How to measure multidimensional variation?
Statistics Theory
2024-12-02 v1 Statistics Theory
Abstract
The coefficient of variation, which measures the variability of a distribution from its mean, is not uniquely defined in the multidimensional case, and so is the multidimensional Gini index, which measures the inequality of a distribution in terms of the mean differences among its observations. In this paper, we connect these two notions of sparsity, and propose a multidimensional coefficient of variation based on a multidimensional Gini index. We demonstrate that the proposed coefficient possesses the properties of the univariate coefficient of variation. We also show its connection with the Voinov-Nikulin coefficient of variation, and compare it with the other multivariate coefficients available in the literature.
Cite
@article{arxiv.2411.19529,
title = {How to measure multidimensional variation?},
author = {Gennaro Auricchio and Paolo Giudici and Giuseppe Toscani},
journal= {arXiv preprint arXiv:2411.19529},
year = {2024}
}
Comments
23 pages, 4 figures