Multigrid convergence rates degenerate on problems with stretched grids or anisotropic operators, unless one uses line or plane relaxation. For 3-D problems, only plane relaxation suffices, in general. While line and plane relaxation algorithms are efficient on sequential machines, they are quite awkward and inefficient on parallel machines. A new multigrid algorithm is presented based on the use of multiple coarse grids, that eliminates the need for line or plane relaxation in anisotropic problems. This algorithm was developed and the standard multigrid theory was extended to establish rapid convergence for this class of algorithms. The new algorithm uses only point relaxation, allowing easy and efficient parallel implementation, yet achie...
AbstractWe survey the literature on robust multigrid methods which have been developed in recent yea...
International audienceThis paper studies the combination of the Full-Multi-Grid (FMG) algorithm with...
This work presents techniques, theory and numbers for multigrid in a general d-dimensional setting. ...
The convergence rate of standard multigrid algorithms degenerates on problems with stretched grids o...
We discuss the behavior of several plane relaxation methods as multigrid smoothers for the solution ...
Standard multigrid methods are not well suited for problems with anisotropic discrete operators, whi...
This paper discusses multigrid for high dimensional partial differential equations (PDEs). We presen...
The parallel multigrid algorithm of Frederickson and McBryan (1987) is considered. This algorithm us...
Multigrid efficiency often suffers from inadequate coarse grid correction in different prototypic si...
Abstract. This paper discusses multigrid for high dimensional partial differential equa-tions (PDEs)...
Quasi-elliptic schemes arise from central differencing or finite element discretization of elliptic ...
For special model problems, Fourier analysis gives exact convergence rates for the two-grid multigri...
Departing from Mulder's semi-coarsening technique for first order PDEs, the notion of a grid of grid...
A semicoarsening multigrid algorithm suitable for use on single instruction multiple data (SIMD) arc...
Discrete systems arising from elliptic PDEs can be solved efficiently using multigrid methods. In ma...
AbstractWe survey the literature on robust multigrid methods which have been developed in recent yea...
International audienceThis paper studies the combination of the Full-Multi-Grid (FMG) algorithm with...
This work presents techniques, theory and numbers for multigrid in a general d-dimensional setting. ...
The convergence rate of standard multigrid algorithms degenerates on problems with stretched grids o...
We discuss the behavior of several plane relaxation methods as multigrid smoothers for the solution ...
Standard multigrid methods are not well suited for problems with anisotropic discrete operators, whi...
This paper discusses multigrid for high dimensional partial differential equations (PDEs). We presen...
The parallel multigrid algorithm of Frederickson and McBryan (1987) is considered. This algorithm us...
Multigrid efficiency often suffers from inadequate coarse grid correction in different prototypic si...
Abstract. This paper discusses multigrid for high dimensional partial differential equa-tions (PDEs)...
Quasi-elliptic schemes arise from central differencing or finite element discretization of elliptic ...
For special model problems, Fourier analysis gives exact convergence rates for the two-grid multigri...
Departing from Mulder's semi-coarsening technique for first order PDEs, the notion of a grid of grid...
A semicoarsening multigrid algorithm suitable for use on single instruction multiple data (SIMD) arc...
Discrete systems arising from elliptic PDEs can be solved efficiently using multigrid methods. In ma...
AbstractWe survey the literature on robust multigrid methods which have been developed in recent yea...
International audienceThis paper studies the combination of the Full-Multi-Grid (FMG) algorithm with...
This work presents techniques, theory and numbers for multigrid in a general d-dimensional setting. ...