A Simple Bias Reduction for Chatterjee's Correlation
Abstract
Chatterjee's rank correlation coefficient is an empirical index for detecting functional dependencies between two variables and . It is an estimator for a theoretical quantity that is zero for independence and one if is a measurable function of . Based on an equivalent characterization of sorted numbers, we derive an upper bound for and suggest a simple normalization aimed at reducing its bias for small sample size . In Monte Carlo simulations of various models, the normalization reduced the bias in all cases. The mean squared error was reduced, too, for values of greater than about 0.4. Moreover, we observed that non-parametric confidence intervals for based on bootstrapping in the usual n-out-of-n way have a coverage probability close to zero. This is remedied by an m-out-of-n bootstrap without replacement in combination with our normalization method.
Cite
@article{arxiv.2312.15496,
title = {A Simple Bias Reduction for Chatterjee's Correlation},
author = {Christoph Dalitz and Juliane Arning and Steffen Goebbels},
journal= {arXiv preprint arXiv:2312.15496},
year = {2024}
}
Comments
14 pages, 6 figures, 2 R code listings