Euler characteristics of the universal Picard stack

Abstract

We study Sn-equivariant weight-graded and topological Euler characteristics of the universal Picard stack Picg, nd Mg, n of degree-d line bundles over Mg, n. We prove that in the weight-zero and topological cases, the generating function for Euler characteristics of Picg, nd is obtained from the corresponding one for Mg, n by an extremely simple combinatorial transformation. This lets us deduce closed formulas for the two generating functions, taking as input the Chan--Faber--Galatius--Payne formula in the weight-zero case and Gorsky's formula in the topological case. As an immediate corollary, we obtain closed formulas for the weight-zero and topological Euler characteristics of Picdg. Our weight-zero calculations follow from a general result passing from the weight-graded Euler characteristics of Mg, n to those of Picg,nd.