公制网束的非阿基米德体积

Pub Date : 2020-11-13 DOI:10.46298/epiga.2021.6908
S. Boucksom, Walter Gubler, Florent Martin
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引用次数: 5

摘要

设$L$是在非平凡值非阿基米德域$K$上的一个适当的几何简化格式$X$上的一个线束。粗略地说,在L$的Berkovich分析上的连续度规的非阿基米德体积度量了L$的张量幂的小截面空间的渐近增长。对于张氏意义上的L上的连续半正度规,我们首先证明了非阿基米德体积与能量是一致的。这种半正度量的存在使得$L$为nef。第二个结果是,非阿基米德体积在任何半正连续度规下都是可微的。当$L$足够时,这些结果是已知的,本文的目的是将它们推广到新情况。该方法是基于在$K$的估值环上(可能是非诺etherian)的有限呈现的扭模的内容和体积的详细研究。
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Non-Archimedean volumes of metrized nef line bundles
Let $L$ be a line bundle on a proper, geometrically reduced scheme $X$ over a non-trivially valued non-Archimedean field $K$. Roughly speaking, the non-Archimedean volume of a continuous metric on the Berkovich analytification of $L$ measures the asymptotic growth of the space of small sections of tensor powers of $L$. For a continuous semipositive metric on $L$ in the sense of Zhang, we show first that the non-Archimedean volume agrees with the energy. The existence of such a semipositive metric yields that $L$ is nef. A second result is that the non-Archimedean volume is differentiable at any semipositive continuous metric. These results are known when $L$ is ample, and the purpose of this paper is to generalize them to the nef case. The method is based on a detailed study of the content and the volume of a finitely presented torsion module over the (possibly non-noetherian) valuation ring of $K$.
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