Brauer groups on K3 surfaces and arithmetic applications
Algebraic Geometry
2021-12-28 v2 Number Theory
Abstract
For a prime , we study subgroups of order p of the Brauer group Br(S) of a general complex polarized K3 surface of degree 2d, generalizing earlier work of van Geemen. These groups correspond to sublattices of index p of the transcendental lattice T_S of S; we classify these lattices up to isomorphism using Nikulin's discriminant form technique. We then study geometric realizations of p-torsion Brauer elements as Brauer-Severi varieties in a few cases via projective duality. We use one of these constructions for an arithmetic application, giving new kinds of counter-examples to weak approximation on K3 surfaces of degree two.
Cite
@article{arxiv.1404.5460,
title = {Brauer groups on K3 surfaces and arithmetic applications},
author = {Kelly McKinnie and Justin Sawon and Sho Tanimoto and Anthony Várilly-Alvarado},
journal= {arXiv preprint arXiv:1404.5460},
year = {2021}
}
Comments
40 pages; changes in exposition