All orders results for self-crossing Wilson loops mimicking double parton scattering

TL;DR

This paper studies the singular behavior of six-point scattering amplitudes in planar ${\cal N}=4$ super-Yang-Mills theory using Wilson loops, deriving all-order results for self-crossing configurations related to double parton scattering.

Contribution

It provides an all-loop order analysis of self-crossing Wilson loops and their relation to scattering amplitude singularities, with explicit formulas for the logarithmic dependence.

Findings

Complete kinematic dependence determined to all loops.

Derived a simple formula for leading logarithms at all orders.

Found that non-MHV amplitudes remain finite in the self-crossing limit through four loops.

Abstract

Loop-level scattering amplitudes for massless particles have singularities in regions where tree amplitudes are perfectly smooth. For example, a $2\to4$ gluon scattering process has a singularity in which each incoming gluon splits into a pair of gluons, followed by a pair of $2\to2$ collisions between the gluon pairs. This singularity mimics double parton scattering because it occurs when the transverse momentum of a pair of outgoing gluons vanishes. The singularity is logarithmic at fixed order in perturbation theory. We exploit the duality between scattering amplitudes and polygonal Wilson loops to study six-point amplitudes in this limit to high loop order in planar ${\cal N}=4$ super-Yang-Mills theory. The singular configuration corresponds to the limit in which a hexagonal Wilson loop develops a self-crossing. The singular terms are governed by an evolution equation, in which the hexagon mixes into a pair of boxes; the mixing back is suppressed in the planar (large $N_c$) limit. Because the kinematic dependence of the box Wilson loops is dictated by (dual) conformal invariance, the complete kinematic dependence of the singular terms for the self-crossing hexagon on the one nonsingular variable is determined to all loop orders. The complete logarithmic dependence on the singular variable can be obtained through nine loops, up to a couple of constants, using a correspondence with the multi-Regge limit. As a byproduct, we obtain a simple formula for the leading logs to all loop orders. We also show that, although the MHV six-gluon amplitude is singular, remarkably, the transcendental functions entering the non-MHV amplitude are finite in the same limit, at least through four loops.