The Kernel Pitman-Yor Process

Nonparametric Bayesian modeling techniques, especially Dirichlet process mixture (DPM) models, have become very popular in statistics over the last few years, for performing nonparametric density estimation [1], [2], [3]. This theory is based on the observation that an infinite number of component distributions in an ordinary finite mixture model (clustering model) tends on the limit to a Dirichlet process (DP) prior [2], [4]. Eventually, the nonparametric Bayesian inference scheme induced by a DPM model yields a posterior distribution on the proper number of model component densities (inferred clusters) [5], rather than selecting a fixed number of mixture components. Hence, the obtained nonparametric Bayesian formulation eliminates the need of doing inference (or making arbitrary choices) on the number of mixture components (clusters) necessary to represent the modeled data. An interesting alternative to the Dirichlet process prior for nonparametric Bayesian modeling is the Pitman-Yor process (PYP) prior [6]. Pitman-Yor processes produce power-law distributions that allow for better modeling populations comprising a high number of clusters with low popularity and a low number of clusters with high popularity [7]. Indeed, the Pitman-Yor process prior can be viewed as a generalization of the Dirichlet process prior, and reduces to it for a specific selection of its parameter values. In [8], a Gaussian process-based coupled PYP method for joint segmentation of multiple images is proposed.