Closed geodesics on positively curved spheres Sn with Finsler metric induced by (RPn,F)

Abstract

It's well known that the n-sphere Sn is the universal double covering of the n-dimensional real projective space RPn and then any Finsler metric on RPn induces a Finsler metric of Sn. In this paper, we prove that for every Finsler (Sn, F) for n≥3 whose metric is induced by irreversible Finsler (RPn,F) with reversibility λ and flag curvature K satisfying (λλ+1)2<K≤ 1, there exist at least n-1 prime closed geodesics on (Sn, F). Furthermore, if there exist finitely many distinct closed geodesics on (Sn, F), then there exist at least 2[n2]-1 of them are non-hyperbolic.