Polarized Deep Inelastic Scattering as x 1 using Soft Collinear Effective Theory

Abstract

We use Soft Collinear Effective Theory (SCET) to factorize the polarized Deep Inelastic Scattering (DIS) structure functions g1(x) and g2(x), and to sum Sudakov double logarithms of 1-x. The analysis is done both in terms of lightcone parton distributions and their moments. Computing g2 requires subleading SCET operators which contain gluons. We calculate the one-loop matching coefficients from QCD onto these subleading SCET operators, and the one-loop matching from SCET onto the parton distribution function (PDF). The PDF in SCET is given by a bilocal operator, rather than the trilocal operator used in the QCD analysis of g2 for generic x. We compute the one-loop anomalous dimension of the PDF operator for any x, and show that as x 1, it factors into a single-variable evolution. We comment on the QCD anomalous dimensions of twist-three operators, their equation-of-motion relation, and connection to the SCET analysis. We briefly discuss the definition of axial operators in the BMHV scheme. As a side result, we derive the 1/N dependence of the QCD coefficient functions for F1, FL and g1 in the N ∞ limit, where N is the moment, which is expected to hold to all orders in αs.