Prior specification for nonparametric Bayesian inference involves the difficult task of quan-tifying prior knowledge about a parameter of high, often infinite, dimension. Realistically, a statistician is unlikely to have informed opinions about all aspects of such a parameter, but may have real information about functionals of the parameter, such the population mean or vari-ance. This article proposes a new framework for nonparametric Bayes inference in which the prior distribution for a possibly infinite-dimensional parameter is decomposed into two parts: an informative prior on a finite set of functionals, and a nonparametric conditional prior for the parameter given the functionals. Such priors can be easily constructed from standard non...
We propose a general procedure for constructing nonparametric priors for Bayesian inference. Under v...
Nonparametric Bayesian models are used routinely as flexible and powerful models of complex data. Ma...
Introduction Central in Bayesian statistics is Bayes' theorem, which can be written as follows...
Prior specification for non-parametric Bayesian inference involves the difficult task of quantifying...
Nonparametric Bayesian inference has widespread applications in statistics and machine learning. In ...
This book presents a systematic and comprehensive treatment of various prior processes that have bee...
We construct an enrichment of the Dirichlet Process that is more flexible with respect to the precis...
Alternatives to the Dirichlet prior for multinomial probabilities are explored. The Dirichlet prior ...
The Bayesian nonparametric inference requires the construction of priors on infinite dimensional spa...
A family of nonparametric prior distributions which extends the Dirichlet process is introduced and ...
The availability of complex-structured data has sparked new research directions in statistics and ma...
In the first paper, we propose a flexible class of priors for density estimation avoiding discrete m...
The definition and investigation of general classes of non-parametric priors has recently been an ac...
We study the Bayesian approach to nonparametric function estimation problems such as nonparametric r...
In the context of Bayesian statistical analysis, elicitation is the process of formulating a prior d...
We propose a general procedure for constructing nonparametric priors for Bayesian inference. Under v...
Nonparametric Bayesian models are used routinely as flexible and powerful models of complex data. Ma...
Introduction Central in Bayesian statistics is Bayes' theorem, which can be written as follows...
Prior specification for non-parametric Bayesian inference involves the difficult task of quantifying...
Nonparametric Bayesian inference has widespread applications in statistics and machine learning. In ...
This book presents a systematic and comprehensive treatment of various prior processes that have bee...
We construct an enrichment of the Dirichlet Process that is more flexible with respect to the precis...
Alternatives to the Dirichlet prior for multinomial probabilities are explored. The Dirichlet prior ...
The Bayesian nonparametric inference requires the construction of priors on infinite dimensional spa...
A family of nonparametric prior distributions which extends the Dirichlet process is introduced and ...
The availability of complex-structured data has sparked new research directions in statistics and ma...
In the first paper, we propose a flexible class of priors for density estimation avoiding discrete m...
The definition and investigation of general classes of non-parametric priors has recently been an ac...
We study the Bayesian approach to nonparametric function estimation problems such as nonparametric r...
In the context of Bayesian statistical analysis, elicitation is the process of formulating a prior d...
We propose a general procedure for constructing nonparametric priors for Bayesian inference. Under v...
Nonparametric Bayesian models are used routinely as flexible and powerful models of complex data. Ma...
Introduction Central in Bayesian statistics is Bayes' theorem, which can be written as follows...