Cohomology of the hyperelliptic Torelli group

Abstract

Let SI(Sg) denote the hyperelliptic Torelli group of a closed surface Sg of genus g. This is the subgroup of the mapping class group of Sg consisting of elements that act trivially on H1(Sg;Z) and that commute with some fixed hyperelliptic involution of Sg. We prove that the cohomological dimension of SI(Sg) is g-1 when g > 0. We also show that Hg-1(SI(Sg);Z) is infinitely generated when g > 1. In particular, SI(S3) is not finitely presentable. Finally, we apply our main results to show that the kernel of the Burau representation of the braid group Bn at t = -1 has cohomological dimension equal to the integer part of n/2, and it has infinitely generated homology in this top dimension.