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http://dx.doi.org/10.7465/jkdi.2014.25.6.1549

An approach to improving the James-Stein estimator shrinking towards projection vectors  

Park, Tae Ryong (Department of Computer Engineering, Seokyeong University)
Baek, Hoh Yoo (Division of Mathematics and Informational Statistics, Wonkwang University)
Publication Information
Journal of the Korean Data and Information Science Society / v.25, no.6, 2014 , pp. 1549-1555 More about this Journal
Abstract
Consider a p-variate normal distribution ($p-q{\geq}3$, q = rank($P_V$) with a projection matrix $P_V$). Using a simple property of noncentral chi square distribution, the generalized Bayes estimators dominating the James-Stein estimator shrinking towards projection vectors under quadratic loss are given based on the methods of Brown, Brewster and Zidek for estimating a normal variance. This result can be extended the cases where covariance matrix is completely unknown or ${\sum}={\sigma}^2I$ for an unknown scalar ${\sigma}^2$.
Keywords
Generalized Bayes estimator; James-Stein estimator; normal distribution; projection vectors; quadratic loss;
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Times Cited By KSCI : 1  (Citation Analysis)
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