$mathbb{B}_7$ 家族的 ALC 成员上的 $G_2$- nstantons

arXiv - MATH - Differential Geometry Pub Date : 2024-09-05 DOI:arxiv-2409.03886

Jakob Stein, Matt Turner

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引用次数: 0

摘要

利用共偶性一对称性，我们在$S^3 \times \mathbb{R}^4 $上的$G_2$-metrics的渐近局部共轭$\mathbb{B}_7$-family的每一个成员上构建了非阿贝尔$G_2$-瞬子的双参数族，并对由此产生的解进行了分类。这些解可以描述为产生渐近圆纤维的基林向量场对无性瞬子单参数族的扰动。一般来说，这些扰动对模型呈指数衰减，但我们发现了一个具有多项式衰减的单参数瞬子族。此外，我们把这个二参数族与在无绝热极限下，Taub-NUT $/mathbb{R}^4$上的反自双瞬子的一个显式二参数族的提升联系起来。

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$G_2$-instantons on the ALC members of the $\mathbb{B}_7$ family

Using co-homogeneity one symmetries, we construct a two-parameter family of non-abelian $G_2$-instantons on every member of the asymptotically locally conical $\mathbb{B}_7$-family of $G_2$-metrics on $S^3 \times \mathbb{R}^4 $, and classify the resulting solutions. These solutions can be described as perturbations of a one-parameter family of abelian instantons, arising from the Killing vector-field generating the asymptotic circle fibre. Generically, these perturbations decay exponentially to the model, but we find a one-parameter family of instantons with polynomial decay. Moreover, we relate the two-parameter family to a lift of an explicit two-parameter family of anti-self-dual instantons on Taub-NUT $\mathbb{R}^4$, fibred over $S^3$ in an adiabatic limit.

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arXiv - MATH - Differential Geometry

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