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ЖУРНАЛЫ // Eurasian Mathematical Journal // Архив

Eurasian Math. J., 2022, том 13, номер 2, страницы 18–36 (Mi emj435)

Minimax shrinkage estimators and estimators dominating the James-Stein estimator under the balanced loss function

A. Benkhaledab, A. Hamdaouicd, M. Terbecheed

a Department of Biology, Mascara University, Mascara, Algerie
b Laboratory of Stochastic Models, Statistics and Applications, University Tahar Moulay of Saida, Bp 305, Route de Mamounia 29000, Mascara, Algerie
c Laboratory of Statistics and Random Modelisations of University Abou Bekr Belkaid (LSMA), Tlemcen, El Mnaouar, BP 1505, Bir El Djir 31000, Oran, Algeria
d Department of Mathematics, University of Sciences and Technology, Mohamed Boudiaf, Oran
e Laboratory of Analysis and Application of Radiation (LAAR), USTO-MB, El Mnaouar, BP 1505, Bir El Djir 31000, Oran, Algeria

Аннотация: This paper is dealing with the shrinkage estimators of a multivariate normal mean and their minimaxity properties under the balanced loss function. We present here two different classes of estimators: the first which generalizes the James-Stein estimator, and show that any estimator of this class dominates the maximum likelihood estimator (MLE), consequently it is minimax, and the second dominates the James-Stein estimator and we conclude that any estimator of this class is also minimax.

Ключевые слова и фразы: Balanced loss function, James-Stein estimator, minimax estimator, multivariate Gaussian random variable, non-central chi-square distribution, shrinkage estimators.

MSC: Primary 62C20; Secondary 62H10, 62J07

Поступила в редакцию: 30.06.2021

Язык публикации: английский

DOI: 10.32523/2077-9879-2022-13-2-18-36



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