Renormalization Flow of Nonlinear Electrodynamics

TL;DR

This paper investigates the renormalization flow of nonlinear electrodynamics, identifying a continuum of non-Gaussian fixed points and suggesting a singularity-free strong-field limit in quantum electrodynamics.

Contribution

It constructs globally existing fixed functions for the electromagnetic action, revealing a continuum of fixed points parametrized by the anomalous dimension.

Findings

Existence of a continuum of non-Gaussian fixed points.

Construction of a global fixed function for magnetic fields.

Implication of a singularity-free strong-field limit in QED.

Abstract

We study the renormalization flow of generic actions that depend on the invariants of the field strength tensor of an abelian gauge field. While the Maxwell action defines a Gaussian fixed point, we search for further non-Gaussian fixed points or rather fixed functions, i.e., globally existing Lagrangians of the invariants. Using standard small-field expansion techniques for the resulting functional flow equation, a large number of fixed points is obtained, which - in analogy to recent findings for a shift-symmetric scalar field - we consider as approximation artifacts. For the construction of a globally existing fixed function, we pay attention to the use of proper initial conditions. Parametrizing the latter by the photon anomalous dimension, both the coefficients of the weak-field expansion are fully determined and those of the large-field expansion can be matched such that a global fixed function can be constructed for magnetic fields. The anomalous dimension also governs the strong-field limit. Our results provide evidence for the existence of a continuum of non-Gaussian fixed points parametrized by a small positive anomalous dimension below a critical value. We discuss the implications of this result within various scenarios with and without additional matter. For the strong-field limit of the 1PI QED effective action, where the anomalous dimension is determined by electronic fluctuations, our result suggests the existence of a singularity free strong-field limit, circumventing the standard conclusions connected to the perturbative Landau pole.