Roy's largest root test under rank-one alternatives

I. M. Johnstone, Boaz Nadler

Research output: Contribution to journalArticlepeer-review

Abstract

Roy’s largest root is a common test statistic in multivariate analysis, statistical signal processing and allied fields. Despite its ubiquity, provision of accurate and tractable approximations to its distribution under the alternative has been a longstanding open problem. Assuming Gaussian observations and a rank-one alternative, or concentrated noncentrality, we derive simple yet accurate approximations for the most common low-dimensional settings. These include signal detection in noise, multiple response regression, multivariate analysis of variance and canonical correlation analysis. A small-noise perturbation approach, perhaps underused in statistics, leads to simple combinations of standard univariate distributions, such as central and noncentral χ2 and F⁠. Our results allow approximate power and sample size calculations for Roy’s test for rank-one effects, which is precisely where it is most powerful.
Original languageEnglish
Pages (from-to)181-193
Number of pages13
JournalBiometrika
Volume104
Issue number1
Early online date13 Jan 2017
DOIs
StatePublished - Mar 2017

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