Criteria for embedded eigenvalues for discrete Schr\"odinger operators
Abstract
In this paper, we consider discrete Schr\"odinger operators of the form, \begin{equation*} (Hu)(n)= u({n+1})+u({n-1})+V(n)u(n). \end{equation*} We view as a perturbation of the free operator , where . For (no perturbation), and does not have eigenvalues embedded into . It is an interesting and important problem to identify the perturbation such that the operator has one eigenvalue (finitely many eigenvalues or countable eigenvalues) embedded into . We introduce the {\it almost sign type potential } and develop the Pr\"ufer transformation to address this problem, which leads to the following five results. \begin{description} \item[1] We obtain the sharp spectral transition for the existence of irrational type eigenvalues or rational type eigenvalues with even denominator. \item[2] Suppose We obtain a lower/upper bound of such that has one rational type eigenvalue with odd denominator. \item[3] We obtain the asymptotical behavior of embedded eigenvalues around the boundaries of . \item [4]Given any finite set of points in with , we construct potential such that has eigenvalues . \item[5]Given any countable set of points in with , and any function going to infinity arbitrarily slowly, we construct potential such that has eigenvalues . \end{description}
Cite
@article{arxiv.1805.02817,
title = {Criteria for embedded eigenvalues for discrete Schr\"odinger operators},
author = {Wencai Liu},
journal= {arXiv preprint arXiv:1805.02817},
year = {2021}
}