Well-posedness and inverse problems for the nonlocal third-order acoustic equation with time-dependent nonlinearity

In this paper, we study the inverse problems of simultaneously determining a potential term and a time-dependent nonlinearity for the nonlinear Moore-Gibson-Thompson equation with a fractional Laplacian. This nonlocal equation arises in the field of peridynamics describing the ultrasound waves of hi...

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Bibliographic Details
Published in:arXiv.org 2024-11
Main Authors: Song-Ren, Fu, Yu, Yongyi
Format: Article
Language:English
Subjects:
Inverse problems
Nonlinear equations
Nonlinearity
Time dependence
Uniqueness
Wave equations
Well posed problems
Online Access:Get full text
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Summary:In this paper, we study the inverse problems of simultaneously determining a potential term and a time-dependent nonlinearity for the nonlinear Moore-Gibson-Thompson equation with a fractional Laplacian. This nonlocal equation arises in the field of peridynamics describing the ultrasound waves of high amplitude in viscous thermally fluids. We first show the well-posedness for the considered nonlinear equations in general dimensions with small exterior data. Then, by applying the well-known linearization approach and the unique continuation property for the fractional Laplacian, the potential and nonlinear terms are uniquely determined by the Dirichlet-to-Neumann (DtN) map taking on arbitrary subsets of the exterior in the space-time domain. The uniqueness results for general nonlinearities to some extent extend the existing works for nonlocal wave equations. Particularly, we also show a uniqueness result of determining a time-dependent nonlinear coefficient for a 1-dimensional fractional Jordan-Moore-Gibson-Thompson equation of Westervelt type.
ISSN:2331-8422