English

Reparametrizations of vector fields and their shift maps

Dynamical Systems 2015-12-25 v2

Abstract

Let MM be a smooth manifold, FF be a smooth vector field on MM, and FtF_t be the local flow of FF. Denote by Sh(F)Sh(F) the space of smooth maps h:MMh:M\to M of the following form: h(x)=Ff(x)(x)h(x) = F_{f(x)}(x), where f:MRf:M\to\mathbb{R} runs over all smooth functions on MM which can be substituted into the flow FtF_t instead of time. This space often coincides with the identity component of the group of diffeomorphisms preserving orbits of FF. In this note it is shown that Sh(F)Sh(F) is not changed under reparametrizations and pushforwards of FF. As an application it is proved that a vector field FF without non-closed orbits can be reparametrized to induce a circle action on MM if and only if there exists a smooth function f:M(0,+)f:M\to (0,+\infty) such that for each non-singular point xx of MM, the value f(x)f(x) is an integer multiple of the period of xx with respect to FF.

Keywords

Cite

@article{arxiv.0907.0354,
  title  = {Reparametrizations of vector fields and their shift maps},
  author = {Sergiy Maksymenko},
  journal= {arXiv preprint arXiv:0907.0354},
  year   = {2015}
}

Comments

7 pages, no figures

R2 v1 2026-06-21T13:20:29.043Z