On the singlet projector and the monodromy relation for psu(2, 2|4) spin chains and reduction to subsectors

TL;DR

This paper extends the group theoretic approach to the psu(2,2|4) sector of N=4 super Yang-Mills, deriving monodromy relations and covariant operators, bridging weak and strong coupling regimes and subsector reductions.

Contribution

It introduces a covariant construction of the singlet-projection operator and derives monodromy relations for harmonic and fundamental R-matrices in the full psu(2,2|4) sector.

Findings

Derived monodromy relations for harmonic R-matrix

Constructed covariant singlet-projection operator

Analyzed reduction to subsectors of psu(2,2|4)

Abstract

As a step toward uncovering the relation between the weak and the strong coupling regimes of the $\mathcal{N}=4$ super Yang-Mills theory beyond the specral level, we have developed in a previous paper [arXiv:1410.8533] a novel group theoretic interpretation of the Wick contraction of the fields, which allowed us to compute a much more general class of three-point functions in the SU(2) sector, as in the case of strong coupling [arXiv:1312.3727], directly in terms of the determinant representation of the partial domain wall partition funciton. Furthermore, we derived a non-trivial identity for the three point functions with monodromy operators inserted, being the discrete counterpart of the global monodromy condition which played such a crucial role in the computation at strong coupling. In this companion paper, we shall extend our study to the entire ${\rm psu}(2,2|4)$ sector and obtain several important generalizations. They include in particular (i) the manifestly conformally covariant construction, from the basic principle, of the singlet-projection operator for performing the Wick contraction and (ii) the derivation of the monodromy relation for the case of the so-called "harmonic R-matrix", as well as for the usual fundamental R-matrtix. The former case, which is new and has features rather different from the latter, is expected to have important applications. We also describe how the form of the monodromy relation is modified as ${\rm psu}(2,2|4)$ is reduced to its subsectors.