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Spectral analysis of the Half-Line Kronig-Penney model with Wigner-Von neumann perturbations. / Lotoreichik, Vladimir; Simonov, Sergey.
в: Reports on Mathematical Physics, Том 74, № 1, 01.08.2014, стр. 45-72.Результаты исследований: Научные публикации в периодических изданиях › статья › Рецензирование
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TY - JOUR
T1 - Spectral analysis of the Half-Line Kronig-Penney model with Wigner-Von neumann perturbations
AU - Lotoreichik, Vladimir
AU - Simonov, Sergey
PY - 2014/8/1
Y1 - 2014/8/1
N2 - The spectrum of the self-adjoint Schrödinger operator associated with the Kronig-Penney model on the half-line has a band-gap structure: its absolutely continuous spectrum consists of intervals (bands) separated by gaps. We show that if one changes strengths of interactions or locations of interaction centers by adding an oscillating and slowly decaying sequence which resembles the classical Wigner-von Neumann potential, then this structure of the absolutely continuous spectrum is preserved. At the same time in each spectral band precisely two critical points appear. At these points "instable" embedded eigenvalues may exist. We obtain locations of the critical points and discuss for each of them the possibility of an embedded eigenvalue to appear. We also show that the spectrum in gaps remains discrete.
AB - The spectrum of the self-adjoint Schrödinger operator associated with the Kronig-Penney model on the half-line has a band-gap structure: its absolutely continuous spectrum consists of intervals (bands) separated by gaps. We show that if one changes strengths of interactions or locations of interaction centers by adding an oscillating and slowly decaying sequence which resembles the classical Wigner-von Neumann potential, then this structure of the absolutely continuous spectrum is preserved. At the same time in each spectral band precisely two critical points appear. At these points "instable" embedded eigenvalues may exist. We obtain locations of the critical points and discuss for each of them the possibility of an embedded eigenvalue to appear. We also show that the spectrum in gaps remains discrete.
KW - Asymptotic integration
KW - Compact perturbations
KW - Discrete linear systems
KW - Embedded eigenvalues
KW - Kronig-Penney model
KW - Point interactions
KW - Subordinacy theory
KW - Wigner-von Neumann potentials
UR - http://www.scopus.com/inward/record.url?scp=84921944540&partnerID=8YFLogxK
U2 - 10.1016/S0034-4877(14)60057-4
DO - 10.1016/S0034-4877(14)60057-4
M3 - Article
AN - SCOPUS:84921944540
VL - 74
SP - 45
EP - 72
JO - Reports on Mathematical Physics
JF - Reports on Mathematical Physics
SN - 0034-4877
IS - 1
ER -
ID: 9366362