The Chow motive of LSV hyper-K\"alher manifolds

Abstract

Let X be a smooth cubic fourfold over and let π : U U, with U ⊂ (5)*, be the Lagrangian fibration whose fibres are the smooth hyperplane sections Y H = X H, with H ∈ U. There always exists a (not unique) smooth compactification (5)* which is a hyper-K\"alher manifold of OG10 type. Since two different compactifications are birationally equivalent their Chow motives are isomorphic. For a general X a geometrical construction of a smooth compactification (X) with irreducible fibres has been described in [LSV]. In this note we prove that the Chow motive h((X)) is a direct summand of the (twisted) motive of X5 and therefore is is of abelian type if h(X) is of abelian type.We describe a 10 -dimensional family of cubics X such that the compactification (X) is unique, smooth, with irreducible fibres, and the Chow motive h( (X) ) is of abelian type.

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