Nearly hypo structures and compact Nearly K\"ahler 6-manifolds with conical singularities

Abstract

We prove that any totally geodesic hypersurface N5 of a 6-dimensional nearly K\"ahler manifold M6 is a Sasaki-Einstein manifold, and so it has a hypo structure in the sense of ConS. We show that any Sasaki-Einstein 5-manifold defines a nearly K\"ahler structure on the sin-cone N5× R, and a compact nearly K\"ahler structure with conical singularities on N5× [0,π] when N5 is compact thus providing a link between Calabi-Yau structure on the cone N5× [0,π] and the nearly K\"ahler structure on the sin-cone N5× [0,π]. We define the notion of nearly hypo structure that leads to a general construction of nearly K\"ahler structure on N5× R. We determine double hypo structure as the intersection of hypo and nearly hypo structures and classify double hypo structures on 5-dimensional Lie algebras with non-zero first Betti number. An extension of the concept of nearly K\"ahler structure is introduced, which we refer to as nearly half flat SU(3)-structure, that leads us to generalize the construction of nearly parallel G2-structures on M6× R given in BM. For N5=S5⊂ S6 and for N5=S2 × S3⊂ S3 × S3, we describe explicitly a Sasaki-Einstein hypo structure as well as the corresponding nearly K\"ahler structures on N5× R and N5× [0,π], and the nearly parallel G2-structures on N5× R2 and (N5× [0,π])× [0,π].

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