The Conformal Grassmannian: A Symplectic Bi-Grassmannian for CFT 4 Correlators

Abstract

We introduce a formalism for conformal field theory in four dimensions: a symplectic bi-Grassmannian representation of CFT4 Wightman correlators. Working in Klein space with off-shell spinor-helicity variables, we show that correlators of = 2 scalars and symmetric-traceless conserved currents are encoded by integrals over a pair of n-planes in a 2n-dimensional symplectic vector space. These planes are constrained to be mutually symplectically orthogonal and aligned with the external kinematics. Conformal invariance, momentum conservation, and little-group covariance all follow geometrically from this structure. We derive all two- and three-point functions involving scalars, fermions, conserved currents, and stress tensors. As a non-trivial test, we show that the construction reproduces the full set of independent conformally invariant structures of JJJ and TTT in CFT4. The resulting expressions are considerably more compact than their momentum-space counterparts. They also make manifest the double copy between Yang--Mills JJJ and Einstein-gravity TTT . We further present a helicity-basis reformulation that makes the GL(1,R) and SL(2,R) weights of individual helicity components explicit. This basis also provides a natural starting point for a twistor-space formulation of the correlators.