Growth of the Weil-Petersson inradius of moduli space

Abstract

In this paper we study the systole function along Weil-Petersson geodesics. We show that the square root of the systole function is uniformly Lipschitz on Teichm\"uller space endowed with the Weil-Petersson metric. As an application, we study the growth of the Weil-Petersson inradius of moduli space of Riemann surfaces of genus g with n punctures as a function of g and n. We show that the Weil-Petersson inradius is comparable to g with respect to g, and is comparable to 1 with respect to n. Moreover, we also study the asymptotic behavior, as g goes to infinity, of the Weil-Petersson volumes of geodesic balls of finite radii in Teichm\"uller space. We show that they behave like o((1g)(3-ε)g) as g ∞, where ε>0 is arbitrary.