Strong to weak coupling transitions of SU(N) gauge theories in 2+1 dimensions

TL;DR

This paper studies the nature of strong-to-weak coupling transitions in 2+1 dimensional SU(N) gauge theories, revealing phase transition behaviors and eigenvalue spectrum similarities across dimensions, with implications for understanding gauge theory phase structures.

Contribution

It demonstrates that the strong-to-weak coupling crossover becomes a third-order phase transition at infinite N, similar to the Gross-Witten transition, and explores eigenvalue spectrum behaviors across dimensions.

Findings

Identification of a third-order phase transition at N=oo

Eigenvalue spectra of Wilson loops are nearly identical across dimensions

Sequence of ZN symmetry breaking transitions on finite 3-tori

Abstract

We investigate strong-to-weak coupling transitions in D=2+1 SU(N->oo) gauge theories, by simulating lattice theories with a Wilson plaquette action. We find that there is a strong-to-weak coupling cross-over in the lattice theory that appears to become a third-order phase transition at N=oo, in a manner that is essentially identical to the Gross-Witten transition in the D=1+1 SU(oo) lattice gauge theory. There is also evidence for a second order transition at N=oo at approximately the same coupling, which is connected with centre monopoles (instantons) and so analogues to the first order bulk transition that occurs in D=3+1 lattice gauge theories for N>4. We show that as the lattice spacing is reduced, the N=oo gauge theory on a finite 3-torus suffers a sequence of (apparently) first-order ZN symmetry breaking transitions associated with each of the tori (ordered by size). We discuss how these transitions can be understood in terms of a sequence of deconfining transitions on ever-more dimensionally reduced gauge theories.We investigate whether the trace of the Wilson loop has a non-analyticity in the coupling at some critical area, but find no evidence for this although, just as in D=1+1,the eigenvalue density of a Wilson loop forms a gap at N=oo for a critical trace. The physical implications of this are unclear.The gap formation is a special case of a remarkable similarity between the eigenvalue spectra of Wilson loops in D=1+1 and D=2+1 (and indeed D=3+1): for the same value of the trace, the eigenvalue spectra are nearly identical.This holds for finite as well as infinite N; irrespective of the Wilson loop size in lattice units; and for Polyakov as well as Wilson loops.