Large-N Dynamics of a QCD-Inspired Unitary Matrix Model

Abstract

We study the large-N limit of U(N) and SU(N) unitary matrix models inspired by QCD. The model is analyzed in two cases: μ = 0, where the potential is real, and finite μ, where it becomes complex. The complex action drives the eigenvalues into the complex plane, leading to U ≠ U-1 . In the ungapped phase, we obtain analytic expressions for the spectral density, Wilson loops, and free energy, which reproduce the low-temperature behaviour of QCD. In contrast, the gapped phase involves a nontrivial resolvent and is solved partially analytically and numerically. At μ=0, the model exhibits a 3rd order phase transition, while at finite μ, it shows a continuous phase transition of at least second order.