English

On a multivariate copula-based dependence measure and its estimation

Statistics Theory 2022-03-18 v2 Statistics Theory

Abstract

Working with so-called linkages allows to define a copula-based, [0,1][0,1]-valued multivariate dependence measure ζ1(X,Y)\zeta^1(\boldsymbol{X},Y) quantifying the scale-invariant extent of dependence of a random variable YY on a dd-dimensional random vector X=(X1,,Xd)\boldsymbol{X}=(X_1,\ldots,X_d) which exhibits various good and natural properties. In particular, ζ1(X,Y)=0\zeta^1(\boldsymbol{X},Y)=0 if and only if X\boldsymbol{X} and YY are independent, ζ1(X,Y)\zeta^1(\boldsymbol{X},Y) is maximal exclusively if YY is a function of X\boldsymbol{X}, and ignoring one or several coordinates of X\boldsymbol{X} can not increase the resulting dependence value. After introducing and analyzing the metric D1D_1 underlying the construction of the dependence measure and deriving examples showing how much information can be lost by only considering all pairwise dependence values ζ1(X1,Y),,ζ1(Xd,Y)\zeta^1(X_1,Y),\ldots,\zeta^1(X_d,Y) we derive a so-called checkerboard estimator for ζ1(X,Y)\zeta^1(\boldsymbol{X},Y) and show that it is strongly consistent in full generality, i.e., without any smoothness restrictions on the underlying copula. Some simulations illustrating the small sample performance of the estimator complement the established theoretical results.

Keywords

Cite

@article{arxiv.2109.12883,
  title  = {On a multivariate copula-based dependence measure and its estimation},
  author = {Florian Griessenberger and Robert R. Junker and Wolfgang Trutschnig},
  journal= {arXiv preprint arXiv:2109.12883},
  year   = {2022}
}

Comments

to appear in "Electronic Journal of Statistics"

R2 v1 2026-06-24T06:21:59.380Z