A. Alanzi, Muhammad Imran, Muhammad Mohsin Tahir, C. Chesneau, Farrukh Jamal, Saima Shakoor, Waqas Sami
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引用次数: 1
摘要
在本文中,我们对绝对连续分布的Bell-X族做出了数学和实际的贡献。作为该家族的主要成员,详细讨论了扩展了著名的Burr XII (BXII)分布的建模视角的特殊分布。它被称为贝尔-伯尔十二(BBXII)分布。它与其他扩展BXII发行版的区别在于它在功能形状方面的灵活性。在理论方面,概率密度函数的线性表示以及普通矩和不完全矩是深入研究的关键性质。推导了一些常用的熵测度,即r尼、Havrda和Charvat、Arimoto和Tsallis熵。在实际(推理)方面,使用七种不同的频率估计方法对相关参数进行估计,即最大似然估计、百分位数估计、最小二乘估计、加权最小二乘估计、cram von-Mises估计、Anderson-Darling估计和右尾Anderson-Darling估计。利用所有这些方法进行了仿真研究,以突出它们的有效性。随后,BBXII模型成功用于与其他可比较模型的比较,分析急性骨癌和关节炎疼痛患者的数据。当一个项目的寿命遵循BBXII分布时,还提出了截断寿命试验的组验收抽样计划。得到了令人信服的结果。
Simulation analysis, properties and applications on a new Burr XII model based on the Bell-X functionalities
In this article, we make mathematical and practical contributions to the Bell-X family of absolutely continuous distributions. As a main member of this family, a special distribution extending the modeling perspectives of the famous Burr XII (BXII) distribution is discussed in detail. It is called the Bell-Burr XII (BBXII) distribution. It stands apart from the other extended BXII distributions because of its flexibility in terms of functional shapes. On the theoretical side, a linear representation of the probability density function and the ordinary and incomplete moments are among the key properties studied in depth. Some commonly used entropy measures, namely Rényi, Havrda and Charvat, Arimoto, and Tsallis entropy, are derived. On the practical (inferential) side, the associated parameters are estimated using seven different frequentist estimation methods, namely the methods of maximum likelihood estimation, percentile estimation, least squares estimation, weighted least squares estimation, Cramér von-Mises estimation, Anderson-Darling estimation, and right-tail Anderson-Darling estimation. A simulation study utilizing all these methods is offered to highlight their effectiveness. Subsequently, the BBXII model is successfully used in comparisons with other comparable models to analyze data on patients with acute bone cancer and arthritis pain. A group acceptance sampling plan for truncated life tests is also proposed when an item's lifetime follows a BBXII distribution. Convincing results are obtained.
期刊介绍:
AIMS Mathematics is an international Open Access journal devoted to publishing peer-reviewed, high quality, original papers in all fields of mathematics. We publish the following article types: original research articles, reviews, editorials, letters, and conference reports.