GENERAL MAXIMUM LIKELIHOOD EMPIRICAL BAYES ESTIMATION OF NORMAL MEANS
成果类型:
Article
署名作者:
Jiang, Wenhua; Zhang, Cun-Hui
署名单位:
Rutgers University System; Rutgers University New Brunswick
刊物名称:
ANNALS OF STATISTICS
ISSN/ISSBN:
0090-5364
DOI:
10.1214/08-AOS638
发表日期:
2009
页码:
1647-1684
关键词:
false discovery rate
wavelet shrinkage
CONVERGENCE
regression
densities
mixtures
rates
RISK
摘要:
We propose a general maximum likelihood empirical Bayes (GMLEB) method for the estimation of a mean vector based on observations with i.i.d. normal errors. We prove that under mild moment conditions on the unknown means, the average mean squared error (MSE) of the GMLEB is within an infinitesimal fraction of the minimum average MSE among all separable estimators which use a single deterministic estimating function on individual observations, provided that the risk is of greater order than (logn)(5)/n. We also prove that the GMLEB is uniformly approximately minimax in regular and weak l(P) balls when the order of the length-normalized norm of the unknown means is between (log n)(k1/)n(1)/((p boolean AND 2)) and n/(logn)(k2). Simulation experiments demonstrate that the GMLEB outperforms the James-Stein and several state-of-the-art threshold estimators in a wide range of settings without much down side.