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An Immersed Finite Element Method for the Elasticity Problems with Displacement Jump

Published online by Cambridge University Press:  09 January 2017

Daehyeon Kyeong*
Affiliation:
Korea Advanced Institute of Science and Technology, Daejeon, Korea 305-701, Korea
Do Young Kwak*
Affiliation:
Korea Advanced Institute of Science and Technology, Daejeon, Korea 305-701, Korea
*
*Corresponding author. Email:[email protected] (D. Kyeong), [email protected] (D. Y. Kwak)
*Corresponding author. Email:[email protected] (D. Kyeong), [email protected] (D. Y. Kwak)
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Abstract

In this paper, we propose a finite element method for the elasticity problems which have displacement discontinuity along the material interface using uniform grids. We modify the immersed finite element method introduced recently for the computation of interface problems having homogeneous jumps [20, 22]. Since the interface is allowed to cut through the element, we modify the standard Crouzeix-Raviart basis functions so that along the interface, the normal stress is continuous and the jump of the displacement vector is proportional to the normal stress. We construct the broken piecewise linear basis functions which are uniquely determined by these conditions. The unknowns are only associated with the edges of element, except the intersection points. Thus our scheme has fewer degrees of freedom than most of the XFEM type of methods in the existing literature [1,8,13]. Finally, we present numerical results which show optimal orders of convergence rates.

Type
Research Article
Copyright
Copyright © Global-Science Press 2017 

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