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Article Dans Une Revue Engineering Fracture Mechanics Année : 2015

Singular asymptotic solution along an elliptical edge for the Laplace equation in 3-D

Résumé

An explicit asymptotic solution to the elasticity system in a three-dimensional domain in the vicinity of an elliptical crack front, or for an elliptical sharp V-notch is still unavailable. Towards its derivation we first consider the explicit asymptotic solutions of the Laplace equation in the vicinity of an elliptical singular edge in a three-dimensional domain. Both homogeneous Dirichlet and Neumann boundary conditions on the surfaces intersecting at the elliptical edge are considered. The dual singular solution is also provided to be used in a future study to extract the edges flux intensity functions by the quasi-dual function method. We show that just as for the circular edge case, the solution in the vicinity of an elliptical edge is composed of three series, with eigenfunctions being functions of two coordinates.
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Dates et versions

hal-01097676 , version 1 (20-12-2014)

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  • HAL Id : hal-01097676 , version 1

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Samuel Shannon, Victor Péron, Zohar Yosibash. Singular asymptotic solution along an elliptical edge for the Laplace equation in 3-D. Engineering Fracture Mechanics, 2015, pp.16. ⟨hal-01097676⟩
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