Inverse problem in energy-dependent potentials using semiclassical methods
Abstract
Wave equations with energy-dependent potentials appear in many areas of physics, ranging from nuclear physics to black hole perturbation theory. In this work, we use the semi-classical WKB method to first revisit the computation of bound states of potential wells and reflection/transmission coefficients in terms of the Bohr-Sommerfeld rule and the Gamow formula. We then discuss the inverse problem, in which the latter observables are used as a starting point to reconstruct the properties of the potentials. By extending known inversion techniques to energy-dependent potentials, we demonstrate that so-called width-equivalent or WKB-equivalent potentials are not isospectral anymore. Instead, we explicitly demonstrate that constructing quasi-isospectral potentials with the inverse techniques is still possible. Those reconstructed, energy-independent potentials share key properties with the width-equivalent potentials. We report that including energy-dependent terms allows for a rich phenomenology, particularly for the energy-independent equivalent potentials.
Cite
@article{arxiv.2404.11478,
title = {Inverse problem in energy-dependent potentials using semiclassical methods},
author = {Saulo Albuquerque and Sebastian H. Völkel and Kostas D. Kokkotas},
journal= {arXiv preprint arXiv:2404.11478},
year = {2024}
}
Comments
12 pages, 11 figures