Maximal U(1)Y-violating n-point correlators in N=4 super-Yang-Mills theory

Abstract

This paper concerns a special class of n-point correlation functions of operators in the stress tensor supermultiplet of N=4 supersymmetric SU(N) Yang-Mills theory. These are "maximal U(1)Y-violating" correlators that violate the bonus U(1)Y charge by a maximum of 2(n-4) units. We will demonstrate that such correlators satisfy SL(2,Z)-covariant recursion relations that relate n-point correlators to (n-1)-point correlators in a manner analogous to the soft dilaton relations that relate the corresponding amplitudes in flat-space type IIB superstring theory. These recursion relations are used to determine terms in the large-N expansion of n-point maximal U(1)Y-violating correlators in the chiral sector, including correlators with four superconformal stress tensor primaries and (n-4) chiral Lagrangian operators, starting from known properties of the n=4 case. We concentrate on the first three orders in 1/N beyond the supergravity limit. The Mellin representations of the correlators are polynomials in Mellin variables, which correspond to higher derivative contact terms in the low-energy expansion of type IIB superstring theory in AdS5 × S5 at the same orders as R4, d4R4 and d6R4. The coupling constant dependence of these terms is found to be described by non-holomorphic modular forms with holomorphic and anti-holomorphic weights (n-4,4-n) that are SL(2, Z)-covariant derivatives of Eisenstein series and certain generalisations. This determines a number of non-leading contributions to U(1)Y-violating n-particle interactions (n>4) in the low-energy expansion of type IIB superstring amplitudes in AdS5× S5.