E-Statistics, Group Invariance and Anytime Valid Testing
Abstract
We study worst-case-growth-rate-optimal (GROW) e-statistics for hypothesis testing between two group models. It is known that under a mild condition on the action of the underlying group G on the data, there exists a maximally invariant statistic. We show that among all e-statistics, invariant or not, the likelihood ratio of the maximally invariant statistic is GROW, both in the absolute and in the relative sense, and that an anytime-valid test can be based on it. The GROW e-statistic is equal to a Bayes factor with a right Haar prior on G. Our treatment avoids nonuniqueness issues that sometimes arise for such priors in Bayesian contexts. A crucial assumption on the group G is its amenability, a well-known group-theoretical condition, which holds, for instance, in scale-location families. Our results also apply to finite-dimensional linear regression.
Keywords
Cite
@article{arxiv.2208.07610,
title = {E-Statistics, Group Invariance and Anytime Valid Testing},
author = {Muriel Felipe Pérez-Ortiz and Tyron Lardy and Rianne de Heide and Peter Grünwald},
journal= {arXiv preprint arXiv:2208.07610},
year = {2023}
}
Comments
30 pages. Major rewrite of previous version. Submitted to the Annals of Statistics