2001
DOI: 10.1088/0305-4470/34/28/305
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Spectral equivalences, Bethe ansatz equations, and reality properties in 𝒫𝒯-symmetric quantum mechanics

Abstract: The one-dimensional Schrödinger equation for the potential x 6 + αx 2 + l(l + 1)/x 2 has many interesting properties. For certain values of the parameters l and α the equation is in turn supersymmetric (Witten), quasi-exactly solvable (Turbiner), and it also appears in Lipatov's approach to high energy QCD. In this paper we signal some further curious features of these theories, namely novel spectral equivalences with particular second-and third-order differential equations. These relationships are obtained vi… Show more

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Cited by 532 publications
(660 citation statements)
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“…Here, P denotes the spatial reflection p → −p and x → −x, and T denotes the time reversal p → −p, x → x, and i → −i. Many PT -symmetric quantum-mechanical Hamiltonians have been studied in the recent literature [3,4,5,6]. However, the Hamiltonian (1) is special because when g = 0 the boundary conditions on the eigenfunctions may be imposed on the real-x axis, as opposed to the interior of a wedge in the complex-x plane, as we will now show: The quantization condition satisfied by the eigenfunctions requires that ψ n (x) must vanish exponentially in a pair of wedges in the complex-x plane.…”
mentioning
confidence: 99%
“…Here, P denotes the spatial reflection p → −p and x → −x, and T denotes the time reversal p → −p, x → x, and i → −i. Many PT -symmetric quantum-mechanical Hamiltonians have been studied in the recent literature [3,4,5,6]. However, the Hamiltonian (1) is special because when g = 0 the boundary conditions on the eigenfunctions may be imposed on the real-x axis, as opposed to the interior of a wedge in the complex-x plane, as we will now show: The quantization condition satisfied by the eigenfunctions requires that ψ n (x) must vanish exponentially in a pair of wedges in the complex-x plane.…”
mentioning
confidence: 99%
“…The Schwinger model may be solved exactly, and exhibits a violation of unitarity, as was discussed in detail in [12]. Thus, it appears that there are problems with unitarity not only in (PT QED) 2,4 , but also in any quantum mechanical system. Analytic properties required by the probability considerations and the Euclidean postulate seem to be generically violated.…”
Section: Discussionmentioning
confidence: 92%
“…Theories [2] and proved in 2001 [3,4]. There remained the question of unitarity or probability conservation, and that was established in the following year [5].…”
Section: Introductionmentioning
confidence: 99%
“…The spectrum of H c is shown in Figure 1. It was shown in [DDT01] that the spectrum of H c is real and positive. Moreover, H c is closed and has compact resolvent [CGM80,Mez01] so the spectrum is also discrete.…”
Section: Non-selfadjoint Operators and Pseudospectramentioning
confidence: 99%