原始Fano变种的有理连通双盖

IF 0.9 Q2 MATHEMATICS Epijournal de Geometrie Algebrique Pub Date : 2019-10-20 DOI:10.46298/epiga.2020.volume4.5890

A. Pukhlikov

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引用次数: 5

摘要

我们证明了对于$M\geqslant 5$中$M+1$次的Zariski广义超曲面$V$，不存在具有阿贝尔Galois群的$d\geqsant 2$次的Galois有理覆盖$X\dashrightarrow V$，其中$X$是有理连通的变种。特别地，存在具有$X$有理连接的2次正规映射$X\dashrightarrow V$。这一事实对许多其他原始法诺变种家族也是如此，并引发了对原始法诺变体绝对刚性的猜测。评论：最终期刊版本

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Rationally connected rational double covers of primitive Fano varieties

We show that for a Zariski general hypersurface $V$ of degree $M+1$ in ${\mathbb P}^{M+1}$ for $M\geqslant 5$ there are no Galois rational covers $X\dashrightarrow V$ of degree $d\geqslant 2$ with an abelian Galois group, where $X$ is a rationally connected variety. In particular, there are no rational maps $X\dashrightarrow V$ of degree 2 with $X$ rationally connected. This fact is true for many other families of primitive Fano varieties as well and motivates a conjecture on absolute rigidity of primitive Fano varieties. Comment: the final journal version

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