多元方差分析中多元秩检验的一种方法

An Approach to Multivariate Rank Tests in Multivariate Analysis of Variance

Journal of the American Statistical Association · 1997
被引 10
ABS 4

中文导读

定义了一类多元秩统计量,用于模拟Mann-Whitney、Kruskal-Wallis等单变量秩检验,在多元方差分析中基于正交对比分解统计量,并比较了基于多元秩与多元中位数的检验效率。

Abstract

Abstract A class of multivariate rank-like quantities is defined and used to develop multivariate tests to mimic popular one-dimensional rank tests such as the Mann-Whitney/Wilcoxon two-sample test, the Jonckheere-Terpstra test for trend, and the Kruskal-Wallis one-way analysis of variance test. Tests in one-way analysis of variance are developed based on qualitative orthogonal contrasts, allowing decomposition of an overall statistic into asymptotically independent components based on the contrasts. The class of tests includes the usual normal-theory tests and the componentwise rank tests, but the main focus is on the tests based on a particular definition of multivariate rank. A study of the Pitman efficiency of the latter tests to those based on multivariate medians shows them to be superior at the normal, slightly heavy-tailed, and light-tailed distributions, whereas the median-based tests are superior for heavy tails. These results are analogous to the univariate case.

多元统计非参数检验方差分析秩检验