A selection rule for transitions in PT-symmetric quantum theory

Lawrence R. Mead; David Garfinkle

doi:10.1063/1.4991032

AIP Advances (Aug 2017)

A selection rule for transitions in PT-symmetric quantum theory

Lawrence R. Mead,
David Garfinkle

Affiliations

Lawrence R. Mead: Dept. of Physics and Astronomy, University of Southern Mississippi, Hattiesburg, MS 39406, USA
David Garfinkle: Dept. of Physics, Oakland University, Rochester Hills, MI 48309 and Michigan Center for Theoretical Physics, Randall Laboratory of Physics, University of Michigan, Ann Arbor, MI 48109-1120, USA

DOI: https://doi.org/10.1063/1.4991032
Journal volume & issue: Vol. 7, no. 8
pp. 085001 – 085001-7

Abstract

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Carl Bender and collaborators have developed a quantum theory governed by Hamiltonians that are PT-symmetric rather than Hermitian. To implement this theory, the inner product was redefined to guarantee positive norms of eigenstates of the Hamiltonian. In the general case, which includes arbitrary time-dependence in the Hamiltonian, a modification of the Schrödinger equation is necessary as shown by Gong and Wang to conserve probability. In this paper, we derive the following selection rule: transitions induced by time dependence in a PT-symmetric Hamiltonian cannot occur between normalized states of differing PT-norm. We show three examples of this selection rule in action: two matrix models and one in the continuum.

Published in AIP Advances

ISSN: 2158-3226 (Online)
Publisher: AIP Publishing LLC
Country of publisher: United States
LCC subjects: Science: Physics
Website: http://aipadvances.aip.org/

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