Mapping class groups of surfaces of genus ≥ 3 do not virtually surject to Z

Abstract

We prove a well known conjecture of Nikolai Ivanov which states that if X is a surface of genus ≥ 3 (with any number of punctures and boundary components), Mod(X) is the mapping class group of X, and K < Mod(X) is a finite-index subgroup, then K does not virtually surject to Z. As a corollary of this we get that H1(Z; Q) = 0 whenever Z is a finite cover of Mg,n, the moduli space of complex algebraic curves of genus g≥ 3 with n marked points.