Synchronizing Dynamical Systems: their groupoids and $C^*$-algebras

TL;DR

This paper introduces synchronizing dynamical systems, a broad class exhibiting hyperbolic behavior, and explores their associated $C^*$-algebras, extending concepts from Smale spaces and analyzing their algebraic properties.

Contribution

It defines synchronizing dynamical systems, generalizing Smale spaces, and investigates their $C^*$-algebras, revealing structural similarities and new properties.

Findings

Homoclinic algebra contains a Smale space-like ideal

Synchronizing systems have dense periodic points

Generalization of Smale space properties

Abstract

Building on work of Ruelle and Putnam in the Smale space case, Thomsen defined the homoclinic and heteroclinic $C^\ast$-algebras for an expansive dynamical system. In this paper we define a class of expansive dynamical systems, called synchronizing dynamical systems, that exhibit hyperbolic behavior almost everywhere. Synchronizing dynamical systems generalize Smale spaces (and even finitely presented systems). Yet they still have desirable dynamical properties such as having a dense set of periodic points. We study various $C^\ast$-algebras associated with a synchronizing dynamical system. Among other results, we show that the homoclinic algebra of a synchronizing system contains an ideal which behaves like the homoclinic algebra of a Smale space.