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A New Discrete Analog of the Continuous Lindley Distribution, with Reliability Applications

Abdulhakim A. Al-Babtain, Abdul Hadi N. Ahmed, Ahmed Z. Afify

2020Entropy45 citationsDOIOpen Access PDF

Abstract

In this paper, we propose and study a new probability mass function by creating a natural discrete analog to the continuous Lindley distribution as a mixture of geometric and negative binomial distributions. The new distribution has many interesting properties that make it superior to many other discrete distributions, particularly in analyzing over-dispersed count data. Several statistical properties of the introduced distribution have been established including moments and moment generating function, residual moments, characterization, entropy, estimation of the parameter by the maximum likelihood method. A bias reduction method is applied to the derived estimator; its existence and uniqueness are discussed. Applications of the goodness of fit of the proposed distribution have been examined and compared with other discrete distributions using three real data sets from biological sciences.

Topics & Concepts

MathematicsApplied mathematicsGeometric distributionPrinciple of maximum entropyEstimatorProbability distributionMoment (physics)Entropy (arrow of time)Lomax distributionMoment-generating functionBeta-binomial distributionNegative binomial distributionProbability mass functionStatistical physicsStatisticsPoisson distributionMaximum likelihoodQuantum mechanicsPhysicsClassical mechanicsStatistical Distribution Estimation and ApplicationsStatistical Methods and Bayesian InferenceBayesian Methods and Mixture Models
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