Universal Hermitian Projective Calculus for CH2

Abstract

We develop an algebraic invariant calculus for complex hyperbolic two-space CH2 in its Hermitian projective model. Starting from a three-dimensional Hermitian vector space of signature (2,1), we treat CH2 as the projectivized negative cone and its boundary as the projectivized null cone. The resulting calculus replaces metric and angular quantities by projectively invariant algebraic data: Hermitian pair moduli, determinant quadrance, polar spread, triple-product phase, cross-ratio invariants, contact boundary forms, normalized ball kernels, and finite Hermitian incidence laws. We prove denominator-cleared identities for three-point Gram determinants, triangle trigonometry, complex geodesics, bisectors, spinal spheres, projective-unitary covariance, CR/contact atlas transitions, and kernel boundary limits. The triple-product phase supplies the algebraic source of the Cartan angular invariant, while pair invariants recover the usual Bergman distance and polar-spread data over C. The same formulas are also organized over starred fields, including finite Hermitian geometries, giving a field-uniform projective calculus for complex hyperbolic geometry.