Global asymptotics for β-Krawtchouk corners processes via multi-level loop equations

Abstract

We introduce a two-parameter family of probability distributions, indexed by β/2 = θ > 0 and K ∈ Z≥ 0, that are called β-Krawtchouk corners processes. These measures are related to Jack symmetric functions, and can be thought of as integrable discretizations of β-corners processes from random matrix theory, or alternatively as non-determinantal measures on lozenge tilings of infinite domains. We show that as K tends to infinity the height function of these models concentrates around an explicit limit shape, and prove that its fluctuations are asymptotically described by a pull-back of the Gaussian free field, which agrees with the one for Wigner matrices. The main tools we use to establish our results are certain multi-level loop equations introduced in our earlier work arXiv:2108.07710.