Super-Grassmannians for N=2 to 4 SCFT3: From AdS4 Correlators to N=4 SYM scattering Amplitudes

Abstract

We construct a Super-Grassmannian for n-point functions in N=2 to 4 SCFT3. The constraints imposed by super-conformal invariance and R-symmetry are completely manifest in this formalism through (operator-valued) delta functions. We test our formalism in N=2 and N=4 AdS4 super Yang-Mills theories. In the N=2 case, for instance, we reproduce the four-gluon correlator using the four-point scalar correlator as input. For N=4, we construct the super-operator in two distinct ways. In one approach, the super-operator has a lowest component of spin zero and includes all states up to spin two. In the other approach, we build the super-operator in a CPT self-conjugate manner, which contains only operators with spin zero, spin half, and spin one mimicking flat space N=4 SYM super-field constructions. The latter construction is particularly interesting, as it matches directly with the N=4 SYM amplitudes in the flat space limit, thereby demonstrating the non-triviality and usefulness of our framework. It is interesting to note that the R-symmetry group enhances from SO(N) to SU(N) in the flat space limit.