$\mathbb{Q}$-Fano的分不稳定性和Vojta的主要猜想

Pub Date : 2019-01-23 DOI:10.4310/ajm.2020.v24.n6.a3

Nathan Grieve

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引用次数: 1

摘要

我们结合围绕Fano变种的$\mathrm{K}$稳定性的概念，研究了对偶除数的丢番图算术性质。还有一个关于牛顿-奥昆科夫天体重心的解释。我们的主要结果表明，在藤田的意义上，除法不稳定性的概念如何暗示了Vojta对Fano变种的主要猜想的实例。证明这些结果的一个主要工具是M.Ru和P.Vojta获得的Cartan第二主要定理的算术形式。

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Divisorial instability and Vojta’s main conjecture for $\mathbb{Q}$-Fano varieties

We study Diophantine arithmetic properties of birational divisors in conjunction with concepts that surround $\mathrm{K}$-stability for Fano varieties. There is also an interpretation in terms of the barycentres of Newton-Okounkov bodies. Our main results show how the notion of divisorial instability, in the sense of K. Fujita, implies instances of Vojta's Main Conjecture for Fano varieties. A main tool in the proof of these results is an arithmetic form of Cartan's Second Main Theorem that has been obtained by M. Ru and P. Vojta.

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