Three-point functions of conserved supercurrents in 3D N=1 SCFT: general formalism for arbitrary superspins

Abstract

We analyse the general structure of the three-point functions of conserved higher-spin supercurrents in 3D, N=1 superconformal field theory. It is shown that supersymmetry imposes additional restrictions on correlation functions of conserved higher-spin currents. We develop a manifestly supersymmetric formalism to compute the three-point function Js1 J's2 J''s3 , where Js1, J's2 and J''s3 are conserved higher-spin supercurrents with superspins s1, s2 and s3 respectively (integer or half-integer). Using a computational approach limited only by computer power, we analytically impose the constraints arising from the superfield conservation equations and symmetries under permutations of superspace points. Explicit solutions for three-point functions are presented and we provide a complete classification of the results for si ≤ 20 ; the pattern is very clear, and we propose that our classification holds for arbitrary superspins. We demonstrate that Grassmann-even three-point functions are fixed up to one parity-even structure and one parity-odd structure, while Grassmann-odd three-point functions are fixed up to a single parity-even structure. The existence of the parity-odd structure in the Grassmann-even correlation functions is subject to a set of triangle inequalities in the superspins. For completeness, we also analyse the structure of three-point functions involving conserved higher-spin supercurrents and scalar superfields.