Uniform spectral gaps for random hyperbolic surfaces with not many cusps

Abstract

In this paper, we investigate uniform spectral gaps for Weil-Petersson random hyperbolic surfaces with not many cusps. We show that if n=O(gα) where α∈ [0,12), then for any ε>0, a random cusped hyperbolic surface in Mg,n has no eigenvalues in (0,14-(16(1-α))2-ε). If α is close to 12, this gives a new uniform lower bound 536-ε for the spectral gaps of Weil-Petersson random hyperbolic surfaces. The major contribution of this work is to reveal a critical phenomenon of ``second order cancellation".