# Antiunitary representations and modular theory

**Authors:** Karl-Hermann Neeb, Gestur Olafsson

arXiv: 1704.01336 · 2017-04-06

## TL;DR

This paper explores the role of antiunitary representations in modular theory and quantum field theory, highlighting their connection to standard subspaces, von Neumann algebras, and the geometry of symmetric spaces.

## Contribution

It provides a unified perspective on antiunitary group representations and modular localization, linking classical von Neumann algebra theory with geometric structures in QFT.

## Key findings

- Standard subspaces correspond to antiunitary representations of R^x
- Half-sided modular inclusions relate to antiunitary representations of Aff(R)
- Configurations of standard subspaces can be studied via antiunitary Lie group representations

## Abstract

Antiunitary representations of Lie groups take values in the group of unitary and antiunitary operators on a Hilbert space H. In quantum physics, antiunitary operators implement time inversion or a PCT symmetry, and in the modular theory of operator algebras they arise as modular conjugations from cyclic separating vectors of von Neumann algebras. We survey some of the key concepts at the borderline between the theory of local observables (Quantum Field Theory (QFT) in the sense of Araki--Haag--Kastler) and modular theory of operator algebras from the perspective of antiunitary group representations. Here a central point is to encode modular objects in standard subspaces V in H which in turn are in one-to-one correspondence with antiunitary representations of the multiplicative group R^x. Half-sided modular inclusions and modular intersections of standard subspaces correspond to antiunitary representations of Aff(R), and these provide the basic building blocks for a general theory started in the 90s with the ground breaking work of Borchers and Wiesbrock and developed in various directions in the QFT context. The emphasis of these notes lies on the translation between configurations of standard subspaces as they arise in the context of modular localization developed by Brunetti, Guido and Longo, and the more classical context of von Neumann algebras with cyclic separating vectors. Our main point is that configurations of standard subspaces can be studied from the perspective of antiunitary Lie group representations and the geometry of the corresponding spaces, which are often fiber bundles over ordered symmetric spaces. We expect this perspective to provide new and systematic insight into the much richer configurations of nets of local observables in QFT.

## Full text

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## References

92 references — full list in the complete paper: https://tomesphere.com/paper/1704.01336/full.md

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Source: https://tomesphere.com/paper/1704.01336