吉尼稳定洛伦兹曲线及其与广义帕累托分布的关系

IF 3.4 2区 管理学 Q2 COMPUTER SCIENCE, INTERDISCIPLINARY APPLICATIONS Journal of Informetrics Pub Date : 2024-01-15 DOI:10.1016/j.joi.2024.101499
Lucio Bertoli-Barsotti , Marek Gagolewski , Grzegorz Siudem , Barbara Żogała-Siudem
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引用次数: 0

摘要

我们引入了一个迭代离散信息生产过程,在此过程中,我们可以根据简单的仿射变换,用新元素扩展有序的归一化向量,同时保留预定义的不平等程度 G(由基尼指数衡量)。然后,我们推导出相应向量的经验洛伦兹曲线族,并证明它与样本大小和 G(扮演不确定性参数的角色)有关,是随机有序的。我们证明,从渐近的角度看,我们可以得到由有限均值皮康兹广义帕累托分布(GPD)的一种新的直观参数化所生成的所有且唯一的洛伦兹曲线,该参数化统一了其他三个族,即帕累托 II 型分布、指数分布和缩放贝塔分布。该系列不仅在参数 G 方面完全有序,而且由于我们的推导,还具有很好的基本解释。我们的模型非常适合文献计量学、信息计量学、社会经济学和环境数据。我们的模型非常适合文献计量学、信息计量学、社会经济学和环境数据,而且非常方便用户使用,因为它只取决于样本大小和基尼指数。
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Gini-stable Lorenz curves and their relation to the generalised Pareto distribution

We introduce an iterative discrete information production process where we can extend ordered normalised vectors by new elements based on a simple affine transformation, while preserving the predefined level of inequality, G, as measured by the Gini index.

Then, we derive the family of empirical Lorenz curves of the corresponding vectors and prove that it is stochastically ordered with respect to both the sample size and G which plays the role of the uncertainty parameter. We prove that asymptotically, we obtain all, and only, Lorenz curves generated by a new, intuitive parametrisation of the finite-mean Pickands' Generalised Pareto Distribution (GPD) that unifies three other families, namely: the Pareto Type II, exponential, and scaled beta distributions. The family is not only totally ordered with respect to the parameter G, but also, thanks to our derivations, has a nice underlying interpretation. Our result may thus shed a new light on the genesis of this family of distributions.

Our model fits bibliometric, informetric, socioeconomic, and environmental data reasonably well. It is quite user-friendly for it only depends on the sample size and its Gini index.

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来源期刊
Journal of Informetrics
Journal of Informetrics Social Sciences-Library and Information Sciences
CiteScore
6.40
自引率
16.20%
发文量
95
期刊介绍: Journal of Informetrics (JOI) publishes rigorous high-quality research on quantitative aspects of information science. The main focus of the journal is on topics in bibliometrics, scientometrics, webometrics, patentometrics, altmetrics and research evaluation. Contributions studying informetric problems using methods from other quantitative fields, such as mathematics, statistics, computer science, economics and econometrics, and network science, are especially encouraged. JOI publishes both theoretical and empirical work. In general, case studies, for instance a bibliometric analysis focusing on a specific research field or a specific country, are not considered suitable for publication in JOI, unless they contain innovative methodological elements.
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