Abstract
Several dynamic mixed problems of elasticity theory, hydromechanics, and mathematical physics are reducible to the integral equations which are the subject of the present paper. The integral equations to be investigated are characterized by a kernel k( t) which does not decrease as t → ∞. This fact makes it difficult to analyze the integral equations and excludes the direct application of the asymptotic expansion method developed in [ 1 2] which is based on the use of the Wiener-Hopf equations. We shall investigate a certain class of integral equations with the above properties, propose a method for constructing their solutions, and describe certain applications to dynamic contact problems.
Published Version
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