Reciprocity and self-tuning relations without wrapping

Abstract

We consider scalar Wilson operators of N=4 SYM at high spin, s, and generic twist in the multi-color limit. We show that the corresponding (non)linear integral equations (originating from the asymptotic Bethe Ansatz equations) respect certain 'reciprocity' and functional 'self-tuning' relations up to all terms 1s( s)n (inclusive) at any fixed 't Hooft coupling λ. Of course, this relation entails straightforwardly the well-known (homonymous) relations for the anomalous dimension at the same order in s. On this basis we give some evidence that wrapping corrections should enter the non-linear integral equation and anomalous dimension expansions at the next order ( s)2s2, at fixed 't Hooft coupling, in such a way to re-establish the aforementioned relation (which fails otherwise).