English

The Closed Orbit Controllability Criterium

Dynamical Systems 2010-03-08 v1

Abstract

We prove that every closed "general" trajectory of the control system ΣM\Sigma_M has an open neighborhood on which ΣM\Sigma_M is controllable if 1) this orbit contains some point where the Lie algebra rank condition (LARCLARC) is satisfied, and 2) the set of control vectors is "involved" at qq. In particular, for the control systems ΣM\Sigma_M on the compact connected manifold MnM^n with an open control set this gives the following "Closed Orbit Controllability Criterium": The dynamical system ΣM\Sigma_M of the considered type is controllable on MnM^n if and only if for an arbitrary point qq of MnM^n there exists a closed trajectory of the control system going through this point. We also present examples which show that our conditions are necessary.

Keywords

Cite

@article{arxiv.1003.1246,
  title  = {The Closed Orbit Controllability Criterium},
  author = {Valeri Marenitch},
  journal= {arXiv preprint arXiv:1003.1246},
  year   = {2010}
}

Comments

16 page

R2 v1 2026-06-21T14:54:14.263Z