The D-equivalence conjecture for hyper-K\"ahler varieties via hyperholomorphic bundles

Abstract

We show that birational hyper-K\"ahler varieties of K3[n]-type are derived equivalent, establishing the D-equivalence conjecture in these cases. The Fourier-Mukai kernels of our derived equivalences are constructed from projectively hyperholomorphic bundles, following ideas of Markman. Our method also proves a stronger version of the D-equivalence conjecture for hyper-K\"ahler varieties of K3[n]-type with Brauer classes.