A Hofer-like metric on the group of symplectic diffeomorphisms

Using a Hodge decomposition of symplectic isotopies on a compact symplectic manifold $(M,omega)$, we construct a norm on the identity component in the group of all symplectic diffeomorphisms of $(M,omega)$ whose restriction to the group $Ham(M,omega)$ of hamiltonian diffeomorphisms is bounded from above by the Hofer norm. Moreover, $Ham(M,omega)$ is closed in $Symp(M,omega)$ equipped with the topology induced by the extended norm. We give an application to the $C^0$ symplectic topology. We also discuss extensions of Ohs spectral distance.