Sylvester domains and pro-p groups

Abstract

Let G be a finitely generated torsion-free pro-p group containing an open free-by-Zp pro-p subgroup. We show that the completed group algebra of G over Fp is a Sylvester domain. Moreover the inner rank of a matrix A over this completed group algebra can be calculated by approximation by ranks corresponding to finite quotients of G, that is, if G=G1>G2>… is a chain of normal open subgroups of G with trivial intersection and Ai is the matrix over Fp[G/Gi] obtained from the matrix A by applying the natural homomorphism induced from G G/Gi, then the inner rank of A equals i ∞ rkFp (Ai)|G:Gi|. As a consequence, we obtain a particular case of the mod p L\"uck approximation for abstract finitely generated subgroups of free-by-Zp pro-p groups.