Polynomial stability of the homology of Hurwitz spaces

Abstract

For a finite group G and a conjugation-invariant subset Q⊂eq G, we consider the Hurwitz space Hurn(Q) parametrising branched covers of the plane with n branch points, monodromies in G and local monodromies in Q. For i0 we prove that n Hi(Hurn(Q)) is a finitely generated module over the ring n H0(Hurn(Q)). As a consequence, we obtain polynomial stability of homology of Hurwitz spaces: taking homology coefficients in a field, the dimension of Hi(Hurn(Q)) agrees for n large enough with a quasi-polynomial in n, whose degree is easily bounded in terms of G and Q. Under suitable hypotheses on G and Q, we prove classical homological stability for certain sequences of components of Hurwitz spaces. Our results generalise previous work of Ellenberg-Venkatesh-Westerland, and rely on techniques introduced by them and by Hatcher-Wahl.