ABSTRACT
Many nonparametric multivariate one-sample tests in the literature require the assumption of symmetry or directional symmetry to be distribution-free. Examples include the bivariate sign test of Blumen [A new bivariate sign test. J Am Stat Assoc. 1958;53(282):448–456], the bivariate sign test of Brown and Hettmansperger [An affine invariant bivariate version of the sign Test. J R Stat Soc B. 1989;51(1):117–125], the multivariate sign test of Randles [A simpler, affine invariant, multivariate, distribution-free sign test. J Am Stat Assoc. 2000;95:1263–1268] and the multivariate signed-rank test of Oja and Randles [Multivariate nonparametric tests. Stat Sci. 2004;19:598–605]. In the current literature, it is not known how robust these tests are to the assumption of (directional) symmetry. When the symmetry assumption is not satisfied, the observed or attained significance level (the type I error probability or the size) of these tests may be unacceptably different from the specified nominal value. In this paper, we examine this robustness issue for the four nonparametric multivariate one-sample sign-type tests cited above in a simulation study, using data from several families of distributions. The popular parametric Hotelling's test included as a benchmark. Conclusions and recommendations are offered.
Acknowledgements
The authors would like to thank the two anonymous reviewers for their valuable comments and suggestions, which have helped improve this manuscript. This work was made possible by the technical support from the Alabama Supercomputer Authority.
Disclosure statement
No potential conflict of interest was reported by the authors.
Funding
This work was made possible in part by a grant of high performance computing resources from the Alabama Supercomputer Authority. The second author's research was supported in part by a 2014 summer research fellowship from the Culverhouse College of Commerce at the University of Alabama.