Space adaptive finite element methods for dynamic obstacle problems
The necessity to approximate dynamic contact problems arises in many engineering processes. Because of the local effects in the contact zone, adaptive techniques are suited to improve the finite element discretisation of such problems. In this article, the Newmark method in time and finite elements...
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| Published in | Electronic transactions on numerical analysis Vol. 32; p. 162 |
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| Main Authors | , , |
| Format | Journal Article |
| Language | English |
| Published |
Institute of Computational Mathematics
01.01.2008
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| Subjects | |
| Online Access | Get full text |
| ISSN | 1068-9613 1097-4067 |
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| Summary: | The necessity to approximate dynamic contact problems arises in many engineering processes. Because of the local effects in the contact zone, adaptive techniques are suited to improve the finite element discretisation of such problems. In this article, the Newmark method in time and finite elements in space are used to approximate the solution numerically. A spatial error estimator is derived from the semidiscretised problem. The approach relies on an auxiliary problem, which is a variational equation. An adaptive refinement process is based on this error control. Numerical results illustrate the performance of the presented method. Key words. dynamic obstacle problem, a posteriori error estimation, mesh refinement, finite element method AMS subject classifications. 351,85, 65M50, 65M60 |
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| ISSN: | 1068-9613 1097-4067 |