Airyβ line ensemble and its Laplace transform
Abstract
The Airyβ line ensemble is a random collection of continuous curves, which should serve as a universal edge scaling limit in problems related to eigenvalues of random matrices and models of 2d statistical mechanics. This line ensemble unifies many existing universal objects including Tracy-Widom distributions, eigenvalues of the Stochastic Airy Operator, Airy2 process from the KPZ theory. Here β>0 is a real parameter governing the strength of the repulsion between the curves. We introduce and characterize the Airyβ line ensemble in terms of the Laplace transform, by producing integral formulas for its joint multi-time moments. We prove two asymptotic theorems for each β>0: the trajectories of the largest eigenvalues in the Dyson Brownian Motion converge to the Airyβ line ensemble; the extreme particles in the GβE corners process converge to the same limit. The proofs are based on the convergence of random walk expansions for the multi-time moments of prelimit objects towards their Brownian counterparts. The expansions are produced through Dunkl differential-difference operators acting on multivariate Bessel generating functions.
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