The authors obtain the first stability estimates for the principal part of the isotropic fractional Calderón problem with exterior data by quantitatively transferring uniqueness from the local case via unique continuation and Runge approximation.
The C alder \'o n problem for nonlocal operators
2 Pith papers cite this work. Polarity classification is still indexing.
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Partial data from fractional random walks on finite graphs determines a gauge class of the transition matrix and allows recovery of the graph and conductivity when the matrix is known.
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On the transfer of stability from the local to the fractional anisotropic Calder\'on problem with exterior measurements
The authors obtain the first stability estimates for the principal part of the isotropic fractional Calderón problem with exterior data by quantitatively transferring uniqueness from the local case via unique continuation and Runge approximation.
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An inverse problem for fractional random walks on finite graphs
Partial data from fractional random walks on finite graphs determines a gauge class of the transition matrix and allows recovery of the graph and conductivity when the matrix is known.