Geodesic loops and orthogonal geodesic chords without self-intersections
Abstract
We show that for a generic Riemannian metric on a compact manifold of dimension n 3 all geodesic loops based at a fixed point have no self-intersections. We also show that for an open and dense subset of the space of Riemannian metrics on an n-disc with n 3 and with a strictly convex boundary there are n geometrically distinct orthogonal geodesic chords without self-intersections. We use a perturbation result for intersecting geodesic segments of the author and a genericity statement due to Bettiol and Giamb\`o and existence results for orthogonal geodesic chords by Giamb\`o, Giannoni, and Piccione.
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