Litcius/Paper detail

Co-inversion of a scattering cavity and its internal sources: uniqueness, decoupling and imaging

Deyue Zhang, Yukun Guo, Yinglin Wang, Yan Chang

2023Inverse Problems12 citationsDOIOpen Access PDF

Abstract

Abstract This paper concerns the simultaneous reconstruction of a sound-soft cavity and its excitation sources from the total-field data. Using the single-layer potential representations on two measurement curves, this co-inversion problem can be decoupled into two inverse problems: an inverse cavity scattering problem and an inverse source problem. This novel decoupling technique is fast and easy to implement since it is based on a linear system of integral equations. Then the uncoupled subproblems are respectively solved by the modified optimization and sampling method. We also establish the uniqueness of this co-inversion problem and analyze the stability of our method. Several numerical examples are presented to demonstrate the feasibility and effectiveness of the proposed method.

Topics & Concepts

Decoupling (probability)Inverse problemUniquenessInversion (geology)MathematicsInverse scattering problemExcitationInverseScatteringMathematical analysisUniqueness theorem for Poisson's equationApplied mathematicsMathematical optimizationAlgorithmOpticsGeometryPhysicsControl engineeringPaleontologyStructural basinQuantum mechanicsEngineeringBiologyNumerical methods in inverse problemsMicrowave Imaging and Scattering AnalysisUltrasonics and Acoustic Wave Propagation