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Learning nonlocal regularization operators

Gernot Holler, Karl Kunisch

2021Mathematical Control and Related Fields12 citationsDOIOpen Access PDF

Abstract

<p style='text-indent:20px;'>A learning approach for determining which operator from a class of nonlocal operators is optimal for the regularization of an inverse problem is investigated. The considered class of nonlocal operators is motivated by the use of squared fractional order Sobolev seminorms as regularization operators. First fundamental results from the theory of regularization with local operators are extended to the nonlocal case. Then a framework based on a bilevel optimization strategy is developed which allows to choose nonlocal regularization operators from a given class which i) are optimal with respect to a suitable performance measure on a training set, and ii) enjoy particularly favorable properties. Results from numerical experiments are also provided.</p>

Topics & Concepts

Regularization (linguistics)MathematicsSobolev spaceOperator (biology)Applied mathematicsBilevel optimizationInverse problemRegularization perspectives on support vector machinesInverseClass (philosophy)Proximal gradient methods for learningMathematical optimizationOptimization problemPure mathematicsMathematical analysisComputer scienceTikhonov regularizationArtificial intelligenceRepressorChemistryGeometryGeneBiochemistryTranscription factorNumerical methods in inverse problemsNumerical methods in engineeringFractional Differential Equations Solutions