Near-Optimal Degree Testing for Bayes Nets
Abstract
This paper considers the problem of testing the maximum in-degree of the Bayes net underlying an unknown probability distribution P over \0,1\n, given sample access to P. We show that the sample complexity of the problem is (2n/2/2). Our algorithm relies on a testing-by-learning framework, previously used to obtain sample-optimal testers; in order to apply this framework, we develop new algorithms for ``near-proper'' learning of Bayes nets, and high-probability learning under 2 divergence, which are of independent interest.
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