A finiteness theorem for the Brauer group of abelian varieties and K3 surfaces
Abstract
Let k be a field that is finitely generated over the field of rational numbers and Br(k) the Brauer group of k. Let X be an absolutely irreducible smooth projective variety over k, let Br(X) be the cohomological Brauer-Grothendieck group of X and Br0(X) the image of Br(k) in Br(X). We write Br1(X) for the subgroup of elements in Br(X) that become trivial after replacing k by its algebraic closure. We prove that Br(X)/Br0(X) is finite if X is a K3 surface. When X is (a principal homogeneous space of) an abelian variety over k then we prove that Br(X)/Br1(X) is finite.
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