A fine grid finite element computation of two-dimensional high Reynolds number flows

Velocity-pressure integrated and consistent penalty finite element computations of high-Reynolds-number laminar flows are presented. In both methods the pressure has been interpolated using linear shape functions for a triangular element which is contained inside the biquadratic flow element. It has

This paper is devoted to the computation of turbulent flows by a Galerkin finite element method. Effects of turbulence on the mean field are taken into account by means of a k--E turbulence model. The wall region is treated through wall laws and, more specifically, Reichardt's law. An inlet profile

Developing Couette-Poiseuille flows at Re= 5000 are studied using a low Reynolds number ktwo-equation model and a finite element formulation. Mesh-independent solutions are obtained using a standard Galerkin formulation and a Galerkin/least-squares stabilized method. The predictions for the velocity