The generalised scaling function: a systematic study

Abstract

We describe a procedure for determining the generalised scaling functions fn(g) at all the values of the coupling constant. These functions describe the high spin contribution to the anomalous dimension of large twist operators (in the sl(2) sector) of N=4 SYM. At fixed n, fn(g) can be obtained by solving a linear integral equation (or, equivalently, a linear system with an infinite number of equations), whose inhomogeneous term only depends on the solutions at smaller n. In other words, the solution can be written in a recursive form and then explicitly worked out in the strong coupling regime. In this regime, we also emphasise the peculiar convergence of different quantities ('masses', related to the fn(g)) to the unique mass gap of the O(6) nonlinear sigma model and analyse the first next-to-leading order corrections.