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A class of general pretest estimators for the univariate normal mean

Jia‐Han Shih, Yoshihiko Konno, Yuan-Tsung Chang, Takeshi Emura

2021Communication in Statistics- Theory and Methods10 citationsDOIOpen Access PDF

Abstract

In this paper, we propose a class of general pretest estimators for the univariate normal mean. The main mathematical idea of the proposed class is the adaptation of randomized tests, where the randomization probability is related to a shrinkage parameter. Consequently, the proposed class includes many existing estimators, such as the pretest, shrinkage, Bayes, and empirical Bayes estimators as special cases. Furthermore, the proposed class can be easily tuned for users by adjusting significance levels and probability function. We derive theoretical properties of the proposed class, such as the expressions for the distribution function, bias, and MSE. Our expressions for the bias and MSE turn out to be simpler than those previously derived for some existing formulas for special cases. We also conduct simulation studies to examine our theoretical results and demonstrate the application of the proposed class through a real dataset.

Topics & Concepts

EstimatorUnivariateBayes' theoremMathematicsClass (philosophy)StatisticsPrior probabilityFunction (biology)Statistical hypothesis testingShrinkage estimatorComputer scienceArtificial intelligenceBayesian probabilityEfficient estimatorMultivariate statisticsEvolutionary biologyMinimum-variance unbiased estimatorBiologyStatistical Distribution Estimation and ApplicationsBayesian Methods and Mixture ModelsStatistical Methods and Bayesian Inference