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/no/economics/shapley-decomposition-inequality

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

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Referert av

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

Relaterte referansebegreper

Fordeling Personlig inntekt, formue og deres fordelinger Faktorinntektsfordeling Helsesvake og global distribusjon Measurement and Analysis of Poverty Globaliseringens økonomiske konsekvenser

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