English

An ergodic theorem for partially exchangeable random partitions

Probability 2017-07-04 v1

Abstract

We consider shifts Πn,m\Pi_{n,m} of a partially exchangeable random partition Π\Pi_\infty of N\mathbb{N} obtained by restricting Π\Pi_\infty to {n+1,n+2,,n+m}\{n+1,n+2,\dots, n+m\} and then subtracting nn from each element to get a partition of [m]:={1,,m}[m]:= \{1, \ldots, m \}. We show that for each fixed mm the distribution of Πn,m\Pi_{n,m} converges to the distribution of the restriction to [m][m] of the exchangeable random partition of N\mathbb{N} with the same ranked frequencies as Π\Pi_\infty. As a consequence, the partially exchangeable random partition Π\Pi_\infty is exchangeable if and only if Π\Pi_\infty is stationary in the sense that for each fixed mm the distribution of Πn,m\Pi_{n,m} on partitions of [m][m] is the same for all nn. We also describe the evolution of the frequencies of a partially exchangeable random partition under the shift transformation. For an exchangeable random partition with proper frequencies, the time reversal of this evolution is the heaps process studied by Donnelly and others.

Keywords

Cite

@article{arxiv.1707.00313,
  title  = {An ergodic theorem for partially exchangeable random partitions},
  author = {Jim Pitman and Yuri Yakubovich},
  journal= {arXiv preprint arXiv:1707.00313},
  year   = {2017}
}

Comments

10 pages

R2 v1 2026-06-22T20:35:37.058Z