Two algebraic properties of thermal quantum field theories

TL;DR

This paper proves key algebraic properties for thermal quantum field theories, enhancing understanding of their structure and operator behavior at finite temperature.

Contribution

It establishes the Schlieder and Borchers properties for thermal field theories, offering new insights into their algebraic and localization features.

Findings

Proves Schlieder property for thermal QFTs

Establishes Borchers property in the thermal context

Provides insights into commutation and localization of operators

Abstract

We establish the Schlieder and the Borchers property for thermal field theories. In addition, we provide some information on the commutation and localization properties of projection operators.