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Threshold resonances and virtual levels in the spectrum of cylindrical and periodic waveguides

We describe and classify the thresholds of the continuous spectrum and the resulting resonances for general formally self-adjoint elliptic systems of second-order differential equations with Dirichlet or Neumann boundary conditions in domains with cylindrical and periodic outlets to infinity (in wav...

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Published in:	Izvestiya. Mathematics 2020-12, Vol.84 (6), p.1105-1160
Main Author:	Nazarov, S. A.
Format:	Article
Language:	English
Subjects:	almost standing waves Boundary conditions Differential equations Dirichlet or Neumann boundary conditions Dirichlet problem Eigenvalues Eigenvectors elliptic systems Infinity Mathematical analysis Operators (mathematics) Polynomials self-adjoint extensions of differential operators spaces with separated asymptotic conditions Standing waves threshold resonances Thresholds thresholds of continuous spectrum virtual levels Waveguides
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container_title	Izvestiya. Mathematics
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creator	Nazarov, S. A.
description	We describe and classify the thresholds of the continuous spectrum and the resulting resonances for general formally self-adjoint elliptic systems of second-order differential equations with Dirichlet or Neumann boundary conditions in domains with cylindrical and periodic outlets to infinity (in waveguides). These resonances arise because there are "almost standing" waves, that is, non-trivial solutions of the homogeneous problem which do not transmit energy. We consider quantum, acoustic, and elastic waveguides as examples. Our main focus is on degenerate thresholds which are characterized by the presence of standing waves with polynomial growth at infinity and produce effects lacking for ordinary thresholds. In particular, we describe the effect of lifting an eigenvalue from the degenerate zero threshold of the spectrum. This effect occurs for elastic waveguides of a vector nature and is absent from the scalar problems for cylindrical acoustic and quantum waveguides. Using the technique of self-adjoint extensions of differential operators in weighted spaces, we interpret the almost standing waves as eigenvectors of certain operators and the threshold as the corresponding eigenvalue. Here the threshold eigenvalues and the corresponding vector-valued functions not decaying at infinity can be obtained by approaching the threshold (the virtual level) either from below or from above. Hence their properties differ essentially from the customary ones. We state some open problems.
doi_str_mv	10.1070/IM8928
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A.</creator><creatorcontrib>Nazarov, S. A.</creatorcontrib><description>We describe and classify the thresholds of the continuous spectrum and the resulting resonances for general formally self-adjoint elliptic systems of second-order differential equations with Dirichlet or Neumann boundary conditions in domains with cylindrical and periodic outlets to infinity (in waveguides). These resonances arise because there are "almost standing" waves, that is, non-trivial solutions of the homogeneous problem which do not transmit energy. We consider quantum, acoustic, and elastic waveguides as examples. Our main focus is on degenerate thresholds which are characterized by the presence of standing waves with polynomial growth at infinity and produce effects lacking for ordinary thresholds. In particular, we describe the effect of lifting an eigenvalue from the degenerate zero threshold of the spectrum. This effect occurs for elastic waveguides of a vector nature and is absent from the scalar problems for cylindrical acoustic and quantum waveguides. Using the technique of self-adjoint extensions of differential operators in weighted spaces, we interpret the almost standing waves as eigenvectors of certain operators and the threshold as the corresponding eigenvalue. Here the threshold eigenvalues and the corresponding vector-valued functions not decaying at infinity can be obtained by approaching the threshold (the virtual level) either from below or from above. Hence their properties differ essentially from the customary ones. We state some open problems.</description><identifier>ISSN: 1064-5632</identifier><identifier>EISSN: 1468-4810</identifier><identifier>DOI: 10.1070/IM8928</identifier><language>eng</language><publisher>Providence: London Mathematical Society, Turpion Ltd and the Russian Academy of Sciences</publisher><subject>almost standing waves ; Boundary conditions ; Differential equations ; Dirichlet or Neumann boundary conditions ; Dirichlet problem ; Eigenvalues ; Eigenvectors ; elliptic systems ; Infinity ; Mathematical analysis ; Operators (mathematics) ; Polynomials ; self-adjoint extensions of differential operators ; spaces with separated asymptotic conditions ; Standing waves ; threshold resonances ; Thresholds ; thresholds of continuous spectrum ; virtual levels ; Waveguides</subject><ispartof>Izvestiya. Mathematics, 2020-12, Vol.84 (6), p.1105-1160</ispartof><rights>2020 RAS(DoM) and LMS</rights><rights>Copyright IOP Publishing Dec 2020</rights><lds50>peer_reviewed</lds50><woscitedreferencessubscribed>false</woscitedreferencessubscribed><citedby>FETCH-LOGICAL-c278t-17be4df634c439f6cda3e3d90364570085b721e011657be274a151fddb0bbbe43</citedby><cites>FETCH-LOGICAL-c278t-17be4df634c439f6cda3e3d90364570085b721e011657be274a151fddb0bbbe43</cites></display><links><openurl>$$Topenurl_article</openurl><openurlfulltext>$$Topenurlfull_article</openurlfulltext><thumbnail>$$Tsyndetics_thumb_exl</thumbnail><link.rule.ids>314,780,784,27924,27925</link.rule.ids></links><search><creatorcontrib>Nazarov, S. A.</creatorcontrib><title>Threshold resonances and virtual levels in the spectrum of cylindrical and periodic waveguides</title><title>Izvestiya. Mathematics</title><addtitle>IZV</addtitle><addtitle>Izv. Math</addtitle><description>We describe and classify the thresholds of the continuous spectrum and the resulting resonances for general formally self-adjoint elliptic systems of second-order differential equations with Dirichlet or Neumann boundary conditions in domains with cylindrical and periodic outlets to infinity (in waveguides). These resonances arise because there are "almost standing" waves, that is, non-trivial solutions of the homogeneous problem which do not transmit energy. We consider quantum, acoustic, and elastic waveguides as examples. Our main focus is on degenerate thresholds which are characterized by the presence of standing waves with polynomial growth at infinity and produce effects lacking for ordinary thresholds. In particular, we describe the effect of lifting an eigenvalue from the degenerate zero threshold of the spectrum. This effect occurs for elastic waveguides of a vector nature and is absent from the scalar problems for cylindrical acoustic and quantum waveguides. Using the technique of self-adjoint extensions of differential operators in weighted spaces, we interpret the almost standing waves as eigenvectors of certain operators and the threshold as the corresponding eigenvalue. Here the threshold eigenvalues and the corresponding vector-valued functions not decaying at infinity can be obtained by approaching the threshold (the virtual level) either from below or from above. Hence their properties differ essentially from the customary ones. We state some open problems.</description><subject>almost standing waves</subject><subject>Boundary conditions</subject><subject>Differential equations</subject><subject>Dirichlet or Neumann boundary conditions</subject><subject>Dirichlet problem</subject><subject>Eigenvalues</subject><subject>Eigenvectors</subject><subject>elliptic systems</subject><subject>Infinity</subject><subject>Mathematical analysis</subject><subject>Operators (mathematics)</subject><subject>Polynomials</subject><subject>self-adjoint extensions of differential operators</subject><subject>spaces with separated asymptotic conditions</subject><subject>Standing waves</subject><subject>threshold resonances</subject><subject>Thresholds</subject><subject>thresholds of continuous spectrum</subject><subject>virtual levels</subject><subject>Waveguides</subject><issn>1064-5632</issn><issn>1468-4810</issn><fulltext>true</fulltext><rsrctype>article</rsrctype><creationdate>2020</creationdate><recordtype>article</recordtype><recordid>eNpd0E1Lw0AQBuBFFKxVf8Oi4C2630mPUqwWKl7q1bDZndgtaTbuJpX-e7dEEDy9c3hmBl6Erim5pyQnD8vXYsaKEzShQhWZKCg5TTNRIpOKs3N0EeOWECIE5RP0sd4EiBvfWJzSt7o1ELFuLd670A-6wQ3soYnYtbjfAI4dmD4MO-xrbA6Na21wJqnjRgfBeesM_tZ7-BychXiJzmrdRLj6zSl6Xzyt5y_Z6u15OX9cZYblRZ_RvAJha8WFEXxWK2M1B25nhCshc0IKWeWMAqFUyURZLjSVtLa2IlWVVvkU3Y53u-C_Boh9ufVDaNPLkolcUsqk4EndjcoEH2OAuuyC2-lwKCkpj92VY3cJ3ozQ-e7v0j_0A6tWbCY</recordid><startdate>202012</startdate><enddate>202012</enddate><creator>Nazarov, S. A.</creator><general>London Mathematical Society, Turpion Ltd and the Russian Academy of Sciences</general><general>IOP Publishing</general><scope>AAYXX</scope><scope>CITATION</scope><scope>7SC</scope><scope>7TB</scope><scope>7U5</scope><scope>8FD</scope><scope>FR3</scope><scope>H8D</scope><scope>JQ2</scope><scope>KR7</scope><scope>L7M</scope><scope>L~C</scope><scope>L~D</scope></search><sort><creationdate>202012</creationdate><title>Threshold resonances and virtual levels in the spectrum of cylindrical and periodic waveguides</title><author>Nazarov, S. 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A.</creatorcontrib><collection>CrossRef</collection><collection>Computer and Information Systems Abstracts</collection><collection>Mechanical & Transportation Engineering Abstracts</collection><collection>Solid State and Superconductivity Abstracts</collection><collection>Technology Research Database</collection><collection>Engineering Research Database</collection><collection>Aerospace Database</collection><collection>ProQuest Computer Science Collection</collection><collection>Civil Engineering Abstracts</collection><collection>Advanced Technologies Database with Aerospace</collection><collection>Computer and Information Systems Abstracts Academic</collection><collection>Computer and Information Systems Abstracts Professional</collection><jtitle>Izvestiya. Mathematics</jtitle></facets><delivery><delcategory>Remote Search Resource</delcategory><fulltext>fulltext</fulltext></delivery><addata><au>Nazarov, S. A.</au><format>journal</format><genre>article</genre><ristype>JOUR</ristype><atitle>Threshold resonances and virtual levels in the spectrum of cylindrical and periodic waveguides</atitle><jtitle>Izvestiya. Mathematics</jtitle><stitle>IZV</stitle><addtitle>Izv. Math</addtitle><date>2020-12</date><risdate>2020</risdate><volume>84</volume><issue>6</issue><spage>1105</spage><epage>1160</epage><pages>1105-1160</pages><issn>1064-5632</issn><eissn>1468-4810</eissn><abstract>We describe and classify the thresholds of the continuous spectrum and the resulting resonances for general formally self-adjoint elliptic systems of second-order differential equations with Dirichlet or Neumann boundary conditions in domains with cylindrical and periodic outlets to infinity (in waveguides). These resonances arise because there are "almost standing" waves, that is, non-trivial solutions of the homogeneous problem which do not transmit energy. We consider quantum, acoustic, and elastic waveguides as examples. Our main focus is on degenerate thresholds which are characterized by the presence of standing waves with polynomial growth at infinity and produce effects lacking for ordinary thresholds. In particular, we describe the effect of lifting an eigenvalue from the degenerate zero threshold of the spectrum. This effect occurs for elastic waveguides of a vector nature and is absent from the scalar problems for cylindrical acoustic and quantum waveguides. Using the technique of self-adjoint extensions of differential operators in weighted spaces, we interpret the almost standing waves as eigenvectors of certain operators and the threshold as the corresponding eigenvalue. Here the threshold eigenvalues and the corresponding vector-valued functions not decaying at infinity can be obtained by approaching the threshold (the virtual level) either from below or from above. Hence their properties differ essentially from the customary ones. We state some open problems.</abstract><cop>Providence</cop><pub>London Mathematical Society, Turpion Ltd and the Russian Academy of Sciences</pub><doi>10.1070/IM8928</doi><tpages>56</tpages></addata></record>
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source	Institute of Physics
subjects	almost standing waves Boundary conditions Differential equations Dirichlet or Neumann boundary conditions Dirichlet problem Eigenvalues Eigenvectors elliptic systems Infinity Mathematical analysis Operators (mathematics) Polynomials self-adjoint extensions of differential operators spaces with separated asymptotic conditions Standing waves threshold resonances Thresholds thresholds of continuous spectrum virtual levels Waveguides
title	Threshold resonances and virtual levels in the spectrum of cylindrical and periodic waveguides
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