A Gaussian process limit for the self-normalized Ewens-Pitman process

Abstract

For an integer n≥1, consider a random partition n of \1,…,n\ into Kn partition sets with Kr,n partition subsets of size r=1,…,n, and assume n distributed according to the Ewens-Pitman model with parameters α∈]0,1[ and θ>-α. Although the large-n asymptotic behaviors of Kn and Kr,n are well understood in terms of almost sure convergence and Gaussian fluctuations, much less is known about the asymptotic behavior of Pr,n=Kr,n/Kn and of the self-normalized Ewens-Pitman process (P1,n,P2,n,…). Motivated by the almost sure convergence of (P1,n,P2,n,…) to the Sibuya distribution pα=(pα(1),pα(2),…), where pα(r) is the probability mass at r=1,2,…, we establish the 2 distributional convergence displaymath Kn((P1,n,\,P2,n,…)-pα)n→+∞G(α), displaymath where G(α) stands for a centered Gaussian process with covariance matrix α=diag(pα) - pα pαT. We apply our result to the estimation of the parameter