On the descending central sequence of absolute Galois groups

Abstract

Let p be an odd prime number and F a field containing a primitive pth root of unity. We prove a new restriction on the group-theoretic structure of the absolute Galois group GF of F. Namely, the third subgroup GF(3) in the descending p-central sequence of GF is the intersection of all open normal subgroups N such that GF/N is 1, Z/p2, or the modular group Mp3 of order p3.