Correlation functions of composite Ramond fields in deformed D1-D5 orbifold SCFT2

Abstract

We study two families of composite twisted Ramond fields (made by products of two operators) in the N=(4,4) supersymmetric D1-D5 SCFT2 deformed by a marginal modulus operator away from its (T4)N/ SN free orbifold point. We construct the large-N contributions to the four-point functions with two composite operators and two deformation fields. These functions allow us to derive short-distance OPE limits and to calculate the anomalous dimensions of the composite operators. We demonstrate that one can distinguish two sets of composite Ramond states with twists m1 and m2: protected states, for which m1+m2=N, and "lifted" states for which m1+m2<N. The latter require an appropriate renormalisation. We also derive the leading order corrections to their two-point functions, and to their three-point functions with the deformation operator.