Process / pipelineDistributional decomposition

Shapley Decomposition of Inequality

The Shapley decomposition, formalized for distributional analysis by Anthony Shorrocks (in a widely circulated 1999 working paper, published in 2013), is a general procedure for attributing an inequality or poverty statistic to its contributing factors — income sources, population subgroups, or determinants. It borrows the Shapley value from cooperative game theory: each factor's contribution is its average marginal effect on the indicator across all possible orders in which factors could be eliminated. The result is an exact, symmetric, residual-free decomposition that applies to any indicator, even those (like the Gini) that have no natural analytic decomposition of their own.

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Shapley Decomposition of Inequality

Datt-Ravallion Decomposi…Gini Coefficient Oaxaca-Blinder Decomposi…Theil Inequality Decompo…Multidimensional Poverty…

Kilder

Shorrocks, A. F. (2013). Decomposition procedures for distributional analysis: a unified framework based on the Shapley value. Journal of Economic Inequality, 11(1), 99–126. DOI: 10.1007/s10888-011-9214-z ↗

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ScholarGate. (2026, June 22). Shapley-Value Decomposition of Inequality and Poverty. ScholarGate. https://scholargate.app/da/economics/shapley-decomposition-inequality

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Datt-Ravallion DecompositionØkonomi↔ sammenlign
Gini CoefficientSociology↔ sammenlign
Oaxaca-Blinder DecompositionØkonomi↔ sammenlign
Theil Inequality DecompositionØkonomi↔ sammenlign

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Datt-Ravallion Decomposition Multidimensional Poverty Index Theil Inequality Decomposition

Lignende metoder

Theil Inequality Decomposition Shapley Value Datt-Ravallion Decomposition Health Inequality Gini Decomposition SHAP Voting Power Index Analysis Gini Coefficient Atkinson Index

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Fordeling Personlig Indkomst, Formue og deres Fordelinger Faktorindkomstfordeling Sundhedsulighed og global fordeling Measurement and Analysis of Poverty Globaliseringens Økonomiske Konsekvenser

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