The numerical stability of standard finite element schemes applied to the advection–diffusion equation is evaluated using a space‐time eigenvalue analysis. Unlike the usual approaches which only consider temporal aspects of stability, this analysis also describes the spatial stability of the solutions. To this end, the one‐dimensional advection–diffusion equation is put into an alternative semi‐discrete form which allows the derivation of a very practical stability condition. In multidimensional flow situations the latter is applied along the streamlines by means of a tensorial corrective function that prevents excessive numerical smearing of fronts or phase interfaces. The efficiency of the procedure is illustrated by an example which succ...
The stability of two dimensional viscous flow is studied by means of a Finite Element method. A smal...
Abstract In this paper, we describe a comparison of two spatial discretization schemes for the advec...
The problem of finite element simulation of incompressible fluid flow in porous medium is considered...
In this paper, we discuss some applications of multiscale finite element methods to two-phase immisc...
This pa.per analyzes the stability and accuracy of various finite element approxima-tion;,: Lo the l...
The solution of problems in which coupling occurs between the displacement of the soil skeleton and ...
In this paper we propose a modified multiscale finite element method for two-phase flow simulations ...
AbstractThis paper analyzes the stability of the finite-element approximation to the linearized two-...
Direct numerical simulations of the fully developed turbulent flow through a porous channel show the...
Abst ract--Th is paper analyzes the stability of the finite-element approximation to the linearized ...
A number of methods have been developed for solving the dynamics of saturated porous media, mostly b...
We investigate the performance of the IDR(s)-algorithms when solving nonsymmetric systems in porous ...
AbstractWe investigate several existing interface procedures for finite difference methods applied t...
A moving grid finite element method is developed to solve the nonlinear coupled set of partial diffe...
This paper introduces a finite-element collocation technique for solving the equation governing two-...
The stability of two dimensional viscous flow is studied by means of a Finite Element method. A smal...
Abstract In this paper, we describe a comparison of two spatial discretization schemes for the advec...
The problem of finite element simulation of incompressible fluid flow in porous medium is considered...
In this paper, we discuss some applications of multiscale finite element methods to two-phase immisc...
This pa.per analyzes the stability and accuracy of various finite element approxima-tion;,: Lo the l...
The solution of problems in which coupling occurs between the displacement of the soil skeleton and ...
In this paper we propose a modified multiscale finite element method for two-phase flow simulations ...
AbstractThis paper analyzes the stability of the finite-element approximation to the linearized two-...
Direct numerical simulations of the fully developed turbulent flow through a porous channel show the...
Abst ract--Th is paper analyzes the stability of the finite-element approximation to the linearized ...
A number of methods have been developed for solving the dynamics of saturated porous media, mostly b...
We investigate the performance of the IDR(s)-algorithms when solving nonsymmetric systems in porous ...
AbstractWe investigate several existing interface procedures for finite difference methods applied t...
A moving grid finite element method is developed to solve the nonlinear coupled set of partial diffe...
This paper introduces a finite-element collocation technique for solving the equation governing two-...
The stability of two dimensional viscous flow is studied by means of a Finite Element method. A smal...
Abstract In this paper, we describe a comparison of two spatial discretization schemes for the advec...
The problem of finite element simulation of incompressible fluid flow in porous medium is considered...