Ergodic extensions and Hilbert modules associated to endomorphisms of MASAS

TL;DR

This paper studies ergodic transformations that extend to representations of bounded operators, unifying known examples and exploring their structure through Hilbert modules and Cuntz families.

Contribution

It introduces a unified framework for ergodic transformations extending to Cuntz algebra representations and analyzes their structure via Hilbert modules and decompositions.

Findings

Established a class of ergodic transformations extending to Cuntz algebra representations.

Proved a decomposition of the space related to N-to-one local homeomorphisms.

Analyzed the structure of Hilbert modules associated with these transformations.

Abstract

We show that a class of ergodic transformations on a probability measure space $(X,\mu)$ extends to a representation of $\mathcal{B}(L^2(X,\mu))$ that is both implemented by a Cuntz family and ergodic. This class contains several known examples, which are unified in this work. During the analysis of the existence and uniqueness of such a Cuntz family we give several results of individual interest. Most notably we prove a decomposition of $X$ for $N$-to-one local homeomorphisms that is connected to the orthonormal basis of Hilbert modules. We remark that the trivial Hilbert module of the Cuntz algebra $\mathcal{O}_N$ does not have a well-defined Hilbert module basis (moreover that it is unitarily equivalent to the module sum $\sum_{i=1}^n \mathcal{O}_N$ for infinitely many $n \in \mathbb{N}$).