On the Pseudo-Hermiticity of a Class of PT-Symmetric Hamiltonians in One Dimension
Abstract
For a given standard Hamiltonian H=[p-A(x)]2/(2m)+V(x) with arbitrary complex scalar potential V and vector potential A, with x real, we construct an invertible antilinear operator τ such that H is τ-anti-pseudo-Hermitian, i.e., H=τ Hτ-1. We use this result to give the explicit form of a linear Hermitian invertible operator with respect to which any standard PT-symmetric Hamiltonian with a real degree of freedom is pseudo-Hermitian. Our results do not make use of the assumption that H is diagonalizable or that its spectrum is discrete.
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