Complete non-compact Spin(7)-manifolds from T2-bundles over AC Calabi Yau manifolds

Abstract

We develop a new construction of complete non-compact 8-manifolds with Riemannian holonomy equal to Spin(7). As a consequence of the holonomy reduction, these manifolds are Ricci-flat. These metrics are built on the total spaces of principal T2-bundles over asymptotically conical Calabi Yau manifolds, and the result is generalized to orbifolds. The resulting metrics have a new geometry at infinity that we call asymptotically T2-fibred conical (AT2C) and which generalizes to higher dimensions the ALG metrics of 4-dimensional hyperk\"ahler geometry, analogously to how ALC metrics generalize ALF metrics. As an application of this construction, we produce infinitely many diffeomorphism types of AT2C Spin(7)-manifolds and the first known examples of complete toric Spin(7)-manifold.

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