An efficient multigrid finite element method for vector problems on triangular anisotropic semi‐structured grids is proposed. This algorithm is based on zebra line‐type smoothers to overcome the difficulties arising when multigrid is applied on stretched meshes. In order to choose the type of multigrid cycle and the number of pre‐ and post‐smoothing steps, a three‐grid Fourier analysis is done. To this end, local Fourier analysis (LFA) on triangular grids for scalar problems is extended to the vector case. To illustrate the good performance of the method, a system of reaction‐diffusion is considered as model problem. A very satisfactory global convergence factor is obtained by using a V(0,2)‐cycle for domains triangulated with highly anisot...
Abstract—This paper discusses robustness of the multigrid (MG) method against distortion of finite e...
In this paper the investigation of the efficiency of the multigrid method as a solution method for l...
In this paper, motivated by applications to multigrid, we present families of anisotropic, bivariate...
An efficient multigrid finite element method for vector problems on triangular anisotropic semi‐stru...
In this work, incomplete factorization techniques are used as smoothers within a geometric multigrid...
Abstract. A nite element method with optimal convergence on non-smooth three dimensional domains req...
In this paper a local Fourier analysis for multigrid methods on tetrahedral grids is presented. Diff...
AbstractThis paper deals with a stencil-based implementation of a geometric multigrid method on semi...
Over the years, multigrid has been demonstrated as an efficient technique for solving inviscid flow ...
Multigrid methods are fast iterative solvers for partial di erential equations. Especially for ellip...
Abstract. We focus on the study of multigrid methods with aggressive coarsening and polynomial smoot...
Over the years, multigrid has been demonstrated as an efficient technique for solving inviscid flow ...
This work presents techniques, theory and numbers for multigrid in a general d-dimensional setting. ...
Abstract: Parallel multigrid method for elliptic difference equations. Anisotropic diffusi...
We investigate multigrid algorithms on locally refined quadrilateral meshes. In contrast to a standa...
Abstract—This paper discusses robustness of the multigrid (MG) method against distortion of finite e...
In this paper the investigation of the efficiency of the multigrid method as a solution method for l...
In this paper, motivated by applications to multigrid, we present families of anisotropic, bivariate...
An efficient multigrid finite element method for vector problems on triangular anisotropic semi‐stru...
In this work, incomplete factorization techniques are used as smoothers within a geometric multigrid...
Abstract. A nite element method with optimal convergence on non-smooth three dimensional domains req...
In this paper a local Fourier analysis for multigrid methods on tetrahedral grids is presented. Diff...
AbstractThis paper deals with a stencil-based implementation of a geometric multigrid method on semi...
Over the years, multigrid has been demonstrated as an efficient technique for solving inviscid flow ...
Multigrid methods are fast iterative solvers for partial di erential equations. Especially for ellip...
Abstract. We focus on the study of multigrid methods with aggressive coarsening and polynomial smoot...
Over the years, multigrid has been demonstrated as an efficient technique for solving inviscid flow ...
This work presents techniques, theory and numbers for multigrid in a general d-dimensional setting. ...
Abstract: Parallel multigrid method for elliptic difference equations. Anisotropic diffusi...
We investigate multigrid algorithms on locally refined quadrilateral meshes. In contrast to a standa...
Abstract—This paper discusses robustness of the multigrid (MG) method against distortion of finite e...
In this paper the investigation of the efficiency of the multigrid method as a solution method for l...
In this paper, motivated by applications to multigrid, we present families of anisotropic, bivariate...