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Communications in Analysis and Geometry
Volume 31 (2023)
Number 5
$\operatorname{Spin}(7)$ metrics from Kähler Geometry
Pages: 1217 – 1258
DOI: https://dx.doi.org/10.4310/CAG.2023.v31.n5.a5
Author
Abstract
We investigate the $\mathbb{T}^2$-quotient of a torsion free $Spin(7)$-structure on an $8$-manifold under the assumption that the quotient $6$-manifold is Kähler. We show that there exists either a Hamiltonian $S^1$ or $\mathbb{T}^2$ action on the quotient preserving the complex structure. Performing a Kähler reduction in each case reduces the problem of finding $Spin(7)$ metrics to studying a system of PDEs on either a $4$- or $2$-manifold with trivial canonical bundle, which in the compact case corresponds to either $\mathbb{T}^4$, a $K3$ surface or an elliptic curve. By reversing this construction we give infinitely many new explicit examples of $Spin(7)$ holonomy metrics. In the simplest case, our result can be viewed as an extension of the Gibbons–Hawking ansatz.
Received 27 March 2020
Accepted 15 April 2021
Published 16 July 2024