On second-order improved estimation of a gamma scale parameter |
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Authors: | Hidekazu Tanaka Wooi K. Lim |
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Affiliation: | 1. Faculty of Liberal Arts &2. Sciences, Osaka Prefecture University, Sakai, Osaka, Japan;3. Department of Mathematics, William Paterson University, Wayne, NJ, USA |
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Abstract: | This paper concludes our comprehensive study on point estimation of model parameters of a gamma distribution from a second-order decision theoretic point of view. It should be noted that efficient estimation of gamma model parameters for samples ‘not large’ is a challenging task since the exact sampling distributions of the maximum likelihood estimators and its variants are not known. Estimation of a gamma scale parameter has received less attention from the earlier researchers compared to shape parameter estimation. What we have observed here is that improved estimation of the shape parameter does not necessarily lead to improved scale estimation if a natural moment condition (which is also the maximum likelihood restriction) is satisfied. Therefore, this work deals with the gamma scale parameter estimation as a separate new problem, not as a by-product of the shape parameter estimation, and studies several estimators in terms of second-order risk. |
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Keywords: | Gamma scale parameter maximum likelihood estimator scaled quadratic loss function second-order admissibility (inadmissibility) simultaneous estimation |
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