Independence Testing for Bounded Degree Bayesian Networks

We study the following independence testing problem: given access to samples from a distribution P over \{0,1\} n, decide whether P is a product distribution or whether it is \varepsilon -far in total variation distance from any product distribution. For arbitrary distributions, this problem requires \exp(n) samples. We show in this work that if P has a sparse structure, then in fact only linearly many samples are required.Specifically, if P is Markov with respect to a Bayesian network whose underlying DAG has in-degree bounded by d, then \tilde{\Theta}(2 {d/2}\cdot n/\varepsilon 2) samples are necessary and sufficient for independence testing.