Hypersurfaces of six-dimensional nearly K\"ahler manifolds

Abstract

In the context of six-dimensional homogeneous nearly K\"ahler manifolds, we prove that S6 is the only ambient space admitting constant sectional curvature hypersurfaces. In order to do so, we prove first that in S3× S3, C P3 and F( C3), any hypersurface with constant sectional curvature is η-quasi umbilical, where η is the dual one-form of the Reeb vector field. Then, we use the non-existence of such hypersurfaces in these spaces. Additionally, we characterize hypersurfaces of six-dimensional nearly K\"ahler manifolds which are Sasakian, nearly Sasakian, co-K\"ahler and nearly cosymplectic.