2007
DOI: 10.1007/s10260-007-0045-9
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Tests of multinormality based on location vectors and scatter matrices

Abstract: Affine invariance, Kurtosis, Pitman efficiency, Skewness,

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Cited by 43 publications
(33 citation statements)
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“…Note that [9] used m 2 R − (p + 2)I p to test for (full) multivariate normality which is a special case here. Further note that the estimated projections (with respect to Mahalanobis inner product) to the noise and signal subspaces are given by…”
Section: Test Statistic For the Dimensionmentioning
confidence: 99%
“…Note that [9] used m 2 R − (p + 2)I p to test for (full) multivariate normality which is a special case here. Further note that the estimated projections (with respect to Mahalanobis inner product) to the noise and signal subspaces are given by…”
Section: Test Statistic For the Dimensionmentioning
confidence: 99%
“…The sample statistics can then be used to test multivariate normality, for example. For their limiting distributions under the normality assumption, see, for example, Kankainen, Taskinen and Oja (2007). For other extensions of multivariate skewness and kurtosis and their connections to skewness and kurtosis measures above, see Kollo (2008) and Kollo and Srivastava (2004).…”
Section: Measures Of Multivariate Skewness and Kurtosismentioning
confidence: 99%
“…The test based on * rejects H0 at a test size α if W * < c α; n, p , where c α; n, p satisfies the equation = Ρ{ * < ; , | 0 holds}. Kankainen et al (2007) obtained generalizations of classical Mardia's measures of skewness and kurtosis by using special choices of location and scatter estimators.…”
Section: Villasenor-alva and Gonzalez-estrada's Generalized Shapiro-wmentioning
confidence: 99%