Exact expressions for n-point maximal U(1)Y-violating integrated correlators in SU(N) N=4 SYM

Abstract

The exact expressions for integrated maximal U(1)Y violating (MUV) n-point correlators in SU(N) N=4 supersymmetric Yang--Mills theory are determined. The analysis generalises previous results on the integrated correlator of four superconformal primaries and is based on supersymmetric localisation. The integrated correlators are functions of N and τ=θ/(2π)+4π i/g_YM2, and are expressed as two-dimensional lattice sums that are modular forms with holomorphic and anti-holomorphic weights (w,-w) where w=n-4. The correlators satisfy Laplace-difference equations that relate the SU(N+1), SU(N) and SU(N-1) expressions and generalise the equations previously found in the w=0 case. The correlators can be expressed as infinite sums of Eisenstein modular forms of weight (w,-w). For any fixed value of N the perturbation expansion of this correlator is found to start at order ( g_YM2 N)w. The contributions of Yang--Mills instantons of charge k>0 are of the form qk\, f(g_YM), where q=e2π i τ and f(g_YM)= O(g_YM-2w) when g_YM2 1. Anti-instanton contributions have charge k<0 and are of the form q|k| \, f(g_YM), where f(g_YM) = O(g_YM2w) when g_YM2 1. Properties of the large-N expansion are in agreement with expectations based on the low energy expansion of flat-space type IIB superstring amplitudes. We also comment on the identification of n-point free-field MUV correlators with the integrands of (n-4)-loop perturbative contributions to the four-point correlator. In particular, we emphasise the important r\ole of SL(2, Z)-covariance in the construction.