Long and short time laws of iterated logarithms for the KPZ fixed point
Abstract
We consider the KPZ fixed point starting from a general class of initial data. In this article, we study the growth of the large peaks of the KPZ fixed point at a spatial point 0 when time t goes to ∞ and when t approaches 1. We prove that for a very broad class of initial data, as t ∞, the limsup of the KPZ fixed point height function when scaled by t1/3( t)2/3 almost surely equals a constant. The value of the constant is (3/4)2/3 or (3/2)2/3 depending on the initial data being non-random or Brownian respectively. Furthermore, we show that the increments of the KPZ fixed point near t=1 admits a short time law of iterated logarithm. More precisely, as the time increments t :=t-1 goes down to 0, for a large class of initial data including the Brownian data initial data, we show that limsup of the height increments the KPZ fixed point near time 1 when scaled by ( t)1/3( ( t)-1)2/3 almost surely equals (3/2)2/3.
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