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Semiparametrically Efficient Tests of Multivariate Independence Using Center-Outward Quadrant, Spearman, and Kendall Statistics

Authors :
Shi, Hongjian
Drton, Mathias
Hallin, Marc
Han, Fang
Shi, Hongjian
Drton, Mathias
Hallin, Marc
Han, Fang
Source :
ECARES Working Papers; 2023-03
Publication Year :
2023

Abstract

Defining multivariate generalizations of the classical univariate ranks has been a long-standing open problem in statistics. Optimal transport has been shown to offer a solution in which multivariate ranks are obtained by transporting data points to a grid that approximates a uniformreference measure (Chernozhukov et al. 2017; Hallin, 2017; Hallin et al. 2021). We take up this new perspective to develop and study multivariate analogues of the sign covariance/quadrant statistic, Kendall’s tau, and Spearman’s rho. The resulting tests of multivariate independence are genuinely distribution-free, hence uniformly valid irrespective of the actual (absolutely continuous) distributions of the observations. Our results provide asymptotic distribution theory for these new test statistics, with asymptotic approximations to critical values to be used for testing independence as well as a power analysis of the resulting tests. This includes a multivariate elliptical Chernoff–Savage property, which guarantees that, under ellipticity, our nonparametric tests of independence enjoy an asymptotic relative efficiency of one or larger with respect to theclassical Gaussian procedures.<br />info:eu-repo/semantics/published

Details

Database :
OAIster
Journal :
ECARES Working Papers; 2023-03
Notes :
36 p., 1 full-text file(s): application/pdf, English
Publication Type :
Electronic Resource
Accession number :
edsoai.on1373811489
Document Type :
Electronic Resource