Abstract

For data assumed to come from a finite mixture with an unknown number of components, it has become common to use Dirichlet process mixtures (DPMs) not only for density estimation, but also for inferences about the number of components. The typical approach is to use the posterior distribution on the number of clusters — that is, the posterior on the number of components represented in the observed data. However, it turns out that this posterior is not consistent — it does not concentrate at the true number of components. In this note, we give an elementary proof of this inconsistency in what is perhaps the simplest possible setting: a DPM with normal components of unit variance, applied to data from a “mixture” with one standard normal component. Further, we show that this example exhibits severe inconsistency: instead of going to 1, the posterior probability that there is one cluster converges (in probability) to 0.