Litcius/Paper detail

Towards stability of NLO corrections in high-energy factorization via modified multi-Regge kinematics approximation

Maxim Nefedov

2020Journal of High Energy Physics23 citationsDOIOpen Access PDF

Abstract

A bstract The perturbatively-stable scheme of Next-to-Leading order (NLO) calculations of cross-sections for multi-scale hard-processes in DIS-like kinematics is developed in the framework of High-Energy Factorization. The evolution equation for unintegrated PDF, which resums log 1 /z -corrections to the coefficient function in the Leading Logarithmic approximation together with a certain subset of Next-to-Leading Logarithmic and Next- to-Leading Power corrections, necessary for the perturbative stability of the formalism, is formulated and solved in the Doubly-Logarithmic approximation. An example of DIS-like process, induced by the operator tr [ G μν G μν ], which is sensitive to gluon PDF already in the LO, is studied. Moderate ( O (20%)) NLO corrections to the inclusive structure function are found at small x B < 10 − 4 , while for the p T -spectrum of a leading jet in the considered process, NLO corrections are small ( < O (20%)) and LO of k T -factorization is a good approximation. The approach can be straightforwardly extended to the case of multi-scale hard processes in pp -collisions at high energies.

Topics & Concepts

PhysicsFactorizationLogarithmStability (learning theory)GluonOperator (biology)KinematicsFunction (biology)Jet (fluid)Order (exchange)Mathematical physicsQuantum electrodynamicsStructure functionPerturbation theory (quantum mechanics)Quantum mechanicsPower (physics)Scheme (mathematics)Statistical physicsWork (physics)High-Energy Particle Collisions ResearchQuantum Chromodynamics and Particle InteractionsParticle physics theoretical and experimental studies