The upper bounds of the asymptotic distribution of a Gini's concentration index among the classes In this paper we use two different procedures to obtain upper bounds for the quantiles of the sampling distribution of a Gini's concentration index among the classes. The upper bounds are deduced supposing a Bernoullian sample taken from a null-concentration population and supposing that the quotas of transferable character referring to single classes are known. The first procedure employs the classical Bonferroni inequality, the second one employs the Chi-squared distribution.
Zenga, M., Brunazzo, A. (1981). Sui maggioranti della distribuzione asintotica di un indice di concentrazione fra le classi di Gini. QUADERNI DI STATISTICA E MATEMATICA APPLICATA ALLE SCIENZE ECONOMICO-SOCIALI, IV(1-2), 33-57.
Sui maggioranti della distribuzione asintotica di un indice di concentrazione fra le classi di Gini
ZENGA, MICHELE;
1981
Abstract
The upper bounds of the asymptotic distribution of a Gini's concentration index among the classes In this paper we use two different procedures to obtain upper bounds for the quantiles of the sampling distribution of a Gini's concentration index among the classes. The upper bounds are deduced supposing a Bernoullian sample taken from a null-concentration population and supposing that the quotas of transferable character referring to single classes are known. The first procedure employs the classical Bonferroni inequality, the second one employs the Chi-squared distribution.
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