On infinitely generated homology of Torelli groups

Abstract

Let Ig be the Torelli group of an oriented closed surface Sg of genus g, that is, the kernel of the action of the mapping class group on the first integral homology group of Sg. We prove that the kth integral homology group of Ig contains a free abelian subgroup of infinite rank, provided that g 3 and 2g-3 k 3g-6. Earlier the same property was known only for k=3g-5 (Bestvina, Bux, Margalit, 2007) and in the special case g=k=3 (Johnson, Millson, 1992). We also show that the hyperelliptic involution acts on the constructed infinite system of linearly independent homology classes in Hk(Ig;Z) as multiplication by -1, provided that k+g is even, thus solving negatively a problem by Hain. For k=2g-3, we show that the group H2g-3(Ig;Z) contains a free abelian subgroup of infinite rank generated by abelian cycles and we construct explicitly an infinite system of abelian cycles generating such subgroup. As a consequence of our results, we obtain that an Eilenberg--MacLane CW complex of type K(Ig,1) cannot have a finite (2g-3)-skeleton. The proofs are based on the study of the spectral sequence for the action of Ig on the complex of cycles constructed by Bestvina, Bux, and Margalit.