Integrable Discretizations of Some Cases of the Rigid Body Dynamics

Integrable Discretizations of Some Cases of the Rigid Body Dynamics

Cached

Download Links

by Yuri B. Suris

BibTeX

@MISC{Suris_integrablediscretizations,
    author = {Yuri B. Suris},
    title = {Integrable Discretizations of Some Cases of the Rigid Body Dynamics},
    year = {}
}

Bookmark

OpenURL

Abstract

A heavy top with a xed point and a rigid body in an ideal uid are important examples of Hamiltonian systems on a dual to the semidirect product Lie algebra e(n) = so(n)nR n . We give a Lagrangian derivation of the corresponding equations of motion, and introduce discrete time analogs of two integrable cases of these systems: the Lagrange top and the Clebsch case, respectively. The construction of discretizations is based on the discrete time Lagrangian mechanics on Lie groups, accompanied by the discrete time Lagrangian reduction. The resulting explicit maps on e (n) are Poisson with respect to the Lie{Poisson bracket, and are also completely integrable. Lax representations of these maps are also found. 1 1

Citations

736	Mathematical Methods of Classical Mechanics - Arnold - 1978
381	Introduction to mechanics and symmetry - Marsden, Ratiu - 1994
271	E.: Foundations of Mechanics - Abraham, Marsden - 1978
123	la géometrie différentielle des groupes de Lie de dimension infinie et ses applications à l’hydrodynamique des fluides parfaits, Ann. Inst. Fourier 16 - Arnold - 1966
96	The Euler-Poincaré equations and semidirect products with applications to continuum theories - Holm, Marsden, et al. - 1998
77	Veselov Discrete versions of some classical integrable systems and factorization of matrix polynomials - Moser, P - 1991
67	Multisymplectic geometry, variational integrators, and nonlinear PDEs - Marsden, Patrick, et al. - 1998
53	Semi-direct products and reduction in mechanics - Marsden, Ratiu, et al. - 1984
51	Mechanical integrators derived from a discrete variational principle - Wendlandt, Marsden - 1997
34	Group theoretical methods in the theory of finite dimensional integrable systems - Reyman, Semenov-Tian-Shansky - 1994
33	Lagrangian reduction and the double spherical pendulum - Marsden - 1993
31	Note on the Integration of Euler’s Equations of the Dynamics of an n-dimensional Rigid Body, Functional Analysis and its Applications 10 - Manakov - 1976
29	Euler–Poisson equations on Lie algebras and the N–dimensional heavy rigid body - Ratiu - 1982
17	Methods of Classical Mechanics - Mathematical - 1978
17	Semidirect products and reduction in mechanics”, Trans.Amer.Math.Soc - Marsden, Ratiu, et al. - 1984
13	The Kowalewski top 99 years later: a Lax pair, generalizations and explicit solutions - Bobenko, Reyman, et al. - 1989
10	Sur la geometrie dierentielle des groupes de Lie de dimension in et ses applicationa a l'hydrodynamique des parfaits - Arnold - 1966
10	Integrable Hamiltonian systems connected with graded Lie algebras - Reyman - 1982
10	representation with a spectral parameter for the Kowalewski top and its generalizations - Reyman, Lax - 1987
10	Integrable discretizations for lattice systems: local equations and their Hamiltonian properties - Suris - 1999
9	Discrete Lagrangian reduction, discrete Euler–Poincaré equations, and semidirect - Bobenko - 1999
9	Kozlov V V 1995 Various aspects of n-dimensional rigid body dynamics - N
8	The Lagrange rigid body motion - Ratiu, Moerbeke - 1982
7	The variational principles of dynamics, World Scientific - Kupershmidt
6	Lagrangian reduction, the Euler-Poincare equations, and semidirect products - Cendra, Marsden - 1998
6	The complex geometry of Lagrange top - Gavrilov, Zhivkov - 1995
5	Kozlov: Various Aspects of n-Dimensional Rigid - Fedorov, V - 1995
5	Über die Bewegung eines Körpers in einer Flüssigkeit. Math. Ann. 3 (1871) 238–262. [CHMR] [FK] H.Cendra, D.D.Holm, J.E.Marsden, T.Ratiu. Lagrangian reduction, the Euler–Poincaré equations, and semi–direct products - Clebsch - 1998
5	Zhivkov: The complex geometry of Lagrange top - Gavrilov, A - 1998
5	147–177; Reduction and Hamiltonian structures on duals of semidirect products Lie algebras - Soc - 1984
4	Some remarks on the integrability of the equations of motion of a rigid body in an ideal fluid - Perelomov - 1981
4	Über das analytische Problem der Rotation eines starren Körpers in Raume von vier Dimensionen - Schottky
3	Note on the integration of Euler’s equations of the dynamics of an n- dimensional rigid body - Manakov - 1977
3	das analytische Problem der Rotation eines starren Körpers in Raume von vier Dimensionen, Sitzungsberichte drer Königligh preussischen Academie der Wissenschaften zu - Uber
3	Geometric and algebraic mechanisms of the integrability of Hamiltonian systems on homogeneous spaces and Lie algebras, Itogi Nauki. Fundamentalnye Napravleniya 16 - Trofimov, Fomenko - 1994
3	Integrable systems with discrete time, and dierence operators - Veselov - 1988
3	Ueber gewisse Differentialgleichungen - Frahm - 1874
2	Multidimensional integrable generalizations of Steklov{ Lyapunov systems - Bolsinov - 1992
2	Rotation around a point - Brun
2	Group theoretical methods in the theory of dimensional integrable systems - Reyman - 1994
2	The motion of a rigid body in a quadratic potential: an integrable discretization - Suris - 2000
2	Integrability of Adler's discretization of the Neumann system - Suris - 2001
2	Discretizations of the Landau–Lifshits equation. Theor. Math. Phys. 124 (2000) 897–908. [Ar1] V.I.Arnold. Sur la géometrie différentielle des groupes de Lie de dimension infinie et ses applications à l’hydrodynamique des fluides paraites. Ann. Inst. Fouri - Adler - 1966
2	The Motion of a Rigid Body in a Quadratic Potential: an Integrable Discretization - B
2	Geometric and Algebraic Mechanisms of the Integrability - Fomenko, Trofimov - 1994
2	Rotation around a fixed point - Brun
1	of the Landau{Lifshits equation - Discretizations - 2000
1	On the motion of a multidimensional body with a point in a gravitational eld - Beliaev - 1981
1	Discrete time mechanics on Lie groups, with an application to the Lagrange top - Bobenko - 1999
1	Integrable Euler equations on Lie algebras arising in problems of mathematical physics - Bogoyavlenski - 1985