C*-simplicity and boundary actions of discrete quantum groups

Abstract

We introduce and investigate several quantum group dynamical notions for the purpose of studying C*-simplicity of discrete quantum groups via the theory of boundary actions. In particular we define a quantum analogue of Powers' Averaging Property (PAP) and a quantum analogue of strongly faithful actions. We show that our quantum PAP implies C*-simplicity and the uniqueness of σ-KMS states, and that the existence of a strongly C*-faithful quantum boundary action also implies C*-simplicity and, in the unimodular case, the quantum PAP. We illustrate these results in the case of the unitary free quantum groups F UF by showing that they satisfy the quantum PAP and that they act strongly C*-faithfully on their quantum Gromov boundary. Moreover we prove that this particular action of F UF is a quantum boundary action.

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