Coadjoint orbits of Lie groupoids
Abstract
For a Lie groupoid G with Lie algebroid A, we realize the symplectic leaves of the Lie-Poisson structure on A* as orbits of the affine coadjoint action of the Lie groupoid JG T*M on A*, which coincide with the groupoid orbits of the symplectic groupoid T*G over A*. It is also shown that there is a fiber bundle structure on each symplectic leaf. In the case of gauge groupoids, a symplectic leaf is the universal phase space for a classical particle in a Yang-Mills field.
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