A review of reduced Navier-Stokes computations for compressible viscous flows

The compressible Navier-Stokes equations for viscous ows with general large continuous initial data, as well as with large discontinuous initial data, are studied. Both a homogeneous free boundary problem with zero outer pressure and a ÿxed boundary problem are considered. For the large initial data

In this paper, a Petrov±Galerkin formulation for a viscous, compressible ¯uid using the meshless reproducing kernel particle method (RKPM) is ®rst presented. The location of shocks is determined from the high-scale part of the solution using multiresolution analysis. A parallel computer implementati

Order-of-magnitude deletion of the stream-wise diffusion terms leads to a reduced form of the Navier-Stokes equations. Solving the reduced equations for internal flows with single-sweep marching algorithms requires a severe minimum stream-wise step-size to avoid unstable solutions. This behaviour is

A family of Navier-Stokes preconditioners is presented that may reduce the stiffness due to complicated interaction between convection and diffusion in viscous flows. Navier-Stokes preconditioning is developed based on a Fourier analysis of the discretized equations and a dispersion analysis of the

A revised version of Dodge's split-velocity method for numerical calculation of compressible duct flow has been developed. The revision incorporates balancing of mass flow rates on each marching step in order to maintain front-to-back continuity during the calculation. The (chequerboard) zebra algor