Global comparisons of medians and other quantiles in a one-way design when there are tied values |
| |
Authors: | Rand R. Wilcox |
| |
Affiliation: | Department of Psychology, University of Southern California, Los Angeles, California |
| |
Abstract: | For J ? 2 independent groups, the article deals with testing the global hypothesis that all J groups have a common population median or identical quantiles, with an emphasis on the quartiles. Classic rank-based methods are sometimes suggested for comparing medians, but it is well known that under general conditions they do not adequately address this goal. Extant methods based on the usual sample median are unsatisfactory when there are tied values except for the special case J = 2. A variation of the percentile bootstrap used in conjunction with the Harrell–Davis quantile estimator performs well in simulations. The method is illustrated with data from the Well Elderly 2 study. |
| |
Keywords: | Bootstrap methods Harrell–Davis estimator Projection distances Tied values Well Elderly 2 study |
|
|