Abstract
The Reissner-Sagocci Problem at high-frequencies for an elastic medium with exponentially varying shear modulus and density in the radial direction is asymptotically reduced to a Wiener-Hopf integral equation whose solution is obtained by Carleman's method. Uniform asymptotic results are obtained. Explicit results are given for the displacement outside the rigid disc, the moment of the applied forces necessary to oscillate the disc, and the amplitude of oscillation of the disc.
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