Robert Laterveer
Published 2017-03-11Version 1
This note is about the Chow groups of a certain family of smooth cubic fourfolds. This family is characterized by the property that each cubic fourfold $X$ in the family has an involution such that the induced involution on the Fano variety $F$ of lines in $X$ is symplectic and has a $K3$ surface $S$ in the fixed locus. The main result establishes a relation between $X$ and $S$ on the level of Chow motives. As a consequence, we can prove finite-dimensionality of the motive of certain members of the family.
Comments: 13 pages, to appear in Acta Math. Sinica, comments still welcome
Algebraic cycles on Fano varieties of some cubics
On the Chow groups of certain EPW sextics
On the Chow groups of some hyperkaehler fourfolds with a non-symplectic involution II
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