Twin Hamiltonians, three types of the Dyson maps, and the probabilistic interpretation problem in quasi-Hermitian quantum mechanics
Abstract
In the framework of the so-called quasi-Hermitian quantum mechanics of stationary unitary systems, bound states are usually constructed as eigenstates |n of a Hamiltonian operator H with real spectrum which is non-Hermitian, H ≠ H. One of the ways of the standard probabilistic interpretation of such systems consists in a transformation of H into its isospectral Hermitian ``twin" h= h via one of the so-called Dyson maps : H h. Naturally, the well known ambiguity of these H-dependent Dyson-map transformations implies also an ambiguity of the physical, -dependent probabilistic and experimental interpretation of the system in question. In the present paper, an exhaustive classification of all of the eligible H-dependent Dyson maps =(H) is provided, implying also a systematic framework for a specification of all of the possible probabilistic interpretations of the quantum system characterized by a preselected H.
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