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Simultaneous recoveries for semilinear parabolic systems

Yi‐Hsuan Lin, Hongyu Liu, Xu Liu, Zhang Shen

2022Inverse Problems27 citationsDOIOpen Access PDF

Abstract

Abstract In this paper, we study inverse boundary problems associated with semilinear parabolic systems in several scenarios where both the nonlinearities and the initial data can be unknown. We establish several simultaneous recovery results showing that the passive or active boundary Dirichlet-to-Neumann operators can uniquely recover both of the unknowns, even stably in a certain case. It turns out that the nonlinearities play a critical role in deriving these recovery results. If the nonlinear term belongs to a general C 1 class but fulfilling a certain growth condition, the recovery results are established by the control approach via Carleman estimates. If the nonlinear term belongs to an analytic class, the recovery results are established through successive linearization in combination with special complex geometrical optics solutions for the parabolic system.

Topics & Concepts

MathematicsLinearizationNonlinear systemTerm (time)Class (philosophy)Boundary (topology)Dirichlet distributionMathematical analysisNeumann boundary conditionParabolic partial differential equationDirichlet boundary conditionApplied mathematicsBoundary value problemInverse problemControl theory (sociology)Control (management)Partial differential equationComputer sciencePhysicsQuantum mechanicsArtificial intelligenceNumerical methods in inverse problemsAdvanced Mathematical Modeling in EngineeringStability and Controllability of Differential Equations