The application of some recently proposed algebraic multilevel methods for the solution of two-dimensional finite element problems on nonuniform meshes is studied. The locally refined meshes are created by the newest vertex mesh refinement method. After the introduction of this refinement technique it is shown that, by combining levels of refinement, a preconditioner of optimal order can be constructed for the case of local refinement along a line. Its relative condition number is accurately estimated. Numerical tests demonstrating the performance of the proposed preconditioners will be reported in a forthcoming paper
We study a multilevel preconditioner for the Galerkin boundary element matrix arising from a symmetr...
International audienceThe aim of this paper is to describe some numerical aspects linked to incompre...
International audienceThis paper introduces a local multilevel mesh refinement strategy that automat...
The application of some recently proposed algebraic multilevel methods for the solution of two-dimen...
Abstract. In this paper, we examine a number of additive and multiplicative multilevel iter-ative me...
ABSTRACT. In this paper, we examine a number of additive and multiplicative multi-level iterative me...
ABSTRACT. The goal of this paper is to design optimal multilevel solvers for the finite element appr...
AbstractPreconditioners based on various multilevel extensions of two-level finite element methods (...
Abstract. In this article, we establish optimality of the Bramble-Pasciak-Xu (BPX) norm equiv-alence...
A local multilevel product algorithm and its additive version are analyzed for linear systems arisin...
We investigate multigrid algorithms on locally refined quadrilateral meshes. In contrast to a standa...
Systems of grid equations that approximate elliptic boundary value problems on locally modified grid...
Generalizing the approach of a previous work [15] the authors present multilevel preconditioners for...
In this paper a multiplicative two-level preconditioning algorithm for second order elliptic bounda...
We consider local multigrid methods for adaptive finite element and adaptive edge element discretize...
We study a multilevel preconditioner for the Galerkin boundary element matrix arising from a symmetr...
International audienceThe aim of this paper is to describe some numerical aspects linked to incompre...
International audienceThis paper introduces a local multilevel mesh refinement strategy that automat...
The application of some recently proposed algebraic multilevel methods for the solution of two-dimen...
Abstract. In this paper, we examine a number of additive and multiplicative multilevel iter-ative me...
ABSTRACT. In this paper, we examine a number of additive and multiplicative multi-level iterative me...
ABSTRACT. The goal of this paper is to design optimal multilevel solvers for the finite element appr...
AbstractPreconditioners based on various multilevel extensions of two-level finite element methods (...
Abstract. In this article, we establish optimality of the Bramble-Pasciak-Xu (BPX) norm equiv-alence...
A local multilevel product algorithm and its additive version are analyzed for linear systems arisin...
We investigate multigrid algorithms on locally refined quadrilateral meshes. In contrast to a standa...
Systems of grid equations that approximate elliptic boundary value problems on locally modified grid...
Generalizing the approach of a previous work [15] the authors present multilevel preconditioners for...
In this paper a multiplicative two-level preconditioning algorithm for second order elliptic bounda...
We consider local multigrid methods for adaptive finite element and adaptive edge element discretize...
We study a multilevel preconditioner for the Galerkin boundary element matrix arising from a symmetr...
International audienceThe aim of this paper is to describe some numerical aspects linked to incompre...
International audienceThis paper introduces a local multilevel mesh refinement strategy that automat...