November 16, 2024
Morad Alizadeh

Morad Alizadeh

Academic Rank: Assistant professor
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Degree: Ph.D in Statistics
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Faculty: Faculty of Intelligent Systems and Data Science

Research

Title A Probability Mass Function for Various Shapes of the Failure Rates, Asymmetric and Dispersed Data with Applications to Coronavirus and Kidney Dysmorphogenesis
Type Article
Keywords
probability mass function; hazard rate function; moments; dispersed data; simulation; Chi-square test; COVID-19
Journal SYMMETRY-BASEL
DOI 10.3390/sym13101790
Researchers Mahmoud El-Morshedy (First researcher) , Morad Alizadeh (Second researcher) , Afrah Al-Bossly (Third researcher) , Mohammed Eliwa (Fourth researcher)

Abstract

In this article, a discrete analogue of an extension to a two-parameter half-logistic model is proposed for modeling count data. The probability mass function of the new model can be expressed as a mixture representation of a geometric model. Some of its statistical properties, including hazard rate function, moments, moment generating function, conditional moments, stress-strength analysis, residual entropy, cumulative residual entropy and order statistics with its moments, are derived. It is found that the new distribution can be utilized to model positive skewed data, and it can be used for analyzing equi- and over-dispersed data. Furthermore, the hazard rate function can be either decreasing, increasing or bathtub. The parameter estimation through the classical point of view has been performed using the method of maximum likelihood. A detailed simulation study is carried out to examine the outcomes of the estimators. Finally, two distinctive real data sets are analyzed to prove the flexibility of the proposed discrete distribution.