Short geodesics and small eigenvalues on random hyperbolic punctured spheres

Abstract

We study the number of short geodesics and small eigenvalues on Weil-Petersson random genus zero hyperbolic surfaces with n cusps in the regime n∞. Inspired by work of Mirzakhani and Petri Mi.Pe19, we show that the random multi-set of lengths of closed geodesics converges, after a suitable rescaling, to a Poisson point process with explicit intensity. As a consequence, we show that the Weil-Petersson probability that a hyperbolic punctured sphere with n cusps has at least k=o(n) arbitrarily small eigenvalues tends to 1 as n∞.