An Analysis of the Next-to-Leading Order Corrections to the gT(=g1+g2) Scaling Function

Abstract

We present a general method for obtaining the quantum chromodynamical radiative corrections to the higher-twist (power-suppressed) contributions to inclusive deep-inelastic scattering in terms of light-cone correlation functions of the fundamental fields of quantum chromodynamics. Using this procedure, we calculate the previously unknown O(αs) corrections to the twist-three part of the spin scaling function gT(xB,Q2) (=g1(xB,Q2)+g2(xB,Q2)) and the corresponding forward Compton amplitude ST(,Q2). Expanding our result about the unphysical point xB=∞, we arrive at an operator product expansion of the nonlocal product of two electromagnetic current operators involving twist-two and -three operators valid to O(αs) for forward matrix elements. We find that the Wandzura-Wilczek relation between g1(xB,Q2) and the twist-two part of gT(xB,Q2) is respected in both the singlet and non-singlet sectors at this order, and argue its validity to all orders. The large-Nc limit does not appreciably simplify the twist-three Wilson coefficients.

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