Classical univariate measures of asymmetry such as Pearson’s (mean-median)/σ or (mean-mode)/σ often measure the standardized distance between two separate location parameters and have been widely used in assessing univariate normality. Similarly, measures of univariate kurtosis are often just ratios of two scale measures. The classical standardized fourth moment and the ratio of the mean deviation to the standard deviation serve as examples. In this paper we consider tests of multinormality which are based on the Mahalanobis distance between two multivariate location vector estimates or on the (matrix) distance between two scatter matrix estimates, respectively. Asymptotic theory is developed to provide approximate null distributions as wel...
A simple statistic is proposed for testing the equality of the covariance matrices of several multiv...
The multivariate location problem is addressed. The most familiar method to address the problem is t...
This paper examines asymptotic distributions of the likelihood ratio criteria, which are proposed un...
Methods of assessing the degree to which multivariate data deviate from multinormality are discussed...
Multivariate statistical methods often require the assumption of multivariate normality. The purpose...
Two classical multivariate statistical problems, testing of multivariate normality and the k-sample ...
Two classical multivariate statistical problems, testing of multivariate normality and the k-sample ...
We propose a new class of rotation invariant and consistent goodness-of-fit tests for multivariate d...
Goodness-of-fit tests based on the empirical Wasserstein dis- tance are proposed for simple and comp...
In this paper, we have proposed two nonparametric tests for testing equal-ity of location parameters...
Abstract. There are few techniques available for testing if modes take specified values. We show tha...
The assumption of multivariate normality is the basis of the standard methodology of multivariate m...
Randles' one sample multivariate sign test based on interdirections is extended to two sample and mu...
Most multivariate tests are based on the hypothesis of multinormality. But often this hypothesis fai...
A multi-sample test for equality of mean directions is developed for populations having Langevin-von...
A simple statistic is proposed for testing the equality of the covariance matrices of several multiv...
The multivariate location problem is addressed. The most familiar method to address the problem is t...
This paper examines asymptotic distributions of the likelihood ratio criteria, which are proposed un...
Methods of assessing the degree to which multivariate data deviate from multinormality are discussed...
Multivariate statistical methods often require the assumption of multivariate normality. The purpose...
Two classical multivariate statistical problems, testing of multivariate normality and the k-sample ...
Two classical multivariate statistical problems, testing of multivariate normality and the k-sample ...
We propose a new class of rotation invariant and consistent goodness-of-fit tests for multivariate d...
Goodness-of-fit tests based on the empirical Wasserstein dis- tance are proposed for simple and comp...
In this paper, we have proposed two nonparametric tests for testing equal-ity of location parameters...
Abstract. There are few techniques available for testing if modes take specified values. We show tha...
The assumption of multivariate normality is the basis of the standard methodology of multivariate m...
Randles' one sample multivariate sign test based on interdirections is extended to two sample and mu...
Most multivariate tests are based on the hypothesis of multinormality. But often this hypothesis fai...
A multi-sample test for equality of mean directions is developed for populations having Langevin-von...
A simple statistic is proposed for testing the equality of the covariance matrices of several multiv...
The multivariate location problem is addressed. The most familiar method to address the problem is t...
This paper examines asymptotic distributions of the likelihood ratio criteria, which are proposed un...