On the Hamiltonian structure of Hirota-Kimura discretization of the Euler top

Details On the Hamiltonian structure of Hirota-Kimura discretization of the Euler top On the Hamiltonian structure of Hirota-Kimura discretization of the Euler top

2007-07-30

arxiv.org/abs/0707.4382v1

Physics

Mathematical Physics

11 pages

Scientific paper

This paper deals with a remarkable integrable discretization of the so(3) Euler top introduced by Hirota and Kimura. Such a discretization leads to an explicit map, whose integrability has been understood by finding two independent integrals of motion and a solution in terms of elliptic functions. Our goal is the construction of its Hamiltonian formulation. After giving a simplified and streamlined presentation of their results, we provide a bi-Hamiltonian structure for this discretization, thus proving its integrability in the standard Liouville-Arnold sense.

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