The usual assumption in multivariate hypothesis testing is that the sample consists of n independent, identically distributed Gaussian m-vectors. In this paper this assumption is weakened by considering a class of distributions for which the vector observations are not necessarily either Gaussian or independent. This class contains the elliptically symmetric laws with densities of the form f(X(n - m)) = [psi][tr(X - M)' (X - M)[Sigma]-1]. For testing the equality of k scale matrices and for the sphericity hypothesis it is shown, by using the structure of the underlying distribution rather than any specific form of the density, that the usual invariant normal-theory tests are exactly robust, for both the null and non-null cases, under this w...
Very general concepts of scatter, extending the traditional notion of covariance matrices, have beco...
We propose and study a general class of tests for group symmetry of a multivariate distribution, whi...
AbstractLet X and Y be d-dimensional random vectors having elliptically symmetric distributions. Cal...
AbstractThe usual assumption in multivariate hypothesis testing is that the sample consists of n ind...
Many normal-theory test procedures for covariance matrices remain valid outside the family of normal...
Many normal-theory test procedures for covariance matrices remain valid outside the family of normal...
AbstractWe present and study a procedure for testing the null hypothesis of multivariate elliptical ...
Although the assumption of elliptical symmetry is quite common in multivariate analysis and widespre...
AbstractThis paper presents a statistic for testing the hypothesis of elliptical symmetry. The stati...
A general method for constructing pseudo-Gaussian tests—reducing to tradi-tional Gaussian tests unde...
AbstractIn this paper, we suggest the conditional test procedures for testing elliptical symmetry of...
This article analyzes whether some existing tests for the pxp covariance matrix [Sigma] of the N ind...
AbstractWe derive the asymptotic distributions for measures of multivariate skewness and kurtosis de...
In this paper we study the existence of locally most powerful invariant tests (LMPIT) for the proble...
Nonparametric procedures for testing and estimation of the shape matrix in the case of multivariate ...
Very general concepts of scatter, extending the traditional notion of covariance matrices, have beco...
We propose and study a general class of tests for group symmetry of a multivariate distribution, whi...
AbstractLet X and Y be d-dimensional random vectors having elliptically symmetric distributions. Cal...
AbstractThe usual assumption in multivariate hypothesis testing is that the sample consists of n ind...
Many normal-theory test procedures for covariance matrices remain valid outside the family of normal...
Many normal-theory test procedures for covariance matrices remain valid outside the family of normal...
AbstractWe present and study a procedure for testing the null hypothesis of multivariate elliptical ...
Although the assumption of elliptical symmetry is quite common in multivariate analysis and widespre...
AbstractThis paper presents a statistic for testing the hypothesis of elliptical symmetry. The stati...
A general method for constructing pseudo-Gaussian tests—reducing to tradi-tional Gaussian tests unde...
AbstractIn this paper, we suggest the conditional test procedures for testing elliptical symmetry of...
This article analyzes whether some existing tests for the pxp covariance matrix [Sigma] of the N ind...
AbstractWe derive the asymptotic distributions for measures of multivariate skewness and kurtosis de...
In this paper we study the existence of locally most powerful invariant tests (LMPIT) for the proble...
Nonparametric procedures for testing and estimation of the shape matrix in the case of multivariate ...
Very general concepts of scatter, extending the traditional notion of covariance matrices, have beco...
We propose and study a general class of tests for group symmetry of a multivariate distribution, whi...
AbstractLet X and Y be d-dimensional random vectors having elliptically symmetric distributions. Cal...