Systole functions and Weil-Petersson geometry

Abstract

A basic feature of Teichm\"uller theory of Riemann surfaces is the interplay of two dimensional hyperbolic geometry, the behavior of geodesic-length functions and Weil-Petersson geometry. Let Tg (g≥ 2) be the Teichm\"uller space of closed Riemann surfaces of genus g. Our goal in this paper is to study the gradients of geodesic-length functions along systolic curves. We show that their Lp (1≤ p ≤ ∞)-norms at every hyperbolic surface X∈ Tg are uniformly comparable to sys(X)1p where sys(X) is the systole of X. As an application, we show that the minimal Weil-Petersson holomorphic sectional curvature at every hyperbolic surface X∈ Tg is bounded above by a uniform negative constant independent of g, which negatively answers a question of M. Mirzakhani. Some other applications to the geometry of Tg will also be discussed.