In this paper, we present three-grid Fourier analysis for multigrid methods. Due to the recursive structure of a multigrid iteration, this analysis can be deduced from the well-known two-grid Fourier analysis. The coarse grid correction part of multigrid algorithms can be more accurately evaluated with the three-grid analysis. We apply the analysis to several scalar equations and discretizations with an emphasis on problems with a multigrid coarse grid correction difficulty like upwind discretizations of the convection diffusion equation. The main focus lies on possible improvements by carefully chosen Galerkin operators and/or by an additional acceleration with restarted GMRES, GMRES(m). Numerical test calculations validate the theoretical...
We present an application of multigrid algorithms to a Discontinuous Galerkin discretization of the ...
In this paper, Fourier analysis is used for finding efficient multigrid components. The individual m...
Abstract. Solving discrete boundary value problems with the help of an appro-priate multigrid method...
Multigrid methods are fast iterative solvers for partial di erential equations. Especially for ellip...
The main topic of this report is a detailed discussion of the discrete Fourier multilevel analysis o...
Before applying multigrid methods to a project, mathematicians, scientists, and engineers need to an...
Keywords continuous Galerkin method ? multigrid iteration ? two-level Fourier analysis ? point-wise ...
We consider a two-grid method for solving 2D convection-diffusion problems. The coarse grid correcti...
We consider a two-grid method based on approximation of the Schur complement. We study the dependenc...
In the paper, we present multigrid methods for solving scalar conservation laws and convection diffu...
The goal of this research is to optimize multigrid methods for higher order accurate space-time disc...
The multigrid algorithm is an extremely efficient method of approximating the solution to a given pr...
Multigrid methods are known to be efficient preconditioners and solvers for linear systems obtained ...
In the present paper we introduce and investigate a robust smooting strategy for convection-diffusio...
Multigrid methods are studied for solving elliptic partial differential equations. Focus is on paral...
We present an application of multigrid algorithms to a Discontinuous Galerkin discretization of the ...
In this paper, Fourier analysis is used for finding efficient multigrid components. The individual m...
Abstract. Solving discrete boundary value problems with the help of an appro-priate multigrid method...
Multigrid methods are fast iterative solvers for partial di erential equations. Especially for ellip...
The main topic of this report is a detailed discussion of the discrete Fourier multilevel analysis o...
Before applying multigrid methods to a project, mathematicians, scientists, and engineers need to an...
Keywords continuous Galerkin method ? multigrid iteration ? two-level Fourier analysis ? point-wise ...
We consider a two-grid method for solving 2D convection-diffusion problems. The coarse grid correcti...
We consider a two-grid method based on approximation of the Schur complement. We study the dependenc...
In the paper, we present multigrid methods for solving scalar conservation laws and convection diffu...
The goal of this research is to optimize multigrid methods for higher order accurate space-time disc...
The multigrid algorithm is an extremely efficient method of approximating the solution to a given pr...
Multigrid methods are known to be efficient preconditioners and solvers for linear systems obtained ...
In the present paper we introduce and investigate a robust smooting strategy for convection-diffusio...
Multigrid methods are studied for solving elliptic partial differential equations. Focus is on paral...
We present an application of multigrid algorithms to a Discontinuous Galerkin discretization of the ...
In this paper, Fourier analysis is used for finding efficient multigrid components. The individual m...
Abstract. Solving discrete boundary value problems with the help of an appro-priate multigrid method...