Bulk heights of the KPZ line ensemble
Abstract
For t > 0, let \H(t)n, n ∈ N\ be the KPZ line ensemble with parameter t, satisfying the homogeneous H-Brownian Gibbs property with H(x) =ex. We prove quantitative concentration estimates for the nth line H(t)n which yield the asymptotics H(t)n = n n + o(n3/4 + ε) as n ∞. A key step in the proof is a general integration by parts formula for H-Brownian Gibbs line ensembles which yields the identity E (H(t)n + 1(x) - H(t)n (x)) = n t-1 for any n, t, x.
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