AbstractWe describe a locally one-dimensional (LOD) time integration scheme for the diffusion equation in two space dimensions: ut = ν(uxx + uyy), based on the extended trapezoidal formula (ETF). The resulting LOD-ETF scheme is third order in time and is unconditionally stable. We describe the scheme for both Dirichlet and Neumann boundary conditions. We then extend the LOD-ETF scheme for nonlinear reaction-diffusion equations and for the convection-diffusion equation in two space dimensions. Numerical experiments are given to illustrate the obtained scheme and to compare its performance with the better-known LOD Crank-Nicolson scheme. While the LOD Crank-Nicolson scheme can give unwanted oscillations in the computed solution, our present L...
The purpose of this work is to introduce a new kind of finite difference formulation inspired from F...
Finite-difference techniques based on Explicit method and 9-point forward time centered space (FTCS)...
Reaction diffusion equations are widely used to model biological phenomena and in some situation, th...
AbstractWe describe a locally one-dimensional (LOD) time integration scheme for the diffusion equati...
AbstractA finite-difference scheme for the diffusion equation that has enjoyed great popularity is t...
AbstractWe first describe a one-parameter family of unconditionally stable third-order time-integrat...
In this paper we focus our attention on rotationally symmetric problems, where cylinder coordinates ...
We consider the class of nonlinear diffusion-convection equations which contain arbitrary functions ...
We examine the one-dimensional transient diffusion equation with a space-dependent diffusion coeffic...
This paper introduces a set of new fully explicit numerical algorithms to solve the spatially discre...
The purpose of this work is to introduce a new kind of finite difference formulation inspired from F...
In this paper we review the existing and develop new continuous Galerkin methods for solving time de...
This paper presents the combined application of differential quadrature method (DQM) and finite-diff...
An efficient computational method to approximate the solution of a general class of nonlinear reacti...
The construction of finite difference schemes in two dimensions is more ambiguous than in one dimens...
The purpose of this work is to introduce a new kind of finite difference formulation inspired from F...
Finite-difference techniques based on Explicit method and 9-point forward time centered space (FTCS)...
Reaction diffusion equations are widely used to model biological phenomena and in some situation, th...
AbstractWe describe a locally one-dimensional (LOD) time integration scheme for the diffusion equati...
AbstractA finite-difference scheme for the diffusion equation that has enjoyed great popularity is t...
AbstractWe first describe a one-parameter family of unconditionally stable third-order time-integrat...
In this paper we focus our attention on rotationally symmetric problems, where cylinder coordinates ...
We consider the class of nonlinear diffusion-convection equations which contain arbitrary functions ...
We examine the one-dimensional transient diffusion equation with a space-dependent diffusion coeffic...
This paper introduces a set of new fully explicit numerical algorithms to solve the spatially discre...
The purpose of this work is to introduce a new kind of finite difference formulation inspired from F...
In this paper we review the existing and develop new continuous Galerkin methods for solving time de...
This paper presents the combined application of differential quadrature method (DQM) and finite-diff...
An efficient computational method to approximate the solution of a general class of nonlinear reacti...
The construction of finite difference schemes in two dimensions is more ambiguous than in one dimens...
The purpose of this work is to introduce a new kind of finite difference formulation inspired from F...
Finite-difference techniques based on Explicit method and 9-point forward time centered space (FTCS)...
Reaction diffusion equations are widely used to model biological phenomena and in some situation, th...