Super-rigidity for CR embeddings of real hypersurfaces into hyperquadrics

Abstract

Let QNl⊂ N+1 denote the standard real, nondegenerate hyperquadric of signature l and M⊂ n+1 a real, Levi nondegenerate hypersurface of the same signature l. We shall assume that there is a holomorphic mapping H0 U N0+1, where U is some neighborhood of M in n+1, such that H0(M)⊂ QN0l but H(U)⊂ QN0l. We show that if N0-n<l then, for any N≥ N0, any holomorphic mapping H U N+1 with H(M)⊂ QNl and H(U)⊂ QN0l must be the standard linear embedding of QN0l into QNl up to conjugation by automorphisms of QN0l and QNl.