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Periodic solutions and multiharmonic expansions for the Westervelt equation

Barbara Kaltenbacher

2020Evolution equations and control theory12 citationsDOIOpen Access PDF

Abstract

<p style='text-indent:20px;'>In this paper we consider nonlinear time periodic sound propagation according to the Westervelt equation, which is a classical model of nonlinear acoustics and a second order quasilinear strongly damped wave equation exhibiting potential degeneracy. We prove existence, uniqueness and regularity of solutions with time periodic forcing and time periodic initial-end conditions, on a bounded domain with absorbing boundary conditions. In order to mathematically recover the physical phenomenon of higher harmonics, we expand the solution as a superposition of contributions at frequencies that are multiples of a fundamental excitation frequency. This multiharmonic expansion is proven to converge, in appropriate function spaces, to the periodic solution in time domain.

Topics & Concepts

Superposition principleBounded functionUniquenessMathematical analysisNonlinear systemHarmonicsMathematicsDomain (mathematical analysis)Degeneracy (biology)Frequency domainOrder (exchange)Wave equationBoundary value problemPhysicsBioinformaticsQuantum mechanicsEconomicsFinanceVoltageBiologyStability and Controllability of Differential EquationsAdvanced Mathematical Modeling in EngineeringNumerical methods in inverse problems