On admissibility in post-hoc hypothesis testing
Abstract
The validity of classical hypothesis testing requires the significance level be fixed before any statistical analysis takes place. This is a stringent requirement. For instance, it prohibits updating during (or after) an experiment due to changing concern about the cost of false positives, or to reflect unexpectedly strong evidence against the null. Perhaps most disturbingly, witnessing a p-value vs for tiny has no (statistical) relevance for any downstream decision-making. Following recent work of Gr\"unwald (2024), we develop a theory of post-hoc hypothesis testing, enabling to be chosen after seeing and analyzing the data. To study "good" post-hoc tests we introduce -admissibility, where is a set of adversaries which map the data to a significance level. We classify the set of -admissible rules for various sets , showing they must be based on e-values, and recover the Neyman-Pearson lemma when is the constant map.
Keywords
Cite
@article{arxiv.2508.00770,
title = {On admissibility in post-hoc hypothesis testing},
author = {Ben Chugg and Tyron Lardy and Aaditya Ramdas and Peter Grünwald},
journal= {arXiv preprint arXiv:2508.00770},
year = {2026}
}
Comments
58 pages. To appear in the International Journal of Approximate Reasoning