On interrelations between divergence-free and Hamiltonian dynamics
Abstract
A mathematically correct description is presented on the interrelations between the dynamics of divergence free vector fields on an oriented 3-dimensional manifold and the dynamics of Hamiltonian systems. It is shown that for a given divergence free vector field with a global cross-section there exist some 4-dimensional symplectic manifold and a smooth Hamilton function such that for some one gets and the Hamiltonian vector field restricted on this level coincides with . 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 . We also consider the case of a divergence free vector field 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 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 ( and are real analytic), due to the Kolmogorov theorem, such the linearization is possible for tori with Diophantine rotation numbers.
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