A twisted derived category of hyper-K\"ahler varieties of K3[n]-type

Abstract

We conjecture that a natural twisted derived category of any hyper-K\"ahler variety of K3[n]-type is controlled by its Markman-Mukai lattice. We prove the conjecture under numerical constraints, and our proof relies heavily on Markman's projectively hyperholomorphic bundle and a recently proven twisted version of the D-equivalence conjecture. In particular, we prove that any two fine moduli spaces of stable sheaves on a K3 surface are derived equivalent if they have the same dimension.

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