Analysis of a mode-I crack perpendicular to an imperfect interface

Inverse square root, l/x/7, singularity characterizes the stress field at the crack tip of homogeneous isotropic elastic media. This 1/x/7 singularity does not, however, hold for cracks present in inhomogeneous solids; such as, a crack terminating at a right angle to bimaterial interface, which is t

A cohesive zone type interface model, taking full account of finite geometry changes, is used to study the decohesion of a viscoplastic block from a rigid substrate. The specific boundary value problem analyzed is a plane strain one with the imposed loading corresponding to overall uniaxial strainin

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,

The opening (mode I) and sliding (mode II) components of the energy that is released during an incremental extension of an interface crack between two different elastic materials are evaluated by the Irwin's crack closure method. Each component of the energies (G~ and G~) is expressed in terms of th