Bogoliubov transformation and the thermal operator representation in the real time formalism

Abstract

It has been shown earlier brandt,brandt1 that, in the mixed space, there is an unexpected simple relation between any finite temperature graph and its zero temperature counterpart through a multiplicative scalar operator (termed thermal operator) which carries the entire temperature dependence. This was shown to hold only in the imaginary time formalism and the closed time path (σ=0) of the real time formalism (as well as for its conjugate σ=1). We study the origin of this operator from the more fundamental Bogoliubov transformation which acts, in the momentum space, on the doubled space of fields in the real time formalisms takahashi,umezawa,pushpa. We show how the (2× 2) Bogoliubov transformation matrix naturally leads to the scalar thermal operator for σ=0,1 while it fails for any other value 0<σ<1. This analysis also suggests that a generalized scalar thermal operator description, in the mixed space, is possible even for 0<σ<1. We also show the existence of a scalar thermal operator relation in the momentum space.