Logical contradictions in the One-way ANOVA and Tukey-Kramer multiple comparisons tests with more than two groups of observations

Abstract

We show that the One-way ANOVA and Tukey-Kramer (TK) tests agree on any sample with two groups. This result is based on a simple identity connecting the Fisher-Snedecor and studentized probabilistic distributions and is proven without any additional assumptions; in particular, the standard ANOVA assumptions (independence, normality, and homoscedasticity (INAH)) are not needed. In contrast, it is known that for a sample with k > 2 groups of observations, even under the INAH assumptions, with the same significance level α, the above two tests may give opposite results: (i) ANOVA rejects its null hypothesis H0A: μ1 = … = μk, while the TK one, H0TK(i,j): μi = μj, is not rejected for any pair i, j ∈ \1, …, k\; (ii) the TK test rejects H0TK(i,j) for a pair (i, j) (with i ≠ j) while ANOVA does not reject H0A. We construct two large infinite pseudo-random families of samples of both types satisfying INAH: in case (i) for any k ≥ 3 and in case (ii) for some larger k. Furthermore, in case (ii) ANOVA, being restricted to the pair of groups (i,j), may reject equality μi = μj with the same α. This is an obvious contradiction, since μ1 = … = μk implies μi = μj for all i, j ∈ \1, …, k\. Similar contradictory examples are constructed for the Multivariable Linear Regression (MLR). However, for these constructions it seems difficult to verify the Gauss-Markov assumptions, which are standardly required for MLR.