Entropy-based pruning for learning Bayesian networks using BIC

作者:

摘要

For decomposable score-based structure learning of Bayesian networks, existing approaches first compute a collection of candidate parent sets for each variable and then optimize over this collection by choosing one parent set for each variable without creating directed cycles while maximizing the total score. We target the task of constructing the collection of candidate parent sets when the score of choice is the Bayesian Information Criterion (BIC). We provide new non-trivial results that can be used to prune the search space of candidate parent sets of each node. We analyze how these new results relate to previous ideas in the literature both theoretically and empirically. We show in experiments with UCI data sets that gains can be significant. Since the new pruning rules are easy to implement and have low computational costs, they can be promptly integrated into all state-of-the-art methods for structure learning of Bayesian networks.

论文关键词:Structure learning,Bayesian networks,BIC,Parent set pruning

论文评审过程:Received 21 July 2017, Revised 19 March 2018, Accepted 13 April 2018, Available online 18 April 2018, Version of Record 12 May 2018.

论文官网地址:https://doi.org/10.1016/j.artint.2018.04.002