On the behaviour of Brauer p-dimensions under finitely-generated field extensions

Abstract

The present paper shows that if q ∈ P or q = 0, where P is the set of prime numbers, then there exist characteristic q fields E q,k \ k ∈ N, of Brauer dimension Brd(E q,k) = k and infinite absolute Brauer p-dimensions abrdp(E q,k), for all p ∈ P not dividing q 2 - q. This ensures that Brdp(F q,k) = ∞ , p q 2 - q, for every finitely-generated transcendental extension F q,k/E q,k. We also prove that each sequence a p, b p, p ∈ P, satisfying the conditions a 2 = b 2 and 0 b p a p ∞ , equals the sequence abrdp(E), Brdp(E), p ∈ P, for a field E of characteristic zero.