Lifting Hamiltonian loops to isotopies in fibrations

Abstract

Let G be a Lie group, H a closed subgroup and M the homogeneous space G/H. Each representation of H determines a G-equivariant principal bundle P on M endowed with a G-invariant connection. We consider subgroups G of the diffeomorphism group Diff(M), such that, each vector field Z∈ Lie( G) admits a lift to a preserving connection vector field on P. We prove that #\,π1( G)≥ #\,(Z(G)). This relation is applicable to subgroups G of the Hamiltonian groups of the flag varieties of a semisimple group G. Let M be the toric manifold determined by the Delzant polytope . We put b for the the loop in the Hamiltonian group of M defined by the lattice vector b. We give a sufficient condition, in terms of the mass center of , for the loops b and b to be homotopically inequivalent.