A Nitsche embedded mesh method
Autor: | Tod A. Laursen, Michael A. Puso, Jessica Sanders |
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Rok vydání: | 2011 |
Předmět: |
Surface (mathematics)
Engineering Mathematical optimization Interface (Java) business.industry Applied Mathematics Mechanical Engineering Computational Mechanics Ocean Engineering Eulerian path Grid Topology Finite element method Mathematics::Numerical Analysis Computational Mathematics symbols.namesake Matrix (mathematics) Computational Theory and Mathematics Mesh generation symbols Polygon mesh business |
Zdroj: | Computational Mechanics. 49:243-257 |
ISSN: | 1432-0924 0178-7675 |
DOI: | 10.1007/s00466-011-0641-2 |
Popis: | A new technique for treating the mechanical interactions of overlapping finite element meshes is proposed. Numerous names have been applied to related approaches, here we refer to such techniques as embedded mesh methods. Such methods are useful for numerous applications e.g., fluid-solid interaction with a superposed meshed solid on an Eulerian background fluid grid or solid-solid interaction with a superposed meshed particle on a matrix background mesh etc. In this work we consider the interaction of two elastic domains: one mesh is the foreground and defines the surface of interaction, the other is a background mesh and is often a grid. We first employ a classical mortar type approach [see Baaijens (Int J Numer Methods Eng 35:743---761, 2001)] to impose constraints on the interface. It turns out that this approach will work well except in special cases. In fact, many related approaches can exhibit mesh locking under certain conditions. This motivates the proposed version of Nitsche's method which is shown to eliminate the locking phenomenon in example problems. |
Databáze: | OpenAIRE |
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