Add to ORKGThis work is primarily concerned with solving the large sparse linear systems which arise in connection with finite-element or finite-difference procedures for solving self-adjoint elliptic boundary-value problems. These problems can be expressed in terms of abstract variational problems on Hilbert spaces. Our (multi-grid) schemes involve a sequence of auxiliary finite-dimensional spaces which do not have to be nested. We approximate the solution using the largest (finite-dimensional) space. These schemes are recursive in nature: they combine smoothing iterations in a space with solving one or more correction problems using smaller spaces. Under certain circumstances, the solution to a problem can be approximated well using smaller spaces. ...
We solve nonlinear elliptic PDEs by stable finite difference schemes of high order on a uniform mesh...
We consider the fast solution of large piecewise smooth minimization problems as resulting from the ...
summary:Second order elliptic systems with boundary conditions of Dirichlet, Neumann's or Newton's t...
this paper are explained only for the regular sparse grids D n . However, it is possible to generali...
We apply iterative subspace correction methods to elliptic PDE problems discretized by generalized s...
This thesis is concerned with the solution of large systems of linear algebraic equations in which t...
Departing from Mulder's semi-coarsening technique for first-order PDEs, the notion of a grid of grid...
We consider a method for solving elliptic boundary-value problems. The method arises from a finite-d...
We investigate the use of algebraic multigrid (AMG) methods for the solution of large sparse linear ...
AbstractSecond degree normalized implicit conjugate gradient methods for the numerical solution of s...
Abstract — In this paper we describe methods to approximate functions and dif-ferential operators on...
This paper discusses multigrid for high dimensional partial differential equations (PDEs). We presen...
Abstract. In this paper, we provide a maximum norm analysis of a finite difference scheme defined on...
textabstractIn this paper, we propose some algorithms to solve the system of linear equations arisin...
We consider the fast solution of large piecewise smooth minimization problems as resulting from the ...
We solve nonlinear elliptic PDEs by stable finite difference schemes of high order on a uniform mesh...
We consider the fast solution of large piecewise smooth minimization problems as resulting from the ...
summary:Second order elliptic systems with boundary conditions of Dirichlet, Neumann's or Newton's t...
this paper are explained only for the regular sparse grids D n . However, it is possible to generali...
We apply iterative subspace correction methods to elliptic PDE problems discretized by generalized s...
This thesis is concerned with the solution of large systems of linear algebraic equations in which t...
Departing from Mulder's semi-coarsening technique for first-order PDEs, the notion of a grid of grid...
We consider a method for solving elliptic boundary-value problems. The method arises from a finite-d...
We investigate the use of algebraic multigrid (AMG) methods for the solution of large sparse linear ...
AbstractSecond degree normalized implicit conjugate gradient methods for the numerical solution of s...
Abstract — In this paper we describe methods to approximate functions and dif-ferential operators on...
This paper discusses multigrid for high dimensional partial differential equations (PDEs). We presen...
Abstract. In this paper, we provide a maximum norm analysis of a finite difference scheme defined on...
textabstractIn this paper, we propose some algorithms to solve the system of linear equations arisin...
We consider the fast solution of large piecewise smooth minimization problems as resulting from the ...
We solve nonlinear elliptic PDEs by stable finite difference schemes of high order on a uniform mesh...
We consider the fast solution of large piecewise smooth minimization problems as resulting from the ...
summary:Second order elliptic systems with boundary conditions of Dirichlet, Neumann's or Newton's t...