Bi-invariant metrics and quasi-morphisms on groups of Hamiltonian diffeomorphisms of surfaces

Abstract

Let g be a closed orientable surface let Diff0(g; area) be the identity component of the group of area-preserving diffeomorphisms of g. In this work we present an extension of Gambaudo-Ghys construction to the case of a closed hyperbolic surface g, i.e. we show that every non-trivial homogeneous quasi-morphism on the braid group on n strings of g defines a non-trivial homogeneous quasi-morphism on the group Diff0(g; area). As a consequence we give another proof of the fact that the space of homogeneous quasi-morphisms on Diff0(g; area) is infinite dimensional. Let Ham(g) be the group of Hamiltonian diffeomorphisms of g. As an application of the above construction we construct two injective homomorphisms from Zm to Ham(g), which are bi-Lipschitz with respect to the word metric on Zm and the autonomous and fragmentation metrics on Ham(g). In addition, we construct a new infinite family of Calabi quasi-morphisms on Ham(g).