Large deviations for the q-deformed polynuclear growth

Abstract

In this paper, we study large time large deviations for the height function h(x,t) of the q-deformed polynuclear growth introduced in ABW22 [arXiv:2108.06018]. We show that the upper-tail deviations have speed t and derive an explicit formula for the rate function +(μ). On the other hand, we show that the lower-tail deviations have speed t2 and express the corresponding rate function -(μ) in terms of a variational problem. Our analysis relies on distributional identities between the height function h and two important measures on the set of integer partitions: the Poissonized Plancherel measure and the cylindric Plancherel measure. Following a scheme developed in DT21 [arXiv:1910.09271], we analyze a Fredholm determinant representation for the q-Laplace transform of h(x,t), from which we extract exact Lyapunov exponents and through inversion the upper-tail rate function +. The proof of the lower-tail large deviation principle is more subtle and requires several novel ideas which combine classical asymptotic results for the Plancherel measure and log-concavity properties of Schur polynomials. Techniques we develop to characterize the lower-tail are rather flexible and have the potential to generalize to other solvable growth models.