English

Logarithmic Asymptotic Relations Between $p$-Values and Mutual Information

Statistics Theory 2026-02-02 v2 Statistics Theory

Abstract

We establish a precise connection between statistical significance in dependence testing and information-theoretic dependence as quantified by Shannon mutual information (MI). In the absence of prior distributional information, we consider a maximum-entropy model and show that the probability associated with the realization of a given magnitude of MI takes an exponential form, yielding a corresponding tail-probability interpretation of a pp-value. In contingency tables with fixed marginal frequencies, we analyze Fisher's exact test and prove that its pp-value PFP_F satisfies a logarithmic asymptotic relation of the form MI=(1/N)logPF+O(log(N+1)/N)MI=-(1/N)\log P_F + O(\log(N+1)/N) as the sample size NN\to\infty. These results clarify the role of MI as the exponential rate governing the asymptotic behavior of pp-values in the settings studied here, and they enable principled comparisons of dependence across datasets with different sample sizes. We further discuss implications for combining evidence across studies via meta-analysis, allowing mutual information and its statistical significance to be integrated in a unified framework.

Keywords

Cite

@article{arxiv.2308.14735,
  title  = {Logarithmic Asymptotic Relations Between $p$-Values and Mutual Information},
  author = {Tsutomu Mori and Takashi Kawamura},
  journal= {arXiv preprint arXiv:2308.14735},
  year   = {2026}
}

Comments

21 pages, 3 figures, 7 tables

R2 v1 2026-06-28T12:06:28.087Z