Abstract
Using the example of the plane contact problem of hydroelasticity theory, the multiple reflection of waves with strong discontinuities, propagating in an ideally elastic liquids, from thin films having a finite acoustic impedance, is investigated analytically. The wave solution is presented in the form of the sum of a basic component (no film) and a perturbed component. An algorithm is developed for the successive analytical calculation of the perturbed components after multiple reflections from an obstruction.
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