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Main Authors: Shi, Hongjian, Drton, Mathias
Format: Preprint
Published: 2024
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Online Access:https://arxiv.org/abs/2407.19361
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author Shi, Hongjian
Drton, Mathias
author_facet Shi, Hongjian
Drton, Mathias
contents A recent line of work provides new statistical tools based on game-theory and achieves safe anytime-valid inference without assuming regularity conditions. In particular, the framework of universal inference proposed by Wasserman, Ramdas and Balakrishnan [78] offers new solutions to testing problems by modifying the likelihood ratio test in a data-splitting scheme. In this paper, we study the performance of the resulting split likelihood ratio test under Gaussian mixture models, which are canonical examples for models in which classical regularity conditions fail to hold. We establish that under the null hypothesis, the split likelihood ratio statistic is asymptotically normal with increasing mean and variance. Contradicting the usual belief that the flexibility of universal inference comes at the price of a significant loss of power, we prove that universal inference surprisingly achieves the same detection rate $(n^{-1}\log\log n)^{1/2}$ as the classical likelihood ratio test.
format Preprint
id arxiv_https___arxiv_org_abs_2407_19361
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle On universal inference in Gaussian mixture models
Shi, Hongjian
Drton, Mathias
Statistics Theory
A recent line of work provides new statistical tools based on game-theory and achieves safe anytime-valid inference without assuming regularity conditions. In particular, the framework of universal inference proposed by Wasserman, Ramdas and Balakrishnan [78] offers new solutions to testing problems by modifying the likelihood ratio test in a data-splitting scheme. In this paper, we study the performance of the resulting split likelihood ratio test under Gaussian mixture models, which are canonical examples for models in which classical regularity conditions fail to hold. We establish that under the null hypothesis, the split likelihood ratio statistic is asymptotically normal with increasing mean and variance. Contradicting the usual belief that the flexibility of universal inference comes at the price of a significant loss of power, we prove that universal inference surprisingly achieves the same detection rate $(n^{-1}\log\log n)^{1/2}$ as the classical likelihood ratio test.
title On universal inference in Gaussian mixture models
topic Statistics Theory
url https://arxiv.org/abs/2407.19361