English

Projective representation theory for compact quantum groups and the quantum Baum-Connes assembly map

Operator Algebras 2024-12-30 v2 K-Theory and Homology Quantum Algebra Representation Theory

Abstract

We study the theory of projective representations for a compact quantum group G\mathbb{G}, i.e. actions of G\mathbb{G} on B(H)\mathcal{B}(H) for some Hilbert space HH. We show that any such projective representation is inner, and is hence induced by an Ω\Omega-twisted representation for some unitary measurable 22-cocycle Ω\Omega on G\mathbb{G}. We show that a projective representation is continuous, i.e. restricts to an action on the compact operators K(H)\mathcal{K}(H), if and only if the associated 22-cocycle is regular, and that this condition is automatically satisfied if G\mathbb{G} is of Kac type. This allows in particular to characterise the torsion of projective type of G^\widehat{\mathbb{G}} in terms of the projective representation theory of G\mathbb{G}. For a given regular unitary 22-cocycle Ω\Omega, we then study Ω\Omega-twisted actions on C^*-algebras. We define deformed crossed products with respect to Ω\Omega, obtaining a twisted version of the Baaj-Skandalis duality and a quantum version of the Packer-Raeburn's trick. As an application, we provide a twisted version of the Green-Julg isomorphism and obtain the quantum Baum-Connes assembly map for permutation torsion-free discrete quantum groups.

Keywords

Cite

@article{arxiv.2112.04365,
  title  = {Projective representation theory for compact quantum groups and the quantum Baum-Connes assembly map},
  author = {Kenny De Commer and Rubén Martos and Ryszard Nest},
  journal= {arXiv preprint arXiv:2112.04365},
  year   = {2024}
}

Comments

52 pages, final version

R2 v1 2026-06-24T08:09:14.334Z