Motives of moduli spaces on K3 surfaces and of special cubic fourfolds

Abstract

For any smooth projective moduli space M of Gieseker stable sheaves on a complex projective K3 surface (or an abelian surface) S, we prove that the Chow motive h(M) becomes a direct summand of a motive h(Ski)(ni) with ki≤ (M). The result implies that finite dimensionality of h(M) follows from finite dimensionality of h(S). The technique also applies to moduli spaces of twisted sheaves and to moduli spaces of stable objects in D b(S,α) for a Brauer class α∈ Br(S). In a similar vein, we investigate the relation between the Chow motives of a K3 surface S and a cubic fourfold X when there exists an isometry H(S,α,Z) H( AX,Z). In this case, we prove that there is an isomorphism of transcendental Chow motives t(S)(1) t(X).