A new stable space–time formulation for two‐dimensional and three‐dimensional incompressible viscous flow |
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Authors: | Donatien N'dri,Andr Garon,Andr Fortin |
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Affiliation: | Donatien N'dri,André Garon,André Fortin |
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Abstract: | A space–time finite element method for the incompressible Navier–Stokes equations in a bounded domain in ?d (with d=2 or 3) is presented. The method is based on the time‐discontinuous Galerkin method with the use of simplex‐type meshes together with the requirement that the space–time finite element discretization for the velocity and the pressure satisfy the inf–sup stability condition of Brezzi and Babu?ka. The finite element discretization for the pressure consists of piecewise linear functions, while piecewise linear functions enriched with a bubble function are used for the velocity. The stability proof and numerical results for some two‐dimensional problems are presented. Copyright © 2001 John Wiley & Sons, Ltd. |
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Keywords: | inf– sup condition Navier– Stokes equations space– time |
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