Extracting Bayesian Evidence from Frequentist p-Values
Abstract
The p-value and the Bayes factor are measures of evidence that are often considered to be philosophically and mathematically incompatible: The p-value quantifies conflict between data and H0 ("surprise"), whereas the Bayes factor quantifies the relative predictive accuracy of H0 versus H1 ("evidence"). We revisit Jeffreys's Approximate Bayes factor (JAB) -- a simple, largely overlooked approximation dating back to the 1930s -- which connects these two paradigms for objective hypothesis testing of the existence of an effect. Under a unit-information prior the approximation requires only the p-value and the effective sample size neff. We clarify the core assumptions and boundary conditions for the application of JAB and show across 704 published t-tests and 39 comparisons of proportions that JAB approximates objective Bayes factors remarkably well. The connection between p-values and JAB has a practical implication: The evidence implied by a p-value depends strongly on neff. Conventional verbal labels for p-values (e.g., "strong surprise" for .001 < p < .01) correspond to similarly graded Bayes factors only around neff ≈ 8; for larger samples the same p-value implies weaker evidence. In moderately sized to large samples, p > .10 can amount to moderate or even strong evidence for H0. JAB offers a cheap, sample-size-sensitive supplement to p-values, computable from routinely reported statistics, that remains valid even under optional stopping.
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