On the motive of O'Grady's six dimensional hyper-K\"ahler varieties
Abstract
We prove that the rational Chow motive of a six dimensional hyper-K\"ahler variety obtained as symplectic resolution of O'Grady type of a singular moduli space of semistable sheaves on an abelian surface A belongs to the tensor category of motives generated by the motive of A. We in fact give a formula for the rational Chow motive of such a variety in terms of that of the surface. As a consequence, the conjectures of Hodge and Tate hold for many hyper-K\"ahler varieties of OG6-type.
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