Automorphisms of a Free Centre-by-Centre-by-Metabelian Group of Rank 3

Abstract

Let F3 be the free group of rank 3 and let G3 = F3/[F3, F3, F3], that is, G3 is a free centre-by-centre-by-metabelian group of rank 3. We show that Aut(G3) contains a proper finitely generated subgroup that is dense with respect to the formal power series topology.

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