On the uniqueness of quasihyperbolic geodesics (1504.01981v1)

Abstract: In this work we solve a couple of well known open problems related to the quasihyperbolic metric. In the case of planar domains, our first main result states that quasihyperbolic geodesics are unique in simply connected domains. As the second main result, we prove that for an arbitrary plane domain the geodesics are unique for all pairs of points with quasihyperbolic distance less than $\pi$. This bound is sharp and improves the best known bound. Concerning the $n$-dimensional case, we prove the existence of a universal constant $c$ (independent of dimension) such that any quasihyperbolic ball with radius less than $c$ is convex.