On Tonelli periodic orbits with low energy on surfaces

Abstract

We prove that, on a closed surface, a Lagrangian system defined by a Tonelli Lagrangian L possesses a periodic orbit that is a local minimizer of the free-period action functional on every energy level belonging to the low range of energies (e0(L),cu(L)). We also prove that almost every energy level in (e0(L),cu(L)) possesses infinitely many periodic orbits. These statements extend two results, respectively due to Taimanov and Abbondandolo-Macarini-Mazzucchelli-Paternain, valid for the special case of electromagnetic Lagrangians.