Application of Betti's reciprocal work theorem to the location of cracks in three-dimensional elasticity

The two-dimensional hypersingular integral equation of a plane crack under an arbitrary normal pressure distribution inside an infinite, three-dimensional, isotropic elastic medium is rederived here by application of the classical Betti's reciprocal work theorem. This approach is a very simple one a

This work continues the calculation of the stress intensity factors\ as a function of position s along the front of an arbitrary "kinked and curved# in\_nitesimal extension of some arbitrary crack on some three! dimensional body[ More precisely\ o denoting a small parameter which the crack extension

The aim of this work is to lay theoretical foundations for the prediction of crack paths within the theory of quasistatic LEFM under the most general hypotheses] arbitrary three!dimensional geometry\ arbitrary loading[ This objective requires to derive the expression of the stress intensity factors