A mixed boundary value problem for debonding of a semielliptic rigid inclusion on the rim of a half plane

Abstract

A general solution is obtained for a mixed boundary value problem of plane elasticity. In the present paper the components of the displacement are given on two segments of the boundary and those of the external force are given on the rest of the boundary. A rational mapping function and a complex variable method are used for the analysis. The solution which is obtained in closed form is the first derivative of the complex stress function and does not contain an integral form. A half plane with a semielliptic rigid inclusion is analyzed under uniform tension. The stress distribution, the stress intensity of debonding at the debonded tip of the semielliptic inclusion and the propagation of debonding are investigated.