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On the stability of recovering two sources and initial status in a stochastic hyperbolic-parabolic system

Bin Wu, Jijun Liu

2021Inverse Problems11 citationsDOIOpen Access PDF

Abstract

Abstract Consider an inverse problem of determining two stochastic source functions and the initial status simultaneously in a stochastic thermoelastic system, which is constituted of two stochastic equations of different types, namely a parabolic equation and a hyperbolic equation. To establish the conditional stability for such a coupling system in terms of some suitable norms revealing the stochastic property of the governed system, we first establish two Carleman estimates with regular weight function and two large parameters for stochastic parabolic equation and stochastic hyperbolic equation, respectively. By means of these two Carleman estimates, we finally prove the conditional stability for our inverse problem, provided the source in the elastic equation be known near the boundary and the solution be in an a priori bounded set. Due to the lack of information about the time derivative of wave field at the final time, the stability index with respect to the wave field at final time is found to be halved, which reveals the special characteristic of our inverse problem for the coupling system.

Topics & Concepts

MathematicsStability (learning theory)Bounded functionMathematical analysisWave equationHyperbolic partial differential equationInverseInverse problemBoundary (topology)Time derivativeHeat equationApplied mathematicsPartial differential equationGeometryMachine learningComputer scienceNumerical methods in inverse problemsStability and Controllability of Differential EquationsAdvanced Mathematical Modeling in Engineering
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