A determinantal point process approach to scaling and local limits of random Young tableaux

Abstract

We obtain scaling and local limit results for large random Young tableaux of fixed shape λ0 via the asymptotic analysis of a determinantal point process due to Gorin and Rahman (2019). More precisely, we prove: (1) an explicit description of the limiting surface of a uniform random Young tableau of shape λ0, based on solving a complex-valued polynomial equation; (2) a simple criteria to determine if the limiting surface is continuous in the whole domain; (3) and a local limit result in the bulk of a random Poissonized Young tableau of shape λ0. Our results have several consequences, for instance: they lead to explicit formulas for the limiting surface of L-shaped tableaux, generalizing the results of Pittel and Romik (2007) for rectangular shapes; they imply that the limiting surface for L-shaped tableaux is discontinuous for almost-every L-shape; and they give a new one-parameter family of infinite random Young tableaux, constructed from the so-called random infinite bead process.