An almost existence theorem for non-contractible periodic orbits in cotangent bundles

Abstract

Assume M is a closed connected smooth manifold and H:T*M->R a smooth proper function bounded from below. Suppose the sublevel set H<d contains the zero section and α is a non-trivial homotopy class of free loops in M. Then for almost every s>=d the level set H=s carries a periodic orbit z of the Hamiltonian system (T*M,ω0,H) representing α. Examples show that the condition that H<d contains M is necessary and almost existence cannot be improved to everywhere existence.