与复合代数相关的Picard数1的投影对称流形的刚性

Pub Date : 2022-12-06 DOI:10.46298/epiga.2023.10432

Yifei Chen, Baohua Fu, Qifeng Li

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引用次数: 1

摘要

对于每一个复合代数$\mathbb{A}$，都有一个Picard 1的投影对称流形$X(\mathbb{A})$的关联，它只是以下变量${\rm Lag}(3,6)，{\rm Gr}(3,6)， \mathbb{S}_6, E_7/P_7的光滑超平面截面。本文证明了这些种类是刚性的，即对于连通基上的任意光滑投影流形族，如果一根纤维同构于X(\mathbb{A})$，则所有纤维同构于X(\mathbb{A})$。

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Rigidity of projective symmetric manifolds of Picard number 1 associated to composition algebras

To each complex composition algebra $\mathbb{A}$, there associates a projective symmetric manifold $X(\mathbb{A})$ of Picard number one, which is just a smooth hyperplane section of the following varieties ${\rm Lag}(3,6), {\rm Gr}(3,6), \mathbb{S}_6, E_7/P_7.$ In this paper, it is proven that these varieties are rigid, namely for any smooth family of projective manifolds over a connected base, if one fiber is isomorphic to $X(\mathbb{A})$, then every fiber is isomorphic to $X(\mathbb{A})$.

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