Analytic Solution for the Revised Helicity Evolution at Small x and Large Nc: New Resummed Gluon-Gluon Polarized Anomalous Dimension and Intercept

Abstract

We construct an exact analytic solution of the revised small-x helicity evolution equations derived recently. The equations we solve are obtained in the large-Nc limit (with Nc the number of quark colors) and are double-logarithmic (summing powers of αs 2(1/x) with αs the strong coupling constant and x the Bjorken x variable). Our solution provides small-x, large-Nc expressions for the flavor-singlet quark and gluon helicity parton distribution functions (PDFs) and for the g1 structure function, with their leading small-x asymptotics given by align (x, Q2) G (x, Q2) g1 (x, Q2) ( 1x )αh , align where the exact analytic expression we obtain for the intercept αh can be approximated by αh = 3.66074 \, αs \, Nc2 π. Our solution also yields an all-order (in αs) resummed small-x anomalous dimension γGG (ω) which agrees with all the existing fixed-order calculations (to three loops). Notably, our anomalous dimension is different from that obtained in the infrared evolution equation framework developed earlier by Bartels, Ermolaev, and Ryskin (BER), with the disagreement starting at four loops. Despite the previously reported agreement at two decimal points based on the numerical solution of the same equations, the intercept of our large-Nc helicity evolution and that of BER disagree beyond that precision, with the BER intercept at large Nc given by a different analytic expression from ours with the numerical value of αhBER = 3.66394 \, αs \, Nc2 π. We speculate on the origin of this disagreement.