Continuous β function for the SU(3) gauge systems with two and twelve fundamental flavors

Abstract

The gradient flow transformation can be interpreted as continuous real-space renormalization group transformation if a coarse-graining step is incorporated as part of calculating expectation values. The method allows to predict critical properties of strongly coupled systems including the renormalization group β function and anomalous dimensions at nonperturbative fixed points. In this contribution we discuss a new analysis of the continuous renormalization group β function for Nf=2 and Nf=12 fundamental flavors in SU(3) gauge theories based on this method. We follow the approach developed and tested for the Nf=2 system in arXiv:1910.06408. Here we present further information on the analysis, emphasizing the robustness and intuitive features of the continuous β function calculation. We also discuss the applicability of the continuous β function calculation in conformal systems, extending the possible phase diagram to include a 4-fermion interaction. The numerical analysis for Nf=12 uses the same set of ensembles that was generated and analyzed for the step scaling function in arXiv:1909.05842. The new analysis uses volumes with L 20 and determines the β function in the c=0 gradient flow renormalization scheme. The continuous β function predicts the existence of a conformal fixed point and is consistent between different operators. Although determinations of the step scaling and continuous β function use different renormalization schemes, they both predict the existence of a conformal fixed point around g2 6.