关于一类托里式谎言的尤-田-唐纳森通信

Pub Date : 2021-08-27 DOI:10.5802/aif.3580
S. Jubert
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引用次数: 1

摘要

我们建立了一个Yau-Tian-Donaldson类型的对应关系,用一个单一的Delzant多面体表示,关于一大类复曲面上极值K\“ahler度量的存在性,由Apostolov-Calderbank-Gauduchon-Tonnesen-Friedman引入,称为半简单主复曲面。我们使用总空间上的极值度量对应于相应复曲面上的加权常标量曲率K\”ahler度量(在Lahdili的意义上),以便得到了全空间上极值K\“ahler度量的存在性与相应Delzant多面体的加权一致K-稳定性的一个适当概念之间的等价性。作为一个应用,我们证明了投影平面丛$\mathbb{P}(\mathcal{L}_0\oplus\mathcal{L}_1\oplus\mathcal{L}_2)$,其中$\mathcal{L}_i$是椭圆曲线上的全纯线性丛,在每个K\“ahler类中都允许一个极值度量。
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A Yau–Tian–Donaldson correspondence on a class of toric fibrations
We established a Yau--Tian--Donaldson type correspondence, expressed in terms of a single Delzant polytope, concerning the existence of extremal K\"ahler metrics on a large class of toric fibrations, introduced by Apostolov--Calderbank--Gauduchon--Tonnesen-Friedman and called semi-simple principal toric fibrations. We use that an extremal metric on the total space corresponds to a weighted constant scalar curvature K\"ahler metric (in the sense of Lahdili) on the corresponding toric fiber in order to obtain an equivalence between the existence of extremal K\"ahler metrics on the total space and a suitable notion of weighted uniform K-stability of the corresponding Delzant polytope. As an application, we show that the projective plane bundle $\mathbb{P}(\mathcal{L}_0\oplus\mathcal{L}_1 \oplus \mathcal{L}_2)$, where $\mathcal{L}_i$ are holomorphic line bundles over an elliptic curve, admits an extremal metric in every K\"ahler class.
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