The resolution of the universal Abel map via tropical geometry and applications

Abstract

Let g and n be nonnegative integers and A=(a0,…,an) a sequence of n+1 integers summing up to d. Let Mg,n+1 be the moduli space of (n+1)-pointed stable curves of genus g and Jμ,g→ Mg,1 be the Esteves' universal Jacobian, where μ is a universal genus-g polarization of degree d. We give an explicit resolution of the universal Abel map α A,μ Mg,n+1 Jμ,g, taking a pointed curve (X,p0,…,pn) to OX(Σ0 i n aipi). The blowup of Mg,n+1 giving rise to the resolution is inspired by the resolution of the tropical analogue of the map α A,μ (in the category of generalized cone complexes). As an application, we describe the double ramification cycle in terms of the universal sheaf inducing the resolution of the map α A,μ.