Second-order fluctuations for a phase transition in random partitions
Abstract
In a recent paper, Banderier et al. (2024) investigated the limiting behavior of component counts of random partitions induced by the Chinese restaurant process with parameter α∈(0,1) and θ>-α. Let Cj(n) denote the number of components of size j of a partition of \1,…,n\ and consider j=jn∞ as n∞. They revealed a phase transition in the first-order limit behavior of Cjn(n), where the critical regime corresponds to jn rnα/(1+α) for some r>0. A natural next question is to understand the corresponding second-order fluctuations. We establish second-order limit theorems in both the subcritical (jn nα/(1+α)) and critical regimes for the counting process (Cjn(n(1+t/jn)+))t∈ R. In the subcritical regime, after appropriate normalization, the limit is a stationary Ornstein--Uhlenbeck Gaussian process, whereas in the critical regime the limit is a stationary M/M/∞ queue. We also establish a more refined point-process convergence in the critical regime. In fact, we establish second-order limit theorems for the more general Karlin infinite urn model, and then adapt the analysis to the Chinese restaurant process.
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