Spin(7) metrics from K\"ahler Geometry

Abstract

We investigate the T2-quotient of a torsion free Spin(7)-structure on an 8-manifold under the assumption that the quotient 6-manifold is K\"ahler. We show that there exists either a Hamiltonian S1 or T2 action on the quotient preserving the complex structure. Performing a K\"ahler 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 T4, 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.