CONSISTENCY OF BAYESIAN PROCEDURES FOR VARIABLE SELECTION
成果类型:
Article
署名作者:
Casella, George; Giron, F. Javier; Martinez, M. Lina; Moreno, Elias
署名单位:
State University System of Florida; University of Florida; Universidad de Malaga; University of Granada
刊物名称:
ANNALS OF STATISTICS
ISSN/ISSBN:
0090-5364
DOI:
10.1214/08-AOS606
发表日期:
2009
页码:
1207-1228
关键词:
model selection
hypotheses
摘要:
It has long been known that for the comparison of pairwise nested models, a decision based on the Bayes factor produces I consistent model selector (in the frequentist sense). Here we go beyond the usual consistency for nested pairwise models, and show that for a wide class of prior distributions, including intrinsic priors, the corresponding Bayesian procedure for variable selection in normal regression is consistent in the entire class of normal linear models. We find that the asymptotics of the Bayes factors for intrinsic priors are equivalent to those of the Schwarz (BIC) criterion. Also, recall that the Jeffreys-Lindley paradox refers to the well-known fact that a point null hypothesis on the normal mean parameter is always accepted when the variance of the conjugate prior goes to infinity. This implies that some limiting forms of proper prior distributions are not necessarily Suitable for testing problems. Intrinsic priors are limits of proper prior distributions, and for finite sample sizes they have been proved to behave extremely well for variable selection in regression;,I consequence of our results is that for intrinsic priors Lindley's paradox does not arise.