A procedure is given for obtaining a random width confidence interval for the largest reliability of k Weibull populations. The procedure does not identify the populations for which the reliability would be a maximum. The maximum likelihood estimators or the simplified linear estimators of the reliability based on type II censored data are used. The cases considered include unknown shape parameters being equal or unequal. Simultaneous confidence intervals for the k reliabilities are also obtained. Tables for the lower and upper limits in selected cases are constructed using Monte Carlo methods. © 1981, Taylor & Francis Group, LLC. All rights reserved
The Weibull distribution is widely used in lifetime data analysis. For example, in studies on the ti...
The subject of this thesis is the point estimate and interval estimates of the binomial proportion. ...
One form of the generalized gamma distribution brings out an association between the normal distribu...
[[abstract]]In this paper, we provide a method for constructing an exact confidence interval for the...
Statistical inference methods for the Weibull parameters and their functions usually depend on exten...
[[abstract]]For complete and type II censored data, this work compares the mean lengths of three exa...
Abstract: Simple estimators of the Weibull shape parameter and any quantile in uncensored samples ar...
This study considers the estimation of Maximum Likelihood Estimator and the Bayesian Estimator of th...
For the first time, ten frequentist estimation methods are considered on stress-strength reliability...
Based on progressively Type-II censored samples, this paper deals with inference for the stress-stre...
The likelihood ratio method is used to construct a confidence interval for a population mean when sa...
[[abstract]]Different types of exact confidence intervals and exact joint confidence regions for the...
There are many real-life situations where exact failure times are not available or not easily availa...
In this paper, we consider Kumaraswamy-G distributions and derive a Uniformly Minimum Variance Unbia...
This thesis looks at extending previous work in the field of Type I censored reliability experiments...
The Weibull distribution is widely used in lifetime data analysis. For example, in studies on the ti...
The subject of this thesis is the point estimate and interval estimates of the binomial proportion. ...
One form of the generalized gamma distribution brings out an association between the normal distribu...
[[abstract]]In this paper, we provide a method for constructing an exact confidence interval for the...
Statistical inference methods for the Weibull parameters and their functions usually depend on exten...
[[abstract]]For complete and type II censored data, this work compares the mean lengths of three exa...
Abstract: Simple estimators of the Weibull shape parameter and any quantile in uncensored samples ar...
This study considers the estimation of Maximum Likelihood Estimator and the Bayesian Estimator of th...
For the first time, ten frequentist estimation methods are considered on stress-strength reliability...
Based on progressively Type-II censored samples, this paper deals with inference for the stress-stre...
The likelihood ratio method is used to construct a confidence interval for a population mean when sa...
[[abstract]]Different types of exact confidence intervals and exact joint confidence regions for the...
There are many real-life situations where exact failure times are not available or not easily availa...
In this paper, we consider Kumaraswamy-G distributions and derive a Uniformly Minimum Variance Unbia...
This thesis looks at extending previous work in the field of Type I censored reliability experiments...
The Weibull distribution is widely used in lifetime data analysis. For example, in studies on the ti...
The subject of this thesis is the point estimate and interval estimates of the binomial proportion. ...
One form of the generalized gamma distribution brings out an association between the normal distribu...