An unusual stabilized finite element method for a generalized Stokes problem

In this work we present an adaptive strategy (based on an a posteriori error estimator) for a stabilized finite element method for the Stokes problem, with and without a reaction term. The hierarchical type estimator is based on the solution of local problems posed on appropriate finite dimensional

## Abstract A new stabilized finite element method for the Stokes problem is presented. The method is obtained by modification of the mixed variational equation by using local __L__^2^ polynomial pressure projections. Our stabilization approach is motivated by the inherent inconsistency of equal‐or

The numerical solution of the non-stationary, incompressible Navier-Stokes model can be split into linearized auxiliary problems of Oseen type. We present in a unique way different stabilization techniques of finite element schemes on isotropic meshes. First we describe the state-of-the-art for the

In this paper, we describe a ®nite element formulation for the numerical solution of the stationary incompressible Navier±Stokes equations including Coriolis forces and the permeability of the medium. The stabilized method is based on the algebraic version of the sub-grid scale approach. We ®rst des

We consider in this work the boundary value problem for Stokes equations on a two dimensional domain in cases where non-standard boundary conditions are given. We study the cases where pressure and normal or tangential components of the velocity are given in different parts of the boundary and solve