Projective representation theory for compact quantum groups and the quantum Baum-Connes assembly map
Abstract
We study the theory of projective representations for a compact quantum group , i.e. actions of on for some Hilbert space . We show that any such projective representation is inner, and is hence induced by an -twisted representation for some unitary measurable -cocycle on . We show that a projective representation is continuous, i.e. restricts to an action on the compact operators , if and only if the associated -cocycle is regular, and that this condition is automatically satisfied if is of Kac type. This allows in particular to characterise the torsion of projective type of in terms of the projective representation theory of . For a given regular unitary -cocycle , we then study -twisted actions on C-algebras. We define deformed crossed products with respect to , 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.
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