AbstractTwo-grid methods are studied for solving a two dimensional nonlinear parabolic equation using finite volume element method. The methods are based on one coarse-grid space and one fine-grid space. The nonsymmetric and nonlinear iterations are only executed on the coarse grid and the fine-grid solution can be obtained in a single symmetric and linear step. It is proved that the coarse grid can be much coarser than the fine grid. The two-grid methods achieve asymptotically optimal approximation as long as the mesh sizes satisfy h=O(H3|lnH|). As a result, solving such a large class of nonlinear parabolic equations will not be much more difficult than solving one single linearized equation
In this paper, we study a postprocessing procedure for improving accuracy of the finite volume eleme...
This paper deals with a fully discrete scheme to approximate multidimensional singular parabolic pro...
In this paper, we first present a combined finite element-upwind finite volume method for a fully no...
AbstractTwo-grid methods are studied for solving a two dimensional nonlinear parabolic equation usin...
A two-grid method is presented and discussed for a finite element approximation to a nonlinear parab...
AbstractThe two-grid method is studied for solving a two-dimensional second-order nonlinear hyperbol...
Mixed finite element approximation of nonlinear parabolic equations is discussed. The equation consi...
. We present a two level finite difference scheme for the approximation of nonlinear parabolic equat...
. A new nonlinear Galerkin method based on finite element discretization is presented in this paper ...
Abateact-Galerkin-type method is considered for approximating solutions of the nonlinear parabolic p...
Abstract: The different computational methods for 2D parabolic boundary problems have been...
International audienceWe propose and analyze a numerical scheme for nonlinear degenerate parabolic c...
AbstractIn this paper, we propose some least-squares finite element procedures for linear and nonlin...
An efficient implementation of finite element methods for free boundary parabolic problems in genera...
We analyze the spatially semidiscrete piecewise linear finite volume element method for parabolic eq...
In this paper, we study a postprocessing procedure for improving accuracy of the finite volume eleme...
This paper deals with a fully discrete scheme to approximate multidimensional singular parabolic pro...
In this paper, we first present a combined finite element-upwind finite volume method for a fully no...
AbstractTwo-grid methods are studied for solving a two dimensional nonlinear parabolic equation usin...
A two-grid method is presented and discussed for a finite element approximation to a nonlinear parab...
AbstractThe two-grid method is studied for solving a two-dimensional second-order nonlinear hyperbol...
Mixed finite element approximation of nonlinear parabolic equations is discussed. The equation consi...
. We present a two level finite difference scheme for the approximation of nonlinear parabolic equat...
. A new nonlinear Galerkin method based on finite element discretization is presented in this paper ...
Abateact-Galerkin-type method is considered for approximating solutions of the nonlinear parabolic p...
Abstract: The different computational methods for 2D parabolic boundary problems have been...
International audienceWe propose and analyze a numerical scheme for nonlinear degenerate parabolic c...
AbstractIn this paper, we propose some least-squares finite element procedures for linear and nonlin...
An efficient implementation of finite element methods for free boundary parabolic problems in genera...
We analyze the spatially semidiscrete piecewise linear finite volume element method for parabolic eq...
In this paper, we study a postprocessing procedure for improving accuracy of the finite volume eleme...
This paper deals with a fully discrete scheme to approximate multidimensional singular parabolic pro...
In this paper, we first present a combined finite element-upwind finite volume method for a fully no...