Abstract
With the rapid development of statistics, information entropy is proposed as an important indicator used to quantify information uncertainty. In this paper, maximum likelihood and Bayesian methods are used to obtain the estimators of the entropy for a two-parameter Burr type XII distribution under progressive type-II censored data. In the part of maximum likelihood estimation, the asymptotic confidence intervals of entropy are calculated. In Bayesian estimation, we consider non-informative and informative priors respectively, and asymmetric and symmetric loss functions are both adopted. Meanwhile, the posterior risk is also calculated to evaluate the performances of the entropy estimators against different loss functions. In a numerical simulation, the Lindley approximation and the Markov chain Monte Carlo method were used to obtain the Bayesian estimates. In turn, the highest posterior density credible intervals of the entropy were derived. Finally, average absolute bias and mean square error were used to evaluate the estimators under different methods, and a real dataset was selected to illustrate the feasibility of the above estimation model.
Highlights
Burr type XII distribution was first proposed in [1] by Burr along with thirteen other types of Burr distributions
We investigated the statistical inferences for the information entropy of
In the Bayesian section, we demonstrated the performances of estimators under different loss functions, prior distributions and censoring schemes, which is helpful for the selection of models with entropy, such as those using the maximum entropy principle
Summary
Burr type XII distribution was first proposed in [1] by Burr along with thirteen other types of Burr distributions. For the consideration of applicability and flexibility, we adopt progressive type-II censored data to estimate information entropy. Lee [16] employed the generalized progressive hybrid censored data to study the entropy estimation using ML and Bayesian methods under the inverse Weibull distribution. That means the Bayesian method can utilize prior information besides likelihood information, which can make up for the loss of information caused by censoring to some extent Based on this idea, we adopted the Bayesian method to derive and calculate the information entropy under different prior distributions. To the best of our knowledge, no work has been done in applying the Bayesian method to the entropy estimation of a Burr XII distribution with progressive censored data.
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