Optimal Rates for Differentially Private Hypothesis Testing with E-values
Abstract
E-values have attracted considerable interest in recent years as flexible tools for enabling anytime-valid and adaptive data analysis. Hypothesis testing is at the core of many of these applications, which can often involve private or sensitive data. In this work, we answer a simple but important question: given two distributions and , what is the maximum achievable e-power when testing against with e-values that satisfy -differential privacy? We characterize the optimal rate for this problem and provide an algorithm which matches it exactly. In the sequential setting, when observations arrive one-by-one and the analyst chooses when to halt, we give matching upper and lower bounds on the stopping times of any private e-process. Numerical experiments confirm the practicality of our algorithms, which require less data than the recently proposed DP-SPRT across a range of sequential testing problems and privacy levels.
Keywords
Cite
@article{arxiv.2605.28952,
title = {Optimal Rates for Differentially Private Hypothesis Testing with E-values},
author = {Ben Jacobsen and Tomas Gonzales and Gavin Brown and Kassem Fawaz and Aaditya Ramdas},
journal= {arXiv preprint arXiv:2605.28952},
year = {2026}
}
Comments
28 pages, 2 figures