A Nitsche type method for stress fields calculation in dissimilar material with interface crack

Michael Michaeli, Franck Assous, Anatoly Golubchik

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5 Scopus citations

Abstract

This work deals with the crack problem simulation in dissimilar media. It proposes a new numerical method derived from a Nitsche approach for handling interface conditions in the elasticity equations. The Nitsche method, introduced to impose weakly essential boundary conditions in the scalar Laplace operator, has been then worked out more generally and transferred to continuity conditions. We propose here an extension of this method to the Navier-Lame equations. We derive a variational formulation that provides the solution in terms of displacements field in the case of a crack existence in a plate domain Ω, made of several different layers characterized by different material properties. We formulate the method for both the homogeneous and the dissimilar material domains and report some numerical experiments.

Original languageEnglish
Pages (from-to)187-203
Number of pages17
JournalApplied Numerical Mathematics
Volume67
DOIs
StatePublished - 2013
Externally publishedYes

Keywords

  • Continuous finite element methods
  • Crack tip
  • Fracture mechanics
  • Nitsche method
  • Stress fields
  • Stress intensity factor

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