Extreme Behaviors of the Tail Gini-Type Variability Measures

IF 0.7 3区 工程技术 Q4 ENGINEERING, INDUSTRIAL
Hong-Jie Sun, Yu Chen
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引用次数: 1

Abstract

For a bivariate random vector $(X, Y)$ , suppose $X$ is some interesting loss variable and $Y$ is a benchmark variable. This paper proposes a new variability measure called the joint tail-Gini functional, which considers not only the tail event of benchmark variable $Y$ , but also the tail information of $X$ itself. It can be viewed as a class of tail Gini-type variability measures, which also include the recently proposed tail-Gini functional. It is a challenging and interesting task to measure the tail variability of $X$ under some extreme scenarios of the variables by extending the Gini's methodology, and the two tail variability measures can serve such a purpose. We study the asymptotic behaviors of these tail Gini-type variability measures, including tail-Gini and joint tail-Gini functionals. The paper conducts this study under both tail dependent and tail independent cases, which are modeled by copulas with so-called tail order property. Some examples are also shown to illuminate our results. In particular, a generalization of the joint tail-Gini functional is considered to provide a more flexible version.
尾基尼型变异性测量的极端行为
对于二元随机向量$(X, Y)$,假设$X$是一个有趣的损失变量,$Y$是一个基准变量。本文提出了一种新的可变性测度——联合尾部基尼函数,它不仅考虑基准变量$Y$的尾部事件,而且考虑$X$本身的尾部信息。它可以被视为一类尾部基尼型变异性测量,其中也包括最近提出的尾部基尼函数。通过扩展基尼系数的方法来测量变量在某些极端情况下X$的尾部可变性是一项具有挑战性和有趣的任务,两个尾部可变性测量可以达到这样的目的。我们研究了这些尾基尼型变异性度量的渐近行为,包括尾基尼函数和联合尾基尼函数。本文在尾相关和尾独立两种情况下进行了研究,这两种情况都是用具有尾序性质的连曲线来建模的。文中还列举了一些例子来说明我们的结论。特别是,联合尾-基尼函数的泛化被认为提供了一个更灵活的版本。
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
CiteScore
2.20
自引率
18.20%
发文量
45
审稿时长
>12 weeks
期刊介绍: The primary focus of the journal is on stochastic modelling in the physical and engineering sciences, with particular emphasis on queueing theory, reliability theory, inventory theory, simulation, mathematical finance and probabilistic networks and graphs. Papers on analytic properties and related disciplines are also considered, as well as more general papers on applied and computational probability, if appropriate. Readers include academics working in statistics, operations research, computer science, engineering, management science and physical sciences as well as industrial practitioners engaged in telecommunications, computer science, financial engineering, operations research and management science.
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