A sharp slope inequality for general stable fibrations of curves

Abstract

Let Mg be the moduli space of stable curves of genus g >= 2. Let Di be the irreducible component of the boundary of Mg such that general points of Di correspond to stable curves with one node of type i. Let Mg0 be the set of stable curves that have at most one node of type i>0. Let di be the class of Di in Pic(Mg)Q and h the Hodge class on Mg. In this paper, we will prove a sharp slope inequality for general stable fibrations. Namely, if C is a complete curve on Mg0, then ( (8g+4)h - g d0 - Σi=1[g/2] 4i(g-i) di . C ) >= 0. As an application, we can prove effective Bogomolov's conjecture for general stable fibrations.

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