An elementary proof of Franks' lemma for geodesic flows

Abstract

Given a Riemannian manifold (M,g) and a geodesic γ, the perpendicular part of the derivative of the geodesic flow φgt: SM → SM along γ is a linear symplectic map. We give an elementary proof of the following Franks' lemma, originally found in [G. Contreras and G. Paternain, 2002] and [G. Contreras, 2010]: this map can be perturbed freely within a neighborhood in Sp(n) by a C2-small perturbation of the metric g that keeps γ a geodesic for the new metric. Moreover, the size of these perturbations is uniform over fixed length geodesics on the manifold. When M ≥ 3, the original metric must belong to a C2--open and dense subset of metrics.