title: |
Integrable flows and Bäcklund transformations on extended Stiefel varieties with application to the Euler top on the Lie group SO(3) |
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publication: |
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| volume-issue: | 12 - Supplement 2 | |
| pages: | 77 - 94 | |
ISSN: |
1402-9251 | |
DOI: |
doi:10.2991/jnmp.2005.12.s2.7 (how to use a DOI) | |
author(s): |
Yuri N FEDOROV |
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publication date: |
December 2005 |
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abstract: |
We show that the m-dimensional EulerManakov top on so
(m) can be
represented as a Poisson reduction of an integrable Hamiltonian system on a
symplectic extended Stiefel variety ¯V(k, m), and present its Lax representation
with a rational parameter.
We also describe an integrable two-valued symplectic map B on the dimensional variety V(2, 3). The map admits two different reductions, namely,
to the Lie group SO(3) and to the coalgebra so
(3).
The first reduction provides a discretization of the motion of the classical
Euler top in space and has a transparent geometric interpretation, which can
be regarded as a discrete version of the celebrated Poinsot model of motion and
which inherits some properties of another discrete system, the elliptic billiard.
The reduction of B to so
(3) gives a new explicit discretization of the Eler top in the angular momentum space, which preserves first integrals of the
continuous system. |
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copyright: |
©
Atlantis Press. This article is distributed under the
terms of the Creative Commons Attribution License, which permits
non-commercial use, distribution and reproduction in any medium,
provided the original work is properly cited. |
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full text: |