Alomair Abdullah M, Ahmed Mukhtar, Tariq Saadia, Ahsan-Ul-Haq Muhammad, Talib Junaid
Department of Quantitative Methods, School of Business, King Faisal University, 31982, Al-Ahsa, Saudi Arabia.
School of Statistics, Minhaj University Lahore, Lahore, Pakistan.
Heliyon. 2024 Jan 29;10(3):e25472. doi: 10.1016/j.heliyon.2024.e25472. eCollection 2024 Feb 15.
In this paper, we propose exponentiated XLindley (EXL) distribution. The novel model is adaptable due to the mixt shapes of its density and failure rate functions. The following key statistical properties of EXL distribution are derived: quantile function, moments, hazard function, mean residual life, and Rényi entropy. The parameters are estimated using the maximum likelihood, Anderson Darling, Cramer von Misses, maximum product spacing, ordinary and weighted least square estimation procedures. To examine the behavior of the estimate, Monte Carlo simulation is used. Further Bayesian technique is also utilized to estimate the EXL parameters. The traceplot and Geweke diagnostics are used to track the convergence of simulated processes. The applicability of the EXL distribution is demonstrated by three datasets from different domains such as mortality rate due to COVID-19, precipitation in inches, and failure time for repairable items. The proposed distribution provides efficient results as compared to renowned competitive distributions.
在本文中,我们提出了指数化XLindley(EXL)分布。该新型模型因其密度函数和失效率函数的混合形状而具有适应性。推导了EXL分布的以下关键统计特性:分位数函数、矩、危险函数、平均剩余寿命和Rényi熵。使用最大似然估计、Anderson Darling估计、Cramer von Misses估计、最大乘积间距估计、普通最小二乘估计和加权最小二乘估计程序来估计参数。为了检验估计的行为,使用了蒙特卡罗模拟。还利用了进一步的贝叶斯技术来估计EXL参数。使用迹图和Geweke诊断来跟踪模拟过程的收敛情况。通过来自不同领域的三个数据集,如因COVID-19导致的死亡率、英寸降水量和可修复物品的失效时间,证明了EXL分布的适用性。与著名的竞争分布相比,所提出的分布提供了有效的结果。