The cohomology of Torelli groups is algebraic

Abstract

The Torelli group of Wg = \#g Sn × Sn is the subgroup of the diffeomorphisms of Wg fixing a disc which act trivially on Hn(Wg;Z). The rational cohomology groups of the Torelli group are representations of an arithmetic subgroup of Sp2g(Z) or Og,g(Z). In this paper we prove that for 2n ≥ 6 and g ≥ 2, they are in fact algebraic representations. Combined with previous work, this determines the rational cohomology of the Torelli group in a stable range. We further prove that the classifying space of the Torelli group is nilpotent.