Add to ORKGThis article describes how the Jacobian is found for certain functions of a singular random matrix, both in the general case and in that of a non-negative definite random matrix. The Jacobian of the transformation V = S2 is found when S is non-negative definite; in addition, the Jacobian of the transformation Y = X+ is determined when X+ is the generalized, or Moore-Penrose, inverse of X. Expressions for the densities of the generalized inverse of the central beta and F singular random matrices are proposed. Finally, two applications in the field of Bayesian inference are presented
AbstractThis short note is about the singular value distribution of Gaussian random matrices (i.e. G...
AbstractTwo very basic transformations in multivariate statistics are those of a p×q matrix X to a p...
Motivated by recent results in random matrix theory we will study the distributions arising from pro...
AbstractThis paper explains the differences between the densities and the Jacobians of the transform...
For a singular random matrix Y, we find the Jacobians associated with the following decompositions; ...
Abstract. In this work are studied the Jacobians of certain singu-lar transformations and the corres...
AbstractFor a singular random matrix X, we find the Jacobians associated to the following decomposit...
In this study we intend to clarify the differences between the densities and the Jaco-bians of the t...
In this paper we find the Jacobians of the transforms relating to matrix variate beta types I and II...
AbstractThe Moore–Penrose inverse of a singular or nonsquare matrix is not only existent but also un...
Introducing a new method for studying general probability distributions on R^n, we generalize some r...
This thesis bridges the gap between pure and applied mathematics. The first part of this thesis focu...
We study n by n symmetric random matrices H, possibly discrete, with iid above-diagonal entries. We ...
Some years ago the author defined a pseudo inverse of a singular matrix and used it in representing ...
Since the publication of Random Matrices (Academic Press, 1967) so many new results have emerged bot...
AbstractThis short note is about the singular value distribution of Gaussian random matrices (i.e. G...
AbstractTwo very basic transformations in multivariate statistics are those of a p×q matrix X to a p...
Motivated by recent results in random matrix theory we will study the distributions arising from pro...
AbstractThis paper explains the differences between the densities and the Jacobians of the transform...
For a singular random matrix Y, we find the Jacobians associated with the following decompositions; ...
Abstract. In this work are studied the Jacobians of certain singu-lar transformations and the corres...
AbstractFor a singular random matrix X, we find the Jacobians associated to the following decomposit...
In this study we intend to clarify the differences between the densities and the Jaco-bians of the t...
In this paper we find the Jacobians of the transforms relating to matrix variate beta types I and II...
AbstractThe Moore–Penrose inverse of a singular or nonsquare matrix is not only existent but also un...
Introducing a new method for studying general probability distributions on R^n, we generalize some r...
This thesis bridges the gap between pure and applied mathematics. The first part of this thesis focu...
We study n by n symmetric random matrices H, possibly discrete, with iid above-diagonal entries. We ...
Some years ago the author defined a pseudo inverse of a singular matrix and used it in representing ...
Since the publication of Random Matrices (Academic Press, 1967) so many new results have emerged bot...
AbstractThis short note is about the singular value distribution of Gaussian random matrices (i.e. G...
AbstractTwo very basic transformations in multivariate statistics are those of a p×q matrix X to a p...
Motivated by recent results in random matrix theory we will study the distributions arising from pro...