Quantum scattering near the lowest Landau threshold for a Schrödinger operator with a constant magnetic field : Sussex Research Online

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Melgaard, Michael (2003) Quantum scattering near the lowest Landau threshold for a Schrödinger operator with a constant magnetic field. Central European Journal of Mathematics, 1 (4). pp. 477-509. ISSN 1895-1074

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Official URL: http://dx.doi.org/10.2478/BF02475180

Abstract

For fixed magnetic quantum number $m$ results on spectral properties and scattering theory are given for the three-dimensional Schrödinger operator with a constant magnetic field and an axisymmetrical electric potential $V$.
In various, mostly fairly singular settings asymptotic expansions for the
resolvent of the Hamiltonian $H_{m}=H_{om}+V$ are deduced as the spectral
parameter tends to the lowest Landau threshold. Furthermore, scattering theory
for the pair $(H_{m}, H_{om})$ is established and asymptotic expansions of the
scattering matrix are derived as the energy parameter tends to the lowest
Landau threshold

Item Type:	Article
Keywords:	Near-threshold resolvent expansions; scattering matrix; auxiliary one-dimensional Schrödinger operator
Schools and Departments:	School of Mathematical and Physical Sciences > Mathematics
Subjects:	Q Science > QA Mathematics > QA0299 Analysis. Including analytical methods connected with physical problems
Related URLs:	Publisher
Depositing User:	Michael Melgaard
Date Deposited:	19 Sep 2013 13:27
Last Modified:	19 Sep 2013 13:27
URI:	http://srodev.sussex.ac.uk/id/eprint/46389

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