On torsion in the homology of the Torelli group
Abstract
Let Sg be a closed, oriented surface of genus g, and let Mod(Sg) denote its mapping class group. The Torelli group Ig is the subgroup of Mod(Sg) consisting of mapping classes that act trivially on H1(Sg). For any collection of pairwise disjoint, separating simple closed curves on Sg, the corresponding Dehn twists pairwise commute and determine a homology class in Hk(Ig), which is called an abelian cycle. We prove that the subgroup of Hk(Ig) generated by such abelian cycles is a Z/2Z-vector space for all k, and that it is finite-dimensional for k = 2 and g ≥ 4.
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