关于森的基尼系数表示法的说明:修订与反响

Oded Stark
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引用次数: 0

摘要

森(Sen,1973 年和 1997 年)提出了人口中收入不平等的基尼系数。"在任何一对一的比较中,收入较低的人发现自己的收入较低时,可以认为他受到了某种压抑。让这种抑郁与收入差距成正比。在所有可能的成对比较中,所有这种压抑的总和就是基尼系数。(森的口头叙述附有一个公式(森,1997 年,第 31 页,公式 2.8.1),本注释将其复制为公式 (1)。这就造成了一个难题,因为定义在单位区间上的不平等度量的 "使命 "是将 0 表示完全平等(最大平等),将 1 表示完全不平等(最大不平等)。在本说明中,我们将证明,如果基尼系数是通过对由经历收入相关抑郁的人组成的人口的收入相关抑郁总量的精确测量得出的,那么所得到的基尼系数是 "表现良好的",即它从上而下以 1 为界。我们猜测了森的定义存在缺陷的原因,并提出了使用 "表现良好的 "基尼系数的反响。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
A note on Sen’s representation of the Gini coefficient: Revision and repercussions

Sen (1973 and 1997) presents the Gini coefficient of income inequality in a population as follows. “In any pair-wise comparison the man with the lower income can be thought to be suffering from some depression on finding his income to be lower. Let this depression be proportional to the difference in income. The sum total of all such depressions in all possible pair-wise comparisons takes us to the Gini coefficient.” (This citation is from Sen 1973, p. 8.) Sen’s verbal account is accompanied by a formula (Sen 1997, p. 31, eq. 2.8.1), which is replicated in the text of this note as equation (1). The formula yields a coefficient bounded from above by a number smaller than 1. This creates a difficulty, because the “mission” of a measure of inequality defined on the unit interval is to accord 0 to perfect equality (maximal equality) and 1 to perfect inequality (maximal inequality). In this note we show that when the Gini coefficient is elicited from a neat measure of the aggregate income-related depression of the population that consists of the people who experience income-related depression, then the obtained Gini coefficient is “well behaved” in the sense that it is bounded from above by 1. We conjecture a reason for a drawback of Sen’s definition, and we present repercussions of the usage of the “well-behaved” Gini coefficient.

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