Reduction of symplectic principal R-bundles

Abstract

We describe a reduction process for symplectic principal R-bundles in the presence of a momentum map. This type of structures plays an important role in the geometric formulation of non-autonomous Hamiltonian systems. We apply this procedure to the standard symplectic principal R-bundle associated with a fibration π:M. When π is a principal G-bundle and G denotes the isotropy group associated with an element in the dual to the Lie algebra of G, we use the reduction process in order to describe a Poisson structure on the quotient manifold M/G whose symplectic leaves are isomorphic to the coadjoint orbit O . Moreover, we show a reduction process for non-autonomous Hamiltonian systems on symplectic principal R-bundles.