The matrix-F distribution is presented as prior for covariance matrices as an alternative to the conjugate inverted Wishart distribution. A special case of the univariate F distribution for a variance parameter is equivalent to a half-t distribution for a standard deviation, which is becoming increasingly popular in the Bayesian literature. The matrix-F distribution can be conveniently modeled as a Wishart mixture of Wishart or inverse Wishart distributions, which allows straightforward implementation in a Gibbs sampler. By mixing the covariance matrix of a multivariate normal distribution with a matrix-F distribution, a multivariate horseshoe type prior is obtained which is useful for modeling sparse signals. Furthermore, it is shown that ...
A conjugate Wishart prior is used to present a simple and rapid procedure for computing the analytic...
AbstractLet S be a p × p random matrix having a Wishart distribution Wp(n,n−1Σ). For testing a gener...
In random effect models, error variance (stage 1 variance) and scalar random effect variance compone...
Covariance matrix estimation arises in multivariate problems including multivariate normal sam-pling...
A family of prior distributions for covariance matrices is studied. Members of the family possess th...
Linear mixed effects models arise quite naturally in a number of settings. Two of the more prominent...
When fitting hierarchical regression models, maximum likelihood (ML) esti-mation has computational (...
AbstractAlthough distribution theory dates back over a century, the distributions derived were essen...
Complex dependency structures are often conditionally modeled, where random effects parameters are u...
summary:In a multivariate normal distribution, let the inverse of the covariance matrix be a band ma...
The paper derives the reference prior for complex covariance matrices. The reference prior is a noni...
summary:This paper concerns generalized quadratic forms for the multivariate case. These forms are u...
In this paper we proposed a new statistical test for testing the covariance matrix in one population...
The covariance matrix of asset returns, which describes the fluctuation of asset prices, plays a cru...
Multilevel autoregressive models are especially suited for modeling between-person differences in wi...
A conjugate Wishart prior is used to present a simple and rapid procedure for computing the analytic...
AbstractLet S be a p × p random matrix having a Wishart distribution Wp(n,n−1Σ). For testing a gener...
In random effect models, error variance (stage 1 variance) and scalar random effect variance compone...
Covariance matrix estimation arises in multivariate problems including multivariate normal sam-pling...
A family of prior distributions for covariance matrices is studied. Members of the family possess th...
Linear mixed effects models arise quite naturally in a number of settings. Two of the more prominent...
When fitting hierarchical regression models, maximum likelihood (ML) esti-mation has computational (...
AbstractAlthough distribution theory dates back over a century, the distributions derived were essen...
Complex dependency structures are often conditionally modeled, where random effects parameters are u...
summary:In a multivariate normal distribution, let the inverse of the covariance matrix be a band ma...
The paper derives the reference prior for complex covariance matrices. The reference prior is a noni...
summary:This paper concerns generalized quadratic forms for the multivariate case. These forms are u...
In this paper we proposed a new statistical test for testing the covariance matrix in one population...
The covariance matrix of asset returns, which describes the fluctuation of asset prices, plays a cru...
Multilevel autoregressive models are especially suited for modeling between-person differences in wi...
A conjugate Wishart prior is used to present a simple and rapid procedure for computing the analytic...
AbstractLet S be a p × p random matrix having a Wishart distribution Wp(n,n−1Σ). For testing a gener...
In random effect models, error variance (stage 1 variance) and scalar random effect variance compone...