Hamiltonian mechanics and Lie algebroid connections
Abstract
We develop a new, coordinate-free formulation of Hamiltonian mechanics on the dual of a Lie algebroid. Our approach uses a connection, rather than coordinates in a local trivialization, to obtain global expressions for the horizontal and vertical dynamics. We show that these dynamics can be obtained in two equivalent ways: (1) using the canonical Lie-Poisson structure, expressed in terms of the connection; or (2) using a novel variational principle that generalizes Hamilton's phase space principle.
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