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Inverse Eigenvalue Problems for Perturbed Spherical Schroedinger Operators

arXiv:1004.4175 · doi:10.1088/0266-5611/26/10/105013

Abstract

We investigate the eigenvalues of perturbed spherical Schrödinger operators under the assumption that the perturbation $q(x)$ satisfies $x q(x) \in L^1(0,1)$. We show that the square roots of eigenvalues are given by the square roots of the unperturbed eigenvalues up to an decaying error depending on the behavior of $q(x)$ near $x=0$. Furthermore, we provide sets of spectral data which uniquely determine $q(x)$.

14 pages