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On the Wiener–Hopf solution of water-wave interaction with a submerged elastic or poroelastic plate

M. J. A. Smith, M. A. Peter, I. D. Abrahams, M. H. Meylan

2020Proceedings of the Royal Society A Mathematical Physical and Engineering Sciences33 citationsDOIOpen Access PDF

Abstract

A solution to the problem of water-wave scattering by a semi-infinite submerged thin elastic plate, which is either porous or non-porous, is presented using the Wiener-Hopf technique. The derivation of the Wiener-Hopf equation is rather different from that which is used traditionally in water-waves problems, and it leads to the required equations directly. It is also shown how the solution can be computed straightforwardly using Cauchy-type integrals, which avoids the need to find the roots of the highly non-trivial dispersion equations. We illustrate the method with some numerical computations, focusing on the evolution of an incident wave pulse which illustrates the existence of two transmitted waves in the submerged plate system. The effect of the porosity is studied, and it is shown to influence the shorter-wavelength pulse much more strongly than the longer-wavelength pulse.

Topics & Concepts

PoromechanicsPulse (music)ScatteringMechanicsPorosityDispersion (optics)Porous mediumMathematical analysisDispersion relationPhysicsClassical mechanicsWave equationMathematicsDispersive partial differential equationWave propagationMaterials scienceNumerical analysisOpticsGeometryExact solutions in general relativityElasticity (physics)Ocean Waves and Remote SensingThermoelastic and Magnetoelastic PhenomenaCoastal and Marine Dynamics