Propagation of longitudinal and transverse waves in an elastic solid that c
ontains a cracked slab region is investigated. The cracks have a uniform pr
obability density in the slab region, are parallel to the boundaries of the
slab, and the solid is uncracked on either side of the slab. The waves are
normally incident on the cracks. It is shown that the resulting average to
tal motion in the solid is governed by a pair of coupled integral equations
. These equations are solved under the special assumption that the average
exciting motion near a fixed crack is equal to the average total motion. In
this case, one finds that in the cracked region, where multiple scattering
occurs, there is a forward motion and a backward motion. The two motions h
ave identical frequency-dependent velocity and attenuation, for which simpl
e closed-form formulae are obtained. Simple formulae are also obtained for
the wave amplitudes outside the slab. Numerical results corresponding to th
e velocity, attenuation, reflection amplitude, and transmission amplitude a
re presented for several values of crack density and slab thickness. (C) 20
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