Optional P\'olya tree and Bayesian inference

Abstract

We introduce an extension of the P\'olya tree approach for constructing distributions on the space of probability measures. By using optional stopping and optional choice of splitting variables, the construction gives rise to random measures that are absolutely continuous with piecewise smooth densities on partitions that can adapt to fit the data. The resulting "optional P\'olya tree" distribution has large support in total variation topology and yields posterior distributions that are also optional P\'olya trees with computable parameter values.