Chen--Stein Method for the Uncovered Set of Random Walk on Znd for d 3

Abstract

Let X be a simple random walk on Znd with d≥ 3 and let tcov be the expected cover time. We consider the set of points Uα of Znd that have not been visited by the walk by time α tcov for α∈ (0,1). It was shown in [MS17] that there exists α1(d)∈ (0,1) such that for all α>α1(d) the total variation distance between the law of the set Uα and an i.i.d. sequence of Bernoulli random variables indexed by Znd with success probability n-α d tends to 0 as n ∞. In [MS17] the constant α1(d) converges to 1 as d∞. In this short note using the Chen--Stein method and a concentration result for Markov chains of Lezaud we greatly simplify the proof of [MS17] and find a constant α1(d) which converges to 3/4 as d∞.