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Main Authors: Auricchio, Gennaro, Brigati, Giovanni, Giudici, Paolo, Toscani, Giuseppe
Format: Preprint
Published: 2024
Subjects:
Online Access:https://arxiv.org/abs/2411.01052
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author Auricchio, Gennaro
Brigati, Giovanni
Giudici, Paolo
Toscani, Giuseppe
author_facet Auricchio, Gennaro
Brigati, Giovanni
Giudici, Paolo
Toscani, Giuseppe
contents Measuring distances in a multidimensional setting is a challenging problem, which appears in many fields of science and engineering. In this paper, to measure the distance between two multivariate distributions, we introduce a new measure of discrepancy which is scale invariant and which, in the case of two independent copies of the same distribution, and after normalization, coincides with the scaling invariant multidimensional version of the Gini index recently proposed in [34]. A byproduct of the analysis is an easy-to-handle discrepancy metric, obtained by application of the theory to a pair of Gaussian multidimensional densities. The obtained metric does improve the standard metrics, based on the mean squared error, as it is scale invariant. The importance of this theoretical finding is illustrated by means of a real problem that concerns measuring the importance of Environmental, Social and Governance factors for the growth of small and medium enterprises.
format Preprint
id arxiv_https___arxiv_org_abs_2411_01052
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Multivariate Gini-type discrepancies
Auricchio, Gennaro
Brigati, Giovanni
Giudici, Paolo
Toscani, Giuseppe
Methodology
Analysis of PDEs
Measuring distances in a multidimensional setting is a challenging problem, which appears in many fields of science and engineering. In this paper, to measure the distance between two multivariate distributions, we introduce a new measure of discrepancy which is scale invariant and which, in the case of two independent copies of the same distribution, and after normalization, coincides with the scaling invariant multidimensional version of the Gini index recently proposed in [34]. A byproduct of the analysis is an easy-to-handle discrepancy metric, obtained by application of the theory to a pair of Gaussian multidimensional densities. The obtained metric does improve the standard metrics, based on the mean squared error, as it is scale invariant. The importance of this theoretical finding is illustrated by means of a real problem that concerns measuring the importance of Environmental, Social and Governance factors for the growth of small and medium enterprises.
title Multivariate Gini-type discrepancies
topic Methodology
Analysis of PDEs
url https://arxiv.org/abs/2411.01052