Exact short-time height distribution for the flat Kardar-Parisi-Zhang interface

Abstract

We determine the exact short-time distribution - Pf(H,t)= Sf (H)/t of the one-point height H=h(x=0,t) of an evolving 1+1 Kardar-Parisi-Zhang (KPZ) interface for flat initial condition. This is achieved by combining (i) the optimal fluctuation method, (ii) a time-reversal symmetry of the KPZ equation in 1+1 dimension, and (iii) the recently determined exact short-time height distribution - Pst(H,t)= Sst (H)/t for stationary initial condition. In studying the large-deviation function Sst (H) of the latter, one encounters two branches: an analytic and a non-analytic. The analytic branch is non-physical beyond a critical value of H where a second-order dynamical phase transition occurs. Here we show that, remarkably, it is the analytic branch of Sst (H) which determines the large-deviation function Sf (H) of the flat interface via a simple mapping Sf(H)=2-3/2Sst(2H).