Azumaya algebras over unramified extensions of function fields

Abstract

Let X be a smooth variety over a field K with function field K(X). Using the interpretation of the torsion part of the \'etale cohomology group H\'et2(K(X), Gm) in terms of Milnor-Quillen algebraic K-group K2(K(X)), we prove that under mild conditions on the norm maps along unramified extensions of K(X) over X, there exist cohomological Brauer classes in H\'et2(X, Gm) that are representable by Azumaya algebras on X. Theses conditions are almost satisfied in the case of number fields, providing then, a partial answer on a question of Grothendieck.