PT-symmetric quantum field theory in D dimensions

Abstract

PT-symmetric quantum mechanics began with a study of the Hamiltonian H=p2+x2(ix). A surprising feature of this non-Hermitian Hamiltonian is that its eigenvalues are discrete, real, and positive when ≥0. This paper examines the corresponding quantum-field-theoretic Hamiltonian H=12(∇φ)2+12φ2(iφ) in D-dimensional spacetime, where φ is a pseudoscalar field. It is shown how to calculate the Green's functions as series in powers of directly from the Euclidean partition function. Exact finite expressions for the vacuum energy density, all of the connected n-point Green's functions, and the renormalized mass to order are derived for 0≤ D<2. For D≥2 the one-point Green's function and the renormalized mass are divergent, but perturbative renormalization can be performed. The remarkable spectral properties of PT-symmetric quantum mechanics appear to persist in PT-symmetric quantum field theory.