Bounding the minimal number of generators of an Azumaya algebra

Abstract

A paper of U. First & Z. Reichstein proves that if R is a commutative ring of dimension d, then any Azumaya algebra A over R can be generated as an algebra by d+2 elements, by constructing such a generating set, but they do not prove that this number of generators is required, or even that for an arbitrarily large r that there exists an Azumaya algebra requiring r generators. In this paper, for any given fixed n 2, we produce examples of a base ring R of dimension d and an Azumaya algebra of degree n over R that requires r(d,n) = d2n-2 + 2 generators. While r(d,n) < d+2 in general, we at least show that there is no uniform upper bound on the number of generators required for Azumaya algebras. The method of proof is to consider certain varieties Brn that are universal varieties for degree-n Azumaya algebras equipped with a set of r generators, and specifically we show that a natural map on Chow group CH(r-1)(n-1)PGLn CH(r-1)(n-1)(Brn) fails to be injective, which is to say that the map fails to be injective in the first dimension in which it possibly could fail. This implies that for a sufficiently generic rank-n Azumaya algebra, there is a characteristic class obstruction to generation by r elements.