Isoparametric Hypersurfaces in Products of Simply Connected Space Forms
Abstract
Let Qεini denote the simply connected space form of dimension ni 2 and constant sectional curvature εi. We prove that any connected isoparametric hypersurface of Qε1n1× Qε2n2 has constant angle function. We then use this property to classify the isoparametric and homogeneous hypersurfaces of Qε1n1× Qε2n2, |ε1|+|ε2| 0, that satisfy a one-point condition.
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