Gauge finite element method for incompressible flows

We study the performance of various upwind techniques implemented in parabolic ÿnite element discretizations for incompressible high Reynolds number ow. The characteristics of an 'ideal' upwind procedure are ÿrst discussed. Then the streamline upwind Petrov=Galerkin method, a simpliÿed version there

Parallel simulation of incompressible uid ows is considered on networks of homogeneous workstations. Coarse-grain parallelization of a Taylor-Galerkin=pressure-correction ÿnite element algorithm are discussed, taking into account network communication costs. The main issues include the parallelizati

A parallel semi-explicit iterative ®nite element computational procedure for modelling unsteady incompressible ¯uid ¯ows is presented. During the procedure, element ¯ux vectors are calculated in parallel and then assembled into global ¯ux vectors. Equilibrium iterations which introduce some `local i

In a dynamic unbounded medium±structure interaction analysis in the time domain performed with the substructure method the unit-impulse response function on the structure±medium interface of the unbounded medium is determined. The consistent in®nitesimal ®nite element cell method based solely on the

A boundary element method (BEM) for steady viscous #uid #ow at high Reynolds numbers is presented. The new integral formulation with a poly-region approach involves the use of the convective kernel with slight compressibility that was previously employed by Grigoriev and Fafurin [1] for driven cavit

The objective of this paper is twofold. First, a stabilized finite element method (FEM) for the incompressible Navier-Stokes is presented and several numerical experiments are conducted to check its performance. This method is capable of dealing with all the instabilities that the standard Galerkin