Perturbation of multi-critical unitary matrix models, double scaling limits, and Argyres-Douglas theories

TL;DR

This paper analyzes multi-critical unitary matrix models, revealing phase transitions and spectral curve singularities, and connects their double scaling limits to Argyres-Douglas theories, providing explicit formulas and scaling behaviors.

Contribution

It explicitly derives the spectral curve and free energy of multi-critical unitary matrix models and links their double scaling limits to Argyres-Douglas theories.

Findings

Identifies third-order phase transitions in multi-critical matrix models.

Shows the spectral curve has an $A_{4k-1}$ singularity at criticality.

Establishes the double scaling limit as isomorphic to Argyres-Douglas curves.

Abstract

Using the saddle point method, we give an explicit form of the planar free energy and Wilson loops of unitary matrix models in the one-cut regime. The multi-critical unitary matrix models are shown to undergo third-order phase transitions at two points by studying the planar free energy. One of these ungapped/gapped phase transitions is multi-critical, while the other is not multi-critical. The spectral curve of the $k$-th multi-critical matrix model exhibits an $A_{4k-1}$ singularity at the multi-critical point. Perturbation around the multi-critical point and its double scaling limit are studied. In order to take the double scaling limit, the perturbed coupling constants should be fine-tuned such that all the zero points of the spectral curve approach to the $A_{4k-1}$ singular point. The fine-tuning is examined in the one-cut regime, and the scaling behavior of the perturbed couplings is determined. It is shown that the double scaling limit of the spectral curve is isomorphic to the Seiberg-Witten curve of the Argyres-Douglas theory of type $(A_1, A_{4k-1})$.