The stress distribution around a crack perpendicular to an interface between materials

The stress concentration around a circular interface crack between two dissimilar elastic planes is analysed in this paper. The constructive algorithm of the group of general stress functions which satisfy the crack boundary conditions is introduced. From that, six analytic solutions are selected to

W-A simpk limiting procedure is reveakd whereby tk three-dimensional state of stress and defonaatba around pa&olii cracks or flaws embedded in elastic solids may be obtained. Several results are derived from availabk solutions conceraing elliptical cracks or thin-sheet rigid inclusions. In particula

This paper is concerned with the plane strain problem of a crack that terminates perpendicularly at the interface of a bonded composite. An integral JR,, is proposed. By the asymptotic analysis, it is shown that, so laong as R o is within the K-dominant region, JR0 = KZ,R6Z"+'((1 -u2)/2pL2)H. Here,

Fourier ~~sfo~ and Fourier series technique is used to express the stress intensity factor of a centra1 crack in P finite rectangular sheet with two different materials whose interface normat to the crack in terms of the solution of a Fredhogm integral equation of the second kind. The constant loadi

Stress intensity factor of a crack perpendicular to the welding bead in a wide plate is analyzed as a plane problem of elasticity. The function which simulates the residual stress distribution qualitatively is assumed. Crack analysis is performed by using the Muskhelishvili's stress function. Result