2008
DOI: 10.1002/nme.2532
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An X‐FEM approach for large sliding contact along discontinuities

Abstract: SUMMARYThe extended finite element method (X-FEM) has been developed to minimize requirements on the mesh design in a problem with a displacement discontinuity. This advantage, however, still remains limited to the small deformation hypothesis when considering sliding discontinuities. The approach presented in this paper proposes to couple X-FEM with a Lagrangian large sliding frictionless contact algorithm. A new hybrid X-FEM contact element was developed with a contact search algorithm allowing for an update… Show more

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Cited by 56 publications
(47 citation statements)
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“…Remark that the coherent imperfect interface model appropriate for modelling the interface effect in nanomaterials and nanostructures can also be derived from (22) and (23) by taking the interphase to be very stiff with respect to the surrounding phases. In the coherent imperfect interface model, the displacement vector is continuous but the traction vector is discontinuous across the interface.…”
mentioning
confidence: 99%
“…Remark that the coherent imperfect interface model appropriate for modelling the interface effect in nanomaterials and nanostructures can also be derived from (22) and (23) by taking the interphase to be very stiff with respect to the surrounding phases. In the coherent imperfect interface model, the displacement vector is continuous but the traction vector is discontinuous across the interface.…”
mentioning
confidence: 99%
“…In the elements where K α is discontinuous, a technique similar to the ghost node interpolation used in [41] is preferred. The principle consists in using two continuous interpolations by prolongation of the one on + and the one on − to the whole domain (an example is given Fig.…”
Section: New "Bubble" Approximation Spacementioning
confidence: 99%
“…As in the previous subsection, the continuous terms of the approximation (12) are cancelled when evaluating the differences (u P −u Q ). Note that F 1 (r, ) is the only enrichment function that is discontinuous in (11).…”
Section: Crack-tip Elementmentioning
confidence: 99%