Deformations and embeddings of three-dimensional strictly pseudoconvex CR manifolds

Abstract

Abstract deformations of the CR structure of a compact strictly pseudoconvex hypersurface M in C2 are encoded by complex functions on M. In sharp contrast with the higher dimensional case, the natural integrability condition for 3-dimensional CR structures is vacuous, and generic deformations of a compact strictly pseudoconvex hypersurface M⊂eq C2 are not embeddable even in CN for any N. A fundamental (and difficult) problem is to characterize when a complex function on M ⊂eq C2 gives rise to an actual deformation of M inside C2. In this paper we study the embeddability of families of deformations of a given embedded CR 3-manifold, and the structure of the space of embeddable CR structures on S3. We show that the space of embeddable deformations of the standard CR 3-sphere is a Frechet submanifold of C∞(S3,C) near the origin. We establish a modified version of the Cheng-Lee slice theorem in which we are able to characterize precisely the embeddable deformations in the slice (in terms of spherical harmonics). We also introduce a canonical family of embeddable deformations and corresponding embeddings starting with any infinitesimally embeddable deformation of the unit sphere in C2.