Abstract.
The 2D-model of an anisotropic, non-homogeneous, bonded elastic solid with a crack on the interface is considered. We state the linear problem with the stress-free boundary condition at the crack faces in addition to the transmission condition at the connected part of the interface. The sensitivity of the model to non-linear perturbations of the curvilinear crack along the interface is investigated. We obtain the asymptotic expansion and the corresponding derivatives of the potential energy functional with respect to the crack length via the material derivatives of the solution. This allows us to describe the growth or stationarity, and the local optimality conditions by the Griffith rupture criterion. The integral expression of the energy release rate for the considered problems is obtained, and the Cherepanov-Rice integral is discussed.
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Received: December 7, 2000; revised: July 2, 2001
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Kovtunenko, V. Shape sensitivity of curvilinear cracks on interface to non-linear perturbations. Z. angew. Math. Phys. 54, 410–423 (2003). https://doi.org/10.1007/s00033-003-0143-y
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DOI: https://doi.org/10.1007/s00033-003-0143-y