Email this article The Hess–Appelrot case and quantization of the rotation number
- Authors: Bizyaev I.A.1, Borisov A.V.1, Mamaev I.S.1
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Affiliations:
- Steklov Mathematical Institute
- Issue: Vol 22, No 2 (2017)
- Pages: 180-196
- Section: Article
- URL: https://ogarev-online.ru/1560-3547/article/view/218593
- DOI: https://doi.org/10.1134/S156035471702006X
- ID: 218593
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Abstract
This paper is concerned with the Hess case in the Euler–Poisson equations and with its generalization on the pencil of Poisson brackets. It is shown that in this case the problem reduces to investigating the vector field on a torus and that the graph showing the dependence of the rotation number on parameters has horizontal segments (limit cycles) only for integer values of the rotation number. In addition, an example of a Hamiltonian system is given which possesses an invariant submanifold (similar to the Hess case), but on which the dependence of the rotation number on parameters is a Cantor ladder.
About the authors
Ivan A. Bizyaev
Steklov Mathematical Institute
Author for correspondence.
Email: bizaev_90@mail.ru
Russian Federation, ul. Gubkina 8, Moscow, 119991
Alexey V. Borisov
Steklov Mathematical Institute
Email: bizaev_90@mail.ru
Russian Federation, ul. Gubkina 8, Moscow, 119991
Ivan S. Mamaev
Steklov Mathematical Institute
Email: bizaev_90@mail.ru
Russian Federation, ul. Gubkina 8, Moscow, 119991
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