The Noether inequality for algebraic 3 -folds

IF 2.3 1区 数学 Q1 MATHEMATICS Duke Mathematical Journal Pub Date : 2020-05-01 DOI:10.1215/00127094-2019-0080
J. Chen, Meng Chen, Chen Jiang
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引用次数: 10

Abstract

We establish the Noether inequality for projective $3$-folds. More precisely, we prove that the inequality $${\rm vol}(X)\geq \tfrac{4}{3}p_g(X)-{\tfrac{10}{3}}$$ holds for all projective $3$-folds $X$ of general type with either $p_g(X)\leq 4$ or $p_g(X)\geq 21$, where $p_g(X)$ is the geometric genus and ${\rm vol}(X)$ is the canonical volume. This inequality is optimal due to known examples found by M. Kobayashi in 1992.
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代数3 -折叠的Noether不等式
我们建立了投射$3$-折叠的Noether不等式。更准确地说,我们证明了不等式$${\rm-vol}(X)\geq\tfrac{4}{3}p_g(X) -{\tfrac{10}{3}}$$适用于所有具有$p_g(X)\leq 4$或$p_g(X)\geq 21$的一般类型的投影$3$-折叠$X$,其中$p_g是几何亏格,${\rm-vol}(X)$是规范体积。由于M.Kobayashi在1992年发现的已知例子,这个不等式是最优的。
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来源期刊
CiteScore
3.40
自引率
0.00%
发文量
61
审稿时长
6-12 weeks
期刊介绍: Information not localized
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