Renormalization of three-quark operators with up to two derivatives at three loops

Abstract

We study in QCD the MS renormalization of three-quark operators with up to two covariant derivatives, which are related to N=0,1,2 Mellin moments of baryonic light-cone distributions amplitudes. Apart from general three-quark operators, we also consider those corresponding to spin 3/2 and 1/2 states. We present in analytic form the renormalization constants and anomalous dimensions of these operators through three loops, confirming previous two- and three-loop results for N=0. Furthermore, we evaluate through two loops their amputated four-point Green's functions with RI/MOM four-momentum assignment, which are required for the matching of lattice results with perturbative calculations. We work in linear covariant gauge and find the anomalous dimensions to be gauge independent as expected.