Demushkin groups and inverse Galois theory for pro-p-groups of finite rank and maximal p-extensions

Abstract

This paper proves that if E is a field, such that the Galois group G(E(p)/E) of the maximal p-extension E(p)/E is a Demushkin group of finite rank r(p)E 3, for some prime number p, then G(E(p)/E) does not possess nontrivial proper decomposition groups. When r(p)E = 2, it describes the decomposition groups of G(E(p)/E). The paper shows that if (K, v) is a p-Henselian valued field with r(p)K ∈ N and a residue field of characteristic p, then P P or P is presentable as a semidirect product Zpτ P, for some τ ∈ N, where P is a Demushkin group of rank 3 or a free pro-p-group. It also proves that when P is of the former type, it is continuously isomorphic to G(K (p)/K ), for some local field K containing a primitive p-th root of unity.