{"title":"Uniform Spectral Asymptotics for the Schrödinger Operator with Translation in Free Term and Periodic Boundary Conditions","authors":"D.I. Borisov, D.M. Polyakov","doi":"10.1134/S1061920825600552","DOIUrl":null,"url":null,"abstract":"<p> We consider a nonlocal Schrödinger operator on the interval <span>\\((0,2\\pi)\\)</span> with the periodic boundary conditions and a translation in the free term. The value of the translation is denoted by <span>\\(a\\)</span> and is treated as a parameter. We show that the resolvent of such an operator is Hölder continuous in this parameter with the exponent <span>\\(\\frac{1}{2},\\)</span> the spectrum of this operator consists of infinitely many discrete eigenvalues accumulating at infinity, and all eigenvalues are continuous in <span>\\(a\\in[0,2\\pi]\\)</span> and coincide for <span>\\(a=0\\)</span> and <span>\\(a=2\\pi.\\)</span> Our main result is a uniform spectral asymptotics for the operator under consideration. Namely, we show that sufficiently large eigenvalues separate into pairs, each is located in the vicinity of the point <span>\\(n^2,\\)</span> where <span>\\(n\\)</span> in the index counting the eigenvalues, and we find a four-term asymptotics for these eigenvalues for large <span>\\(n\\)</span> with the error term of order <span>\\(O(n^{-3})\\)</span>, and this term is uniform with respect to <span>\\(a.\\)</span> We also discuss nontrivial high-frequency phenomena demonstrated by the uniform spectral asymptotics we have found. </p><p> <b> DOI</b> 10.1134/S1061920825600552 </p>","PeriodicalId":763,"journal":{"name":"Russian Journal of Mathematical Physics","volume":"32 3","pages":"434 - 450"},"PeriodicalIF":1.5000,"publicationDate":"2025-09-29","publicationTypes":"Journal Article","fieldsOfStudy":null,"isOpenAccess":false,"openAccessPdf":"","citationCount":"0","resultStr":null,"platform":"Semanticscholar","paperid":null,"PeriodicalName":"Russian Journal of Mathematical Physics","FirstCategoryId":"101","ListUrlMain":"https://link.springer.com/article/10.1134/S1061920825600552","RegionNum":3,"RegionCategory":"物理与天体物理","ArticlePicture":[],"TitleCN":null,"AbstractTextCN":null,"PMCID":null,"EPubDate":"","PubModel":"","JCR":"Q2","JCRName":"PHYSICS, MATHEMATICAL","Score":null,"Total":0}
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Abstract
We consider a nonlocal Schrödinger operator on the interval \((0,2\pi)\) with the periodic boundary conditions and a translation in the free term. The value of the translation is denoted by \(a\) and is treated as a parameter. We show that the resolvent of such an operator is Hölder continuous in this parameter with the exponent \(\frac{1}{2},\) the spectrum of this operator consists of infinitely many discrete eigenvalues accumulating at infinity, and all eigenvalues are continuous in \(a\in[0,2\pi]\) and coincide for \(a=0\) and \(a=2\pi.\) Our main result is a uniform spectral asymptotics for the operator under consideration. Namely, we show that sufficiently large eigenvalues separate into pairs, each is located in the vicinity of the point \(n^2,\) where \(n\) in the index counting the eigenvalues, and we find a four-term asymptotics for these eigenvalues for large \(n\) with the error term of order \(O(n^{-3})\), and this term is uniform with respect to \(a.\) We also discuss nontrivial high-frequency phenomena demonstrated by the uniform spectral asymptotics we have found.
期刊介绍:
Russian Journal of Mathematical Physics is a peer-reviewed periodical that deals with the full range of topics subsumed by that discipline, which lies at the foundation of much of contemporary science. Thus, in addition to mathematical physics per se, the journal coverage includes, but is not limited to, functional analysis, linear and nonlinear partial differential equations, algebras, quantization, quantum field theory, modern differential and algebraic geometry and topology, representations of Lie groups, calculus of variations, asymptotic methods, random process theory, dynamical systems, and control theory.
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