On the minimal number of closed geodesics on positively curved Finsler spheres
Abstract
In this paper, we proved that for every Finsler metric on Sn (n 4) with reversibility λ and flag curvature K satisfying (2n-3n-1)2 (λλ+1)2<K 1 and λ<n-1n-2 , there exist at least n prime closed geodesics on (Sn,F), which solved a conjecture of Katok and Anosov for such positivley curved spheres when n is even. Furthermore, if the number of closed geodesics on such positively curved Finsler Sn is finite, then there exist at least 2[n2]-1 non-hyperbolic closed geodesics.
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