Quotients of absolute Galois groups which determine the entire Galois cohomology

Abstract

For prime power q=pd and a field F containing a root of unity of order q we show that the Galois cohomology ring H*(GF,/q) is determined by a quotient GF[3] of the absolute Galois group GF related to its descending q-central sequence. Conversely, we show that GF[3] is determined by the lower cohomology of GF. This is used to give new examples of pro-p groups which do not occur as absolute Galois groups of fields.