Non-contractible closed geodesics on compact Finsler space forms without self-intersections

Abstract

Let M=Sn/ and h ∈ π1(M) be a non-trivial element of finite order p, where the integers n, p≥2 and is a finite abelian group which acts on the sphere freely and isometrically, therefore M is diffeomorphic to a compact space form which is typical a non-simply connected manifold. We prove there exist at least two non-contractible closed geodesics on RP2 and obtain the upper bounds on their lengths. Moreover, we prove there exist at least n prime non-contractible simple closed geodesics on (M,F) of prescribed class [h], provided \[ F2 <(λ+1λ)2 g0 \;\; and \;\; (λλ+1)2 < K ≤ 1 for n is odd or \; 0<K ≤ 1 for n is even, \] where λ is the reversibility, K is the flag curvature and g0 is standard Riemannian metric. Stability of these non-contractible closed geodesics is also studied.