume el-ement approximations o...
Abstract. We consider a new formulation for finite volume element methods, which is satisfied by kno...
. This paper is concerned with the effective numerical treatment of elliptic boundary value problems...
Finite element methods are conventionally used for solving linear elasticity equations. These method...
AbstractThe convergence of the classical finite element method (FEM) and boundary element method (BE...