Commensurations of subgroups of Out(FN)

Abstract

A theorem of Farb and Handel asserts that for N 4, the natural inclusion from Out(FN) into its abstract commensurator is an isomorphism. We give a new proof of their result, which enables us to generalize it to the case where N=3. More generally, we give sufficient conditions on a subgroup of Out(FN) ensuring that its abstract commensurator Comm() is isomorphic to its relative commensurator in Out(FN). In particular, we prove that the abstract commensurator of the Torelli subgroup IAN for all N 3, or more generally any term of the Andreadakis--Johnson filtration if N 4, is equal to Out(FN). Likewise, if the kernel of the natural map from Out(FN) to the outer automorphism group of a free Burnside group of rank N≥ 3, then the natural map Out(FN)() is an isomorphism.