Curvature-adapted hypersurfaces of 2-type in non-flat quaternionic space forms

Abstract

We classify curvature-adapted real hypersurfaces M of non-flat quaternionic space forms HPm and HHm that are of Chen type 2 in an appropriately defined (pseudo) Euclidean space of quaternion-Hermitian matrices, where in the hyperbolic case we assume additionally that the hypersurace has constant principal curvatures. In the quaternionic projective space they include geodesic hyperspheres of arbitrary radius r ∈ (0, π/2) except one, two series of tubes about canonically embedded quaternionic projective spaces of lower dimensions and two particular tubes about a canonically embedded CPm ⊂ HPm . On the other hand, the list of 2-type curvature-adapted hypersurfaces with constant principal curvatures in HHm is reduced to geodesic spheres and tubes of arbitrary radius about totally geodesic quaternionic hyperplane HHm-1. Among these hypersurfaces we determine those that are mass-symmetric or minimal. We also show that the horosphere H3 in HHm is not of finite type but satisfies 2 x = const.

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