A threshold phenomenon for random independent sets in the discrete hypercube

TL;DR

This paper studies a phase transition in the structure of independent sets in the hypercube under the hard-core model, revealing a sharp change at parameter =1 and providing detailed asymptotics for the partition function.

Contribution

It establishes a precise threshold phenomenon for independent sets in the hypercube and extends asymptotic analysis of the hard-core partition function beyond previous bounds.

Findings

Sharp transition at =1 in the structure of independent sets

Asymptotic estimates for the partition function Z_(Q_d) for >-1

Long-range influence result showing dependence decay across bipartition classes

Abstract

Let $I$ be an independent set drawn from the discrete $d$-dimensional hypercube $Q_d=\{0,1\}^d$ according to the hard-core distribution with parameter $\lambda>0$ (that is, the distribution in which each independent set $I$ is chosen with probability proportional to $\lambda^{|I|}$). We show a sharp transition around $\lambda=1$ in the appearance of $I$: for $\lambda>1$, $\min\{|I \cap {\cal E}|, |I \cap {\cal O}|\}=0$ asymptotically almost surely, where ${\cal E}$ and ${\cal O}$ are the bipartition classes of $Q_d$, whereas for $\lambda<1$, $\min\{|I \cap {\cal E}|, |I \cap {\cal O}|\}$ is asymptotically almost surely exponential in $d$. The transition occurs in an interval whose length is of order $1/d$. A key step in the proof is an estimation of $Z_\lambda(Q_d)$, the sum over independent sets in $Q_d$ with each set $I$ given weight $\lambda^{|I|}$ (a.k.a. the hard-core partition function). We obtain the asymptotics of $Z_\lambda(Q_d)$ for $\lambda>\sqrt{2}-1$, and nearly matching upper and lower bounds for $\lambda \leq \sqrt{2}-1$, extending work of Korshunov and Sapozhenko. These bounds allow us to read off some very specific information about the structure of an independent set drawn according to the hard-core distribution. We also derive a long-range influence result. For all fixed $\lambda>0$, if $I$ is chosen from the independent sets of $Q_d$ according to the hard-core distribution with parameter $\lambda$, conditioned on a particular $v \in {\cal E}$ being in $I$, then the probability that another vertex $w$ is in $I$ is $o(1)$ for $w \in {\cal O}$ but $\Omega(1)$ for $w \in {\cal E}$.