Two-Loop Rational Terms in Yang-Mills Theories

TL;DR

This paper investigates the scheme dependence of two-loop rational counterterms in Yang-Mills theories and presents a method to derive them universally, enabling more flexible and efficient amplitude computations.

Contribution

It introduces a new approach to control scheme dependence of two-loop rational counterterms, allowing their universal derivation in renormalisable theories.

Findings

Identified nontrivial scheme dependence from mass and field renormalisation.

Developed a method to control scheme dependence via one-loop counterterms.

Computed the full set of two-loop rational counterterms in Yang-Mills theories.

Abstract

Scattering amplitudes in $D$ dimensions involve particular terms that originate from the interplay of UV poles with the $D-4$ dimensional parts of loop numerators. Such contributions can be controlled through a finite set of process-independent rational counterterms, which make it possible to compute loop amplitudes with numerical tools that construct the loop numerators in four dimensions. Building on a recent study [1] of the general properties of two-loop rational counterterms, in this paper we investigate their dependence on the choice of renormalisation scheme. We identify a nontrivial form of scheme dependence, which originates from the interplay of mass and field renormalisation with the $D-4$ dimensional parts of loop numerators, and we show that it can be controlled through a new kind of one-loop counterterms. This guarantees that the two-loop rational counterterms for a given renormalisable theory can be derived once and for all in terms of generic renormalisation constants, which can be adapted a posteriori to any scheme. Using this approach, we present the first calculation of the full set of two-loop rational counterterms in Yang-Mills theories. The results are applicable to SU(N) and U(1) gauge theories coupled to $n_{f}$ fermions with arbitrary masses.