Improved inference for the shape-scale family of distributions under type-II censoring |
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Authors: | H V Kulkarni |
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Institution: | Department of Statistics, Shivaji University, Kolhapur, Maharashtra, India |
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Abstract: | The presence of a nuisance parameter may often perturb the quality of the likelihood-based inference for a parameter of interest under small to moderate sample sizes. The article proposes a maximal scale invariant transformation for likelihood-based inference for the shape in a shape-scale family to circumvent the effect of the nuisance scale parameter. The transformation can be used under complete or type-II censored samples. Simulation-based performance evaluation of the proposed estimator for the popular Weibull, Gamma and Generalized exponential distribution exhibits markedly improved performance in all types of likelihood-based inference for the shape under complete and type-II censored samples. The simulation study leads to a linear relation between the bias of the classical maximum likelihood estimator (MLE) and the transformation-based MLE for the popular Weibull and Gamma distributions. The linearity is exploited to suggest an almost unbiased estimator of the shape parameter for these distributions. Allied estimation of scale is also discussed. |
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Keywords: | Maximal scale invariant transformation type-II censoring almost unbiased estimator Weibull distribution Gamma distribution Generalized exponential distribution |
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