∞-jets of difeomorphisms preserving orbits of vector fields

Abstract

Let F be a smooth vector field defined in a neighborhood of the origin in Rn, F(O)=0, and let Ft be its local flow. Denote by E the set of germs of diffeomorphisms h:Rn Rn preserving orbits of F and let Eidr be the identity component of E with respect to Cr-topology. Then every Eidr contains a subset Sh consisting of mappings of the form Ff(x)(x), where f: Rn R is a smooth function. It was proved earlier by the author that if F is a linear vector field, then Sh=Eid0. In this paper we present a class of vector fields for which Sh and Eid1 coincide on the level of ∞-jets. We also establish a parameter rigidity of linear vector fields and "reduced" Hamiltonian vector fields of real homogeneous polynomials in two variables.