On the weight zero compactly supported cohomology of Hg, n

Abstract

For g 2 and n 0, let Hg,n⊂ Mg,n denote the complex moduli stack of n-marked smooth hyperelliptic curves of genus g. A normal crossings compactification of this space is provided by the theory of pointed admissible Z/2Z-covers. We explicitly determine the resulting dual complex, and we use this to define a graph complex which computes the weight zero compactly supported cohomology of Hg, n. Using this graph complex, we give a sum-over-graphs formula for the Sn-equivariant weight zero compactly supported Euler characteristic of Hg, n. This formula allows for the computer-aided calculation, for each g 7, of the generating function hg for these equivariant Euler characteristics for all n. More generally, we determine the dual complex of the boundary in any moduli space of pointed admissible G-covers of genus zero curves, when G is abelian, as a symmetric -complex. We use these complexes to generalize our formula for hg to moduli spaces of n-pointed smooth abelian covers of genus zero curves.