Anomalous dimensions of operators in polarized deep inelastic scattering at [formula omitted

Abstract

Critical exponents are computed for a variety of twist-2 composite operators, which occur in polarized and unpolarized deep inelastic scattering, at leading order in the 1/N ƒ expansion. The resulting d-dimensional expressions, which depend on the moment of the operator, are in agreement with recent explicit two- and three-loop perturbative calculations. An interesting aspect of the critical point approach which is used, is that the anomalous dimensions of the flavour singlet eigenoperators, which diagonalize the perturbative mixing matrix, are computed directly. We also elucidate the treatment of γ 5 at the fixed point which is important in simplifying the calculation for polarized operators. Finally, the anomalous dimension of the singlet axial current is determined at O(1/N ƒ) by considering the renormalization of the anomaly in operator form.