Travelling cracks in elastic materials under longitudinal shear

Abdmc-A cylindrical crack at the interface of dissimilar nonhomogeneous elastic materials is studied. Three types of boundary conditions are considered. The mixed boundary conditions lead to dual integral equations which are. further reduced to a Fredholm integral equation of the second kind. A clos

The theory of cracks under longitudinal shear, as discussed in previous publications (1,2,3), is extended to bodies containing external cracks. It is possible, by an adaptation of the Schwartz-Christoffel transformation, to derive a general formula for finding the stress-intensity factor, a paramete

An antiplane crack in a nonhomogeneous material is studied by assuming a continuously varying shear modulus which characterizes a decreasing rigidity near the crack tip. Explicit expressions for the stress and displacement fields are obtained and the influence of material softening upon these quanti

We consider the problem of determining the stress distribution in an infinitely long isotropic homogeneous elastic layer containing two coplanar Grifith cracks which are opened by internal shear stress acting along the lengths of the cracks. The faces of the layer are rigidly fixed. The cracks are l

The general solution of the stress intensity factor of a rectangular orthotropic sheet with an edge crack under anti-plane shear is found by means of the Fourier transform and Fourier series in the present paper. It is of interest to note that the general solution of this problem is identical with t