Longitudinal Rescaling and High-Energy Effective Actions

Abstract

Under a rescaling of longitudinal coordinates x0,3 by a factor λ which is taken to zero, the classical QCD action simplifies dramatically. This is the high-energy limit, as λ is of order s-1/2, where s is the center-of-mass energy squared of a hadronic collision. We find the quantum corrections to the rescaled action at one loop, in particular finding the anomalous powers of λ in this action, for λ close to unity. The method is an integration over high-momentum components of the gauge field. This is a Wilsonian renormalization procedure, and counterterms are needed to make the sharp-momentum cut-off gauge invariant. Our result for the quantum action is found, assuming that the logarithm of λ is small, which is essential for the validity of perturbation theory. If λ is sufficiently small (so that its logarithm is large), then the perturbative renormalization group breaks down. This is due to uncontrollable fluctuations of the longitudinal chromomagnetic field.