Finite-dimensional pseudo-bosons: a non-Hermitian version of the truncated harmonic oscillator

Abstract

We propose a deformed version of the commutation rule introduced in 1967 by Buchdahl to describe a particular model of the truncated harmonic oscillator. The rule we consider is defined on a N-dimensional Hilbert space N, and produces two biorhogonal bases of N which are eigenstates of the Hamiltonians h=12(q2+p2), and of its adjoint h. Here q and p are non-Hermitian operators obeying [q,p]=i(\1-Nk), where k is a suitable orthogonal projection operator. These eigenstates are connected by ladder operators constructed out of q, p, q and p. Some examples are discussed.