Heavenly metrics, hyper-Lagrangians and Joyce structures

IF 1 2区数学 Q1 MATHEMATICS Journal of the London Mathematical Society-Second Series Pub Date : 2024-10-11 DOI:10.1112/jlms.13009

Maciej Dunajski, Timothy Moy

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Abstract

In [Proc. Sympos. Pure Math., American Mathematical Society, Providence, RI, 2021, pp. 1–66], Bridgeland defined a geometric structure, named a Joyce structure, conjectured to exist on the space $M$ of stability conditions of a $C Y_{3}$ triangulated category. Given a non-degeneracy assumption, a feature of this structure is a complex hyper-Kähler metric with homothetic symmetry on the total space $X = T M$ of the holomorphic tangent bundle. Generalising the isomonodromy calculation which leads to the $A_{2}$ Joyce structure in [Math. Ann. 385 (2023), 193–258], we obtain an explicit expression for a hyper-Kähler metric with homothetic symmetry via construction of the isomonodromic flows of a Schrödinger equation with deformed polynomial oscillator potential of odd-degree $2 n + 1$ . The metric is defined on a total space $X$ of complex dimension $4 n$ and fibres over a $2 n$ -dimensional manifold $M$ which can be identified with the unfolding of the $A_{2 n}$ -singularity. The hyper-Kähler structure is shown to be compatible with the natural symplectic structure on $M$ in the sense of admitting an affine symplectic fibration as defined in [Lett. Math. Phys. 111 (2021), 54]. Separately, using the additional conditions imposed by a Joyce structure, we consider reductions of Plebański's heavenly equations that govern the hyper-Kähler condition. We introduce the notion of a projectable hyper-Lagrangian foliation and show that in dimension four such a foliation of $X$ leads to a linearisation of the heavenly equation. The hyper-Kähler metrics constructed here are shown to admit such a foliation.

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天堂度量、超拉格朗日和乔伊斯结构

在[Proc.Pure Math.，American Mathematical Society，Providence，RI，2021，pp.1-66]中，布里奇兰定义了一种几何结构，命名为乔伊斯结构，猜想它存在于 C Y 3 $CY_3$ 三角形范畴的稳定条件空间 M $M$ 上。考虑到非退化假设，该结构的一个特征是在全形切线束的总空间 X = T M $X = TM$ 上具有同调对称性的复超凯勒度量。数学年鉴》385 (2023), 193-258]中的等单旋转计算导致了 A 2 $A_2$ 乔伊斯结构，我们通过构建具有奇数度 2 n + 1 $2n+1$ 变形多项式振荡器势的薛定谔方程的等单旋转流，得到了具有同调对称性的超凯勒度量的明确表达式。该度量定义在复维度为 4 n $4n$ 的总空间 X $X$ 上，其纤维覆盖 2 n $2n$ 维流形 M $M$，该流形可与 A 2 n $A_{2n}$ 星状性的展开相鉴别。超凯勒结构与 M $M$ 上的自然交映结构是相容的，就像[Lett. Math. Phys.另外，利用乔伊斯结构施加的附加条件，我们考虑了制约超凯勒条件的普莱宾斯基天体方程的还原。我们引入了可投影超拉格朗日折线的概念，并证明在四维中，X $X$ 的这种折线会导致天体方程的线性化。在此构建的超凯勒度量也被证明允许这样的折射。

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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来源期刊

Journal of the London Mathematical Society-Second Series 数学-数学

CiteScore

1.90

自引率

0.00%

发文量

186

审稿时长

6-12 weeks

期刊介绍： The Journal of the London Mathematical Society has been publishing leading research in a broad range of mathematical subject areas since 1926. The Journal welcomes papers on subjects of general interest that represent a significant advance in mathematical knowledge, as well as submissions that are deemed to stimulate new interest and research activity.

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