Stability of compact actions and a result on divided differences

Abstract

We study smooth locally free actions of Rn on manifolds M of dimension n+1. We are interested in compact orbits and in compact actions: actions with all orbits compact. Given a compact orbit in a neighborhood of compact orbits, we give necessary and sufficient conditions for the existence of a Ck perturbation with noncompact orbits in the given neighborhood. We prove that if such a perturbation exists it can be assumed to differ from the original action only in a smaller neighborhood of the initial orbit. As an application, for each k, we give examples of compact actions which admit Ck-1-perturbations with noncompact orbits but such that all Ck-perturbations are compact. The main result generalizes for k > 1 a previous result for the case C1. A critical auxiliary result is an estimate on divided differences.