A differential operator for integrating one-loop scattering equations

TL;DR

This paper introduces a differential operator to efficiently compute residues in scattering amplitude forms, simplifying calculations and establishing connections with existing methods like Q-cut for one-loop Yang-Mills amplitudes.

Contribution

A novel differential operator is proposed for residue calculation in scattering equations, improving computational efficiency and linking to known amplitude results.

Findings

Successfully evaluated tree-level $\

Derived the one-loop Yang-Mills integrand with clear correspondence to Q-cut results.

Reduced computational complexity in amplitude calculations.

Abstract

We propose a differential operator for computing the residues associated with a class of meromorphic $n$-forms that frequently appear in the Cachazo-He-Yuan form of the scattering amplitudes. This differential operator is conjectured to be uniquely determined by the local duality theorem and the intersection number of the divisors in the $n$-form. We use the operator to evaluate the tree-level amplitude of $\phi^3$ theory and the one-loop integrand of Yang-Mills theory from their CHY forms. The method can reduce the complexity of the calculation. In addition, the expression for the 1-loop four-point Yang-Mills integrand obtained in our approach has a clear correspondence with the Q-cut results.