Chow groups and $L$-derivatives of automorphic motives for unitary groups

IF 5.7 1区 数学 Q1 MATHEMATICS
Chao Li, Yifeng Liu
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引用次数: 21

Abstract

In this article, we study the Chow group of the motive associated to a tempered global $L$-packet $\pi$ of unitary groups of even rank with respect to a CM extension, whose global root number is $-1$. We show that, under some restrictions on the ramification of $\pi$, if the central derivative $L'(1/2,\pi)$ is nonvanishing, then the $\pi$-nearly isotypic localization of the Chow group of a certain unitary Shimura variety over its reflex field does not vanish. This proves part of the Beilinson--Bloch conjecture for Chow groups and $L$-functions, which generalizes the Birch and Swinnerton-Dyer conjecture. Moreover, assuming the modularity of Kudla's generating functions of special cycles, we explicitly construct elements in a certain $\pi$-nearly isotypic subspace of the Chow group by arithmetic theta lifting, and compute their heights in terms of the central derivative $L'(1/2,\pi)$ and local doubling zeta integrals. This confirms the conjectural arithmetic inner product formula proposed by one of us, which generalizes the Gross--Zagier formula to higher dimensional motives.
Chow群和酉群自同构动机的$L$-导数
在本文中,我们研究了关于全局根数为$-1$的CM扩展的偶数秩酉群的调和全局$L$-包$\pi$的动机的Chow群。我们证明,在$\pi$的分支上的一些限制下,如果中心导数$L'(1/2,\pi)$是非零的,那么某个酉Shimura变种的Chow群在其反射场上的$\pi$-几乎同构局部化不会消失。这证明了Chow群和$L$-函数的Beilinson-Bloch猜想的一部分,推广了Birch和Swinnerton-Dyer猜想。此外,假设特殊循环的Kudla生成函数的模块性,我们通过算术θ提升显式地构造了Chow群的某个$\pi$-几乎同构子空间中的元素,并根据中心导数$L'(1/2,\pi)$和局部加倍zeta积分计算了它们的高度。这证实了我们提出的猜想算术内积公式,该公式将Gross—Zagier公式推广到高维动机。
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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来源期刊
Annals of Mathematics
Annals of Mathematics 数学-数学
CiteScore
9.10
自引率
2.00%
发文量
29
审稿时长
12 months
期刊介绍: The Annals of Mathematics is published bimonthly by the Department of Mathematics at Princeton University with the cooperation of the Institute for Advanced Study. Founded in 1884 by Ormond Stone of the University of Virginia, the journal was transferred in 1899 to Harvard University, and in 1911 to Princeton University. Since 1933, the Annals has been edited jointly by Princeton University and the Institute for Advanced Study.
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