Automorphisms of generic gradient vector fields with prescribed finite symmetries

Abstract

Let M be a compact and connected smooth manifold endowed with a smooth action of a finite group , and let f be a -invariant Morse function on M. We prove that the space of -invariant Riemannian metrics on M contains a residual subset Metf with the following property. Let g∈ Metf and let ∇gf be the gradient vector field of f with respect to g. For any diffeomorphism φ of M preserving ∇gf there exists some real number t and some γ∈ such that for every x∈ M we have φ(x)=γ\,tg(x), where tg is the time-t flow of the vector field ∇gf.