Tang Ren-ji. Crack Problem for an Inhomogeneous Plane Bonded by Two Different Inhomogeneous Half-Planes[J]. Applied Mathematics and Mechanics, 1991, 12(2): 177-183.
Citation:
Tang Ren-ji. Crack Problem for an Inhomogeneous Plane Bonded by Two Different Inhomogeneous Half-Planes[J]. Applied Mathematics and Mechanics, 1991, 12(2): 177-183.
Tang Ren-ji. Crack Problem for an Inhomogeneous Plane Bonded by Two Different Inhomogeneous Half-Planes[J]. Applied Mathematics and Mechanics, 1991, 12(2): 177-183.
Citation:
Tang Ren-ji. Crack Problem for an Inhomogeneous Plane Bonded by Two Different Inhomogeneous Half-Planes[J]. Applied Mathematics and Mechanics, 1991, 12(2): 177-183.
In this paper the crack problem for two bonded inhomogeneous half-planes is considered. It is assumed that the different materials have the same Poisson ratio v, but generally speaking, both Young's moduli vary exponentially with the coordinate x in different form. Using the single crack solution of the inhomogeneous plane problem and Fourier transform technique, the problem is reduced to a Cauchy-type singular integral equation. Several numerical examples to calculate the stress intensity factors are carried out.
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