Fixed rigid line problem in antiplane elasticity

In this paper the properties of eigenfunction expansion form (EEF) in the fixed rigid line tip (FRLT) problem in plane elasticity are discussed in detail. After using the Betti's reciprocal theorem to the plane body containing the FRLT, several new path-independent integrals are obtained. All the c

Ahatract-The inclusion in some materials often plays an irn~~t role to their fractures. In order to study the fracture due to inclusion, the piastic region around the inclusion must be studied in detail. This paper deals with the elasto-perfectly plastic antiplane problem of a rigid line inclusion i

In this paper, the elastic plane problem of co&near periodical rigid lines is studied. Using the method of conformat mapping, an elastic solution in closed form is obtained. ## ' Taking the limit b-03 for eq. ( 22) gives This result is the same as the classical one for the ease of a single rigid

This paper deals with the elasto-perfectly plastic antiplane problem of collinear rigid line inclusions in an infinite plane. The plastic region near the tip of the rigid line is studied and an exact solution in closed form is obtained by the methods of Rice and Myskhelishvili.