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Criteria for embedded eigenvalues for discrete Schr\"odinger operators

Spectral Theory 2021-11-03 v1 Mathematical Physics math.MP

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 HH as a perturbation of the free operator H0H_0, where (H0u)(n)=u(n+1)+u(n1)(H_0u)(n)= u({n+1})+u({n-1}). For H0H_0 (no perturbation), σess(H0)=σac(H)=[2,2]\sigma_{\rm ess}(H_0)=\sigma_{\rm ac}(H)=[-2,2] and H0H_0 does not have eigenvalues embedded into (2,2)(-2,2). It is an interesting and important problem to identify the perturbation such that the operator H0+VH_0+V has one eigenvalue (finitely many eigenvalues or countable eigenvalues) embedded into (2,2)(-2,2). 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 lim supnnV(n)=a<.\limsup_{n\to \infty} n|V(n)|=a<\infty. We obtain a lower/upper bound of aa such that H0+VH_0+V has one rational type eigenvalue with odd denominator. \item[3] We obtain the asymptotical behavior of embedded eigenvalues around the boundaries of (2,2)(-2,2). \item [4]Given any finite set of points {Ej}j=1N\{ E_j\}_{j=1}^N in (2,2)(-2,2) with 0{Ej}j=1N+{Ej}j=1N0\notin \{ E_j\}_{j=1}^N+\{ E_j\}_{j=1}^N, we construct potential V(n)=O(1)1+nV(n)=\frac{O(1)}{1+|n|} such that H=H0+VH=H_0+V has eigenvalues {Ej}j=1N\{ E_j\}_{j=1}^N. \item[5]Given any countable set of points {Ej}\{ E_j\} in (2,2)(-2,2) with 0{Ej}+{Ej}0\notin \{ E_j\}+\{ E_j\}, and any function h(n)>0h(n)>0 going to infinity arbitrarily slowly, we construct potential V(n)h(n)1+n|V(n)|\leq \frac{h(n)}{1+|n|} such that H=H0+VH=H_0+V has eigenvalues {Ej}\{ E_j\}. \end{description}

Keywords

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}
}
R2 v1 2026-06-23T01:47:55.649Z