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A generalized finite element method for modeling arbitrary interfaces in large deformation problems

Biabanaki, S. O. R ; Sharif University of Technology

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  1. Type of Document: Article
  2. Abstract:
  3. In this paper, a generalized-FEM technique is presented in modeling of arbitrary interfaces in large deformations. The method is used to model the internal interfaces and arbitrary geometries using a uniform non-conformal mesh. The technique is applied to capture independent deformations at both sides of separated element cut by the interface in a uniform regular mesh. In this approach, a uniform non-conformal mesh is decomposed into subelements that conform to the internal interfaces. The geometry of interface is used to produce various triangular, quadrilateral and pentagonal elements at the intersection of interface with regular FE mesh, in which the extra degrees-of-freedom are defined along the interface. The level set method is employed to describe the material geometry on the background mesh. The technique is used to extrude any arbitrary geometry from an initial background mesh and model under different external effects. The most feature of the technique is to introduce the conformal decomposition finite element method, in which the new conforming elements are produced in the uniform structured mesh by decomposing the uniform mesh into elements that is conformed to the material interfaces. Finally, several numerical examples are analyzed to demonstrate the efficiency of proposed technique in modeling arbitrary interfaces in large deformations
  4. Keywords:
  5. Arbitrary interfaces ; Generalized-FEM ; Pentagonal elements ; Arbitrary geometry ; Conforming elements ; Generalized finite element methods ; Generalized-FEM ; Internal interfaces ; Large deformations ; Level Set method ; Material geometry ; Material interfaces ; Numerical example ; Regular meshes ; Structured mesh ; Uniform mesh ; Deformation ; Finite element method ; Geometry ; Plasticity ; Interfaces (materials)
  6. Source: Computational Plasticity XI - Fundamentals and Applications, COMPLAS XI, 7 September 2011 through 9 September 2011 ; September , 2011 , Pages 1306-1317 ; 9788489925731 (ISBN)