On Some Classes of Estimators Derived from the Positive Part of James–Stein Estimator

Abdenour Hamdaoui; Abdelkader Benkhaled; Mohammed Alshahrani; Mekki Terbeche; Waleed Almutiry; Amani Alahmadi

doi:10.1155/2023/5221061

Journal of Mathematics (Jan 2023)

On Some Classes of Estimators Derived from the Positive Part of James–Stein Estimator

Abdenour Hamdaoui,
Abdelkader Benkhaled,
Mohammed Alshahrani,
Mekki Terbeche,
Waleed Almutiry,
Amani Alahmadi

Affiliations

Abdenour Hamdaoui: Department of Mathematics
Abdelkader Benkhaled: Department of Biology
Mohammed Alshahrani: Department of Mathematics
Mekki Terbeche: Department of Mathematics
Waleed Almutiry: Department of Mathematics
Amani Alahmadi: Department of Mathematics

DOI: https://doi.org/10.1155/2023/5221061
Journal volume & issue: Vol. 2023

Abstract

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This work consists of developing shrinkage estimation strategies for the multivariate normal mean when the covariance matrix is diagonal and known. The domination of the positive part of James–Stein estimator (PPJSE) over James–Stein estimator (JSE) relative to the balanced loss function (BLF) is analytically proved. We introduce a new class of shrinkage estimators which ameliorate the PPJSE, and then we construct a series of polynomial shrinkage estimators which improve the PPJSE; also, any estimator of this series can be ameliorated by adding to it a new term of higher degree. We end this paper by simulation studies which confirm the performance of the suggested estimators.

Published in Journal of Mathematics

ISSN: 2314-4629 (Print); 2314-4785 (Online)
Publisher: Wiley
Country of publisher: United Kingdom
LCC subjects: Science: Mathematics
Website: https://onlinelibrary.wiley.com/journal/1469

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