On the Cut Locus of Submanifolds of a Finsler Manifold

Abstract

In this article, we investigate the cut locus of closed (not necessarily compact) submanifolds in a forward complete Finsler manifold. We explore the deformation and characterization of the cut locus, extending the results of Basu and the second author (Algebraic and Geometric Topology, 2023). Given a submanifold N, we consider an N-geodesic loop as an N-geodesic starting and ending in N, possibly at different points. This class of geodesics were studied by Omori (Journal of Differential Geometry, 1968). We obtain a generalization of Klingenberg's lemma for closed geodesics (Annals of Mathematics, 1959) for N-geodesic loops in the reversible Finsler setting.