Gaussian Approximation of the Distribution of Strongly Repelling Particles on the Unit Circle

Abstract

In this paper, we consider a strongly-repelling model of n ordered particles \ei θj\j=0n-1 with the density p(θ0,·s, θn-1)=1Zn \-β2Σj ≠ k -2 ( θj-θk2)\, β>0. Let θj=2 π jn+xjn2+const such that Σj=0n-1xj=0. Define ζn ( 2 π jn) =xjn and extend ζn piecewise linearly to [0, 2 π]. We prove the functional convergence of ζn(t) to ζ(t)=2β Re ( Σk=1∞ 1k eikt Zk ), where Zk are i.i.d. complex standard Gaussian random variables.