Nonparametric hierarchical Bayes via sequential imputations
成果类型:
Article
署名作者:
Liu, JS
刊物名称:
ANNALS OF STATISTICS
ISSN/ISSBN:
0090-5364
发表日期:
1996
页码:
911-930
关键词:
dirichlet process prior
GIBBS SAMPLER
maximum-likelihood
mixtures
distributions
computations
augmentation
inference
schemes
摘要:
We consider the empirical Bayes estimation of a distribution using binary data via the Dirichlet process. Let D(alpha) denote a Dirichlet process with alpha being a finite measure on [0, 1]. Instead of having direct samples from an unknown random distribution F from D(alpha), we assume that only indirect binomial data are observable. This paper presents a new interpretation of Lo's formula, and thereby relates the predictive density of the observations based on a Dirichlet process model to likelihoods of much simpler models. As a consequence, the log-likelihood surface, as well as the maximum likelihood estimate of c = alpha([0, 1]), is found when the shape of alpha is assumed known, together with a formula for the Fisher information evaluated at the estimate. The sequential imputation method of Kong, Liu and Wong is recommended for overcoming computational difficulties commonly encountered in this area. The related approximation formulas are provided. An analysis of the tack data of Beckett and Diaconis, which motivated this study, is supplemented to illustrate our methods.