From Webs to Polylogarithms

Abstract

We compute a class of diagrams contributing to the multi-leg soft anomalous dimension through three loops, by renormalizing a product of semi-infinite non-lightlike Wilson lines in dimensional regularization. Using non-Abelian exponentiation we directly compute contributions to the exponent in terms of webs. We develop a general strategy to compute webs with multiple gluon exchanges between Wilson lines in configuration space, and explore their analytic structure in terms of αij, the exponential of the Minkowski cusp angle formed between the lines i and j. We show that beyond the obvious inversion symmetry αij 1/αij, at the level of the symbol the result also admits a crossing symmetry αij -αij, relating spacelike and timelike kinematics, and hence argue that in this class of webs the symbol alphabet is restricted to αij and 1-αij2. We carry out the calculation up to three gluons connecting four Wilson lines, finding that the contributions to the soft anomalous dimension are remarkably simple: they involve pure functions of uniform weight, which are written as a sum of products of polylogarithms, each depending on a single cusp angle. We conjecture that this type of factorization extends to all multiple-gluon-exchange contributions to the anomalous dimension.