Quotient groups of IA-automorphisms of a free group of rank 3

Abstract

We prove that, for any positive integer c, the quotient group γc(M3)/γc+1(M3) of the lower central series of the McCool group M3 is isomorphic to two copies of the quotient group γc(F3)/γc+1(F3) of the lower central series of a free group F3 of rank 3 as Z-modules. Furthermore, we give a necessary and sufficient condition whether the associated graded Lie algebra gr(M3) of M3 is naturally embedded into the Johnson Lie algebra L( IA(F3)) of the IA-automorphisms of F3.