Positive topological entropy of Tonelli Lagrangian flows

Abstract

We study the topological entropy of the Lagrangian flow restricted to an energy level EL-1(c) ⊂ TM for c >e0(L). We prove that if the flow of the Tonelli Lagrangian L: M R, on a closed manifold of dimension n+1, has a non-hyperbolic closed orbit or an infinite number of closed orbits with energy c>e0(L) and satisfies certain open dense conditions, then there exist a smooth potential u: M R , with C2-norm arbitrarily small, such that the flow of the perturbed Lagrangian Lu=L-u restricted to ELu-1(c) has positive topological entropy. The proof of this result is based on an analog version of the Franks' Lemma for Lagrangian flows and Ma\~n\'e's techniques on dominated splitting. As an application, we show that if (M)=2 and c > e0(L), then L admits a C2-perturbation by a smooth potential u, such that, the perturbed flow φtLu|ELu-1(c) has positive topological entropy.