Galois groups and cohomological functors

Abstract

Let q=ps be a prime power, F a field containing a root of unity of order q, and GF its absolute Galois group. We determine a new canonical quotient Gal(F(3)/F) of GF which encodes the full mod-q cohomology ring H*(GF,Z/q) and is minimal with respect to this property. We prove some fundamental structure theorems related to these quotients. In particular, it is shown that when q=p is an odd prime, F(3) is the compositum of all Galois extensions E of F such that Gal(E/F) is isomorphic to \1\, Z/p or to the nonabelian group Hp3 of order p3 and exponent p.