A local and renormalizable framework for the gauge-invariant operator A2 in Euclidean Yang-Mills theories in linear covariant gauges

Abstract

We address the issue of the renormalizability of the gauge-invariant non-local dimension-two operator A2 min, whose minimization is defined along the gauge orbit. Despite its non-local character, we show that the operator A2 min can be cast in local form through the introduction of an auxiliary Stueckelberg field. The localization procedure gives rise to an unconventional kind of Stueckelberg-type action which turns out to be renormalizable to all orders of perturbation theory. In particular, as a consequence of its gauge invariance, the anomalous dimension of the operator A2 min turns out to be independent from the gauge parameter α entering the gauge-fixing condition, being thus given by the anomalous dimension of the operator A2 in the Landau gauge.