Quantum charges and spacetime topology: The emergence of new superselection sectors

TL;DR

This paper develops a new topologically motivated framework for superselection sectors in quantum field theory, extending traditional approaches by incorporating spacetime topology and fundamental group representations.

Contribution

It introduces a novel topological extension of Doplicher-Haag-Roberts superselection theory, including a new invariant based on group von Neumann algebras and holonomy of 1-cocycles.

Findings

Extension of superselection sectors to include topological charges

Introduction of a new invariant via group von Neumann algebras

Decomposition of 1-cocycles into charge and topological parts

Abstract

In which is developed a new form of superselection sectors of topological origin. By that it is meant a new investigation that includes several extensions of the traditional framework of Doplicher, Haag and Roberts in local quantum theories. At first we generalize the notion of representations of nets of C*-algebras, then we provide a brand new view on selection criteria by adopting one with a strong topological flavour. We prove that it is coherent with the older point of view, hence a clue to a genuine extension. In this light, we extend Roberts' cohomological analysis to the case where 1--cocycles bear non trivial unitary representations of the fundamental group of the spacetime, equivalently of its Cauchy surface in case of global hyperbolicity. A crucial tool is a notion of group von Neumann algebras generated by the 1-cocycles evaluated on loops over fixed regions. One proves that these group von Neumann algebras are localized at the bounded region where loops start and end and to be factorial of finite type I. All that amounts to a new invariant, in a topological sense, which can be defined as the dimension of the factor. We prove that any 1-cocycle can be factorized into a part that contains only the charge content and another where only the topological information is stored. This second part resembles much what in literature are known as geometric phases. Indeed, by the very geometrical origin of the 1-cocycles that we discuss in the paper, they are essential tools in the theory of net bundles, and the topological part is related to their holonomy content. At the end we prove the existence of net representations.