Zero-cycles on Cancian-Frapporti surfaces
classification
🧮 math.AG
keywords
conjecturesurfacesvoisinbehavecanciancancian-frapporticonstructedcycles
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An old conjecture of Voisin describes how $0$-cycles on a surface $S$ should behave when pulled-back to the self-product $S^m$ for $m>p_g(S)$. We show that Voisin's conjecture is true for a $3$-dimensional family of surfaces of general type with $p_g=q=2$ and $K^2=7$ constructed by Cancian and Frapporti, and revisited by Pignatelli-Polizzi.
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