Spin(7)-manifolds in compactifications to four dimensions

Abstract

We describe off-shell N=1 M-theory compactifications down to four dimensions in terms of eight-dimensional manifolds equipped with a topological Spin(7)-structure. Motivated by the exceptionally generalized geometry formulation of M-theory compactifications, we consider an eight-dimensional manifold M8 equipped with a particular set of tensors S that allow to naturally embed in M8 a family of G2-structure seven-dimensional manifolds as the leaves of a codimension-one foliation. Under a different set of assumptions, S allows to make M8 into a principal S1 bundle, which is equipped with a topological Spin(7)-structure if the base is equipped with a topological G2-structure. We also show that S can be naturally used to describe regular as well as a singular elliptic fibrations on M8, which may be relevant for F-theory applications, and prove several mathematical results concerning the relation between topological G2-structures in seven dimensions and topological Spin(7)-structures in eight dimensions.