The Flat CR Twistor Model Q2,2 and Its Algebraic Sections

Abstract

We study the flat CR twistor model Q2,2⊂ CP3 by explicit projective methods. Using the anti-holomorphic involution j associated with the twistor fibration, we classify the projective lines contained in Q2,2 into twistor fibres and transverse lines, and relate the latter to round 2-spheres in S3 through an explicit incidence--tangency correspondence. We classify hyperplane sections under the twistor-compatible symmetry group PSp(1,1) and describe the induced CR geometries on S3. For smooth j-invariant quadric sections, we obtain a complete relative classification in terms of Coxeter's inversive distance and show that, in the disjoint case, the construction yields an explicit one-parameter family of globally defined real-analytic non-spherical Levi-nondegenerate CR structures on S3.