Classes of multivariate and cone valued infinitely divisible Gamma distributions are introduced. Particular emphasis is put on the cone-valued case, due to the relevance of infinitely divisible distributions on the positive semi-definite matrices in applica-tions. The cone-valued class of generalised Gamma convolutions is studied. In partic-ular, a characterisation in terms of an Itô-Wiener integral with respect to an infinitely divisible random measure associated to the jumps of a Lévy process is established. A new example of an infinitely divisible positive definite Gamma random matrix is introduced. It has properties which make it appealing for modelling under an infinite divisibility framework. An interesting relation of the moments of ...
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...
We study infinitely divisible (ID) distributions on the nonnegative half-line $\mathbb{R}_+$. The L\...
Abstract Classes of multivariate and cone valued infinitely divisible Gamma distributions are introd...
In this paper we study time series models with infinitely divisible marginal distributions. The moti...
AbstractA particular class of p-dimensional exponential distributions have Laplace transforms |I + V...
Infinitely divisible random variables have distributions that can be written as sums of countably ma...
dom matrices The so-called Bercovici-Pata bijection maps the set of classical infinitely divisible l...
This book deals with topics in the area of Lévy processes and infinitely divisible distributions suc...
Random objects taking on values in a locally compact second countable convex cone are studied. The c...
A class of random matrices whose determinants and some of their powers are infinitely divisible is p...
AbstractRandom objects taking on values in a locally compact second countable convex cone are studie...
This paper introduces and studies a family of new classes of infinitely divisible distributions on R...
Suppose X=(X1,..,Xp)', has the Laplace transform ψ (t) = ∣Ι + VT∣-½, where V is a positive definite ...
We construct a random matrix model for the bijection between clas-sical and free infinitely divisib...
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...
We study infinitely divisible (ID) distributions on the nonnegative half-line $\mathbb{R}_+$. The L\...
Abstract Classes of multivariate and cone valued infinitely divisible Gamma distributions are introd...
In this paper we study time series models with infinitely divisible marginal distributions. The moti...
AbstractA particular class of p-dimensional exponential distributions have Laplace transforms |I + V...
Infinitely divisible random variables have distributions that can be written as sums of countably ma...
dom matrices The so-called Bercovici-Pata bijection maps the set of classical infinitely divisible l...
This book deals with topics in the area of Lévy processes and infinitely divisible distributions suc...
Random objects taking on values in a locally compact second countable convex cone are studied. The c...
A class of random matrices whose determinants and some of their powers are infinitely divisible is p...
AbstractRandom objects taking on values in a locally compact second countable convex cone are studie...
This paper introduces and studies a family of new classes of infinitely divisible distributions on R...
Suppose X=(X1,..,Xp)', has the Laplace transform ψ (t) = ∣Ι + VT∣-½, where V is a positive definite ...
We construct a random matrix model for the bijection between clas-sical and free infinitely divisib...
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...
We study infinitely divisible (ID) distributions on the nonnegative half-line $\mathbb{R}_+$. The L\...