Cohomogeneity-One Ruled Hypersurfaces in CP2 and CH2

Abstract

In this paper, we show how to construct a special class of ruled hypersurfaces in the nonflat complex space forms CPn and CHn. This is done by taking an arbitrary smooth curve in a totally geodesic (complex) one-dimensional submanifold and erecting an orthogonal ruling over each of its points. Concentrating on the n=2 case, we also examine the special situation in which the base curve has constant geodesic curvature. We show that, in this case, the construction yields precisely the real-analytic hypersurfaces of cohomogeneity one that satisfy a certain transversality condition.