Hypersurfaces of S3 × R and H3 × R with constant principal curvatures
Abstract
We classify the hypersurfaces of Q3×R with three distinct constant principal curvatures, where ∈ \1,-1\ and Q3 denotes the unit sphere S3 if = 1, whereas it denotes the hyperbolic space H3 if = -1. We show that they are cylinders over isoparametric surfaces in Q3, filling an intriguing gap in the existing literature. We also prove that the hypersurfaces with constant principal curvatures of Q3×R are isoparametric. Furthermore, we provide the complete classification of the extrinsically homogeneous hypersurfaces in Q3×R.
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