Abstract
The multivariate normal is a common assumption in many statistical models and methodologies for high-dimensional data analysis. The exploration of approaches to testing multivariate normality never stops. Due to the characteristics of the multivariate normal distribution, most approaches to testing multivariate normality show more or less advantages in their power performance. These approaches can be classified into two types: multivariate and univariate. Using the multivariate normal characteristic by the Mahalanobis distance, we propose an approach to testing multivariate normality based on representative points of the simple univariate F-distribution and the traditional chi-square statistic. This approach provides a new way of improving the traditional chi-square test for goodness-of-fit. A limited Monte Carlo study shows a considerable power improvement of the representative-point-based chi-square test over the traditional one. An illustration of testing goodness-of-fit for three well-known datasets gives consistent results with those from classical methods.
Funder
Guangdong Provincial Key Laboratory of Interdisciplinary Research and Application for Data Science, BNU-HKBU United International College
Subject
General Mathematics,Engineering (miscellaneous),Computer Science (miscellaneous)
Reference71 articles.
1. Measures of multivariate skewnees and kurtosis with applications;Biometrika,1970
2. Applications of some measures of multivariate skewness and kurtosis for testing normality and robustness studies;Sankhy A,1974
3. Tests of univariate and multivariate normality;Handb. Stat.,1980
4. A class of invariant procedures for assessing multivariate normality;Biometrika,1982
5. Assessing multivariate normality: A compendium;Commun. Stat. Theory Methods,1986
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