Formalism of a harmonic oscillator in the future-included complex action theory

Abstract

In a special representation of complex action theory that we call ``future-included'', we study a harmonic oscillator model defined with a non-normal Hamiltonian H, in which a mass m and an angular frequency ω are taken to be complex numbers. In order for the model to be sensible some restrictions on m and ω are required. We draw a phase diagram in the plane of the arguments of m and ω, according to which the model is classified into several types. In addition, we formulate two pairs of annihilation and creation operators, two series of eigenstates of the Hamiltonians H and H, and coherent states. They are normalized in a modified inner product IQ, with respect to which the Hamiltonian H becomes normal. Furthermore, applying to the model the maximization principle that we previously proposed, we obtain an effective theory described by a Hamiltonian that is Q-Hermitian, i.e. Hermitian with respect to the modified inner product IQ. The generic solution to the model is found to be the ``ground'' state. Finally we discuss what the solution implies.