Holomorphic Mappings between Hyperquadrics with Small Signature Difference

Abstract

In this paper, we study holomorphic mappings sending a hyperquadric of signature in n into a hyperquadric of signature ' in N. We show (Theorem main) that if the signature difference '- is not too large, then the mapping can be normalized by automorphisms of the target hyperquadric to a particularly simple form and, in particular, the image of the mapping is contained in a complex plane of a dimension that depends only on and ', and not on the target dimension N. We also prove a Hopf Lemma type result (Theorem main2) for such mappings.