Kristensen, Jens Peter (2023) Study about Gini Coefficient and Discontinuity: Contribution to the Analysis of a Transformation. In: Research and Applications Towards Mathematics and Computer Science Vol. 4. B P International, pp. 163-183. ISBN 978-81-19491-73-5
Full text not available from this repository.Abstract
This chapter reveals a discontinuity in the mapping from a Lorenz curve to the associated cumulative distribution function. The Gini co-efficient is an important tool for analyzing income or wealth distribution within a country or region, but it should not be mistaken for an absolute measurement of income or wealth. A high-income country and a low-income country might have the same Gini co-efficient, even with rather different income distributions. The issue is mathematical in nature and is based on an examination of how a bounded random variable's distribution function gets converted into its Lorenz curve. It will be proven that the transformation from a finite income distribution to its Lorenz curve is a continuous bijection with respect to the Lq ([0,1])-metric – for every q 1. The inverse transformation, however, is not continuous for any q 1. This implies a more careful attitude when interpreting the value of a Gini coefficient. Another issue is that you cannot trust the associated distribution to be an accurate representation of the underlying income distribution if you computed a Lorenz curve using empirical data. Generalisations in several directions are possible when calculating the Gini coefficient using Lorenz curves. One that connects the Lorenz curve to variance is included here.
Item Type: | Book Section |
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Subjects: | Apsci Archives > Computer Science |
Depositing User: | Unnamed user with email support@apsciarchives.com |
Date Deposited: | 29 Sep 2023 13:06 |
Last Modified: | 29 Sep 2023 13:06 |
URI: | http://eprints.go2submission.com/id/eprint/1734 |