The Koopman representation for self-similar groupoid actions

TL;DR

This paper studies the Koopman representation of étale groupoids acting on measure spaces, establishing conditions for residual finite-dimensionality and exploring connections to self-similar structures and operator algebras.

Contribution

It introduces the $C^*$-algebra generated by the Koopman representation for self-similar groupoid actions and analyzes its properties, including residual finite-dimensionality.

Findings

Existence of an invariant measure on the infinite path space

Residual finite-dimensionality of the $C^*$-algebra $C^*( abla)$

Connections between self-similar representations and Cuntz-Pimsner algebras

Abstract

We introduce the $C^*$-algebra $C^*(\kappa)$ generated by the Koopman representation $\kappa$ of an \'etale groupoid $G$ acting on a measure space $(X,\mu)$. We prove that for a level transitive self-similar action $(G,E)$ with $E$ finite and $|uE^1|$ constant, there is an invariant measure $\nu$ on $X=E^\infty$ and that $C^*(\kappa)$ is residually finite-dimensional with a normalized self-similar trace. We also discus $p$-fold similarities of Hilbert spaces in connection to representations of the graph algebra $C^*(E)$ and self-similar representations of $G$ in connection to the Cuntz-Pimsner algebra $C^*(G,E)$.