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Main Author: Chen, Lung-Hui
Format: Preprint
Published: 2025
Subjects:
Online Access:https://arxiv.org/abs/2508.11103
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author Chen, Lung-Hui
author_facet Chen, Lung-Hui
contents We consider the inverse resonance problem in one-dimensional scattering theory. The scattering matrix consists of $2\times 2$ entries of meromorphic functions, which are quotients of certain Fourier transform. The resonances are expressed as the zeros of Fourier transform of wave field. For compactly-supported perturbation, we are able to quantitatively estimate the zeros and poles of each meromorphic entry. The size of potential support is connected to the zero distribution of scattered wave field. We derive the inverse stability on scattering source based on certain knowledge on the perturbation theory of resonances. When the resonances are distributed regularly, there is certain natural stability through the value distribution theory.
format Preprint
id arxiv_https___arxiv_org_abs_2508_11103
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Stability of Inverse Resonance Problem on the Half Line
Chen, Lung-Hui
Spectral Theory
Mathematical Physics
34B24/35P25/35R30
We consider the inverse resonance problem in one-dimensional scattering theory. The scattering matrix consists of $2\times 2$ entries of meromorphic functions, which are quotients of certain Fourier transform. The resonances are expressed as the zeros of Fourier transform of wave field. For compactly-supported perturbation, we are able to quantitatively estimate the zeros and poles of each meromorphic entry. The size of potential support is connected to the zero distribution of scattered wave field. We derive the inverse stability on scattering source based on certain knowledge on the perturbation theory of resonances. When the resonances are distributed regularly, there is certain natural stability through the value distribution theory.
title Stability of Inverse Resonance Problem on the Half Line
topic Spectral Theory
Mathematical Physics
34B24/35P25/35R30
url https://arxiv.org/abs/2508.11103