On CR embeddings of strictly pseudoconvex hypersurfaces into spheres in low dimensions

Abstract

It follows from the 2004 work of the first author, X.Huang, and D. Zaitsev that any local CR embedding f of a strictly psedoconvex hypersurface M2n+1⊂n+1 into the sphere 2N+1⊂ N+1 is rigid, i.e.\ any other such local embedding is obtained from f by composition by an automorphism of the target sphere 2N+1, provided that the codimension N-n<n/2. In this paper, we consider the limit case N-n=n/2 in the simplest situation where n=2, i.e.\ we consider local CR embeddings f M5 7. We show that there are at most two different local embeddings, up to composition with an automorphism of 7. We also identify a subclass of 5-dimensional, strictly pseudoconvex hypersurfaces M5 in terms of their CR curvatures such that rigidity holds for local CR embeddings f M5 7.