Existence of closed geodesics on certain non-compact Riemannian manifolds

Abstract

Let M be a complete Riemannian manifold. Suppose M contains a bounded, concave, connected open set U with C0 boundary and M U is connected. We assume that either the relative homotopy set π1(M,M U)=0 or the union of all the conjugate subgroups of the image of the homomorphism π1(M U)→ π1(M) (induced by the inclusion M U M) is a proper subset of π1(M). (The first condition is equivalent to π1(M U)→ π1(M) is surjective; the second condition is satisfied if the relative homology group H1(M,M U)≠ 0.) Then there exists a non-trivial closed geodesic on M. This partially proves a conjecture of Chambers, Liokumovich, Nabutovsky and Rotman.