Abstract. This paper is concerned with the convergence analysis of robust multigrid methods for convection-diffusion problems. We consider a finite difference discretization of a 2D model convection-diffusion problem with constant coefficients and Dirichlet boundary conditions. For the approximate solution of this discrete problem a multigrid method based on semicoarsening, matrix-dependent prolongation and restriction and line smoothers is applied. For a multigrid W-cycle we prove an upper bound for the contraction number in the euclidean norm which is smaller than one and independent of the mesh size and the diffusion/convection ratio. For the contraction number of a multigrid V-cycle a bound is proved which is uniform for a class of conv...
We consider a two-grid method based on approximation of the Schur complement. We study the dependenc...
The theory of Generally Locally Toeplitz (or GLT for short) sequences of matrices is proposed in the...
AbstractWe conduct convergence analysis on some classical stationary iterative methods for solving t...
This paper is concerned with the covergence analysis of robust multigrid methods for convection-diff...
In this note we consider discrete linear reaction-diffusion problems. For the discretization a stand...
We consider a two-grid method for solving 2D convection-diffusion problems. The coarse grid correcti...
Keywords continuous Galerkin method ? multigrid iteration ? two-level Fourier analysis ? point-wise ...
Abstract. We prove two theorems on the residual damping in multigrid methods when solving convection...
AbstractWe study the convergence behavior of the FAC (fast adaptive composite) multigrid method as a...
We present a new strategy to accelerate the convergence rate of a high accuracy multigrid method fo...
: We introduce a high-order compact difference scheme with multigrid algorithm to solve the convecti...
Multigrid methods applied to standard linear finite element discretizations of linear elliptic bound...
*Abstract. * For the solution of convection-diffusion problems we present a multilevel self-adaptive...
In the paper, we present multigrid methods for solving scalar conservation laws and convection diffu...
Multigrid methods applied to standard linear finite element discretizations of linear elliptic two-p...
We consider a two-grid method based on approximation of the Schur complement. We study the dependenc...
The theory of Generally Locally Toeplitz (or GLT for short) sequences of matrices is proposed in the...
AbstractWe conduct convergence analysis on some classical stationary iterative methods for solving t...
This paper is concerned with the covergence analysis of robust multigrid methods for convection-diff...
In this note we consider discrete linear reaction-diffusion problems. For the discretization a stand...
We consider a two-grid method for solving 2D convection-diffusion problems. The coarse grid correcti...
Keywords continuous Galerkin method ? multigrid iteration ? two-level Fourier analysis ? point-wise ...
Abstract. We prove two theorems on the residual damping in multigrid methods when solving convection...
AbstractWe study the convergence behavior of the FAC (fast adaptive composite) multigrid method as a...
We present a new strategy to accelerate the convergence rate of a high accuracy multigrid method fo...
: We introduce a high-order compact difference scheme with multigrid algorithm to solve the convecti...
Multigrid methods applied to standard linear finite element discretizations of linear elliptic bound...
*Abstract. * For the solution of convection-diffusion problems we present a multilevel self-adaptive...
In the paper, we present multigrid methods for solving scalar conservation laws and convection diffu...
Multigrid methods applied to standard linear finite element discretizations of linear elliptic two-p...
We consider a two-grid method based on approximation of the Schur complement. We study the dependenc...
The theory of Generally Locally Toeplitz (or GLT for short) sequences of matrices is proposed in the...
AbstractWe conduct convergence analysis on some classical stationary iterative methods for solving t...