The number of geometrically distinct reversible closed geodesics on a Finsler sphere with K 1
Abstract
In this paper we study the Finsler sphere (Sn,F) with n>1, which has constant flag curvature K 1 and only finite prime closed geodesics. In this case, the connected isometry group I0(Sn,F) must be a torus which dimension satisfies 0< I(Sn,F) ≤[n+12]. We will prove that the number of geometrically distinct reversible closed geodesics on (Sn,F) is at least I(Sn,F). When I0(Sn,F)=[n+12], the equality happens, and there are exactly 2[n+12] prime closed geodesics, which verifies Anosov conjecture in this special case.
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