Application of Pseudo-Hermitian Quantum Mechanics to a Complex Scattering Potential with Point Interactions

Abstract

We present a generalization of the perturbative construction of the metric operator for non-Hermitian Hamiltonians with more than one perturbation parameter. We use this method to study the non-Hermitian scattering Hamiltonian: H=p2/2m+ζ-δ(x+a)+ζ+δ(x-a), where ζ and a are respectively complex and real parameters and δ(x) is the Dirac delta function. For regions in the space of coupling constants ζ where H is quasi-Hermitian and there are no complex bound states or spectral singularities, we construct a (positive-definite) metric operator η and the corresponding equivalent Hermitian Hamiltonian h. η turns out to be a (perturbatively) bounded operator for the cases that the imaginary part of the coupling constants have opposite sign, (ζ+) = -(ζ-). This in particular contains the PT-symmetric case: ζ+ = ζ-*. We also calculate the energy expectation values for certain Gaussian wave packets to study the nonlocal nature of or equivalently the non-Hermitian nature of . We show that these physical quantities are not directly sensitive to the presence of PT-symmetry.