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Non-isospectrality of the generalized Swanson Hamiltonian and harmonic oscillator

Published 5 Jan 2011 in quant-ph, math-ph, math.MP, and math.SP | (1101.1040v1)

Abstract: The generalized Swanson Hamiltonian $H_{GS} = w (\tilde{a}\tilde{a}\dag+ 1/2) + \alpha \tilde{a}2 + \beta \tilde{a}{\dag2}$ with $\tilde{a} = A(x)d/dx + B(x)$, can be transformed into an equivalent Hermitian Hamiltonian with the help of a similarity transformation. It is shown that the equivalent Hermitian Hamiltonian can be further transformed into the harmonic oscillator Hamiltonian so long as $[\tilde{a},\tilde{a}\dag]=$ constant. However, the main objective of this paper is to show that though the commutator of $\tilde{a}$ and $\tilde{a}\dag$ is constant, the generalized Swanson Hamiltonian is not necessarily isospectral to the harmonic oscillator. Reason for this anomaly is discussed in the frame work of position dependent mass models by choosing $A(x)$ as the inverse square root of the mass function.

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