Approximation of pseudohermitian structures via embeddings into spheres

Abstract

Let (X,T1,0X) be a compact strictly pseudoconvex CR manifold which is CR embeddable into the complex Euclidean space. We show that T1,0X can be approximated in C∞-topology by a sequence of strictly pseudoconvex CR structures \Vk\k∈ N such that each (X,Vk) is CR embeddable into the unit sphere of a complex Euclidean space. Furthermore, as a refinement of this statement, we show that given a one form α on X such that (X,T1,0X,α) is a pseudohermitian manifold we can approximate (T1,0X,α) in C∞-topology by a sequence of pseudohermitian structures \(Vk,αk)\k∈ N on X such that for each k∈ N we have that (X,Vk,αk) is isomorphic to a real analytic pseudohermitian submanifold of a sphere. A similar result for the Sasakian case was obtained earlier by Loi-Placini. Let (X,T1,0X,T) be a compact Sasakian manifold, i.e. T is a transversal CR vector field and the one form α defined by α(T)=1 and α(ReT1,0X)=0 defines a pseudohermitian structure on (X,T1,0X). Loi-Placini showed that (T1,0X,T) can be smoothly approximated by a sequence of quasi-regular Sasakian structures \(Vk,Tk)\k∈ N on X such that each (X,Vk,Tk) admits a smooth equivariant CR embedding into a Sasakian sphere. Applying our methods to the Sasakian case we show that it is possible to approximate with a sequence of Sasakian structures having the form \(Vk,T)\k∈ N, i.e. we can keep the vector field T. Further applications concerning Sasakian deformations, the embedding of domains into balls and local approximation results are provided.