中文

Dependence functions based on Chatterjee's rank correlation

统计理论 2026-05-27 v3 统计理论

摘要

We investigate a geometric and distributional reinterpretation of Chatterjee's ξ\xi-coefficient, which measures functional dependence between a response variable YY and a predictor vector X\mathbf{X}. For this purpose, we analyze the Markov product (Y,Y)(Y,Y'), where YY' is a copy of YY that is conditionally independent of YY given X\mathbf{X}. Based on this construction, we introduce and study two dependence functions, denoted by ϕ(Y,X)\phi_{(Y,\mathbf{X})} and κ(Y,X)\kappa_{(Y,\mathbf{X})}. The proposed framework provides a geometric interpretation of the Markov product and extends Chatterjee's correlation coefficient to a richer and more interpretable object for the analysis of directed stochastic dependence. In particular, rather than only measuring how well YY can be represented as a function of X\mathbf{X}, the proposed dependence functions additionally quantify how strongly the corresponding Markov product is concentrated near the diagonal.

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引用

@article{arxiv.2605.13522,
  title  = {Dependence functions based on Chatterjee's rank correlation},
  author = {Carsten Limbach},
  journal= {arXiv preprint arXiv:2605.13522},
  year   = {2026}
}