A Large-N Phase Transition in a Finite Lattice Gauge Theory

Abstract

We consider gauge theories of non-Abelian finite groups, and discuss the 1+1 dimensional lattice gauge theory of the permutation group SN as an illustrative example. The partition function at finite N can be written explicitly in a compact form using properties of SN conjugacy classes. A natural large-N limit exists with a new 't Hooft coupling, λ=g2 N. We identify a Gross-Witten-Wadia-like phase transition at infinite N, at λ=2. It is first order. An analogue of the string tension can be computed from the Wilson loop expectation value, and it jumps from zero to a finite value. We view this as a type of large-N (de-)confinement transition. Our holographic motivations for considering such theories are briefly discussed.