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Asymptotics of Sequential Composite Hypothesis Testing under Probabilistic Constraints

Information Theory 2022-03-30 v2 math.IT Statistics Theory Statistics Theory

Abstract

We consider the sequential composite binary hypothesis testing problem in which one of the hypotheses is governed by a single distribution while the other is governed by a family of distributions whose parameters belong to a known set Γ\Gamma. We would like to design a test to decide which hypothesis is in effect. Under the constraints that the probabilities that the length of the test, a stopping time, exceeds nn are bounded by a certain threshold ϵ\epsilon, we obtain certain fundamental limits on the asymptotic behavior of the sequential test as nn tends to infinity. Assuming that Γ\Gamma is a convex and compact set, we obtain the set of all first-order error exponents for the problem. We also prove a strong converse. Additionally, we obtain the set of second-order error exponents under the assumption that X\mathcal{X} is a finite alphabet. In the proof of second-order asymptotics, a main technical contribution is the derivation of a central limit-type result for a maximum of an uncountable set of log-likelihood ratios under suitable conditions. This result may be of independent interest. We also show that some important statistical models satisfy the conditions.

Keywords

Cite

@article{arxiv.2106.00896,
  title  = {Asymptotics of Sequential Composite Hypothesis Testing under Probabilistic Constraints},
  author = {Jiachun Pan and Yonglong Li and Vincent Y. F. Tan},
  journal= {arXiv preprint arXiv:2106.00896},
  year   = {2022}
}

Comments

The paper was presented in part at the 2021 International Symposium on Information Theory (ISIT). It was accepted by Transactions on Information Theory

R2 v1 2026-06-24T02:44:06.742Z