English

Combining independent p-values in replicability analysis: A comparative study

Applications 2021-04-28 v1

Abstract

Given a family of null hypotheses H1,,HsH_{1},\ldots,H_{s}, we are interested in the hypothesis HsγH_{s}^{\gamma} that at most γ1\gamma-1 of these null hypotheses are false. Assuming that the corresponding pp-values are independent, we are investigating combined pp-values that are valid for testing HsγH_{s}^{\gamma}. In various settings in which HsγH_{s}^{\gamma} is false, we determine which combined pp-value works well in which setting. Via simulations, we find that the Stouffer method works well if the null pp-values are uniformly distributed and the signal strength is low, and the Fisher method works better if the null pp-values are conservative, i.e. stochastically larger than the uniform distribution. The minimum method works well if the evidence for the rejection of HsγH_{s}^{\gamma} is focused on only a few non-null pp-values, especially if the null pp-values are conservative. Methods that incorporate the combination of ee-values work well if the null hypotheses H1,,HsH_{1},\ldots,H_{s} are simple.

Cite

@article{arxiv.2104.13081,
  title  = {Combining independent p-values in replicability analysis: A comparative study},
  author = {Anh-Tuan Hoang and Thorsten Dickhaus},
  journal= {arXiv preprint arXiv:2104.13081},
  year   = {2021}
}
R2 v1 2026-06-24T01:33:20.976Z