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Algebraic multigrid, mixed‐order interpolation, and incompressible fluid flow
Author(s) -
Webster R.
Publication year - 2010
Publication title -
numerical linear algebra with applications
Language(s) - English
Resource type - Journals
SCImago Journal Rank - 1.02
H-Index - 53
eISSN - 1099-1506
pISSN - 1070-5325
DOI - 10.1002/nla.645
Subject(s) - multigrid method , mathematics , interpolation (computer graphics) , laminar flow , polygon mesh , reynolds number , grid , compressibility , algebraic number , mathematical optimization , mathematical analysis , partial differential equation , geometry , computer science , mechanics , animation , physics , computer graphics (images) , turbulence
This paper presents the results of numerical experiments on the use of equal‐order and mixed‐order interpolations in algebraic multigrid (AMG) solvers for the fully coupled equations of incompressible fluid flow. Several standard test problems are addressed for Reynolds numbers spanning the laminar range. The range of unstructured meshes spans over two orders of problem size (over one order of mesh bandwidth). Deficiencies in performance are identified for AMG based on equal‐order interpolations (both zero‐order and first‐order). They take the form of poor, fragile, mesh‐dependent convergence rates. The evidence suggests that a degraded representation of the inter‐field coupling in the coarse‐grid approximation is the cause. Mixed‐order interpolation (first‐order for the vectors, zero‐order for the scalars) is shown to address these deficiencies. Convergence is then robust, independent of the number of coarse grids and (almost) of the mesh bandwidth. The AMG algorithms used are reviewed. Copyright © 2009 John Wiley & Sons, Ltd.

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