Robert Laterveer
Published 2020-09-24Version 1
This note is about a $16$-dimensional family of surfaces of general type with $p_g=2$ and $q=0$ and $K^2=1$, called "special Horikawa surfaces". These surfaces, studied by Pearlstein-Zhang and by Garbagnati, are related to K3 surfaces. We show that special Horikawa surfaces have a multiplicative Chow-K\"unneth decomposition, in the sense of Shen-Vial. As a consequence, the Chow ring of special Horikawa surfaces displays K3-like behaviour.
Comments: 15 pages, to appear in Acta Math. Vietnamica, comments welcome
Algebraic cycles on surfaces with $p_g=1$ and $q=2$
Algebraic cycles and intersections of a quadric and a cubic
Algebraic cycles and intersections of 2 quadrics
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