Numerical solution for curved crack problem in elastic half-plane using hypersingular integral equation

A hypersingular integral equation for a curved crack in half-plane is formulated in this report. One particular advantage of the formulation is that the crack opening displacement can be obtained from the solution of the integral equation. Using the concept of the finite-part integral proposed by H

The complex variable function method is used to formulate the multiple curved crack problems into hypersingular integral equations. These hypersingular integral equations are solved numerically for the unknown function, which are later used to find the stress intensity factor, SIF, for the problem c

Ahatraet-The plane elastic problem for a curved crack problem is studied by means of the hypersingular integral equation approach. Based on the solution of a doublet of dislocation, the hypersingular integral equation for the curved crack problem is formulated. The unknown function invalved is the c

## Abstract In this paper, a hypersingular integral equation for curved cracks in plane elasticity is formulated and presented. This paper describes a new numerical technique for solution of deep curved cracks in plane elasticity. In this method, the crack curve length is taken as the co‐ordinate i