Chow rings and decomposition theorems for families of K3 surfaces and Calabi-Yau hypersurfaces

Abstract

The decomposition theorem for smooth projective morphisms π:X→ B says that Rπ*Q decomposes as Riπ*Q[-i]. We describe simple examples where it is not possible to have such a decomposition compatible with cup-product, even after restriction to Zariski dense open sets of B. We prove however that this is always possible for families of K3 surfaces (after shrinking the base), and show how this result relates to a result by Beauville and the author on the Chow ring of K3 surfaces S. We give two proofs of this result, the second one involving a certain decomposition of the small diagonal in S3 also proved by Beauville and the author. We prove an analogue of such a decomposition of the small diagonal in X3 for Calabi-Yau hypersurfaces X in Pn, which in turn provides strong restrictions on their Chow ring.