A Covolume Method Based on Rotated Bilinears for the Generalized Stokes Problem

We present a covolume method for the modi®ed Stokes problem using the simplest approximation spaces, Q 1 ±P 0 . This scheme turns out the stabilized covolume method for the Stokes problem. We prove that the covolume method in this paper has a unique solution and Oh convergence order in H 1 semi-norm

Using the nonoverlapping domain decomposition approach, we propose a formulation of the dual Schur algorithm for the generalized Stokes problem discretized by a mixed finite element method continuous for the pressure in each subdomain, but discontinuous at the interfaces. The corresponding LBB condi

## 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