The Voisin map via families of extensions
We prove that given a cubic fourfold $Y$ not containing any plane, the Voisin map $v: F(Y)\times F(Y) \dashrightarrow Z(Y)$ constructed in \cite{Voi}, where $F(Y)$ is the variety of lines and $Z(Y)$ is the Lehn-Lehn-Sorger-van Straten eightfold, can be resolved by blowing up the incident locus $\Gam...
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| Sprache: | eng |
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| Zusammenfassung: | We prove that given a cubic fourfold $Y$ not containing any plane, the Voisin
map $v: F(Y)\times F(Y) \dashrightarrow Z(Y)$ constructed in \cite{Voi}, where
$F(Y)$ is the variety of lines and $Z(Y)$ is the Lehn-Lehn-Sorger-van Straten
eightfold, can be resolved by blowing up the incident locus $\Gamma \subset
F(Y)\times F(Y)$ endowed with the reduced scheme structure. Moreover, if $Y$ is
very general, then this blowup is a relative Quot scheme over $Z(Y)$
parametrizing quotients in a heart of a Kuznetsov component of $Y.$ |
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| DOI: | 10.48550/arxiv.1806.05771 |