Strong Characterization for the Airy Line Ensemble

Abstract

In this paper we show that a Brownian Gibbsian line ensemble whose top curve approximates a parabola must be given by the parabolic Airy line ensemble. More specifically, we prove that if L = (L1, L2, … ) is a line ensemble satisfying the Brownian Gibbs property, such that for any > 0 there exists a constant K () > 0 with P [ | L1 (t) + 2-1/2 t2 | t2 + K () ] 1 - , for all t ∈ R, then L is the parabolic Airy line ensemble, up to an independent affine shift. Specializing this result to the case when L (t) + 2-1/2 t2 is translation-invariant confirms a prediction of Okounkov and Sheffield from 2006 and Corwin-Hammond from 2014.