Factorization of Boosted Multijet Processes for Threshold Resummation

TL;DR

This paper develops a generalized factorization theorem within soft-collinear effective theory that applies to multijet processes at hadron colliders near the threshold, unifying previous simpler cases.

Contribution

It introduces a new factorization framework for arbitrary multijet processes, extending soft function calculations to include multiple jets and nonzero boosts.

Findings

Derived a general soft function depending on null and timelike momenta.

Verified the factorization theorem to order alpha_s for any number of jets.

Allows extension to partonic threshold resummation away from the hadronic endpoint.

Abstract

Explicit applications of factorization theorems for processes at hadron colliders near the hadronic endpoint have largely focused on simple final states with either no jets (e.g., Drell-Yan) or one inclusive jet (e.g., deep inelastic scattering and prompt photon production). Factorization for the former type of process gives rise to a soft function that depends on timelike momenta, whereas the soft function for the latter type depends on null momenta. We derive in soft-collinear effective theory a factorization theorem that allows for an arbitrary number of jets, where the jets are defined with respect to a jet algorithm, together with any number of non-strongly interacting particles. We find the soft function in general depends on the null components of the soft momenta inside the jets and on a timelike component of the soft momentum outside of the jets. This generalizes and interpolates between the soft functions for the cases of no jets and one inclusive jet. We verify consistency of our factorization theorem to order alpha_s for any number of jets. While in this paper we demonstrate consistency only near the hadronic endpoint, we keep the kinematics general enough (in particular allowing for nonzero boost) to allow for an extension to partonic threshold resummation away from the hadronic endpoint.