Smooth profinite groups, I: geometrizing Kummer theory

Abstract

In this series of three papers, we introduce and study cyclotomic pairs and smooth profinite groups. They are a geometric axiomatisation of Kummer theory for fields, with coefficients p-primary roots of unity, for a prime p. These coefficients are enhanced, to G-linearized line bundles in Witt vectors, over G-schemes of characteristic p. In the second paper, this upgrade is pushed even further, to the scheme-theoretic setting. In this first article, we introduce cyclotomic pairs, smooth profinite groups and (G,S)-cohomology. We prove a first lifting theorem for G-linearized torsors under line bundles (Theorem A). With the help of the algebro-geometric tools developed in the second article, this formalism is applied in the third one, to prove the Smoothness Theorem, whose essence reads as follows. Let G be profinite group. Assume that, for every open subgroup H ⊂ G, and for n=1, the natural arrow Hn(H,Z/p2) Hn(H,Z/p) is surjective. Then, it is also surjective for every such H, and every n ≥ 2. Applied to absolute Galois groups, the Smoothness Theorem provides a new proof of the Norm Residue Isomorphism Theorem, entirely disjoint from motivic cohomology.