Adelic geometry on arithmetic surfaces, I: Idelic and adelic interpretation of the Deligne pairing

Pub Date : 2018-12-27 DOI:10.1215/21562261-2022-0009
Paolo Dolce
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引用次数: 1

Abstract

For an arithmetic surface $X\to B=\operatorname{Spec} O_K$ the Deligne pairing $\left<\,,\,\right>\colon \operatorname{Pic}(X) \times \operatorname{Pic}(X) \to \operatorname{Pic}(B)$ gives the"schematic contribution"to the Arakelov intersection number. We present an idelic and adelic interpretation of the Deligne pairing; this is the first crucial step for a full idelic and adelic interpretation of the Arakelov intersection number. For the idelic approach we show that the Deligne pairing can be lifted to a pairing $\left<\,,\,\right>_i:\ker(d^1_\times)\times \ker(d^1_\times)\to\operatorname{Pic}(B) $, where $\ker(d^1_\times)$ is an important subspace of the two dimensional idelic group $\mathbf A_X^\times$. On the other hand, the argument for the adelic interpretation is entirely cohomological.
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算术曲面上的阿德利几何,I:德列涅配对的阿德利几何和阿德利几何解释
对于算术曲面$X\to B=\operatorname{Spec}O_K$,Deligne配对$\left\colon\operatorname{Pic}。我们对Deligne配对给出了一个理想的和熟练的解释;这是对Arakelov交数进行全面理想和熟练解释的第一个关键步骤。对于理想化方法,我们证明了Deligne配对可以提升到$\left_i:\ker(d^1_\times)\times\ker(d^1 \times。另一方面,专业解释的论点完全是同调的。
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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