Boundedness of the p-primary torsion of the Brauer group of an abelian variety

Abstract

We prove that the p∞-torsion of the transcendental Brauer group of an abelian variety over a finitely generated field of characteristic p>0 is bounded. This answers a (variant of a) question asked by Skorobogatov and Zarhin for abelian varieties. To do this, we prove a "flat Tate conjecture" for divisors. In the text, we also study other geometric Galois-invariant p∞-torsion classes of the Brauer group which are not in the transcendental Brauer group. These classes, in contrast with our main theorem, can be infinitely p-divisible. We explain how the existence of these p-divisible towers is naturally related to the failure of surjectivity of specialisation morphisms of N\'eron--Severi groups in characteristic p.