Boundary integral formulation of cracked axisymmetric bodies under torsion

By applying integration by parts and other techniques to the traditional boundary integral formulation, a new boundary integral equation is derived to analyze cracked anisotropic bodies under anti-plane shear. The new boundary formulation uses dislocation density as unknown on the crack surface from

This paper presents a new boundary integral formulation for a plane elastic body containing an arbitrary number of cracks and holes[ The body is assumed to be linear elastic and isotropic\ but can be of either \_nite or in\_nite extend[ The cracks inside the body can be either internal or edge crack

In this paper a general boundary element formulation for the three-dimensional elastoplastic analysis of cracked bodies is presented. The non-linear formulation is based on the Dual Boundary Element Method. The continuity requirements of the field variables are fulfilled by a discretization strategy

The presence of subsurface cracks in a halfspace excited by elastic waves may give rise to scattered body and surface waves. For many engineering applications, such as non-destructive testing or oil exploration, the scattered field may yield valuable information to detect cracks and other scatterers