AbstractA particular class of multivariate negative binomial distributions has probability generating functions of the form |I−Q|α|I−QS|−α, where α>0 and S=diag(s1, …, sn). The main results of this paper concern characterizations of the infinitely divisible distributions of this class
AbstractA class of multivariate distributions that are mixtures of the positive powers of a max-infi...
AbstractA class of infinitely divisible distributions on {0,1,2,…} is defined by requiring the (disc...
A new class of multivariate discrete distributions with binomial and multinomial marginals is studie...
A particular class of multivariate negative binomial distributions has probability generating functi...
AbstractA particular class of multivariate negative binomial distributions has probability generatin...
AbstractThe probability generating function (pgf) of an n-variate negative binomial distribution is ...
The probability generating function (pgf) of an n-variate negative binomial distribution is defined ...
Infinitely divisible random variables have distributions that can be written as sums of countably ma...
We define a multivariate negative binomial distribution (MVNB) as a bivariate Poisson distribution f...
Simple conditions are given which characterize the generating function of a nonnegative multivariate...
AbstractSimple conditions are given which characterize the generating function of a nonnegative mult...
Simple conditions are given which characterize the generating function of a nonnegative multivariate...
Simple conditions are given which characterize the generating function of a nonnegative multivariate...
Simple conditions are given which characterize the generating function of a nonnegative multivariate...
Simple conditions are given which characterize the generating function of a nonnegative multivariate...
AbstractA class of multivariate distributions that are mixtures of the positive powers of a max-infi...
AbstractA class of infinitely divisible distributions on {0,1,2,…} is defined by requiring the (disc...
A new class of multivariate discrete distributions with binomial and multinomial marginals is studie...
A particular class of multivariate negative binomial distributions has probability generating functi...
AbstractA particular class of multivariate negative binomial distributions has probability generatin...
AbstractThe probability generating function (pgf) of an n-variate negative binomial distribution is ...
The probability generating function (pgf) of an n-variate negative binomial distribution is defined ...
Infinitely divisible random variables have distributions that can be written as sums of countably ma...
We define a multivariate negative binomial distribution (MVNB) as a bivariate Poisson distribution f...
Simple conditions are given which characterize the generating function of a nonnegative multivariate...
AbstractSimple conditions are given which characterize the generating function of a nonnegative mult...
Simple conditions are given which characterize the generating function of a nonnegative multivariate...
Simple conditions are given which characterize the generating function of a nonnegative multivariate...
Simple conditions are given which characterize the generating function of a nonnegative multivariate...
Simple conditions are given which characterize the generating function of a nonnegative multivariate...
AbstractA class of multivariate distributions that are mixtures of the positive powers of a max-infi...
AbstractA class of infinitely divisible distributions on {0,1,2,…} is defined by requiring the (disc...
A new class of multivariate discrete distributions with binomial and multinomial marginals is studie...
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