Sixfolds of generalized Kummer type and K3 surfaces
Abstract
We prove that any hyper-K\"ahler sixfold K of generalized Kummer type has a naturally associated manifold YK of K3[3]-type. It is obtained as crepant resolution of the quotient of K by a group of symplectic involutions acting trivially on its second cohomology. When K is projective, the variety YK is birational to a moduli space of stable sheaves on a uniquely determined projective~K3 surface~SK. As application of this construction we show that the Kuga-Satake correspondence is algebraic for the K3 surfaces SK, producing infinitely many new families of K3 surfaces of general Picard rank 16 satisfying the Kuga-Satake Hodge conjecture.
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