Remarks on the geometry of the variety of planes of a cubic fivefold

Pub Date : 2023-10-25 DOI:10.46298/epiga.2023.10806
René Mboro
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引用次数: 1

Abstract

This note presents some properties of the variety of planes $F_2(X)\subset G(3,7)$ of a cubic $5$-fold $X\subset \mathbb P^6$. A cotangent bundle exact sequence is first derived from the remark made by Iliev and Manivel that $F_2(X)$ sits as a Lagrangian subvariety of the variety of lines of a cubic $4$-fold, which is a hyperplane section of $X$. Using the sequence, the Gauss map of $F_2(X)$ is then proven to be an embedding. The last section is devoted to the relation between the variety of osculating planes of a cubic $4$-fold and the variety of planes of the associated cyclic cubic $5$-fold.
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论五重立方的各种平面的几何形状
本文给出了三次元$5$-fold $X\子集$ mathbb P^6$的各种平面$F_2(X)\子集G(3,7)$的一些性质。协切束精确序列是由Iliev和Manivel提出的$F_2(X)$是$X$的一个超平面截面的三次$4$-fold的线的一个拉格朗日子变体所导出的。利用该序列,证明了$F_2(X)$的高斯映射是一个嵌入。最后一节讨论了一个立方$4 -fold的各种相交平面与相应的循环立方$5 -fold的各种平面之间的关系。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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