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Local projection stabilized Galerkin approximations for the generalized Stokes problem

✍ Scribed by Kamel Nafa; Andrew J. Wathen

Publisher
Elsevier Science
Year
2009
Tongue
English
Weight
397 KB
Volume
198
Category
Article
ISSN
0045-7825

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✦ Synopsis

We analyze pressure stabilized finite element methods for the solution of the generalized Stokes problem and investigate their stability and convergence properties. An important feature of the method is that the pressure gradient unknowns can be eliminated locally thus leading to a decoupled system of equations. Although stability of the method has been established, for the homogeneous Stokes equations, the proof given here is based on the existence of a special interpolant with additional orthogonal property with respect to the projection space. This, makes it a lot simpler and more attractive. The resulting stabilized method is shown to lead to optimal rates of convergence for both velocity and pressure approximations.

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## Abstract This article first recalls the results of a stabilized finite element method based on a local Gauss integration method for the stationary Stokes equations approximated by low equal‐order elements that do not satisfy the __inf‐sup__ condition. Then, we derive general superconvergence res