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http://dx.doi.org/10.5351/CSAM.2017.24.5.519

Goodness-of-fit tests for randomly censored Weibull distributions with estimated parameters  

Kim, Namhyun (Department of Science, Hongik University)
Publication Information
Communications for Statistical Applications and Methods / v.24, no.5, 2017 , pp. 519-531 More about this Journal
Abstract
We consider goodness-of-fit test statistics for Weibull distributions when data are randomly censored and the parameters are unknown. Koziol and Green (Biometrika, 63, 465-474, 1976) proposed the $Cram\acute{e}r$-von Mises statistic's randomly censored version for a simple hypothesis based on the Kaplan-Meier product limit of the distribution function. We apply their idea to the other statistics based on the empirical distribution function such as the Kolmogorov-Smirnov and Liao and Shimokawa (Journal of Statistical Computation and Simulation, 64, 23-48, 1999) statistics. The latter is a hybrid of the Kolmogorov-Smirnov, $Cram\acute{e}r$-von Mises, and Anderson-Darling statistics. These statistics as well as the Koziol-Green statistic are considered as test statistics for randomly censored Weibull distributions with estimated parameters. The null distributions depend on the estimation method since the test statistics are not distribution free when the parameters are estimated. Maximum likelihood estimation and the graphical plotting method with the least squares are considered for parameter estimation. A simulation study enables the Liao-Shimokawa statistic to show a relatively high power in many alternatives; however, the null distribution heavily depends on the parameter estimation. Meanwhile, the Koziol-Green statistic provides moderate power and the null distribution does not significantly change upon the parameter estimation.
Keywords
$Cram\acute{e}r$-von Mises; goodness-of-fit tests; Kaplan-Meier estimator; Kolmogorov-Smirnov; maximum likelihood estimator; random censoring; Weibull distribution;
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