Optimal rates for independence testing via $U$-statistic permutation tests
Abstract
We study the problem of independence testing given independent and identically distributed pairs taking values in a -finite, separable measure space. Defining a natural measure of dependence as the squared -distance between a joint density and the product of its marginals, we first show that there is no valid test of independence that is uniformly consistent against alternatives of the form . We therefore restrict attention to alternatives that impose additional Sobolev-type smoothness constraints, and define a permutation test based on a basis expansion and a -statistic estimator of that we prove is minimax optimal in terms of its separation rates in many instances. Finally, for the case of a Fourier basis on , we provide an approximation to the power function that offers several additional insights. Our methodology is implemented in the R package USP.
Cite
@article{arxiv.2001.05513,
title = {Optimal rates for independence testing via $U$-statistic permutation tests},
author = {Thomas B. Berrett and Ioannis Kontoyiannis and Richard J. Samworth},
journal= {arXiv preprint arXiv:2001.05513},
year = {2020}
}
Comments
58 pages, 4 figures