Foliated backgrounds for M-theory compactifications (II)

Abstract

We summarize the foliation approach to N=1 compactifications of eleven-dimensional supergravity on eight-manifolds M down to AdS3 spaces for the case when the internal part of the supersymmetry generator is chiral on some proper subset W of M. In this case, a topological no-go theorem implies that the complement M W must be a dense open subset, while M admits a singular foliation F (in the sense of Haefliger) which is defined by a closed one-form ω and is endowed with a longitudinal G2 structure. The geometry of this foliation is determined by the supersymmetry conditions. We also describe the topology of F in the case when ω is a Morse form.