Galois Module Structure of /n-th Classes of Fields

Abstract

In this paper we use the Merkurjev-Suslin theorem to explore the structure of arithmetically significant Galois modules that arise from Kummer theory. Let K be a field of characteristic different from a prime , n a positive integer, and suppose that K contains the (n)th roots of unity. Let L be the maximal /n-elementary abelian extension of K, and set G = (L|K). We consider the G-module J = L×/n and denote its socle series by Jm. We provide a precise condition, in terms of a map to H3(G,/n), determining which submodules of Jm-1 embed in cyclic modules generated by elements of Jm. This generalizes a theorem of Adem, Gao, Karaguezian, and Minac which deals with the case m=n=2. This description of Jm/Jm-1 can be viewed as an analogue of the classical Hilbert's Theorem 90 and it is helpful for understanding the G-module J.