AbstractIn this paper, a family of kurtosis orderings for multivariate distributions is proposed and studied. Each ordering characterizes in an affine invariant sense the movement of probability mass from the “shoulders” of a distribution to either the center or the tails or both. All even moments of the Mahalanobis distance of a random vector from its mean (if exists) preserve a subfamily of the orderings. For elliptically symmetric distributions, each ordering determines the distributions up to affine equivalence. As applications, the orderings are used to study elliptically symmetric distributions. Ordering results are established for three important families of elliptically symmetric distributions: Kotz type distributions, Pearson Type ...
We introduce the general familiy of multivariate elliptical location-scale mixture model. This class...
The asymptotic distribution of marginal sample kurtoses is derived. The distribution is used to deri...
A multivariate dispersion ordering is introduced in a weak and strong version. These arise naturally...
AbstractIn this paper, a family of kurtosis orderings for multivariate distributions is proposed and...
AbstractIt has been commonly admitted that the meaning of a descriptive feature of distributions is ...
AbstractWhen a multivariate elliptical distribution is used as the basis in multivariate analysis al...
The main objective of this paper is the calculation and the comparative study of two general measure...
An increase in kurtosis is achieved through the location‐ and scale‐free movement of probability mas...
AbstractWe derive the asymptotic distributions for measures of multivariate skewness and kurtosis de...
We first describe a class of quantile-based kurtosis orderings on symmetric distributions that use d...
In this paper, we show two characterizations of a univariate elliptical distribution. For a special ...
Two families of kurtosis measures are defined as K1(b) = E[ab-|z|] and K2(b) = E[a(1 - |z|b)] where ...
In multivariate analysis it is generally assumed that the observations are normally distributed. It ...
We study the exact distribution of linear combinations of order statistics of arbitrary (absolutely ...
A general family of distributions for the empirical modelling of ordered multivariate data is propos...
We introduce the general familiy of multivariate elliptical location-scale mixture model. This class...
The asymptotic distribution of marginal sample kurtoses is derived. The distribution is used to deri...
A multivariate dispersion ordering is introduced in a weak and strong version. These arise naturally...
AbstractIn this paper, a family of kurtosis orderings for multivariate distributions is proposed and...
AbstractIt has been commonly admitted that the meaning of a descriptive feature of distributions is ...
AbstractWhen a multivariate elliptical distribution is used as the basis in multivariate analysis al...
The main objective of this paper is the calculation and the comparative study of two general measure...
An increase in kurtosis is achieved through the location‐ and scale‐free movement of probability mas...
AbstractWe derive the asymptotic distributions for measures of multivariate skewness and kurtosis de...
We first describe a class of quantile-based kurtosis orderings on symmetric distributions that use d...
In this paper, we show two characterizations of a univariate elliptical distribution. For a special ...
Two families of kurtosis measures are defined as K1(b) = E[ab-|z|] and K2(b) = E[a(1 - |z|b)] where ...
In multivariate analysis it is generally assumed that the observations are normally distributed. It ...
We study the exact distribution of linear combinations of order statistics of arbitrary (absolutely ...
A general family of distributions for the empirical modelling of ordered multivariate data is propos...
We introduce the general familiy of multivariate elliptical location-scale mixture model. This class...
The asymptotic distribution of marginal sample kurtoses is derived. The distribution is used to deri...
A multivariate dispersion ordering is introduced in a weak and strong version. These arise naturally...