Unitary symmetry constraints on tensorial group field theory renormalization group flow

TL;DR

This paper investigates how unitary symmetry constraints influence the renormalization group flow in tensorial group field theories, deriving Ward-Takahashi identities and structure equations to improve non-perturbative analysis.

Contribution

It introduces symmetry-based Ward identities and structure equations that constrain the RG flow in melonic tensorial group field theories, enhancing non-perturbative analysis methods.

Findings

Derived Ward-Takahashi identities for tensorial group field theories.

Established structure equations in the melonic sector and symmetric phase.

Analyzed the $T^4_5$ TGFT model without gauge constraints.

Abstract

Renormalization group methods are an essential ingredient in the study of nonperturbative problems of quantum field theory. This paper deal with the symmetry constraints on the renormalization group flow for quartic melonic tensorial group field theories. Using the unitary invariance of the interactions, we provide a set of Ward-Takahashi identities which leads to relations between correlation functions. There are numerous reasons to consider such Ward identities in the functional renormalization group. Their compatibility along the flow provides a non-trivial constraint on the reliability of the approximation schemes used in the non-perturbative regime, especially on the truncation and the choice of the regulator. We establish the so called structure equations in the melonic sector and in the symmetric phase. As an example we consider the $T^4_5$ TGFT model without gauge constraint. The Wetterich flow equation is given and the way to improve the truncation on the effective action is also scrutinized.