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Main Authors: Vila, Roberto, Saulo, Helton, Quintino, Felipe
Format: Preprint
Published: 2026
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Online Access:https://arxiv.org/abs/2603.26166
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author Vila, Roberto
Saulo, Helton
Quintino, Felipe
author_facet Vila, Roberto
Saulo, Helton
Quintino, Felipe
contents We propose a new family of inequality indices that bridges the Hoover index and the Gini coefficient. The measure is defined as the normalized expected absolute value of a convex combination of deviations from the mean and pairwise differences, providing a continuous interpolation between these two classical indices. We establish key theoretical properties, including scale invariance, boundedness, continuity, and compliance with the Pigou-Dalton transfer principle. Analytical representations are derived, allowing explicit evaluation under gamma distributions and leading to closed-form expressions involving incomplete gamma functions. From a statistical perspective, we study the plug-in estimator, obtaining a general expression for its expectation and explicit formulas for its bias under gamma populations. Simulation results indicate good finite-sample performance, with decreasing bias and mean squared error as the sample size increases. An empirical application to GDP per capita data illustrates the practical usefulness of the proposed index as a flexible tool for inequality analysis.
format Preprint
id arxiv_https___arxiv_org_abs_2603_26166
institution arXiv
publishDate 2026
record_format arxiv
spellingShingle Unifying the Hoover and Gini indices: Analytical, bias, and computational aspects
Vila, Roberto
Saulo, Helton
Quintino, Felipe
Methodology
We propose a new family of inequality indices that bridges the Hoover index and the Gini coefficient. The measure is defined as the normalized expected absolute value of a convex combination of deviations from the mean and pairwise differences, providing a continuous interpolation between these two classical indices. We establish key theoretical properties, including scale invariance, boundedness, continuity, and compliance with the Pigou-Dalton transfer principle. Analytical representations are derived, allowing explicit evaluation under gamma distributions and leading to closed-form expressions involving incomplete gamma functions. From a statistical perspective, we study the plug-in estimator, obtaining a general expression for its expectation and explicit formulas for its bias under gamma populations. Simulation results indicate good finite-sample performance, with decreasing bias and mean squared error as the sample size increases. An empirical application to GDP per capita data illustrates the practical usefulness of the proposed index as a flexible tool for inequality analysis.
title Unifying the Hoover and Gini indices: Analytical, bias, and computational aspects
topic Methodology
url https://arxiv.org/abs/2603.26166