Add to ORKGIn this article we first provide a priori estimates of the solution for the nonstationary two-dimensional viscoelastic fluid motion equations with periodic boundary condition. We then present an modified nonlinear Galerkin method for solving such equations. By comparing the convergence rates of the proposed method with the standard Galerkin method, we conclude that the modified nonlinear Galerkin method is better than the standard Galerkin method because the former can save a large amount of computational work and maintain the convergence rate of the latter. (C) 1999 Elsevier Science Ltd. All rights reserved
An optimal {\em a priori} error estimate ${\cal O}\left(h^{k}+\Delta t\right)$, result is presented ...
Abstract. We study a new approximation scheme of transient viscoelas-tic fluid flow obeying an Oldro...
In this paper, a semidiscrete finite element Galerkin method for the equations of motion arising in ...
In this article we first provide a priori estimates of the solution for the nonstationary two-dimens...
In this article we first provide a priori estimates of the solution for the nonstationary two-dimens...
In this article we first provide a priori estimates of the solution for the nonstationary two-dimens...
In this article we rst provide a priori estimates of the solution for the nonsta tionary twodimensio...
Finite element Galerkin method is applied to equations of motion arising in the KelvinVoigt model of...
In this paper, a semidiscrete finite element Galerkin method for the equations of motion arising in ...
In this paper, a semidiscrete finite element Galerkin method for the equations of motion arising in ...
In this paper, a semidiscrete finite element Galerkin method for the equations of motion arising in ...
Abstract. We consider discrete schemes for a nonlinear model of non-Fickian diffusion in viscoelasti...
In this paper, a finite element Galerkin method is applied to equations of motion arising in the Kel...
An optimal {\em a priori} error estimate ${\cal O}\left(h^{k}+\Delta t\right)$, result is presented ...
In this paper, a semidiscrete finite element Galerkin method for the equations of motion arising in ...
An optimal {\em a priori} error estimate ${\cal O}\left(h^{k}+\Delta t\right)$, result is presented ...
Abstract. We study a new approximation scheme of transient viscoelas-tic fluid flow obeying an Oldro...
In this paper, a semidiscrete finite element Galerkin method for the equations of motion arising in ...
In this article we first provide a priori estimates of the solution for the nonstationary two-dimens...
In this article we first provide a priori estimates of the solution for the nonstationary two-dimens...
In this article we first provide a priori estimates of the solution for the nonstationary two-dimens...
In this article we rst provide a priori estimates of the solution for the nonsta tionary twodimensio...
Finite element Galerkin method is applied to equations of motion arising in the KelvinVoigt model of...
In this paper, a semidiscrete finite element Galerkin method for the equations of motion arising in ...
In this paper, a semidiscrete finite element Galerkin method for the equations of motion arising in ...
In this paper, a semidiscrete finite element Galerkin method for the equations of motion arising in ...
Abstract. We consider discrete schemes for a nonlinear model of non-Fickian diffusion in viscoelasti...
In this paper, a finite element Galerkin method is applied to equations of motion arising in the Kel...
An optimal {\em a priori} error estimate ${\cal O}\left(h^{k}+\Delta t\right)$, result is presented ...
In this paper, a semidiscrete finite element Galerkin method for the equations of motion arising in ...
An optimal {\em a priori} error estimate ${\cal O}\left(h^{k}+\Delta t\right)$, result is presented ...
Abstract. We study a new approximation scheme of transient viscoelas-tic fluid flow obeying an Oldro...
In this paper, a semidiscrete finite element Galerkin method for the equations of motion arising in ...