AbstractThis paper establishes a link between a generalized matrix Matsumoto–Yor (MY) property and the Wishart distribution. This link highlights certain conditional independence properties within blocks of the Wishart and leads to a new characterization of the Wishart distribution similar to the one recently obtained by Geiger and Heckerman but involving independences for only three pairs of block partitionings of the random matrix.In the process, we obtain two other main results. The first one is an extension of the MY independence property to random matrices of different dimensions. The second result is its converse. It extends previous characterizations of the matrix generalized inverse Gaussian and Wishart seen as a couple of distribut...
Let A be a (m1+m2)×(m1+m2) blocked Wishart random matrix with diagonal blocks of orders m1×m1 and m2...
This article provides a comprehensive, rigorous, and self-contained introduction to the analysis of ...
AbstractD. Foata and D. Zeilberger (1988, SIAM J. Discrete Math.4, 425–433) and D. Vere-Jones (1988,...
AbstractThis paper establishes a link between a generalized matrix Matsumoto–Yor (MY) property and t...
AbstractIn this paper we discuss the distributions and independency properties of several generaliza...
International audienceFor a positive integer r, let I denote the r × r unit matrix. Let X and Y be t...
Let Y be an nxp multivariate normal random matrix with general covariance [Sigma]Y. The general cova...
AbstractLet Y be an n×p multivariate normal random matrix with general covariance ΣY. The general co...
The pseudo-Wishart distribution arises when a Hermitian matrix generated from a complex Gaussian ens...
If the elements of a matrix $S$ follow a central Wishart distribution $W_{k}(n,\Sigma)$ and $a'\Sigm...
The distribution of the eigenvalues of Wishart matrices and Gaussian quadratic forms is of great int...
In this paper we derive a very useful formula for the stochastic representation of the product of a ...
Abstract. We introduce the class of Beta-Wishart random matrices and develop a comprehensive eigen-v...
AbstractGiven two independent positive random variables x and y, and the independence of xy and (1 −...
Classical Wishart distributions on the open convex cones of positive definite matrices and their fun...
Let A be a (m1+m2)×(m1+m2) blocked Wishart random matrix with diagonal blocks of orders m1×m1 and m2...
This article provides a comprehensive, rigorous, and self-contained introduction to the analysis of ...
AbstractD. Foata and D. Zeilberger (1988, SIAM J. Discrete Math.4, 425–433) and D. Vere-Jones (1988,...
AbstractThis paper establishes a link between a generalized matrix Matsumoto–Yor (MY) property and t...
AbstractIn this paper we discuss the distributions and independency properties of several generaliza...
International audienceFor a positive integer r, let I denote the r × r unit matrix. Let X and Y be t...
Let Y be an nxp multivariate normal random matrix with general covariance [Sigma]Y. The general cova...
AbstractLet Y be an n×p multivariate normal random matrix with general covariance ΣY. The general co...
The pseudo-Wishart distribution arises when a Hermitian matrix generated from a complex Gaussian ens...
If the elements of a matrix $S$ follow a central Wishart distribution $W_{k}(n,\Sigma)$ and $a'\Sigm...
The distribution of the eigenvalues of Wishart matrices and Gaussian quadratic forms is of great int...
In this paper we derive a very useful formula for the stochastic representation of the product of a ...
Abstract. We introduce the class of Beta-Wishart random matrices and develop a comprehensive eigen-v...
AbstractGiven two independent positive random variables x and y, and the independence of xy and (1 −...
Classical Wishart distributions on the open convex cones of positive definite matrices and their fun...
Let A be a (m1+m2)×(m1+m2) blocked Wishart random matrix with diagonal blocks of orders m1×m1 and m2...
This article provides a comprehensive, rigorous, and self-contained introduction to the analysis of ...
AbstractD. Foata and D. Zeilberger (1988, SIAM J. Discrete Math.4, 425–433) and D. Vere-Jones (1988,...