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Main Authors: De Keyser, Steven, Gijbels, Irene
Format: Preprint
Published: 2024
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Online Access:https://arxiv.org/abs/2404.07141
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author De Keyser, Steven
Gijbels, Irene
author_facet De Keyser, Steven
Gijbels, Irene
contents We generalize 2-Wasserstein dependence coefficients to measure dependence between a finite number of random vectors. This generalization includes theoretical properties, and in particular focuses on an interpretation of maximal dependence and an asymptotic normality result for a proposed semi-parametric estimator under a Gaussian copula assumption. In addition, we discuss general axioms for dependence measures between multiple random vectors, other plausible normalizations, and various examples. Afterwards, we look into plug-in estimators based on penalized empirical covariance matrices in order to deal with high dimensionality issues and take possible marginal independencies into account by inducing (block) sparsity. The latter ideas are investigated via a simulation study, considering other dependence coefficients as well. We illustrate the use of the developed methods in two real data applications.
format Preprint
id arxiv_https___arxiv_org_abs_2404_07141
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle High-dimensional copula-based Wasserstein dependence
De Keyser, Steven
Gijbels, Irene
Methodology
Statistics Theory
We generalize 2-Wasserstein dependence coefficients to measure dependence between a finite number of random vectors. This generalization includes theoretical properties, and in particular focuses on an interpretation of maximal dependence and an asymptotic normality result for a proposed semi-parametric estimator under a Gaussian copula assumption. In addition, we discuss general axioms for dependence measures between multiple random vectors, other plausible normalizations, and various examples. Afterwards, we look into plug-in estimators based on penalized empirical covariance matrices in order to deal with high dimensionality issues and take possible marginal independencies into account by inducing (block) sparsity. The latter ideas are investigated via a simulation study, considering other dependence coefficients as well. We illustrate the use of the developed methods in two real data applications.
title High-dimensional copula-based Wasserstein dependence
topic Methodology
Statistics Theory
url https://arxiv.org/abs/2404.07141