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http://dx.doi.org/10.29220/CSAM.2021.28.2.099

Parameter estimation of an extended inverse power Lomax distribution with Type I right censored data  

Hassan, Amal S. (Department of Mathematical Statistics, Cairo University)
Nassr, Said G. (Department of Quantitative Methods, Sinai University)
Publication Information
Communications for Statistical Applications and Methods / v.28, no.2, 2021 , pp. 99-118 More about this Journal
Abstract
In this paper, we introduce an extended form of the inverse power Lomax model via Marshall-Olkin approach. We call it the Marshall-Olkin inverse power Lomax (MOIPL) distribution. The four- parameter MOIPL distribution is very flexible which contains some former and new models. Vital properties of the MOIPL distribution are affirmed. Maximum likelihood estimators and approximate confidence intervals are considered under Type I censored samples. Maximum likelihood estimates are evaluated according to simulation study. Bayesian estimators as well as Bayesian credible intervals under symmetric loss function are obtained via Markov chain Monte Carlo (MCMC) approach. Finally, the flexibility of the new model is analyzed by means of two real data sets. It is found that the MOIPL model provides closer fits than some other models based on the selected criteria.
Keywords
Inverse power Lomax distribution; Marshall-Olkin method; maximum likelihood; Bayesian estimation; Type I censored sample;
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