The Gluon Distribution Function and Factorization in Feynman Gauge
High Energy Physics - Phenomenology
2009-11-13 v2
Abstract
A complication in proving factorization theorems in Feynman gauge is that individual graphs give a super-leading power of the hard scale when all the gluons inducing the hard scattering are longitudinally polarized. With the aid of an example in gluon-mediated deep inelastic scattering, we show that, although the super-leading terms cancel after a sum over graphs, there is a residual non-zero leading term from longitudinally polarized gluons. This is due to the non-zero transverse momenta of the gluons in the target. The non-cancellation, due to the non-Abelian property of the gauge group, is necessary to obtain the correct form of the gluon distribution function as a gauge-invariant matrix element.
Cite
@article{arxiv.0805.1752,
title = {The Gluon Distribution Function and Factorization in Feynman Gauge},
author = {J. C. Collins and T. C. Rogers},
journal= {arXiv preprint arXiv:0805.1752},
year = {2009}
}
Comments
15 pages, 31 figures