Robert Laterveer
Published 2018-08-28Version 1
This note is about the Hilbert square $X=S^{[2]}$, where $S$ is a general $K3$ surface of degree $10$, and the anti-symplectic birational involution $\iota$ of $X$ constructed by O'Grady. The main result is that the action of $\iota$ on certain pieces of the Chow groups of $X$ is as expected by Bloch's conjecture. Since $X$ is birational to a double EPW sextic $X^\prime$, this has consequences for the Chow ring of the EPW sextic $Y\subset{\mathbb{P}}^5$ associated to $X^\prime$.
Comments: 29 pages, to appear in Kodai Math. J., comments welcome
On the Chow groups of some hyperkaehler fourfolds with a non-symplectic involution II
On a multiplicative version of Bloch's conjecture
A short note on the weak Lefschetz property for Chow groups
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