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Discrete Lagrangian and Hamiltonian Mechanics on Lie groupoids | J.C. Marrero
; D. Mart’{i}n de Diego
; E. Mart’{i}nez
; | Date: |
15 Jun 2005 | Subject: | Differential Geometry; Mathematical Physics MSC-class: 17B66; 22A22; 70G45; 70Hxx | math.DG math-ph math.MP | Abstract: | The purpose of this paper is to describe geometrically discrete Lagrangian and Hamiltonian Mechanics on Lie groupoids. From a variational principle we derive the discrete Euler-Lagrange equations and we introduce a symplectic 2-section, which is preserved by the Lagrange evolution operator. In terms of the discrete Legendre transformations we define the Hamiltonian evolution operator which is a symplectic map with respect to the canonical symplectic 2-section on the prolongation of the dual of the Lie algebroid of the given groupoid. The equations we get include as particular cases the classical discrete Euler-Lagrange equations, the discrete Euler-Poincaré and discrete Lagrange-Poincaré equations. Our results can be important for the construction of geometric integrators for continuous Lagrangian systems. | Source: | arXiv, math.DG/0506299 | Services: | Forum | Review | PDF | Favorites |
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