Finite generation of abelianizations of the genus 3 Johnson kernel and the commutator subgroup of the Torelli group for Out(F3)

Abstract

Let gb be a compact oriented surface of genus g with b boundary components, where b∈\0,1\. The Johnson kernel Kgb is the subgroup of the mapping class group Mod(gb) generated by Dehn twists about separating simple closed curves. Let Fn be a free group with n generators. The Torelli group for Out(Fn) is the subgroup IOn⊂Out(Fn) consisting of all outer automorphisms that act trivially on the abelianization of Fn. Long standing questions are whether the groups Kgb and [IOn,IOn] or their abelianizations (Kgb)ab and [IOn,IOn]ab are finitely generated for g3 (respectively, n3). During the last 15 years, these questions were answered positively for g4 and n4, respectively. Nevertheless, the cases of g=3 and n=3 remained completely unsettled. In this paper, we prove that the abelianizations (K3b)ab and [IO3,IO3]ab are finitely generated. Our approach is based on a new general sufficient condition for a module over a Laurent polynomial ring to be finitely generated as an abelian group.