Universal compactified Jacobians: cohomological invariance and boundary combinatorics

Abstract

Pagani and Tommasi have introduced a class of smoothable fine compactified Jacobians Jg,nd(σ)→ Mg,n over the moduli space of stable curves, depending nontrivially on the degree d and the choice of a stability condition σ. A theorem of Migliorini-Shende-Viviani implies that the cohomology of Jg,nd(σ) is independent of d and σ, a statement which is quite unexpected from the point of view of the boundary geometry of these spaces. We reprove this independence statement using a direct combinatorial argument, summing up contributions of individual strata. The Appendix includes a result by J. Feusi characterizing when Jg,nd and Jg,nd' are Sn-equivariantly isomorphic over Mg,n, and a result by Q. Yin showing that [Jdg] and [Jd'g] are not always equal in K0(VarC).