Representation stability for moduli spaces of admissible covers

Abstract

We prove a representation stability result for the sequence of spaces Mg, nA of pointed admissible A-covers of stable n-pointed genus-g curves, for an abelian group A. For fixed genus g and homology degree i, we give the sequence of rational homology groups Hi(Mg, nA; Q) the structure of a module over a combinatorial category, a la Sam--Snowden, and prove that this module is generated in degree at most g + 5 i. This implies that the generating function for the ranks of the homology groups is rational, with poles in the set \-1, -12, …, -1|A|2·(g + 5i)\. In the case where A is the trivial group, our work significantly improves on previous representation stability results on the Deligne--Mumford compactification Mg, n.