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Title: Superconvergence for convection-diffusion problems with low regularity (English)
Author: Ludwig, Lars
Author: Roos, Hans-Görg
Language: English
Journal: Applications of Mathematics 2012
Volume: Proceedings. Prague, May 2-5, 2012
Issue: 2012
Year:
Pages: 173-187
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Category: math
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Summary: The finite element method is applied to a convection-diffusion problem posed on the unite square using a tensor product mesh and bilinear elements. The usual proofs that establish superconvergence for this setting involve a rather high regularity of the exact solution - typically $\(u \in H^3(\Omega)\)$, which in many cases cannot be taken for granted. In this paper we derive superconvergence results where the right hand side of our a priori estimate no longer depends on the $\(H^3\)$ norm but merely requires finiteness of some weaker functional measuring the regularity. Moreover, we consider the streamline diffusion stabilization method and how superconvergence is affected by the regularity of the solution. Finally, numerical experiments for both discretizations support and illustrate the theoretical results. (English)
Keyword: singular perturbation
Keyword: finite element method
Keyword: convection-diffusion boundary value problem
Keyword: superconvergence
Keyword: supercloseness
MSC: 35B25
MSC: 35J25
MSC: 65N12
MSC: 65N15
MSC: 65N30
idZBL: Zbl 1313.65292
idMR: MR3204410
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Date available: 2017-02-14T09:01:41Z
Last updated: 2017-04-13
Stable URL: http://hdl.handle.net/10338.dmlcz/702903
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