Quantifying directed dependence via dimension reduction
Abstract
Studying the multivariate extension of copula correlation yields a dimension reduction principle, which turns out to be strongly related with the `simple measure of conditional dependence' T recently introduced by Azadkia & Chatterjee (2021). In the present paper, we identify and investigate the dependence structure underlying this dimension-reduction principle, provide a strongly consistent estimator for it, and demonstrate its broad applicability. For that purpose, we define a bivariate copula capturing the scale-invariant extent of dependence of an endogenous random variable Y on a set of d ≥ 1 exogenous random variables X = (X1, …, Xd), and containing the information whether Y is completely dependent on X, and whether Y and X are independent. The dimension reduction principle becomes apparent insofar as the introduced bivariate copula can be viewed as the distribution function of two random variables Y and Y sharing the same conditional distribution and being conditionally independent given X. Evaluating this copula uniformly along the diagonal, i.e. calculating Spearman's footrule, leads to Azadkia and Chatterjee's `simple measure of conditional dependence' T. On the other hand, evaluating this copula uniformly over the unit square, i.e. calculating Spearman's rho, leads to a distribution-free coefficient of determination (a.k.a. copula correlation). Several real data examples illustrate the importance of the introduced methodology.
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