Rigorous upper bound for the discrete Bak-Sneppen model

Abstract

Fix some p∈[0,1] and a positive integer n. The discrete Bak-Sneppen model is a Markov chain on the space of zero-one sequences of length n with periodic boundary conditions. At each moment of time a minimum element (typically, zero) is chosen with equal probability, and is then replaced together with both its neighbours by independent Bernoulli(p) random variables. Let (n)(p) be the probability that an element of this sequence equals one under the stationary distribution of this Markov chain. It was shown in [Barbay, Kenyon (2001)] that (n)(p) 1 as n∞ when p>0.54…; the proof there is, alas, not rigorous. The complimentary fact that (n)(p)< 1 for p∈(0,p') for some p'>0 is much harder; this was eventually shown in [Meester, Znamenski (2002)]. The purpose of this note is to provide a rigorous proof of the result from Barbay et al, as well as to improve it, by showing that (n)(p) 1 when p>0.45. In fact, our method with some finer tuning allows to show this fact even for all p>0.419533.