In this paper, we will introduce composite finite elements for solving elliptic boundary value problems with discontinuous coefficients. The focus is on problems where the geometry of the interfaces between the smooth regions of the coefficients is very complicated. On the other hand, efficient numerical methods such as, e.g., multigrid methods, wavelets, extrapolation, are based on a multi-scale discretization of the problem. In standard finite element methods, the grids have to resolve the structure of the discontinuous coefficients. Thus, straightforward coarse scale discretizations of problems with complicated coefficient jumps are not obvious. In this paper, we define composite finite elements for problems with discontinuous coefficien...
In this article, we develop the a posteriori error estimation of hp–version discontinuous Galerkin c...
The numerical approximation of partial differential equations (PDEs) posed on complicated geometries...
The numerical approximation of partial differential equations (PDEs) posed on complicated geometries...
In this paper, we will introduce composite finite elements for solving elliptic boundary value probl...
In this paper we introduce the hp-version discontinuous Galerkin composite finite element method for...
In this paper we introduce the hp-version discontinuous Galerkin composite finite element method fo...
For scalar and vector-valued elliptic boundary value problems with discontinuous coefficients across...
In this article, we develop the a posteriori error estimation of hp–version discontinuous Galerkin c...
In this paper we develop the a posteriori error estimation of hp-version discontinuous Galerkin comp...
In this paper, we introduce the multi-region discontinuous Galerkin composite finite element method ...
In this paper, we define a new class of finite elements for the discretization of problems with Diri...
The Composite Finite Element Mesh method is useful for the estimation of the discretization error an...
The multigrid method is applied to the numerical solution of elliptic equations on general composite...
In this article we consider the application of Schwarz-type domain decomposition preconditioners for...
In this paper we discusss a simple finite difference method for the discretization of elliptic bound...
In this article, we develop the a posteriori error estimation of hp–version discontinuous Galerkin c...
The numerical approximation of partial differential equations (PDEs) posed on complicated geometries...
The numerical approximation of partial differential equations (PDEs) posed on complicated geometries...
In this paper, we will introduce composite finite elements for solving elliptic boundary value probl...
In this paper we introduce the hp-version discontinuous Galerkin composite finite element method for...
In this paper we introduce the hp-version discontinuous Galerkin composite finite element method fo...
For scalar and vector-valued elliptic boundary value problems with discontinuous coefficients across...
In this article, we develop the a posteriori error estimation of hp–version discontinuous Galerkin c...
In this paper we develop the a posteriori error estimation of hp-version discontinuous Galerkin comp...
In this paper, we introduce the multi-region discontinuous Galerkin composite finite element method ...
In this paper, we define a new class of finite elements for the discretization of problems with Diri...
The Composite Finite Element Mesh method is useful for the estimation of the discretization error an...
The multigrid method is applied to the numerical solution of elliptic equations on general composite...
In this article we consider the application of Schwarz-type domain decomposition preconditioners for...
In this paper we discusss a simple finite difference method for the discretization of elliptic bound...
In this article, we develop the a posteriori error estimation of hp–version discontinuous Galerkin c...
The numerical approximation of partial differential equations (PDEs) posed on complicated geometries...
The numerical approximation of partial differential equations (PDEs) posed on complicated geometries...