A regular analogue of the Smilansky model: Spectral properties. Issue 2 (October 2017)

Record Type:
Journal Article
Title:
A regular analogue of the Smilansky model: Spectral properties. Issue 2 (October 2017)
Main Title:
A regular analogue of the Smilansky model: Spectral properties
Authors:
Barseghyan, Diana
Exner, Pavel
Abstract:
Abstract : We analyze spectral properties of the operator H = ∂ 2 / ∂x 2 — ∂ 2 / ∂y 2 + ω 2 y 2 – λy 2 V ( xy ) in L 2 (ℝ 2 ), where ω ≠ 0 and V ≥ 0 is a compactly supported and sufficiently regular potential. It is known that the spectrum of H depends on the one-dimensional Schrödinger operator L = — d 2 / dx 2 + ω 2 — λV ( x ) and it changes substantially as infσ( L ) switches sign. We prove that in the critical case, infσ( L ) = 0, the spectrum of H is purely essential and covers the interval [0, ∞). In the subcritical case, inf σ ( L ) > 0, the essential spectrum starts from ω and there is a nonvoid discrete spectrum in the interval [0, ω ). We also derive a bound on the corresponding eigenvalue moments.
Is Part Of:
Reports on mathematical physics. Volume 80:Issue 2(2017)
Journal:
Reports on mathematical physics
Issue:
Volume 80:Issue 2(2017)
Issue Display:
Volume 80, Issue 2 (2017)
Year:
2017
Volume:
80
Issue:
2
Issue Sort Value:
2017-0080-0002-0000
Page Start:
177
Page End:
192
Publication Date:
2017-10
Subjects:
discrete spectrum -- eigenvalue estimates -- Smilansky model -- spectral transition
Mathematical physics -- Periodicals
Physique mathématique -- Périodiques
530.15
Journal URLs:
http://www.sciencedirect.com/science/journal/00344877
http://www.elsevier.com/journals
http://www.journals.elsevier.com/reports-on-mathematical-physics/
DOI:
10.1016/S0034-4877(17)30075-7
Languages:
English
ISSNs:
0034-4877
Deposit Type:
Legaldeposit
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Physical Locations:
British Library DSC - 7660.510000
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