Order of the SU(N_f) x SU(N_f) chiral transition via the functional renormalization group

TL;DR

This paper uses the functional renormalization group to analyze the order of the chiral phase transition in SU(N_f) x SU(N_f) models, finding second-order transitions for N_f≥5 and first-order for N_f=2,3,4, influenced by the U_A(1) anomaly.

Contribution

It introduces a non-ε-expansion FRG approach in 3D to identify fixed points and determine the nature of the chiral transition across different flavor numbers.

Findings

Second-order transition for N_f≥5

First-order transition for N_f=2,3,4

U_A(1) anomaly affects transition strength

Abstract

Renormalization group flows of the $SU(N_f)\times SU(N_f)$ symmetric Ginzburg-Landau potential are calculated for a general number of flavors, $N_f$. Our approach does not rely on the $\epsilon$ expansion, but uses the functional renormalization group, formulated directly in $d=3$ spatial dimensions, with the inclusion of all possible (perturbatively) relevant and marginal operators, whose number is considerably larger than those in $d=4$. We find new, potentially infrared stable fixed points spanned throughout the entire $N_f$ range. By conjecturing that the thermal chiral transition is governed by these ``flavor continuous" fixed points, stability analyses show that for $N_f\geq 5$ the chiral transition is of second-order, while for $N_f=2,3,4$, it is of first-order. We argue that the $U_{\rm A}(1)$ anomaly controls the strength of the first-order chiral transition for $N_f=2,3,4$, and makes it almost indistinguishable from a second-order one, if it is sufficiently weak at the critical point. This could open up a new strategy to investigate the strength of the $U_{\rm A}(1)$ symmetry breaking around the critical temperature.