Proalgebraic crossed modules of quasirational presentations

Abstract

We introduce the concept of quasirational relation modules for discrete and pro-p presentations of discrete and pro-p groups and show that aspherical presentations and their subpresentations are quasirational. In the pro-p-case quasirationality of pro-p-groups with a single defining relation holds. For every quasirational (pro-p)relation module we construct the so called p-adic rationalization, which is a pro-fd-module RQp= R/[R,RMn]p. We provide the isomorphisms Rw(Qp)=RQp and Ru(Qp)=O(Gu)*, where Rw and Ru stands for continuous prounipotent completions and corresponding prounipotent presentations correspondingly. We show how Rw embeds into a sequence of abelian prounipotent groups. This sequence arises naturally from a certain prounipotent crossed module, the latter bring concrete examples of proalgebraic homotopy types. The old-standing open problem of Serre, slightly corrected by Gildenhuys, in its modern form states that pro-p-groups with a single defining relation are aspherical. Our results give a positive feedback to the question of Serre.