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The problem of an ellipsoidal inhomogeneity embedded in an infinitely extended elastic medium with sliding interfaces is investigated.An exact solution is presented for such an inhomogeneous system that is subject to remote uniform shearing stress.Both the elastic inclusion and matrix are considered isotropic with a separate elastic modulus.Based on Luré’s approach to solving ellipsoidal cavity problems through Lamé functions,several harmonic functions are introduced for Papkovich-Neuber displacement potentials.The displacement fields inside and outside the ellipsoidal inclusion are obtained explicitly,and the stress field in the whole domain is consequently determined.
The problem of an ellipsoidal inhomogeneity embedded in an infinitely extended elastic medium with sliding interfaces is investigated. An exact solution is presented for such an inhomogeneous system that is subject to remote uniform shearing stress. Both the elastic inclusion and matrix are considered isotropic with a separate elastic modulus. Based on Luré’s approach to solving ellipsoidal cavity problems through Lamé functions, several harmonic functions are introduced for Papkovich-Neuber displacement potentials. displacement of the fields inside and outside the ellipsoidal inclusion are obtained, and the stress field in the whole domain is solved determined.