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Index reduction for Brauer classes via stable sheaves (with an appendix by Bhargav Bhatt)

arXiv:0706.1072

Abstract

We use twisted sheaves to study the problem of index reduction for Brauer classes. In general terms, this problem may be phrased as follows: given a field $k$, a $k$-variety $X$, and a class $α\in \Br(k)$, compute the index of the class $α_{k(X)} \in \Br(X)$ obtained from $α$ by extension of scalars to $k(X)$. We give a general method for computing index reduction which refines classical results of Schofield and van den Bergh. When $X$ is a curve of genus 1, we use Atiyah's theorem on the structure of stable vector bundles with integral slope to show that our formula simplifies dramatically, giving a complete solution to the index reduction problem in this case. Using the twisted Fourier-Mukai transform, we show that a similarly simple formula describes homogeneous index reduction on torsors under higher-dimensional abelian varieties.

18 pages. Additional minor revisions and corrections