The projective dimension of profinite modules for pro-p groups

Abstract

The homology groups introduced by A. Brumer can be used to establish a criterion ensuring that a profinite Fp[[G]]-module of a pro-p group G has projective dimension d<∞ (cf. Thm. A). This criterion yields a new characterization of free pro-p groups (cf. Cor. B). Applied to a semi-direct factor Gp G isomorphic to Zp which defines a non-trivial end in the sense of A.A. Korenev one concludes that the closure of the normal closure of the image of σ is a free pro-p subgroup (cf. Thm. C). From this result we will deduce a structure theorem (cf. Thm. D) for finitely generated pro-p groups with infinitely many ends.