Log-gases on a quadratic lattice via discrete loop equations and q-boxed plane partitions

TL;DR

This paper investigates log-gas ensembles on quadratic lattices, proving laws of large numbers and Gaussian fluctuations, and applies these results to analyze the asymptotic behavior of q-boxed plane partitions, revealing connections to Gaussian free fields.

Contribution

It introduces a q-analogue of loop equations for quadratic lattices and applies them to derive universal fluctuation results for log-gases and plane partitions.

Findings

Empirical measures satisfy a law of large numbers.

Global fluctuations are Gaussian with universal covariance.

Height function fluctuations relate to Gaussian free fields.

Abstract

We study a general class of log-gas ensembles on (shifted) quadratic lattices. We prove that the corresponding empirical measures satisfy a law of large numbers and that their global fluctuations are Gaussian with a universal covariance. We apply our general results to analyze the asymptotic behavior of a $q$-boxed plane partition model introduced by Borodin, Gorin and Rains. In particular, we show that the global fluctuations of the height function on a fixed slice are described by a one-dimensional section of a pullback of the two-dimensional Gaussian free field. Our approach is based on a $q$-analogue of the Schwinger-Dyson (or loop) equations, which originate in the work of Nekrasov and his collaborators, and extends the methods developed by Borodin, Gorin and Guionnet to quadratic lattices.