Fujita–Odaka的\（\delta _m）-不变量的反对称平衡度量和Hilbert–Mumford准则

IF 0.6 3区数学 Q3 MATHEMATICS Annals of Global Analysis and Geometry Pub Date : 2023-07-12 DOI:10.1007/s10455-023-09911-2

Yoshinori Hashimoto

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引用次数: 0

摘要

我们证明了Saito–Takahashi定义的Fano流形的稳定性条件，用Ding不变量和Chow权的和给出，等价于反对称平衡度量的存在性。结合Rubinstein–Tian–Zhang的结果，我们得到了以下代数几何推论：Fujita–Odaka的\（\delta _m）-不变量满足\。我们还将这一结果推广到Kähler–Ricci g孤子和耦合Kächler–Einstein度量，作为副产品，我们得到了耦合Ding泛函在多重测试配置下的渐近斜率公式。

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Anticanonically balanced metrics and the Hilbert–Mumford criterion for the \(\delta _m\)-invariant of Fujita–Odaka

We prove that the stability condition for Fano manifolds defined by Saito–Takahashi, given in terms of the sum of the Ding invariant and the Chow weight, is equivalent to the existence of anticanonically balanced metrics. Combined with the result by Rubinstein–Tian–Zhang, we obtain the following algebro-geometric corollary: the \(\delta _m\)-invariant of Fujita–Odaka satisfies \(\delta _m >1\) if and only if the Fano manifold is stable in the sense of Saito–Takahashi, establishing a Hilbert–Mumford-type criterion for \(\delta _m >1\). We also extend this result to the Kähler–Ricci g-solitons and the coupled Kähler–Einstein metrics, and as a by-product we obtain a formula for the asymptotic slope of the coupled Ding functional in terms of multiple test configurations.

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来源期刊

Annals of Global Analysis and Geometry 数学-数学

CiteScore

1.20

自引率

0.00%

发文量

审稿时长

6-12 weeks

期刊介绍： This journal examines global problems of geometry and analysis as well as the interactions between these fields and their application to problems of theoretical physics. It contributes to an enlargement of the international exchange of research results in the field. The areas covered in Annals of Global Analysis and Geometry include: global analysis, differential geometry, complex manifolds and related results from complex analysis and algebraic geometry, Lie groups, Lie transformation groups and harmonic analysis, variational calculus, applications of differential geometry and global analysis to problems of theoretical physics.

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