Nearly Minimax One-Sided Mixture-Based Sequential Tests
Abstract
We focus on one-sided, mixture-based stopping rules for the problem of sequential testing a simple null hypothesis against a composite alternative. For the latter, we consider two cases---either a discrete alternative or a continuous alternative that can be embedded into an exponential family. For each case, we find a mixture-based stopping rule that is nearly minimax in the sense of minimizing the maximal Kullback-Leibler information. The proof of this result is based on finding an almost Bayes rule for an appropriate sequential decision problem and on high-order asymptotic approximations for the performance characteristics of arbitrary mixture-based stopping times. We also evaluate the asymptotic performance loss of certain intuitive mixture rules and verify the accuracy of our asymptotic approximations with simulation experiments.
Cite
@article{arxiv.1110.0902,
title = {Nearly Minimax One-Sided Mixture-Based Sequential Tests},
author = {Georgios Fellouris and Alexander G. Tartakovsky},
journal= {arXiv preprint arXiv:1110.0902},
year = {2012}
}
Comments
25 pages