RUS  ENG
Full version
JOURNALS // Nanosystems: Physics, Chemistry, Mathematics // Archive

Nanosystems: Physics, Chemistry, Mathematics, 2016 Volume 7, Issue 5, Pages 789–802 (Mi nano285)

This article is cited in 5 papers

On resonances and bound states of Smilansky Hamiltonian

P. Exner, V. Lotoreichik, M. Tater

Nuclear Physics Institute, Czech Academy of Sciences, 25068 Řež, Czech Republic

Abstract: We consider the self-adjoint Smilansky Hamiltonian H$_\varepsilon$ in L$^2(\mathbb{R}^2)$ associated with the formal differential expression $-\partial^2_x-1/2(\partial^2_y+y^2)-\sqrt2\varepsilon y\delta(x)$ in the sub-critical regime, $\varepsilon\in(0,1)$. We demonstrate the existence of resonances for H$_\varepsilon$ on a countable subfamily of sheets of the underlying Riemann surface whose distance from the physical sheet is finite. On such sheets, we find resonance free regions and characterize resonances for small $\varepsilon>0$. In addition, we refine the previously known results on the bound states of H$_\varepsilon$, in the weak coupling regime $(\varepsilon\to0+)$. In the proofs we use Birman–Schwinger principle for H$_\varepsilon$, elements of spectral theory for Jacobi matrices, and the analytic implicit function theorem.

Keywords: Smilansky Hamiltonian, resonances, resonance free region, weak coupling asymptotics, Riemann surface, bound states.

PACS: 02.30.Tb, 03.65.Db

Received: 01.07.2016
Revised: 28.07.2016

Language: English

DOI: 10.17586/2220-8054-2016-7-5-789-802



Bibliographic databases:


© Steklov Math. Inst. of RAS, 2024