Non-linear equation in the re-summed next-to-leading order of perturbative QCD: the leading twist approximation

Abstract

In this paper, we use the re-summation procedure, suggested in Refs.DIMST,SALAM,SALAM1,SALAM2, to fix the BFKL kernel in the NLO. However, we suggest a different way to introduce th non-linear corrections in the saturation region, which is based on the leading twist non-linear equation. In the kinematic region:τ\,\,r2 Q2s(Y)\,≤\,1 , where r denotes the size of the dipole, Y its rapidity and Qs the saturation scale, we found that the re-summation contributes mostly to the leading twist of the BFKL equation. Assuming that the scattering amplitude is small, we suggest using the linear evolution equation in this region. For τ \,>\,1 we are dealing with the re-summation of \, τn and other corrections in NLO approximation for the leading twist.We find the BFKL kernel in this kinematic region and write the non-linear equation, which we solve analytically. We believe the new equation could be a basis for a consistent phenomenology based on the CGC approach.