 A Note on Decomposable Inequality MeasuresR. Robert Russell The Review of Economic Studies, 1985, vol. 52, issue 2, 347-352 Abstract: Cowell has shown that if an inequality measure satisfies (1) additivity, (2) decomposability (among population groups), (3) additivitiy of the group inequality measures, (4) symmetry within groups, and (5) twice differentiability, it can be written as an additive function of group measures belonging to the CES class or of the form ∑i, si, ln si, where si is the i-th person's share. Using a result from the theory of functional equations, I prove that the first two conditions, often imposed for analytical convenience, alone imply Cowell's structure. Symmetry, or other ethical postulates, can then be represented by simple parametric restrictions. Date: 1985 Downloads: (external link) Related works: Export reference: BibTeX RIS (EndNote, ProCite, RefMan) HTML/Text Persistent link: https://EconPapers.repec.org/RePEc:oup:restud:v:52:y:1985:i:2:p:347-352. Access Statistics for this article The Review of Economic Studies is currently edited by Thomas Chaney, Xavier d’Haultfoeuille, Andrea Galeotti, BÃ¥rd Harstad, Nir Jaimovich, Katrine Loken, Elias Papaioannou, Vincent Sterk and Noam Yuchtman More articles in The Review of Economic Studies from Review of Economic Studies Ltd |
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