In this paper we consider the p-FEM for elliptic boundary value problems on tetrahedral meshes where the entries of the stiffness matrix are evaluated by numerical quadrature. Such a quadrature can be done by mapping the tetrahedron to a hexahedron via the Duffy transformation.
We show that for tensor product Gauss-Lobatto-Jacobi quadrature formulas with q+1=p+1 points in each direction and shape functions that are adapted to the quadrature formula, one again has discrete stability for the fully discrete p-FEM.
The present error analysis complements the work [Eibner/Melenk 2005] for the p-FEM on triangles/tetrahedra where it is shown that by adapting the shape functions to the quadrature formula, the stiffness matrix can be set up in optimal complexity.
Identifer | oai:union.ndltd.org:DRESDEN/oai:qucosa.de:bsz:ch1-200702059 |
Date | 30 November 2007 |
Creators | Eibner, Tino, Melenk, Jens Markus |
Contributors | TU Chemnitz, Fakultät für Mathematik |
Publisher | Universitätsbibliothek Chemnitz |
Source Sets | Hochschulschriftenserver (HSSS) der SLUB Dresden |
Language | English |
Detected Language | English |
Type | doc-type:preprint |
Format | application/pdf, text/plain, application/zip |
Rights | Dokument ist für Print on Demand freigegeben |
Relation | dcterms:isPartOf:Chemnitz Scientific Computing Preprints, CSC/06-01 |
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