Superconformal index for N = 4 Super Yang-Mills and Elliptic Macdonald Polynomials

Abstract

We establish a connection between the superconformal index of N=4 U(N) SYM and the elliptic Ruijsenaars-Schneider integrable system. The index admits an expression in terms of elliptic Macdonald polynomials, which leads to a compact summation over generalized partitions involving the structure constants Bλ(p,q,t) and normalization constants Nλ(p,q,t). By solving the elliptic Ruijsenaars-Schneider model perturbatively in the elliptic parameter p, a systematic expansion of the index in powers of p is obtained. We check that in various limits, namely a deformed 1/2 BPS limit and the large N limit, our formalism reduces to previously known results.