On the existence of a Hofer type metric for Poisson manifolds

Abstract

An analogue of the Hofer metric H on the Hamiltonian group Ham(M,) of a Poisson manifold (M,) can be defined but there is the problem of its non-degeneracy. First we observe that H is a genuine metric on Ham(M,) when the union of all closed leaves (as subsets of M) of the corresponding symplectic foliation is dense. Next we deal with the important class of integrable Poisson manifolds. Recall that a Poisson manifold is called integrable if it can be realized as the space of units of a symplectic groupoid. Our main result states that H is a Hofer type metric for every Poisson manifold which admits a Hausdorff integration.