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The Effects of Dissipation and Coarse Grid Resolution for Multigrid in Flow ProblemsThe objective of this paper is to investigate the effects of the numerical dissipation and the resolution of the solution on coarser grids for multigrid with the Euler equation approximations. The convergence is accomplished by multi-stage explicit time-stepping to steady state accelerated by FAS multigrid. A theoretical investigation is carried out for linear hyperbolic equations in one and two dimensions. The spectra reveals that for stability and hence robustness of spatial discretizations with a small amount of numerical dissipation the grid transfer operators have to be accurate enough and the smoother of low temporal accuracy. Numerical results give grid independent convergence in one dimension. For two-dimensional problems with a small amount of numerical dissipation, however, only a few grid levels contribute to an increased speed of convergence. This is explained by the small numerical dissipation leading to dispersion. Increasing the mesh density and hence making the problem over resolved increases the number of mesh levels contributing to an increased speed of convergence. If the steady state equations are elliptic, all grid levels contribute to the convergence regardless of the mesh density.
Document ID
19970006877
Acquisition Source
Langley Research Center
Document Type
Conference Paper
Authors
Eliasson, Peter
(Aeronautical Research Inst. of Sweden Bromma, Sweden)
Engquist, Bjoern
(Royal Inst. of Tech. Stockholm, Sweden)
Date Acquired
August 17, 2013
Publication Date
September 1, 1996
Publication Information
Publication: Seventh Copper Mountain Conference on Multigrid Methods
Issue: Part 1
Subject Category
Numerical Analysis
Accession Number
97N13770
Funding Number(s)
CONTRACT_GRANT: N00014-92-J-1890
CONTRACT_GRANT: NSF-DMS-94-04942
Distribution Limits
Public
Copyright
Work of the US Gov. Public Use Permitted.
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