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| Main Author: | |
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| Format: | Preprint |
| Published: |
2023
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| Subjects: | |
| Online Access: | https://arxiv.org/abs/2312.08040 |
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Table of Contents:
- In traditional hypothesis testing one must pre-specify the significance level $α$ to bound the `size' of the test: its probability to falsely reject the hypothesis. Indeed, a data-dependent selection of $α$ would generally distort the size, possibly making it larger than the specified level $α$. We explore hypothesis testing with a data-dependent choice of $α$ by guaranteeing that there is no such size distortion in expectation, even if the level $α$ is arbitrarily selected based on the data. Unlike regular $p$-values, resulting `post-hoc $p$-values' allow us to `reject at level $p$' and still provide this guarantee. Interestingly, we find that $p$ is a post-hoc $p$-value if and only if $1/p$ is an $e$-value, a recently introduced measure of evidence. While often treated as different paradigms, this reveals $e$-values are simply $p$-values under a stronger error guarantee, thinly veiled by the reciprocal $p = 1/e$. Moreover, we extend classical optimal testing to optimal post-hoc testing. Finally, we apply our work to close Markov's inequality into a post-hoc $α$ equality, and we study more general forms of post-hoc testing that require us to generalize beyond $e$-values.