Boundary Reconstruction for the Anisotropic Fractional Calder\'on Problem

Abstract

In this article, we provide a boundary reconstruction result for the anisotropic fractional Calder\'on problem and its associated degenerate elliptic extension into the upper half plane. More precisely, considering the setting from FGKU21, we show that the metric on the measurement set can be reconstructed from the source-to-solution data. To this end, we rely on the approach by Brown B01 in the framework developed in NT01 (see also KY02) after localizing the problem by considering it through an extension perspective.

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