A complete classification of modular compactifications of the universal Jacobian

Abstract

This is the third paper in a series, following [FPVa] and [FPVb]. We classify all modular compactifications of the universal Jacobian over Mg,n, both as stacks and as their relative good moduli spaces. Our main result gives a combinatorial parametrization of compactified universal Jacobian stacks by V-functions on a stability domain Dg,n of half-vine types (two-components topological types with a chosen side); under this correspondence, fine compactifications are exactly the general V-functions. We single out the classical compactified universal Jacobians, namely those induced by numerical polarizations (relative R-line bundles on the universal curve Cg,n/Mg,n), recovering the constructions of Kass-Pagani and Melo in the fine case, and we prove that their good moduli spaces are locally projective over Mg,n. We determine when two compactified universal Jacobians are isomorphic over Mg,n and describe a resolution of the universal family via a compactified Jacobian over Mg,n+1. Finally, we analyse the poset Σg,n of compactified universal Jacobians, an extension of the poset of regions of the hyperplane arrangement of classical stability conditions Ag,n studied in Kass-Pagani. We prove that for n=0 all compactified universal Jacobians are those constructed by Caporaso. We then give an explicit description of the submaximal elements of Σg,n for all n, generalizing the stability walls in the classical stability space Ag,n from Kass-Pagani's work.