The extended/generalized finite element method: An overview of the method and its applications
RWTH Aachen University · Northwestern University
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Abstract
Abstract An overview of the extended/generalized finite element method (GEFM/XFEM) with emphasis on methodological issues is presented. This method enables the accurate approximation of solutions that involve jumps, kinks, singularities, and other locally non‐smooth features within elements. This is achieved by enriching the polynomial approximation space of the classical finite element method. The GEFM/XFEM has shown its potential in a variety of applications that involve non‐smooth solutions near interfaces: Among them are the simulation of cracks, shear bands, dislocations, solidification, and multi‐field problems. Copyright © 2010 John Wiley & Sons, Ltd.
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2Topics & keywords
Topics
Keywords
- Extended finite element method
- Finite element method
- Gravitational singularity
- Space (punctuation)
- Element (criminal law)
- Mixed finite element method
- Polynomial
- Applied mathematics
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