Image of a shift map along the orbits of a flow

Abstract

Let (Ft) be a smooth flow on a smooth manifold M and h:M M be a smooth orbit preserving map. The following problem is studied: suppose that for every point z of M there exists a germ of a smooth function fz at z such that near z we have that h(x)=Ffz(x)(x). Can the functions (fz) be glued together to give a smooth function on all of M? This question is closely related to reparametrizations of flows. We describe a large class of flows for which the above problem can be resolved, and show that they have the following property: any smooth flow (Gt) whose orbits coincides with the ones of (Ft) is obtained from (Ft) by smooth reparametrization of time. The proof of our principal statement uses results of D. Hoffman and L. N. Mann about diameters of effective actions of Lie grous of Riemannian manifolds.