On Brauer p-dimensions and absolute Brauer p-dimensions of Henselian fields

Abstract

This paper determines the Brauer p-dimension Brdp(K) and the absolute Brauer p-dimension abrdp(K) of a Henselian valued field (K, v), for a prime p ≠ char( K), under restrictions on the residue field K, such as the condition abrdp( K) = 0. It describes the set 0 of sequences abrdp(E), Brdp(E), p ∈ P, where P is the set of prime numbers and E runs across the class of Henselian fields with char( E) = 0 and a projective absolute Galois group G E. Specifically, 0 contains a sequence ap, bp ∈ N \0, ∞ \, p ∈ P, whenever a2 2b2 and ap bp, for each p. Similar results are obtained in characteristic q > 0.