Paper

Smooth invariant densities for random switching on the torus

, , and

Published 20 February 2018 © 2018 IOP Publishing Ltd & London Mathematical Society
, , Citation Yuri Bakhtin et al 2018 Nonlinearity 31 1331 DOI 10.1088/1361-6544/aaa04f

Download Article PDF

Article metrics

101 Total downloads

Share this article

Author e-mails

tobias.hurth@epfl.ch

Author affiliations

1 Courant Institute of Mathematical Sciences, New York University, 251 Mercer St, New York, NY 10012, United States of America

2 Ecole Polytechnique Fédérale de Lausanne SB MATH PRST, MA B1, Station 8, CH-1015, Lausanne, Switzerland

3 Department of Mathematics, University of Utah, Salt Lake City, UT 84112, United States of America

4 Mathematics Department, Duke University, Durham, NC 27708, United States of America

Author notes

5 Author to whom any correspondence should be addressed.

Dates

  1. Received 3 August 2017
  2. Accepted 8 December 2017
  3. Published

Check for updates using Crossmark

Buy this article in print

Journal RSS
Sign up for new issue notifications
0951-7715/31/4/1331

Abstract

We consider a random dynamical system obtained by switching between the flows generated by two smooth vector fields on the 2d-torus, with the random switchings happening according to a Poisson process. Assuming that the driving vector fields are transversal to each other at all points of the torus and that each of them allows for a smooth invariant density and no periodic orbits, we prove that the switched system also has a smooth invariant density, for every switching rate. Our approach is based on an integration by parts formula inspired by techniques from Malliavin calculus.

Export citation and abstract BibTeX RIS

Previous article in issue
Next article in issue

Recommended by Dr Dmitry Dolgopyat

10.1088/1361-6544/aaa04f