In this work, incomplete factorization techniques are used as smoothers within a geometric multigrid algorithm on triangular grids. A local Fourier analysis is proposed to study the smoothing properties of these methods, as well as the asymptotic convergence of the whole multigrid procedure. With this purpose, two-and three-grid local Fourier analysis are performed. Several two-dimensional diffusion problems, including different kinds of anisotropy are considered to demonstrate the robustness of this type of methods
Multigrid efficiency often suffers from inadequate coarse grid correction in different prototypic si...
Agglomerated multigrid techniques used in unstructured-grid methods are studied critically for a mod...
The main topic of this report is a detailed discussion of the discrete Fourier multilevel analysis o...
An efficient multigrid finite element method for vector problems on triangular anisotropic semi‐stru...
In this paper a local Fourier analysis for multigrid methods on tetrahedral grids is presented. Diff...
Multigrid methods are fast iterative solvers for partial di erential equations. Especially for ellip...
We consider a two-grid method based on approximation of the Schur complement. We study the dependenc...
This paper proposes an efficient and robust algorithm for solving a physical orthotropy problem. The...
Abstract. We focus on the study of multigrid methods with aggressive coarsening and polynomial smoot...
Multigrid methods are known to be efficient preconditioners and solvers for linear systems obtained ...
We consider a two-grid method for solving 2D convection-diffusion problems. The coarse grid correcti...
In this paper, we present three-grid Fourier analysis for multigrid methods. Due to the recursive st...
AbstractIn this work, it is provided a comparison for the algebraic multigrid (AMG) and the geometri...
Over the years, multigrid has been demonstrated as an efficient technique for solving inviscid flow ...
Over the years, multigrid has been demonstrated as an efficient technique for solving inviscid flow ...
Multigrid efficiency often suffers from inadequate coarse grid correction in different prototypic si...
Agglomerated multigrid techniques used in unstructured-grid methods are studied critically for a mod...
The main topic of this report is a detailed discussion of the discrete Fourier multilevel analysis o...
An efficient multigrid finite element method for vector problems on triangular anisotropic semi‐stru...
In this paper a local Fourier analysis for multigrid methods on tetrahedral grids is presented. Diff...
Multigrid methods are fast iterative solvers for partial di erential equations. Especially for ellip...
We consider a two-grid method based on approximation of the Schur complement. We study the dependenc...
This paper proposes an efficient and robust algorithm for solving a physical orthotropy problem. The...
Abstract. We focus on the study of multigrid methods with aggressive coarsening and polynomial smoot...
Multigrid methods are known to be efficient preconditioners and solvers for linear systems obtained ...
We consider a two-grid method for solving 2D convection-diffusion problems. The coarse grid correcti...
In this paper, we present three-grid Fourier analysis for multigrid methods. Due to the recursive st...
AbstractIn this work, it is provided a comparison for the algebraic multigrid (AMG) and the geometri...
Over the years, multigrid has been demonstrated as an efficient technique for solving inviscid flow ...
Over the years, multigrid has been demonstrated as an efficient technique for solving inviscid flow ...
Multigrid efficiency often suffers from inadequate coarse grid correction in different prototypic si...
Agglomerated multigrid techniques used in unstructured-grid methods are studied critically for a mod...
The main topic of this report is a detailed discussion of the discrete Fourier multilevel analysis o...