Centralizer of fixed point free separating flows

Abstract

In this paper, we study the centralizer of a separating continuous flow without fixed points. We show that if M is a compact metric space and φt:M M is a separating flow without fixed points, then φt has a quasi-trivial centralizer, that is, if a continuous flow t commutes with φt, then there exists a continuous function A: M which is invariant along the orbit of φt such that t(x)=φA(x)t(x) holds for all x∈ M. We also show that if M is a compact Riemannian manifold without boundary and u is a separating C1 Rd-action on M, then u has a quasi-trivial centralizer, that is, if u is a Rd-action on M commuting with u, then there is a continuous map A: Md× d(R) which is invariant along orbit of u such that u(x)=A(x)u(x) for all x∈ M. These improve Theorem 1 of O and Theorem 2 of BRV respectively.