Lagrange Top Revisited(General)
スポンサーリンク
概要
- 論文の詳細を見る
Equations of motion for the Lagrange top in the inertial coordinates system are formulated in continuous-time variable, and they are solved explicitly in terms of the elliptic functions. Then it is shown that such equations of motion suggest time-discretized equations for the same model, which were given by Bobenko and Suris some years ago. And it is proved to be also a discrete integrable system. Exact solutions for such discrete equations are also constructed explicitly by using the elliptic functions.
- 2008-08-15
著者
関連論文
- Real-Space Renormalization Group Approach to Critical Dynamics : Migdal Approximation and Other New Methods
- Hidden Symmetry of the Bogoyavlensky Lattice. the Lattice W Algebars and the Vertex Operators
- Lagrange Top Revisited(General)
- Bethe Ansatz Equation and Order Parameter
- Metastable State in Nematic Liquid Crystals under Magnetic Field
- A Simple Derivation of Multivariable Hermite and Legendre Polynomials
- Variational Discretization of Euler's Elastica Problem(General)
- Inverse Problem and Central Limit Theorem in Chaotic Map Theory