Local orthogonal maps and rigidity of holomorphic mappings between real hyperquadrics

TL;DR

This paper introduces a coordinate-free method using orthogonality to analyze CR maps between real hyperquadrics, leading to simplified proofs of known rigidity theorems in complex geometry.

Contribution

A novel orthogonality-based approach that generalizes rigidity results for CR mappings between real hyperquadrics with simpler arguments.

Findings

Generalized several rigidity theorems for CR maps

Developed a coordinate-free framework based on Hermitian orthogonality

Simplified proofs of existing results in complex hyperquadric mappings

Abstract

We introduced a new coordinate-free approach to study the Cauchy-Riemann (CR) maps between the real hyperquadrics in the complex projective space. The central theme is based on a notion of orthogonality on the projective space induced by the Hermitian structure defining the hyperquadrics. There are various kinds of special linear subspaces associated to this orthogonality which are well respected by the relevant CR maps and this is where the rigidities come from. Our method allows us to generalize a number of well-known rigidity theorems for the CR mappings between real hyperquadrics with much simpler arguments.