移动的Seshadri常数和极大Albanese维数变化的复盖

Pub Date : 2019-02-11 DOI:10.4310/ajm.2021.v25.n2.a8

L. D. Cerbo, L. Lombardi

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引用次数: 7

摘要

设$X$为极大艾博年维数的光滑投影复变，设$L \to X$为一个大线束。证明了$L$对$X$的合适有限阿贝列盖的回拉的运动Seshadri常数是任意大的。作为一个应用，给定任意整数$k\geq 1$，存在一个阿贝尔覆盖$p\colon X' \to X$，使得伴随系统$\big|K_{X'} + p^*L \big|$将$k$ -射流与$p^*L$的增广基轨迹和$p$下$X$的艾博地图的回拉的例外轨迹分开。

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Moving Seshadri constants, and coverings of varieties of maximal Albanese dimension

Let $X$ be a smooth projective complex variety of maximal Albanese dimension, and let $L \to X$ be a big line bundle. We prove that the moving Seshadri constants of the pull-backs of $L$ to suitable finite abelian etale covers of $X$ are arbitrarily large. As an application, given any integer $k\geq 1$, there exists an abelian etale cover $p\colon X' \to X$ such that the adjoint system $\big|K_{X'} + p^*L \big|$ separates $k$-jets away from the augmented base locus of $p^*L$, and the exceptional locus of the pull-back of the Albanese map of $X$ under $p$.

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