Commutative partially integrable systems on Poisson manifolds

A. V. Kurov

doi:10.3103/S0027134916040135

Commutative partially integrable systems on Poisson manifolds

Authors: Kurov A.V.¹
Affiliations:
1. Department of Physics
Issue: Vol 71, No 4 (2016)
Pages: 375-380
Section: Theoretical and Mathematical Physics
URL: https://journal-vniispk.ru/0027-1349/article/view/164559
DOI: https://doi.org/10.3103/S0027134916040135
ID: 164559

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Abstract
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Abstract

We show that, as distinct from completely integrable Hamiltonian systems, a commutative partially integrable system admits different compatible Poisson structures on a phase manifold that are related by a recursion operator. The existence of action–angle coordinates around an invariant submanifold of such a partially integrable system is proved.

Keywords

action–angle coordinates, Poisson manifold, integrable system

About the authors

A. V. Kurov

Department of Physics

Author for correspondence.
Email: kurov.aleksandr@physics.msu.ru
Russian Federation, Moscow, 119991

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