On the top homology group of Johnson kernel

Abstract

The action of the mapping class group Modg of an oriented surface g on the lower central series of π1(g) defines the descending filtration in Modg called the Johnson filtration. The first two terms of it are the Torelli group Ig and the Johnson kernel Kg. By a fundamental result of Johnson (1985), Kg is the subgroup of Modg generated by all Dehn twists about separating curves. In 2007, Bestvina, Bux, and Margalit showed the group Kg has cohomological dimension 2g-3. We prove that the top homology group H2g-3(Kg) is not finitely generated. In fact, we show that it contains a free abelian subgroup of infinite rank, hence, the vector space H2g-3(Kg,Q) is infinite-dimensional. Moreover, we prove that H2g-3(Kg,Q) is not finitely generated as a module over the group ring Q[Ig].