Edgeworth-type expansion for the one-point distribution of the KPZ fixed point with a large height at a prior location

Abstract

We consider the Kardar-Parisi-Zhang (KPZ) fixed point H(x,τ) with the narrow-wedge initial condition and investigate the distribution of H(x,τ) conditioned on a large height at an earlier space-time point H(x',τ'). As H(x',τ') tends to infinity, we prove that the conditional one-point distribution of H(x,τ) in the regime τ>τ' converges to the Gaussian Unitary Ensemble (GUE) Tracy-Widom distribution and that the next two lower-order error terms can be expressed as derivatives of the Tracy-Widom distribution. The lowe order expansion here is analogue to the Edgeworth expansion in the central limit theorem. These KPZ-type limiting behaviors are different from the Gaussian-type ones obtained in Liu-Wang22 where they study the finite-dimensional distribution of H(x,τ) conditioned on a large height at a later space-time point H(x',τ'). They show, with the narrow-wedge initial condition, that the conditional random field H(x,τ) in the regime τ<τ' converges to the minimum of two independent Brownian bridges modified by linear drifts as H(x',τ') goes to infinity. The two results stated above provide the phase diagram of the asymptotic behaviors of a conditional law of KPZ fixed point in the regimes τ>τ' and τ<τ' when H(x',τ') goes to infinity.