中文

Entropy Equivalence Testing

数据结构与算法 2026-05-25 v1 离散数学 信息论 机器学习 math.IT 统计理论 统计理论

摘要

We introduce the problem of \emph{entropy equivalence testing} for probability distributions, a relaxation of the well-studied closeness testing problem, where the distribution testing algorithm is now only required to distinguish, given samples from two unknown distributions p,qp,q and a parameter ε(0,1/2]\varepsilon \in(0,1/2], between p=qp=q and H(p)H(q)ε|H(p)-H(q)| \geq \varepsilon (where HH denotes the Shannon entropy). We provide a time- and sample-efficient algorithm for this task, showing that the optimal sample complexity for this task can be significantly lower than that of closeness testing. As an application, we leverage this result to provide the first non-trivial testing algorithm for (standard) closeness of low-degree \emph{Bayesian networks}, which significantly improves on either the sample or time complexity of a baseline based on full learning.

关键词

引用

@article{arxiv.2605.23225,
  title  = {Entropy Equivalence Testing},
  author = {Clément L. Canonne and Yash Pote and Jonathan Scarlett and Joy Qiping Yang},
  journal= {arXiv preprint arXiv:2605.23225},
  year   = {2026}
}