Comparison of two weibull distributions under random censoring |
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Authors: | Mete Şirvanci |
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Affiliation: | College of Business and Economics , University of Wisconsin , Whitewater, WI, 53190 |
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Abstract: | The two-sample problem for comparing Weibull scale parameters is studied for randomly censored data. Three different test statistics are considered and their asymptotic properties are established under a sequence of local alternatives, It is shown that both the test statistic based on the mlefs (maximum likelihood estimators) and the likelihood ratio test are asymptotically optimum. The third statistic based only on the number of failures is not, Asymptotic relative efficiency of this statistic is obtained and its numerical values are computed for uniform and Weibull censoring, Effects of uniform random censoring on the censoring level of the experiment are illus¬trated, A direct proof for the joint asymptotic normality of the mlefs of the shape and the scale parameters is also given |
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Keywords: | Weibull distribution two sample tests maximum likelihood estimators asymptotic relative efficiency asymptotic normality |
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