PT-symmetric -g4 theory

Abstract

The scalar field theory with potential V()=12 m22-14 g4 (g>0) is ill defined as a Hermitian theory but in a non-Hermitian PT-symmetric framework it is well defined, and it has a positive real energy spectrum for the case of spacetime dimension D=1. While the methods used in the literature do not easily generalize to quantum field theory, in this paper the path-integral representation of a PT-symmetric -g4 theory is shown to provide a unified formulation for general D. A new conjectural relation between the Euclidean partition functions ZPT(g) of the non-Hermitian PT-symmetric theory and Z Herm(λ) of the λ 4 (λ>0) Hermitian theory is proposed: ZPT(g)=12 Z Herm(-g+ i 0+)+12 Z Herm(-g- i 0+). This relation ensures a real energy spectrum for the non-Hermitian PT-symmetric -g4 field theory. A closely related relation is rigorously valid in D=0. For D=1, using a semiclassical evaluation of ZPT(g), this relation is verified by comparing the imaginary parts of the ground-state energy E0PT(g) (before cancellation) and E0, Herm(-g i 0+).