Abstract
The generalization of the Behrens–Fisher problem to comparing more than two means from nonhomogeneous populations has attracted the attention of statisticians for many decades. Several approaches offer different approximations to the distribution of the test statistic. The question of statistical properties of these approximations is still alive. Here, we present a brief overview of several approaches suggested in the literature and implemented in software with a focus on investigating the accuracy of p values as well as their dependence on nuisance parameters and on the underlying assumption of normality. We illustrate by simulation the behavior of p values. In addition to the Satterthwaite–Fai–Cornelius test, the Kenward–Roger test, the simple ANOVA F test, the parametric bootstrap test, and the generalized F test will be briefly discussed.
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