References
Bouillon, C., Legovini, A., Lustig, N.: Rising inequality in Mexico: returns to household characteristics and the ‘Chiappas effect’. Paper presented at the LACEA Conference, Buenos Aires (1998)
Bourguignon, F.: Decomposable income inequality measures. Econometrica 47, 901–920 (1979)
Bourguignon, F., Fournier, M., Gurgand, M.: Distribution, development and education: Taiwan, 1979–1994. Paper presented at the LACEA Conference, Buenos Aires (1998)
Chantreuil, F., Trannoy, A.: Inequality decomposition values. Mimeo, Université de Cergy-Pointoise (1997)
Cowell, F.A., Jenkins, S.P.: How much inequality can we explain—a methodology and an application to the United-States. Econ. J. 105, 421–430 (1995)
Datt, G., Ravallion, M.: Growth and redistribution components of changes in poverty measures—a decomposition with applications to Brazil and India in the 1980s. J. Dev. Econ. 38, 275–296 (1992)
Fields, G.S.: Accounting for differences in income inequality. Mimeo, Cornell University (1995)
Foster, J.E., Shneyerov, A.A.: Path independent inequality measures. Discussion Paper No. 97-W04, Department of Economics, Vanderbilt University (1996)
Foster, J.E., Shneyerov, A.A.: A general class of additively decomposable inequality indices. Discussion Paper No. 97-W10, Department of Economics, Vanderbilt University (1997)
Foster, J.E., Greer, J., Thorbecke, E.: A class of decomposable poverty indices. Econometrica 52, 761–765 (1984)
Grootaert, C.: Structural change and poverty in Africa: a decomposition analysis for Cote d’Ivoire. J. Dev. Econ. 47, 375–402 (1995)
Jenkins, S.P.: Accounting for inequality trends: decomposition analyses for the UK, 1971–86. Economica 62, 29–64 (1995)
Juhn, C., Murphy, K.M., Pierce, B.: Wage inequality and the rise in returns to skill. J. Polit. Econ. 101, 410–442 (1993)
Lambert, P.J., Aronson, J.R.: Inequality decomposition analysis and the Gini coefficient revisited. Econ. J. 103, 1221–1227 (1993)
Morduch, J., Sinclair, T.: Rethinking inequality decomposition, with evidence from rural China. Mimeo, Stanford University (1998)
Moulin, H.: Axioms of Cooperative Decision Making. Cambridge University Press (1988)
Oaxaca, R.: Male-female wage differentials in urban labour markets. Int. Econ. Rev. 14, 693–709 (1973)
Owen, G.: Values of games with priori unions. In: Heim, R., Moeschlin, O. (eds.) Essays in Mathematical Economics and Game Theory. Springer, New York (1977)
Pyatt, G.: On the interpretation and disaggregation of Gini coefficients. Econ. J. 86, 243–255 (1976)
Ravallion, M., Huppi, M.: Measuring changes in poverty: a methodological case study of Indonesia during an adjustment period. World Bank Econ. Rev. 5, 57–84 (1991)
Rongve, I.: A Shapley decomposition of inequality indices by income source. Discussion Paper #59, Department of Economics, University of Regina (1995)
Shapley, L.: A value for n-person games. In: Kuhn, H.W., Tucker, A.W. (eds.) Contributions to the Theory of Games, vol. 2. Princeton University Press (1953)
Shorrocks, A.F.: The class of additively decomposable inequality measures. Econometrica 48, 613–625 (1980)
Shorrocks, A.F.: Inequality decomposition by factor components. Econometrica 50, 193–211 (1982)
Shorrocks, A.F.: Inequality decomposition by population subgroups. Econometrica 52, 1369–1385 (1984)
Szekely, M.: Poverty in Mexico during adjustment. Rev. Income Wealth 1995(3), 331–348 (1995)
Theil, H.: Statistical Decomposition Analysis. North Holland, Amsterdam (1972)
Thorbecke, E., Jung, H.S.: A multiplier decomposition method to analyze poverty alleviation. J. Dev. Econ. 48, 279–300 (1996)
Tsui, K.-Y.: Growth-equity decomposition of a change in poverty: an axiomatic approach. Econ. Lett. 50, 417–424 (1996)
Young, H.P.: Monotonic solutions of cooperative games. Int. J. Game Theory 14, 65–72 (1985)
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I dedicate this paper to the memory of my mother, Vera Florence Shorrocks.
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Shorrocks, A.F. Decomposition procedures for distributional analysis: a unified framework based on the Shapley value. J Econ Inequal 11, 99–126 (2013). https://doi.org/10.1007/s10888-011-9214-z
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DOI: https://doi.org/10.1007/s10888-011-9214-z