The Congruence Subgroup Problem for finitely generated Nilpotent Groups

Abstract

The congruence subgroup problem for a finitely generated group and G≤ Aut() asks whether the map G Aut() is injective, or more generally, what is its kernel C(G,)? Here X denotes the profinite completion of X. In the case G=Aut() we denote C()=C(Aut(),). Let be a finitely generated group, =/[,], and *=/tor()(d). Denote Aut*()=Im(Aut() Aut(*))≤ GLd(Z). In this paper we show that when is nilpotent, there is a canonical isomorphism C() C(Aut*(),*). In other words, C() is completely determined by the solution to the classical congruence subgroup problem for the arithmetic group Aut*(). In particular, in the case where =n,c is a finitely generated free nilpotent group of class c on n elements, we get that C(n,c)=C(Z(n))=\e\ whenever n≥3, and C(2,c)=C(Z(2))=Fω = the free profinite group on countable number of generators.