Three-point Functions in N=4 SYM at Finite Nc and Background Independence

Abstract

We compute non-extremal three-point functions of scalar operators in N=4 super Yang-Mills at tree-level in gYM and at finite Nc, using the operator basis of the restricted Schur characters. We make use of the diagrammatic methods called quiver calculus to simplify the three-point functions. The results involve an invariant product of the generalized Racah-Wigner tensors (6j symbols). Assuming that the invariant product is written by the Littlewood-Richardson coefficients, we show that the non-extremal three-point functions satisfy the large Nc background independence; correspondence between the string excitations on AdS5 × S5 and those in the LLM geometry.