A new full discrete stabilized viscosity method for transient Navier-Stokes equations

This paper is concerned with the development and analysis of a new stabilized finite element method based on two local Gauss integrations for the two-dimensional transient Navier-Stokes equations by using the lowest equal-order pair of finite elements. This new stabilized finite element method has s

The relation between the lattice Boltzmann method, which has recently become popular, and the kinetic schemes, which are routinely used in computational fluid dynamics, is explored. A new discrete velocity method for the numerical solution of Navier-Stokes equations for incompressible fluid flow is

## a b s t r a c t Based on the lowest equal-order conforming finite element subspace (X h , M h ) (i.e. P 1 -P 1 or Q 1 -Q 1 elements), a characteristic stabilized finite element method for transient Navier-Stokes problem is proposed. The proposed method has a number of attractive computational p

We study subgrid artificial viscosity methods for approximating solutions to the Navier-Stokes equations. Two methods are introduced that add viscous stabilization via an artificial viscosity, then remove it only on a coarse mesh. These methods can be considered as conforming, mixed methods, the fir

In this paper we present a stabilized ®nite element formulation for the transient incompressible Navier±Stokes equations. The main idea is to introduce as a new unknown of the problem the projection of the pressure gradient onto the velocity space and to add to the incompresibility equation the dier