A Ball Divergence Based Measure For Conditional Independence Testing
Abstract
In this paper we introduce a new measure of conditional dependence between two random vectors and given another random vector using the ball divergence. Our measure characterizes conditional independence and does not require any moment assumptions. We propose a consistent estimator of the measure using a kernel averaging technique and derive its asymptotic distribution. Using this statistic we construct two tests for conditional independence, one in the model- framework and the other based on a novel local wild bootstrap algorithm. In the model- framework, which assumes the knowledge of the distribution of , applying the conditional randomization test we obtain a method that controls Type I error in finite samples and is asymptotically consistent, even if the distribution of is incorrectly specified up to distance preserving transformations. More generally, in situations where is unknown or hard to estimate, we design a double-bandwidth based local wild bootstrap algorithm that asymptotically controls both Type I error and power. We illustrate the advantage of our method, both in terms of Type I error and power, in a range of simulation settings and also in a real data example. A consequence of our theoretical results is a general framework for studying the asymptotic properties of a 2-sample conditional -statistic, which is of independent interest.
Cite
@article{arxiv.2407.21456,
title = {A Ball Divergence Based Measure For Conditional Independence Testing},
author = {Bilol Banerjee and Bhaswar B. Bhattacharya and Anil K. Ghosh},
journal= {arXiv preprint arXiv:2407.21456},
year = {2024}
}