Three-point functions of conserved currents in 4D CFT: general formalism for arbitrary spins

Abstract

We analyse the general structure of the three-point functions involving conserved higher-spin currents Js := Jα(i) α(j) belonging to any Lorentz representation in four-dimensional conformal field theory. Using the constraints of conformal symmetry and conservation equations, we computationally analyse the general structure of three-point functions Js1 J's2 J''s3 for arbitrary spins and propose a classification of the results. For bosonic vector-like currents with i=j, it is known that the number of independent conserved structures is 2 (si) + 1. For the three-point functions of conserved currents with arbitrarily many dotted and undotted indices, we show that in many cases the number of structures deviates from 2 (si) + 1.