Fundamentals of the Exact Renormalization Group

TL;DR

This paper reviews the Exact Renormalization Group (ERG), exploring its concepts, applications to quantum field theory and phase transitions, and introduces novel methods for analyzing flow equations, fixed points, and gauge invariance.

Contribution

It presents new insights into ERG properties, alternative beta-function computation methods, and a novel approach to gauge-invariant ERGs, advancing the theoretical framework.

Findings

Spectrum of anomalous dimensions at fixed points is quantized.

Explicit dependence on non-universal ERG differences cancels in beta-function calculations.

A new perspective on gauge-invariant ERGs and their relation to renormalizability.

Abstract

Various aspects of the Exact Renormalization Group (ERG) are explored, starting with a review of the concepts underpinning the framework and the circumstances under which it is expected to be useful. A particular emphasis is placed on the intuitive picture provided for both renormalization in quantum field theory and universality associated with second order phase transitions. A qualitative discussion of triviality, asymptotic freedom and asymptotic safety is presented. Focusing on scalar field theory, the construction of assorted flow equations is considered using a general approach, whereby different ERGs follow from field redefinitions. It is recalled that Polchinski's equation can be cast as a heat equation, which provides intuition and computational techniques for what follows. The analysis of properties of exact solutions to flow equations includes a proof that the spectrum of the anomalous dimension at critical fixed-points is quantized. Two alternative methods for computing the beta-function in lambda phi^4 theory are considered. For one of these it is found that all explicit dependence on the non-universal differences between a family of ERGs cancels out, exactly. The Wilson-Fisher fixed-point is rediscovered in a rather novel way. The discussion of nonperturbative approximation schemes focuses on the derivative expansion, and includes a refinement of the arguments that, at the lowest order in this approximation, a function can be constructed which decreases monotonically along the flow. A new perspective is provided on the relationship between the renormalizability of the Wilsonian effective action and of correlation functions, following which the construction of manifestly gauge invariant ERGs is sketched, and some new insights are given. Drawing these strands together suggests a new approach to quantum field theory.