A birational Torelli theorem with a Brauer class

Abstract

Let MC( 2, OC) P3 denote the coarse moduli space of semistable vector bundles of rank 2 with trivial determinant over a smooth projective curve C of genus 2 over C. Let βC denote the natural Brauer class over the stable locus. We prove that if f*( βC') = βC for some birational map f from MC( 2, OC) to MC'( 2, OC'), then the Jacobians of C and of C' are isomorphic as abelian varieties. If moreover these Jacobians do not admit real multiplication, then the curves C and C' are isomorphic. Similar statements hold for Kummer surfaces in P3 and for quadratic line complexes.