A point process on the unit circle with antipodal interactions
Abstract
We introduce the point process align* 1ZnΠ1 ≤ j < k ≤ n |eiθj+eiθk|βΠj=1n dθj, θ1,…,θn ∈ (-π,π], β > 0, align* where Zn is the normalization constant. This point process is attractive: it involves n dependent, uniformly distributed random variables on the unit circle that attract each other. (For comparison, the well-studied CβE involves n uniformly distributed random variables on the unit circle that repel each other.) We consider linear statistics of the form Σj=1ng(θj) as n ∞, where g∈ C1,q and 2π-periodic. We prove that the leading order fluctuations around the mean are of order n and given by (g(U)-∫-ππg(θ) dθ2π)n, where U Uniform(-π,π]. We also prove that the subleading fluctuations around the mean are of order n and of the form NR(0,4g'(U)2/β)n, i.e. that the subleading fluctuations are given by a Gaussian random variable that itself has a random variance. Our proof uses techniques developed by McKay and Isaev [8,6] to obtain asymptotics of related n-fold integrals.
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