Curvature of an exotic 7-sphere
Abstract
We study the geometry of the Gromoll-Meyer sphere, one of Milnor's exotic 7-spheres. We focus on a Kaluza-Klein Ansatz, with a round S4 as base space, unit S3 as fibre, and k=1,2 SU(2) instantons as gauge fields, where all quantities admit an elegant description in quaternionic language. The metric's moduli space coincides with the k=1,2 instantons' moduli space quotiented by the isometry of the base, plus an additional R+ factor corresponding to the radius of the base, r. We identify a "center" of the k=2 instanton moduli space with enhanced symmetry. This k=2 solution is used together with the maximally symmetric k=1 solution to obtain a metric of maximal isometry, SO(3)× O(2), and to explicitly compute its Ricci tensor. This allows us to put a bound on r to ensure positive Ricci curvature, which implies various energy conditions for an 8-dimensional static space-time. This construction then enables a concrete examination of the properties of the sectional curvature.
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