# Thoma type results for discrete quantum groups

**Authors:** Teodor Banica, Alexandru Chirvasitu

arXiv: 1705.07050 · 2018-01-04

## TL;DR

This paper extends Thoma's theorem to discrete quantum groups, establishing conditions under which their group algebras admit certain stationary models, with specific focus on quantum permutation groups and quasi-flat models.

## Contribution

It introduces conditions for stationary models of type ^*(\u03b3) for discrete quantum groups, generalizing Thoma's theorem to the quantum setting.

## Key findings

- Stationary models of type ^*(b3) exist under virtually abelianity conditions.
- Refinements for quantum permutation groups involve quasi-flat matrix models.
- Results connect quantum group properties with the structure of their group algebras.

## Abstract

Thoma's theorem states that a group algebra $C^*(\Gamma)$ is of type I if and only if $\Gamma$ is virtually abelian. We discuss here some similar questions for the quantum groups, our main result stating that, under suitable virtually abelianity conditions on a discrete quantum group $\Gamma$, we have a stationary model of type $\pi:C^*(\Gamma)\to M_F(C(L))$, with $F$ being a finite quantum group, and with $L$ being a compact group. We discuss then some refinements of these results in the quantum permutation group case, $\widehat{\Gamma}\subset S_N^+$, by restricting the attention to the matrix models which are quasi-flat, in the sense that the images of the standard coordinates, known to be projections, have rank $\leq1$.

## Full text

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## References

40 references — full list in the complete paper: https://tomesphere.com/paper/1705.07050/full.md

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Source: https://tomesphere.com/paper/1705.07050