Inverse Wishart distributions based on singular elliptically contoured distribution

Authors :: Wai Cheung Ip
Jin Shan Liu
Heung Wong
Source :: Linear Algebra and its Applications. (2-3):424-432
Publisher :: Elsevier Inc.
Abstract: Assuming that the random matrix X has a singular or non-singular matrix variate elliptically contoured distribution, the density function of the Moore–Penrose inverse Z = ( X ′ X ) + is given with respect to the Hausdorff measure. The result is applied to Bayesian inference for a general multivariate linear regression model with matrix variate elliptically distributed errors. Some results concerning the posterior joint and marginal distributions of the parameters are obtained.

Subjects :: Numerical Analysis
Algebra and Number Theory
Mathematical analysis
Inverse-Wishart distribution
Bayesian inference
Matrix t-distribution
Hausdorff measure
Combinatorics
Matrix (mathematics)
Random variate
Elliptically contoured distribution
Joint probability distribution
Generalized Wishart and pseudo-Wishart distributions
Discrete Mathematics and Combinatorics
Geometry and Topology
Random matrix
Moore–Penrose pseudoinverse
Inverse distribution
Mathematics

Full Text Access

Tools