Quasi-elliptic schemes arise from central differencing or finite element discretization of elliptic systems with odd order derivatives on non-staggered grids. They are somewhat unstable and less accurate then corresponding staggered-grid schemes. When usual multigrid solvers are applied to them, the asymptotic algebraic convergence is necessarily slow. Nevertheless, it is shown by mode analyses and numerical experiments that the usual FMG algorithm is very efficient in solving quasi-elliptic equations to the level of truncation errors. Also, a new type of multigrid algorithm is presented, mode analyzed and tested, for which even the asymptotic algebraic convergence is fast. The essence of that algorithm is applicable to other kinds of probl...
We derive fast solvers for discrete elliptic variational inequalities of the first kind (obstacle pr...
Multigrid methods are good candidates for the resolution of the system arising in numerical fluid dy...
A multigrid solver is defined as having textbook multigrid efficiency (TME) if the solutions to the ...
Multigrid convergence rates degenerate on problems with stretched grids or anisotropic operators, un...
For special model problems, Fourier analysis gives exact convergence rates for the two-grid multigri...
AbstractWe survey the literature on robust multigrid methods which have been developed in recent yea...
A robust solver for the elliptic grid generation equations is sought via a numerical study. The syst...
Traditional iterative methods are stalling numerical processes, in which the error has relatively sm...
Adaptive refinement and the complicated data structures required to support it are discussed. These ...
This paper discusses multigrid for high dimensional partial differential equations (PDEs). We presen...
We consider the convergence theory of adaptive multigrid methods for second-order elliptic problems ...
Abstract — We introduce and analyze a multigrid algorithm for higher order finite difference schemes...
The solution of the singular perturbation problem by a multigrid algorithm is considered. Theoretica...
Abstract: "Standard multigrid methods are not so effective for equations with highly oscillatory coe...
Approximate solutions of elliptic boundary value problems can be obtained by using finite elements. ...
We derive fast solvers for discrete elliptic variational inequalities of the first kind (obstacle pr...
Multigrid methods are good candidates for the resolution of the system arising in numerical fluid dy...
A multigrid solver is defined as having textbook multigrid efficiency (TME) if the solutions to the ...
Multigrid convergence rates degenerate on problems with stretched grids or anisotropic operators, un...
For special model problems, Fourier analysis gives exact convergence rates for the two-grid multigri...
AbstractWe survey the literature on robust multigrid methods which have been developed in recent yea...
A robust solver for the elliptic grid generation equations is sought via a numerical study. The syst...
Traditional iterative methods are stalling numerical processes, in which the error has relatively sm...
Adaptive refinement and the complicated data structures required to support it are discussed. These ...
This paper discusses multigrid for high dimensional partial differential equations (PDEs). We presen...
We consider the convergence theory of adaptive multigrid methods for second-order elliptic problems ...
Abstract — We introduce and analyze a multigrid algorithm for higher order finite difference schemes...
The solution of the singular perturbation problem by a multigrid algorithm is considered. Theoretica...
Abstract: "Standard multigrid methods are not so effective for equations with highly oscillatory coe...
Approximate solutions of elliptic boundary value problems can be obtained by using finite elements. ...
We derive fast solvers for discrete elliptic variational inequalities of the first kind (obstacle pr...
Multigrid methods are good candidates for the resolution of the system arising in numerical fluid dy...
A multigrid solver is defined as having textbook multigrid efficiency (TME) if the solutions to the ...