English

On interrelations between divergence-free and Hamiltonian dynamics

Dynamical Systems 2018-11-14 v1

Abstract

A mathematically correct description is presented on the interrelations between the dynamics of divergence free vector fields on an oriented 3-dimensional manifold MM and the dynamics of Hamiltonian systems. It is shown that for a given divergence free vector field XX with a global cross-section there exist some 4-dimensional symplectic manifold M~M\tilde{M}\supset M and a smooth Hamilton function H:M~RH: \tilde{M}\to \mathbb R such that for some cRc\in \mathbb R one gets M={H=c}M = \{H=c\} and the Hamiltonian vector field XHX_H restricted on this level coincides with XX. For divergence free vector fields with singular points such the extension is impossible but the existence of local cross-section allows one to reduce the dynamics to the study of symplectic diffeomorphisms in some sub-domains of MM. We also consider the case of a divergence free vector field XX with a smooth integral having only finite number of critical levels. It is shown that such a noncritical level is always a 2-torus and restriction of XX on it possesses a smooth invariant 2-form. The linearization of the flow on such a torus (i.e. the reduction to the constant vector field) is not always possible in contrast to the case of an integrable Hamiltonian system but in the analytic case (MM and XX are real analytic), due to the Kolmogorov theorem, such the linearization is possible for tori with Diophantine rotation numbers.

Keywords

Cite

@article{arxiv.1804.10375,
  title  = {On interrelations between divergence-free and Hamiltonian dynamics},
  author = {L. Lerman and E. Yakovlev},
  journal= {arXiv preprint arXiv:1804.10375},
  year   = {2018}
}

Comments

17 pages, no figures

R2 v1 2026-06-23T01:37:45.670Z