Algebraic quantum field theory in curved spacetimes

TL;DR

This paper develops a framework for algebraic quantum field theory in curved spacetimes using local covariance, addressing state selection, subtheories, and gauge transformations, exemplified by the Klein-Gordon theory.

Contribution

It introduces a systematic, covariant framework for AQFT in curved spacetimes, including new results on state selection and subtheories, with a universal Klein-Gordon example.

Findings

The framework formalizes local covariant state selection.

It shows the non-existence of a single preferred state in each spacetime.

The Klein-Gordon theory is given a new universal definition.

Abstract

This article sets out the framework of algebraic quantum field theory in curved spacetimes, based on the idea of local covariance. In this framework, a quantum field theory is modelled by a functor from a category of spacetimes to a category of ($C^*$)-algebras obeying supplementary conditions. Among other things: (a) the key idea of relative Cauchy evolution is described in detail, and related to the stress-energy tensor; (b) a systematic "rigidity argument" is used to generalise results from flat to curved spacetimes; (c) a detailed discussion of the issue of selection of physical states is given, linking notions of stability at microscopic, mesoscopic and macroscopic scales; (d) the notion of subtheories and global gauge transformations are formalised; (e) it is shown that the general framework excludes the possibility of there being a single preferred state in each spacetime, if the choice of states is local and covariant. Many of the ideas are illustrated by the example of the free Klein-Gordon theory, which is given a new "universal definition".