Infinitely many periodic orbits just above the Ma\~n\'e critical value on the 2-sphere

Abstract

We introduce a new critical value c∞(L) for Tonelli Lagrangians L on the tangent bundle of the 2-sphere without minimizing measures supported on a point. We show that c∞(L) is strictly larger than the Ma\~n\'e critical value c(L), and on every energy level e∈(c(L),c∞(L)) there exist infinitely many periodic orbits of the Lagrangian system of L, one of which is a local minimizer of the free-period action functional. This has applications to Finsler metrics of Randers type on the 2-sphere. We show that, under a suitable criticality assumption on a given Randers metric, after rescaling its magnetic part with a sufficiently large multiplicative constant, the new metric admits infinitely many closed geodesics, one of which is a waist. Examples of critical Randers metrics include the celebrated Katok metric.