Yöntem Karşılaştırma
Seçtiğiniz yöntemleri yan yana inceleyin; farklı satırlar vurgulanır.
| Lorenz Curve× | Atkinson Index× | Gini Coefficient× | |
|---|---|---|---|
| Alan | Sociology | Sociology | Sociology |
| Aile | Process / pipeline | Process / pipeline | Process / pipeline |
| Köken yılı≠ | 1905 | 1970 | 1912 |
| Köken≠ | Max Otto Lorenz | Anthony Barnes Atkinson | Corrado Gini |
| Tür≠ | Graphical representation of distributional inequality | Welfare-based, parameterized inequality index | Scalar measure of statistical dispersion / inequality |
| Seminal kaynak≠ | Lorenz, M. O. (1905). Methods of measuring the concentration of wealth. Publications of the American Statistical Association, 9(70), 209–219. DOI ↗ | Atkinson, A. B. (1970). On the measurement of inequality. Journal of Economic Theory, 2(3), 244–263. DOI ↗ | Ceriani, L., & Verme, P. (2012). The origins of the Gini index: extracts from Variabilità e Mutabilità (1912) by Corrado Gini. The Journal of Economic Inequality, 10(3), 421–443. DOI ↗ |
| Diğer adlar≠ | Lorenz concentration curve, Lorenz diagram, cumulative share curve | Atkinson inequality measure, Atkinson's A, welfare-based inequality index | Gini index, Gini ratio, Gini concentration ratio, G |
| İlişkili | 5 | 5 | 5 |
| Özet≠ | The Lorenz curve is a graphical device that displays the full shape of inequality in a distribution by plotting the cumulative share of a quantity (such as income) held by the cumulative share of the population, ranked from poorest to richest. Introduced by Max Lorenz in 1905, it underlies the Gini coefficient and provides the basis for ranking distributions by inequality when one curve lies entirely above another. | The Atkinson index is a welfare-based measure of inequality that incorporates an explicit, analyst-chosen parameter for how much society dislikes inequality. Introduced by Anthony Atkinson in 1970, it asks what fraction of total income could be discarded, under an equal distribution, while leaving social welfare unchanged — making the ethical judgement behind any inequality comparison transparent rather than hidden. | The Gini coefficient is the most widely used single-number summary of inequality in a distribution such as income or wealth. Introduced by the Italian statistician Corrado Gini in 1912, it equals twice the area between the Lorenz curve and the line of perfect equality, ranging from 0 when everyone has the same amount to a maximum approaching 1 when one unit holds everything. |
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