AbstractA theorem is proved that characterizes multivariate distribution functions of class L. This theorem is used to show that every n-dimensional, symmetric distribution function of class L is unimodal in the sense of Kanter
For a T-variate density function, the present paper defines double symmetry, quasi double symmetry of...
Abstract. We present a class of multivariate laws which is an extension of the symmetric multivariat...
AbstractWe define multivariate Meixner classes of invariant distributions of random matrices as thos...
A theorem is proved that characterizes multivariate distribution functions of class L. This theorem ...
AbstractSeveral theorems are obtained concerning the unimodality of spherically symmetric distributi...
Several theorems are obtained concerning the unimodality of spherically symmetric distribution funct...
In this thesis, Kanter's representation of multivariate unimodal distributions is shown equivalent t...
Ann-dimensional random vector is said to have an[alpha]-symmetric distribution,[alpha]>0, if its cha...
Simple conditions are given which characterize the generating function of a nonnegative multivariate...
AbstractA random vector is said to have a 1-symmetric distribution if its characteristic function is...
We give simple proofs of two results about convolutions of unimodal distributions. The first of thes...
AbstractMultivariate symmetric stable characteristic functions and their properties, as well as cond...
AbstractIn 1937, Paul Lévy proved two theorems that characterize one-dimensional distribution functi...
AbstractSimple conditions are given which characterize the generating function of a nonnegative mult...
AbstractA univariate probability distribution which has support in [−1, 1] and is unimodal with resp...
For a T-variate density function, the present paper defines double symmetry, quasi double symmetry of...
Abstract. We present a class of multivariate laws which is an extension of the symmetric multivariat...
AbstractWe define multivariate Meixner classes of invariant distributions of random matrices as thos...
A theorem is proved that characterizes multivariate distribution functions of class L. This theorem ...
AbstractSeveral theorems are obtained concerning the unimodality of spherically symmetric distributi...
Several theorems are obtained concerning the unimodality of spherically symmetric distribution funct...
In this thesis, Kanter's representation of multivariate unimodal distributions is shown equivalent t...
Ann-dimensional random vector is said to have an[alpha]-symmetric distribution,[alpha]>0, if its cha...
Simple conditions are given which characterize the generating function of a nonnegative multivariate...
AbstractA random vector is said to have a 1-symmetric distribution if its characteristic function is...
We give simple proofs of two results about convolutions of unimodal distributions. The first of thes...
AbstractMultivariate symmetric stable characteristic functions and their properties, as well as cond...
AbstractIn 1937, Paul Lévy proved two theorems that characterize one-dimensional distribution functi...
AbstractSimple conditions are given which characterize the generating function of a nonnegative mult...
AbstractA univariate probability distribution which has support in [−1, 1] and is unimodal with resp...
For a T-variate density function, the present paper defines double symmetry, quasi double symmetry of...
Abstract. We present a class of multivariate laws which is an extension of the symmetric multivariat...
AbstractWe define multivariate Meixner classes of invariant distributions of random matrices as thos...