摘要: A differentiable manifold is said to be contact if it admits a linear functional f on the tangent bundle satisfying f ∧(df)M-1≠0.This remark obtain the following the classification: LetM be a complete connected contact hyper-surface of CH2(-4),then M is congruent to one of the following:(i)A tube of radius r>0 around a totally geodesic,totally real hyperbolic space form H2(-1);(ii)A tube of radius r>0 around a totally geodesic complex hyperbolic space form CH1(-4);(iii)A geodesic hypersphere of radius r>0,or(iv)A horosphere.
