Nonunique C operator in PT Quantum Mechanics

Abstract

The three simultaneous algebraic equations, C2=1, [C,PT]=0, [C,H]=0, which determine the C operator for a non-Hermitian PT-symmetric Hamiltonian H, are shown to have a nonunique solution. Specifically, the C operator for the Hamiltonian H=1/2p2+1/2μ2q2+iε q3 is determined perturbatively to first order in ε and it is demonstrated that the C operator contains an infinite number of arbitrary parameters. For each different C operator, the corresponding equivalent isospectral Dirac-Hermitian Hamiltonian h is calculated.