On the Orlov conjecture for hyper-K\"ahler varieties via hyperholomorphic bundles

Abstract

We study Fourier transforms induced by Markman's projectively hyperholomorphic bundles on products of hyper-K\"ahler varieties of K3[n]-type. As applications, we prove the following. (a) Derived equivalent hyper-K\"ahler varieties of K3[n]-type have isomorphic homological motives preserving the cup-product. (b) All smooth projective moduli spaces of stable sheaves on a given K3 surface have isomorphic homological motives preserving the cup-product. (c) Assuming the Franchetta properties for the self-products of polarized K3 surfaces, the isomorphisms in (b) can be lifted to Chow motives for K3 surfaces of Picard rank 1. These results provide evidence for the Orlov conjecture and a conjecture of Fu-Vial.