Lower bounds and infinity criterion for Brauer p-dimensions of finitely-generated field extensions

Abstract

Let E be a field, p a prime number and F/E a finitely-generated extension of transcendency degree t. This paper shows that if the absolute Galois group GE is of nonzero cohomological p-dimension cdp(E), then the field F has Brauer p-dimension Brdp(F) t except, possibly, in case p = 2, the Sylow pro-2-subgroups of GE are of order 2, and F is a nonreal field. It announces that Brdp(F) is infinite whenever t 1 and the absolute Brauer p-dimension abrdp(E) is infinite; moreover, for each pair (m, n) of integers with 1 m n, there exists a central division F-algebra of exponent p m and Schur index p n.