Semi- Minimax Estimations on the Exponential Distribution Under Symmetric and Asymmetric Loss Functions
DOI:
https://doi.org/10.55562/jrucs.v36i2.257Keywords:
Semi-minimax estimator, Exponential distribution, Bayes estimator, Monte- Carlo simulationAbstract
In this paper the semi-minimax estimators of the scale parameter of the exponential distribution are presented by applying the theorem of Lehmann under symmetric (quadratic) loss function and asymmetric (entropy, mlinex , precautionary) loss functions .The results of comparison between these estimators are compared empirically using Monte-Carlo simulation study with respect to the mean square error(MSE) and the mean percentage error(MPE). In general, the results showed that the semi-minimax estimator under quadratic loss function is the best estimator by MSE and MPE for all sample sizes. We can notice that, when the values of the parameters β ,θ increasing the semi-minimax estimator under quadratic loss function is the best estimator by MSE while comparison by MPE showed that the semi-minimax estimator under mlinex loss function when the value of c positive is the best, but they both get worse as α ,θ increases. Also the results showed that when α, β together increase the semi-minimax estimator under entropy loss function is the best by MSE while by MPE the semi-minimax estimator under precautionary loss function is the best estimator.Downloads
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Published
2021-10-13
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How to Cite
Semi- Minimax Estimations on the Exponential Distribution Under Symmetric and Asymmetric Loss Functions. (2021). Journal of Al-Rafidain University College For Sciences ( Print ISSN: 1681-6870 ,Online ISSN: 2790-2293 ), 36(2), 245-270. https://doi.org/10.55562/jrucs.v36i2.257
