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Concentration in the Generalized Chinese Restaurant Process

Probability 2018-06-27 v1

Abstract

The Generalized Chinese Restaurant Process (GCRP) describes a sequence of exchangeable random partitions of the numbers {1,,n}\{1,\dots,n\}. This process is related to the Ewens sampling model in Genetics and to Bayesian nonparametric methods such as topic models. In this paper, we study the GCRP in a regime where the number of parts grows like nαn^\alpha with α>0\alpha>0. We prove a non-asymptotic concentration result for the number of parts of size k=o(nα/(2α+4)/(logn)1/(2+α))k=o(n^{\alpha/(2\alpha+4)}/(\log n)^{1/(2+\alpha)}). In particular, we show that these random variables concentrate around ckVnαc_{k}\,V_*\,n^\alpha where VnαV_*\,n^\alpha is the asymptotic number of parts and ckk(1+α)c_k\approx k^{-(1+\alpha)} is a positive value depending on kk. We also obtain finite-nn bounds for the total number of parts. Our theorems complement asymptotic statements by Pitman and more recent results on large and moderate deviations by Favaro, Feng and Gao.

Keywords

Cite

@article{arxiv.1806.09656,
  title  = {Concentration in the Generalized Chinese Restaurant Process},
  author = {Alan Pereira and Roberto I. Oliveira and Rodrigo Ribeiro},
  journal= {arXiv preprint arXiv:1806.09656},
  year   = {2018}
}
R2 v1 2026-06-23T02:41:16.660Z