A central crack at the interface between two different media in a rectangular sheet under anti-plane shear

Fourier ~~sfo~ and Fourier series technique is used to express the stress intensity factor of a centra1 crack in P finite rectangular sheet with two different materials whose interface normat to the crack in terms of the solution of a Fredhogm integral equation of the second kind. The constant loadi

## Abstrsel-Application of the basic theorem of the Fourier cosine transform and Fourier sine series to this study, we can find the general solution of an eccentric crack normal to two interfaces among three layers in a finite rectangular sheet loaded by an arbitrary longitudinal shear stress. It

Without the customary assumption that the cracked-body is infinite in linear elastic fracture mechanics, the general solution of a central crack across the interface between two orthotropic media in a rectangular sheet under anti-plane shear is obtained by means of the Fourier transform and Fourier

With the aid of the basic theorem of the Mellin transform and Fourier series, the general solution of a central crack at the interface between two dissimilar media in a finite disc under longitudinal shear stress is found in this paper. It is of interest to note that the stress intensity factor of t