The centralizer of Komuro-expansive flows and expansive Rd-actions

Abstract

In this paper we study the centralizer of flows and Rd-actions on compact Riemannian manifolds. We prove that the centralizer of every C∞ Komuro-expansive flow with non-ressonant singularities is trivial, meaning it is the smallest possible, and deduce there exists an open and dense subset of geometric Lorenz attractors with trivial centralizer. We show that Rd-actions obtained as suspension of Zd-actions are expansive if and only if the same holds for the Zd-actions. We also show that homogeneous expansive Rd-actions have quasi-trivial centralizers, meaning that it consists of orbit invariant, continuous linear reparametrizations of the Rd-action. In particular, homogeneous Anosov Rd-actions have quasi-trivial centralizer.