Parallel overlapping scheme for viscous incompressible flows

We present new finite difference schemes for the incompressible Navier-Stokes equations. The schemes are based on two spatial differencing methods; one is fourth-order-accurate and the other is sixth-order accurate. The temporal differencing is based on backward differencing formulae. The schemes us

A numerical scheme for time-dependent incompressible viscous fluid flow, thermally coupled under the Boussinesq approximation is presented. The scheme combines an operator splitting in the time discretization and linear finite elements in the space discretization, and is an extension of one previous

The paper presents a discussion of some phenomena related to the pressure-correction scheme implemented in a spectral element or ®nite element context. Of particular interest are the spurious boundary layers created around prescribed boundaries in which the pressure exhibits spurious behaviour. The

This article performs the convergence analysis of a staggered pressure correction scheme for solving unsteady viscous incompressible flows in a bounded domain using the energy method. Error estimates for the numerical velocity field of the difference scheme are established. The analysis adopts the m

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 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