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SIGMA 7 (2011), 111, 19 pages arXiv:1107.5911
https://doi.org/10.3842/SIGMA.2011.111
Contribution to the Proceedings of the Workshop “Supersymmetric Quantum Mechanics and Spectral Design”
Resolutions of Identity for Some Non-Hermitian Hamiltonians. I. Exceptional Point in Continuous Spectrum
Alexander A. Andrianov a, b and Andrey V. Sokolov a
a) V.A. Fock Department of Theoretical Physics, Sankt-Petersburg State University, 198504 St. Petersburg, Russia
b) ICCUB, Universitat de Barcelona, 08028 Barcelona, Spain
Received August 06, 2011, in final form November 25, 2011; Published online December 05, 2011
Abstract
Resolutions of identity for certain non-Hermitian
Hamiltonians constructed from biorthogonal sets of their
eigen- and associated functions are given for the spectral problem defined on entire
axis. Non-Hermitian Hamiltonians under consideration possess the
continuous spectrum and the following peculiarities are
investigated: (1) the case when there is
an exceptional point of arbitrary multiplicity situated on a boundary of continuous spectrum;
(2) the case when there is an exceptional point
situated inside of continuous spectrum. The reductions of
the derived resolutions of identity under narrowing of the classes of employed
test functions are revealed. It is shown that in the case (1) some of
associated functions included into the resolution of identity are
normalizable and some of them may be not and in the case (2) the bounded associated
function corresponding to the exceptional point does
not belong to the physical state space. Spectral properties of a SUSY partner
Hamiltonian for the Hamiltonian with an exceptional point are examined.
Key words:
non-Hermitian quantum mechanics; supersymmetry; exceptional points; resolution of identity.
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