HYPERSURFACES IN NONCOMPACT COMPLEX GRASSMANNIANS OF RANK TWO

Consider a Riemannian manifold N equipped with an additional geometric structure, such as a Kahler structure or a quaternionic Kahler structure, and a hypersurface M in N. The geometric structure induces a decomposition of the tangent bundle TM of M into subbundles. A natural problem is to classify all hypersurfaces in N for which the second fundamental form of M preserves these subbundles. This problem is reasonably well understood for Riemannian symmetric spaces of rank one, but not for higher rank symmetric spaces. A general treatment of this problem for higher rank symmetric spaces is out of reach at present, and therefore it is desirable to understand this problem better in a few special cases. Due to some conceptual differences between symmetric spaces of compact type and of noncompact type it appears that one needs to consider these two cases separately. In this paper we investigate this problem for the rank two symmetric space SU2,m/S(U2Um) of noncompact type.