Asymptotics of shortest filling closed multi-geodesics

Abstract

In this paper, we investigate the asymptotics of shortest filling closed multi-geodesics of closed hyperbolic surfaces as systole 0 or as genus ∞. We first show that for a closed hyperbolic surface Xg of genus g, the length of a shortest filling closed multi-geodesic of Xg is uniformly comparable to (g+Σclosed geodesic γ⊂ Xg, \ (γ)<1 (1(γ))). As an application, we show that as g ∞, a Weil-Petersson random hyperbolic surface has a shortest closed multi-geodesic of length uniformly comparable to g. We also show that this is true for a random hyperbolic surface in the Brooks-Makover model.