Abstract.
The assumption of multivariate normality provides the customary powerful and convenient ways of analysing multivariate data: if the data are not normal, the analysis may often be simplified by an appropriate transformation. In this context, the most widely used test is the likelihood ratio, which requires the maximum likelihood estimate of the transformation parameter for each variable. Given that this estimate can only be found numerically, when the number of variables is large (> 20) it is impossible or infeasible to compute the test. In this paper we introduce alternative tests which do not require the maximum likelihood estimate of the transformation parameters and prove algebraically their relationships. We also give insights both using theoretical arguments and a robust simulation study, based on the forward search algorithm, about the distribution of the tests previously introduced.
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Riani, M. Robust multivariate transformations to normality: Constructed variables and likelihood ratio tests. Statistical Methods & Applications 13, 179–196 (2004). https://doi.org/10.1007/s10260-004-0095-1
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DOI: https://doi.org/10.1007/s10260-004-0095-1