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This article is cited in 12 scientific papers (total in 12 papers)
Discrete spectrum of cranked quantum and elastic waveguides
S. A. Nazarovabc a St. Petersburg State University, Universitetskii pr. 28, Staryi Peterhof, St. Petersburg, 198504, Russia
b Institute of Problems of Mechanical Engineering, Russian Academy of Sciences, Bolshoi pr. 61, V.O., St. Petersburg, 199178, Russia
c St. Petersburg State Polytechnical University, Politekhnicheskaya ul. 29, St. Petersburg, 195251, Russia
Abstract:
The spectrum of quantum and elastic waveguides in the form of a cranked strip is studied. In the Dirichlet spectral problem for the Laplacian (quantum waveguide), in addition to well-known results on the existence of isolated eigenvalues for any angle $\alpha$ at the corner, a priori lower bounds are established for these eigenvalues. It is explained why methods developed in the scalar case are frequently inapplicable to vector problems. For an elastic isotropic waveguide with a clamped boundary, the discrete spectrum is proved to be nonempty only for small or close-to-$\pi$ angles $\alpha$. The asymptotics of some eigenvalues are constructed. Elastic waveguides of other shapes are discussed.
Key words:
quantum and elastic waveguides, discrete spectrum, trapped modes, asymptotics of eigenvalues.
Received: 26.01.2015
Citation:
S. A. Nazarov, “Discrete spectrum of cranked quantum and elastic waveguides”, Zh. Vychisl. Mat. Mat. Fiz., 56:5 (2016), 879–895; Comput. Math. Math. Phys., 56:5 (2016), 864–880
Linking options:
https://www.mathnet.ru/eng/zvmmf10393 https://www.mathnet.ru/eng/zvmmf/v56/i5/p879
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Abstract page: | 263 | Full-text PDF : | 62 | References: | 57 | First page: | 8 |
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