Curvature-free linear length bounds on geodesics in closed Riemannian surfaces
Abstract
This paper proves that in any closed Riemannian surface M with diameter d, the length of the kth-shortest geodesic between two given points p and q is at most 8kd. This bound can be tightened further to 6kd if p = q. This improves prior estimates by A. Nabutovsky and R. Rotman.
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