Little galoisian modules

Abstract

Let p be a prime number, let K be a p-field (a local field with finite residue field of characteristic p), let L be a finite galoisian tamely ramified extension of K, and let G=Gal(L|K). Suppose that L is split over K in the sense that the short exact sequence 1 T G G/T1 has a section, where T is the inertia subgroup of G. We determine the structure of the Fp[G]-module L×\!/L× p in characteristic 0 when the p-torsion subgroup pL× of L× has order p, and of the Fp[G]-modules L×\!/L× p and L+\!/(L+) in characteristic p, where (x)=xp-x. Let K be a maximal galoisian extension of K, let V be the maximal tamely ramified extension of K in K, let =Gal(V|K), and let B be the maximal abelian extension of exponent p of V in K. We determine the structure of the Fp[[]]-module Gal(B|V), and show how this leads in characteristic 0 to a simple proof of the fact that the profinite group Gal( K|K) is generated by [K:Qp]+3 elements.