On homogeneous hypersurfaces in C3

Abstract

We consider a family Mtn, with n 2, t>1, of real hypersurfaces in a complex affine n-dimensional quadric arising in connection with the classification of homogeneous compact simply-connected real-analytic hypersurfaces in Cn due to Morimoto and Nagano. To finalize their classification, one needs to resolve the problem of the embeddability of Mtn in Cn for n=3,7. In our earlier article we showed that Mt7 is not embeddable in C7 for every t and that Mt3 is embeddable in C3 for all 1<t<1+10-6. In the present paper, we improve on the latter result by showing that the embeddability of Mt3 in fact takes place for 1<t<(2+2)/3. This is achieved by analyzing the explicit totally real embedding of the sphere S3 in C3 constructed by Ahern and Rudin. For t(2+2)/3 the problem of the embeddability of Mt3 remains open.