Contact real hypersurfaces in the complex hyperbolic quadric
Abstract
We give a new proof of the classification of contact real hypersurfaces with constant mean curvature in the complex hyperbolic quadric Qm* = SOm,2o/SOmSO2, where m≥ 3. We show that a contact real hypersurface M in Qm* for m≥ 3 is locally congruent to a tube of radius r∈ R+ around the complex hyperbolic quadric Qm-1*, or to a tube of radius r∈R+ around the A-principal m-dimensional real hyperbolic space RHm in Qm* = SOm,2o/SOmSO2, or to a horosphere in Qm-1* induced by a class of A-principal geodesics in Qm*.
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