Abstract
Form factors, as quantities involving both local operators and asymptotic particle states, contain information of both the spectrum of operators and the on-shell amplitudes. So far the studies of form factors have been mostly focused on the large Nc planar limit, with a few exceptions of Sudakov form factors. In this paper, we discuss the systematical construction of full color dependent form factors with generic local operators. We study the color decomposition for form factors and discuss the general strategy of using on-shell unitarity cut method. As concrete applications, we compute the full two-loop non-planar minimal form factors for both half-BPS operators and non-BPS operators in the SU(2) sector in mathcal{N} = 4 SYM. Another important aspect is to investigate the color-kinematics (CK) duality for form factors of high-length operators. Explicit CK dual representation is found for the two-loop half-BPS minimal form factors with arbitrary number of external legs. The full-color two-loop form factor result provides an independent check of the infrared dipole formula for two-loop n-point amplitudes. By extracting the UV divergences, we also reproduce the known non-planar SU(2) dilatation operator at two loops. As for the finite remainder function, interestingly, the non-planar part is found to contain a new maximally transcendental part beyond the known planar result.
Highlights
The large Nc limit has been a useful approximation in the study of gauge theories [1]
The full-color two-loop form factor result provides an independent check of the infrared dipole formula for two-loop n-point amplitudes
Form factors provide an alternative way to compute the dilatation operator, and as we will discuss in this paper, the on-shell method makes it straightforward to go beyond the planar limit
Summary
The large Nc limit (i.e. the planar limit) has been a useful approximation in the study of gauge theories [1]. A concrete goal of this paper is to study the non-planar form factors of generic high-length local operators in N = 4 SYM This generalization is important in the sense. As for the second approach, an important tool for non-planar construction is the colorkinematics duality [48, 49], where the entanglement between color and kinematics becomes a bonus in the construction (see [60] for an extensive review of the developments) As mentioned above, this duality has been very useful for computing the Sudakov form factors in N = 4 SYM [46, 47]. We make a concrete step and find a two-loop integral representation that manifests the color-kinematics duality for minimal form factors of half-BPS operators tr(φL) for arbitrary L (which equals to the number of external on-shell legs). Appendix A–F contain some further discussions and several technical details
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