Exact permutation tests for unreplicated factorials

## Abstract Permutation methods for analysis of functional neuroimaging data acquired as factorially designed experiments are described and validated. The __F__ ratio was estimated for main effects and interactions at each voxel in standard space. Critical values corresponding to probability thresh

## Abstract The paper proposes a new method for the analysis of unreplicated factorial designs. The new method does not use an estimate of the error variance and has the potential to identify up to __m__ – 1 active contrasts, where __m__ is the number of contrasts in the study. It can be shown that

The paper presents a permutation procedure for testing reflected (or diagonal) symmetry of the distribution of a multivariate variable. The test statistics are based in empirical characteristic functions. The resulting permutation tests are strictly distribution free under the null hypothesis that t

Critical values of the test statistic proposed by Al-Shiha and Yang (1999) for analyzing unreplicated factorials are estimated by fitting an appropriate linear model. Some important properties of the test are also provided.