Most of measures of income inequality are derived from the Lorenz curve and many authors state that the Gini index is the best single measure of inequality. The present paper reviews some of theorical properties of the Lorenz curve and provides a non-parametric estimate of the Gini index and the almost sure convergence of this estimate. And to confirm the performance of the estimator, a simulation on real data was carried out.

K. Agbokou and K.E. Gneyou, On the strong convergence of the hazard rate and its maximum risk point estimators in presence of censorship and functional explanatory covariate, Afrika Statistika 12 (2017) (3), no.3, 1397–1415.

K. Agbokou, K.E. Gneyou, and E. Deme, Almost sure representations of the conditional hazard function and its maximum estimation under right-censoring and left-truncation, Far East Journal of Theoretical Statistics 54 (2018), no 2, 141–173.

K. Agbokou and K.E. Gneyou, On the asymptotic distribution of non-parametric conditional quantile estimator under random censorship, Far East Journal of Theoretical Statistics 56 (2019), no. 1, 1–34.

K. Agbokou and K.E. Gneyou, Asymptotic properties of the conditional hazard function and its maximum estimation under right-censoring and left-truncation, Jordan Journal of Mathematics and statistics 12 (2019), no.3, 351–374.

Y.G. Berger, A note on the asymptotic equivalence of jackknife and linearization variance estimation for the Gini coefficient, Journal of Statist. 24 (2008), no. 1, 541–555.

P.L. Conti and G.M. Giorgi, Distribution - free estimation of the Gini inequality index: the kernel method approach, Statistica LXI (2001), no. 1.

F. Cowell, Measuring Inequality. LSE Handbooks on Economics Series, Prentice Hall, London, 1995.

J.L. Gastwirth, A general definition of the Lorenz curve, Econometrica 39 (1971), no. 6, 1037–1039.

G.M. Giorgi, Income inequality measurement: the statistical approach, In: (J. Silber ed.) Hand-book of income inequality measurement, Kluwer Academic Publishers, Boston, 1999, 245–260.

D.E. Giles, A cautionary note on estimating the standard error of the Gini index of inequality: comment, Oxford Bulletin of Economics and Statistics 68 (2006), no. 1, 395–396.

J.L. Gastwirth, The estimation of the Lorentz curve and Gini index, The Review of Economics and Statistics 54 (1972), no. 3, 306–316.

S. Jeffrey, Smoothing Methods in Statistics, Springer, New York University, 1996.

M.G. Kendall and A. Stuart, The Advanced Theory of Statistics 1, 2nd edition,Charles Griffen and Company, London, 1963.

E.L. Lehmann, Elements of Large-Sample Theory, Springer Texts in Statistics, 1998.

R.I. Lerman and S. Yitzhaki, A note on the calculation and interpretation of the Gini index, Economics Letters de Estadistica 15 (1984), 363–368.

M. Lubrano, The econometrics of inequality and poverty, Econometrics (2017).

T. Ogwang, A convenient method of computing the Gini index and its standard error, Oxford Bulletin of Economics and Statistics 47 (2000), 123–129.

K.S. Pranab and M.S. Julio, Large sample methods in statistics: an introduction with applications, Springer-Science+Business Media, B. V., 1993.

H. Shalit, Calculating the Gini index of inequality for individual data, Oxford Bulletin of Economics and Statistics 47 (1985), 185–189.

M. Shahryar, M.B. Gholam Reza, and A. Mohammad, A Comparative Study of the Gini Coefficient Estimators Based on the Linearization and U-Statistics Methods, Rev. Col. de Estad. 40 (2017), no. 2, 205–221.

K. Xu, How has the literature on Gini’s index evolved in the past 80 years? Economics working paper, Dalhousie University, 2003.

S. Yitzhaki and E. Schechtman, The Gini Methodology: A primer on a Statistical Methodology. Springer, New York, 2013.

https://data.worldbank.org/indicator/NY.ADJ.NNTY.KD?locations=1W&most_recent_value_desc=true