On Hopf hypersurfaces of the homogeneous nearly K\"ahler S3×S3

Abstract

In this paper, extending our previous joint work (Hu et al., Math Nachr 291:343--373, 2018), we initiate the study of Hopf hypersurfaces in the homogeneous NK (nearly K\"ahler) manifold S3×S3. First, we show that any Hopf hypersurface of the homogeneous NK S3×S3 does not admit two distinct principal curvatures. Then, for the important class of Hopf hypersurfaces with three distinct principal curvatures, we establish a complete classification under the additional condition that their holomorphic distributions \U\ are preserved by the almost product structure P of the homogeneous NK S3×S3.