Lower part of the spectrum for the two-dimensional Schrodinger operator periodic in one variable and application to quantum dimers
Publication year
2016Source
Theoretical and Mathematical Physics, 188, 2, (2016), pp. 1210-1235ISSN
Publication type
Article / Letter to editor
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Organization
Theory of Condensed Matter
Journal title
Theoretical and Mathematical Physics
Volume
vol. 188
Issue
iss. 2
Page start
p. 1210
Page end
p. 1235
Subject
Theory of Condensed MatterAbstract
We study the semiclassical asymptotic approximation of the spectrum of the two-dimensional Schrodinger operator with a potential periodic in x and increasing at infinity in y. We show that the lower part of the spectrum has a band structure (where bands can overlap) and calculate their widths and dispersion relations between energy and quasimomenta. The key role in the obtained asymptotic approximation is played by librations, i.e., unstable periodic trajectories of the Hamiltonian system with an inverted potential. We also present an effective numerical algorithm for computing the widths of bands and discuss applications to quantum dimers.
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- Academic publications [246425]
- Electronic publications [134061]
- Faculty of Science [37995]
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