Int-amplified endomorphisms of compact Kähler spaces

IF 0.5 4区数学 Q3 MATHEMATICS Asian Journal of Mathematics Pub Date : 2019-10-09 DOI:10.4310/AJM.2021.v25.n3.a3

Guolei Zhong

引用次数: 3

Abstract

Let $X$ be a normal compact Kahler space of dimension $n$. A surjective endomorphism $f$ of such $X$ is int-amplified if $f^*\xi-\xi=\eta$ for some Kahler classes $\xi$ and $\eta$. First, we show that this definition generalizes the notation in the projective setting. Second, we prove that for the cases of $X$ being smooth, a surface or a threefold with mild singularities, if $X$ admits an int-amplified endomorphism with pseudo-effective canonical divisor, then it is a $Q$-torus. Finally, we consider a normal compact Kahler threefold $Y$ with only terminal singularities and show that, replacing $f$ by a positive power, we can run the minimal model program (MMP) $f$-equivariantly for such $Y$ and reach either a $Q$-torus or a Fano (projective) variety of Picard number one.

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紧缩Kähler空间的内放大自同态

设$X$是维数为$n$的正规紧致Kahler空间。对于某些Kahler类$\nenenebc xi$和$\eta$，如果$f^*\neneneba xi-\nenenebb xi=\eta$则这种$X$的满射自同构$f$是内扩的。首先，我们证明了这个定义推广了射影环境中的记法。其次，我们证明了对于$X$是光滑的，一个具有温和奇点的曲面或三重的情况，如果$X$允许一个具有伪有效正则除数的整数放大自同态，那么它就是$Q$-环面。最后，我们考虑一个只有终端奇点的正规紧致Kahler三重$Y$，并证明用正幂代替$f$，我们可以对这样的$Y$等变地运行最小模型程序（MMP）$f$并达到Picard数1的$Q$环面或Fano（投影）变种。

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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