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Application of a mild data-driven technique to Lippmann–Schwinger inverse scattering in variable-exponent Lebesgue spaces for microwave imaging

Claudio Estatico, Valentina Schenone, Alessandro Fedeli, Andrea Randazzo

2024Inverse Problems10 citationsDOIOpen Access PDF

Abstract

Abstract A mild data-driven approach for microwave imaging is considered in this paper. In particular, the developed technique relies upon the use of a Newton-type inversion scheme in variable-exponent Lebesgue spaces, which has been modified by including a data-driven operator to enforce the available a-priori information about the class of targets to be investigated. In this way, the performance of the method is improved, and the problems related to the possible convergence to local minima are mitigated. The effectiveness of the approach has been evaluated through numerical simulations involving the detection of defects inside (partially) known objects, showing good results.

Topics & Concepts

MathematicsLp spaceMicrowave imagingInverse scattering problemA priori and a posterioriMaxima and minimaExponentMicrowaveInversion (geology)InverseLebesgue integrationVariable (mathematics)Inverse problemConvergence (economics)Mathematical analysisApplied mathematicsGeometryBanach spacePhysicsQuantum mechanicsBiologyPhilosophyEconomicsStructural basinLinguisticsEpistemologyEconomic growthPaleontologyMicrowave Imaging and Scattering AnalysisNumerical methods in inverse problemsGeophysical Methods and Applications
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