Abelian-by-Central Galois groups of fields I: a formal description

Abstract

Let K be a field whose characteristic is prime to a fixed integer n with μn ⊂ K, and choose ω ∈ μn a primitive nth root of unity. Denote the absolute Galois group of K by Gal(K), and the mod-n central-descending series of Gal(K) by Gal(K)(i). Recall that Kummer theory, together with our choice of ω, provides a functorial isomorphism between Gal(K)/Gal(K)(2) and Hom(K×,Z/n). Analogously to Kummer theory, in this note we use the Merkurjev-Suslin theorem to construct a continuous, functorial and explicit embedding Gal(K)(2)/Gal(K)(3) Fun(K\0,1\,( Z/n)2), where Fun(K\0,1\,( Z/n)2) denotes the group of ( Z/n)2-valued functions on K\0,1\. We explicitly determine the functions associated to the image of commutators and nth powers of elements of Gal(K) under this embedding. We then apply this theory to prove some new results concerning relations between elements in abelian-by-central Galois groups.