Bounded Weighted Exponential Distribution with Applications

Q3 Business, Management and Accounting American Journal of Mathematical and Management Sciences Pub Date : 2020-10-20 DOI:10.1080/01966324.2020.1834893

Avishek Mallick, I. Ghosh, S. Dey, D. Kumar

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引用次数: 3

Abstract

Abstract In this article, we try to supplement the distribution theory literature by incorporating a new bounded distribution, called the bounded weighted exponential (BWE) distribution in the (0, 1) intervals by transformation method. The proposed distribution exhibits decreasing and left-skewed unimodal density while the hazard rate can have increasing and bathtub shaped. Although our main focus is on the estimation from the frequentist point of view, in addition, we derive some useful structural and statistical properties of the proposed BWE distribution. We briefly describe three classical estimators namely, the maximum likelihood estimators (MLE), the ordinary least-squares estimators (LSE) and the weighted least-squares estimators (WLSE). Monte Carlo simulations are performed to compare performances of the proposed methods of estimation for both moderate and large samples. An application of the model is presented by re-analyzing a real data set and comparisons are made with the fit attained by some other well-known distributions for illustrative purposes.

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有界加权指数分布及其应用

摘要在本文中，我们试图通过转换方法引入一种新的有界分布来补充分布理论文献，称为（0，1）区间中的有界加权指数（BWE）分布。所提出的分布表现出递减和左偏的单峰密度，而危险率可以呈上升和浴缸状。尽管我们的主要关注点是从频率学家的角度进行估计，但此外，我们还推导出了所提出的BWE分布的一些有用的结构和统计特性。我们简要描述了三种经典的估计量，即最大似然估计量（MLE）、普通最小二乘估计量（LSE）和加权最小二乘估计量。进行了蒙特卡罗模拟，以比较所提出的估计方法对中等样本和大样本的性能。通过重新分析真实数据集，给出了该模型的应用，并与其他一些已知分布所获得的拟合进行了比较，以便于说明。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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来源期刊

American Journal of Mathematical and Management Sciences Business, Management and Accounting-Business, Management and Accounting (all)

CiteScore

2.70

自引率

0.00%

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