Nearly Minimax Optimal Wasserstein Conditional Independence Testing
Abstract
This paper is concerned with minimax conditional independence testing. In contrast to some previous works on the topic, which use the total variation distance to separate the null from the alternative, here we use the Wasserstein distance. In addition, we impose Wasserstein smoothness conditions which on bounded domains are weaker than the corresponding total variation smoothness imposed, for instance, by Neykov et al. [2021]. This added flexibility expands the distributions which are allowed under the null and the alternative to include distributions which may contain point masses for instance. We characterize the optimal rate of the critical radius of testing up to logarithmic factors. Our test statistic which nearly achieves the optimal critical radius is novel, and can be thought of as a weighted multi-resolution version of the U-statistic studied by Neykov et al. [2021].
Cite
@article{arxiv.2308.08672,
title = {Nearly Minimax Optimal Wasserstein Conditional Independence Testing},
author = {Matey Neykov and Larry Wasserman and Ilmun Kim and Sivaraman Balakrishnan},
journal= {arXiv preprint arXiv:2308.08672},
year = {2023}
}
Comments
24 pages, 1 figure, ordering of the last three authors is random