English

Adaptive Critical Value for Constrained Likelihood Ratio Testing

Methodology 2018-06-26 v2

Abstract

We present a new way of testing ordered hypotheses against all alternatives which overpowers the classical approach both in simplicity and statistical power. Our new method tests the constrained likelihood ratio statistic against the quantile of one and only one chi-squared random variable with a data-dependent degrees of freedom instead of a mixture of chi-squares. Our new test is proved to have a valid finite-sample significance level α\alpha and provides more power especially for sparse alternatives (those with a few or moderate number of null constraints violations) in comparison to the classical approach. Our method is also easier to use than the classical approach which requires to calculate or simulate a set of complicated weights. Two special cases are considered with more details, namely the case of testing orthants μ1<0,,μn<0\mu_1<0, \cdots, \mu_n<0 and the isotonic case of testing μ1<μ2<μ3\mu_1<\mu_2<\mu_3 against all alternatives. Contours of the difference in power are shown for these examples showing the interest of our new approach.

Keywords

Cite

@article{arxiv.1806.01325,
  title  = {Adaptive Critical Value for Constrained Likelihood Ratio Testing},
  author = {Diaa Al Mohamad and Jelle J. Goeman and Erik W. van Zwet and Eric A. Cator},
  journal= {arXiv preprint arXiv:1806.01325},
  year   = {2018}
}

Comments

We proved the conjecture from last version. We found out that some part of this works was already published in the literature and was made clear in the current version. The main text is the first 16 pages. The appendix includes other ideas and a part that was already discussed in the literature

R2 v1 2026-06-23T02:18:44.310Z