Soft Algebra for N=4 SYM

Abstract

Scattering amplitudes of n particles in nonabelian gauge theories admit factorizations of the general form An \;=\; A softn × A hardn, where A softn is IR divergent, while A hardn is IR finite and encodes the higher loop corrections to scattering. We specify a particular all-orders definition of this factorization for planar N=4 super Yang-Mills (SYM) and argue that the resulting An hard obeys an uncorrected tree-level soft theorem. Moreover it furnishes a representation of the undeformed tree-level S-algebra generated by a tower of soft gluons. The results follow from several commonly invoked assumptions for N=4 SYM, including BDS one-loop exponentiation of the splitting function and amplitude/Wilson-loop duality.