Characterization of exchangeable measure-valued P\'olya urn sequences

Abstract

Measure-valued P\'olya urn sequences (MVPS) are a generalization of the observation processes generated by k-color P\'olya urn models, where the space of colors X is a complete separable metric space and the urn composition is a finite measure on X, in which case reinforcement reduces to a summation of measures. In this paper, we prove a representation theorem for the reinforcement measures R of all exchangeable MVPSs, which leads to a characterization result for their directing random measures P. In particular, when X is countable or R is dominated by the initial distribution , then any exchangeable MVPS is a Dirichlet process mixture model over a family of probability distributions with disjoint supports. Furthermore, for all exchangeable MVPSs, the predictive distributions converge on a set of probability one in total variation to P. Importantly, we do not restrict our analysis to balanced MVPSs, in the terminology of k-color urns, but rather show that the only non-balanced exchangeable MVPSs are sequences of i.i.d. random variables.