On conjugate points and geodesic loops in a complete Riemannian manifold

Abstract

A well-known Lemma in Riemannian geometry by Klingenberg says that if x0 is a minimum point of the distance function d(p,·) to p in the cut locus Cp of p, then either there is a minimal geodesic from p to x0 along which they are conjugate, or there is a geodesic loop at p that smoothly goes through x0. In this paper, we prove that: for any point q and any local minimum point x0 of Fq(·)=d(p,·)+d(q,·) in Cp, either x0 is conjugate to p along each minimal geodesic connecting them, or there is a geodesic from p to q passing through x0. In particular, for any local minimum point x0 of d(p,·) in Cp, either p and x0 are conjugate along every minimal geodesic from p to x0, or there is a geodesic loop at p that smoothly goes through x0. Earlier results based on injective radius estimate would hold under weaker conditions.