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Autori principali: Das, Saumyajit, Ghosh, Tuhin
Natura: Preprint
Pubblicazione: 2025
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Accesso online:https://arxiv.org/abs/2508.06998
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author Das, Saumyajit
Ghosh, Tuhin
author_facet Das, Saumyajit
Ghosh, Tuhin
contents In this article, we investigate the fractional Borg-Levinson problem, an inverse spectral problem focused on recovering potentials from boundary spectral data. We demonstrate that the potential can, in fact, be uniquely determined by this data. However, for technical reasons, we restrict the fractional exponent to the interval (0.5, 1). Additionally, we assume that at least one of the potentials is small, non-negative, and exhibits mild growth. The smallness condition is made explicit in our calculations and depends only on the domain and the spatial dimension.
format Preprint
id arxiv_https___arxiv_org_abs_2508_06998
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Fractional Borg-Levinson Problem with small non-negative potential of small growth
Das, Saumyajit
Ghosh, Tuhin
Analysis of PDEs
35R30 35J10 35K10
In this article, we investigate the fractional Borg-Levinson problem, an inverse spectral problem focused on recovering potentials from boundary spectral data. We demonstrate that the potential can, in fact, be uniquely determined by this data. However, for technical reasons, we restrict the fractional exponent to the interval (0.5, 1). Additionally, we assume that at least one of the potentials is small, non-negative, and exhibits mild growth. The smallness condition is made explicit in our calculations and depends only on the domain and the spatial dimension.
title Fractional Borg-Levinson Problem with small non-negative potential of small growth
topic Analysis of PDEs
35R30 35J10 35K10
url https://arxiv.org/abs/2508.06998