Littlewood-Offord problems for Ising models

Abstract

We consider the one-dimensional Littlewood-Offord problem for general Ising models. More precisely, we consider the concentration function \[Qn(x,v)=P(Σi=1nivi∈(x-1,x+1)),\] where x∈R, v1,v2,…,vn are real numbers such that |v1|≥ 1, |v2|≥ 1,…, |vn|≥ 1, and (i)i=1,2,…,n∈\-1,1\n are random spins of some Ising model. Let Qn=x,vQn(x,v). Under natural assumptions, we show that there exists a universal constant C such that for all n≥ 1, \[n[n/2]2-n≤ Qn≤ Cn-12.\] As an application of the method, under the same assumption, we give a lower bound on the smallest eigenvalue of the truncated correlation matrix of the Ising model.