In statistics, a matrix gamma distribution is a generalization of the gamma distribution to positive-definite matrices.[1] It is effectively a different parametrization of the Wishart distribution, and is used similarly, e.g. as the conjugate prior of the precision matrix of a multivariate normal distribution and matrix normal distribution. The compound distribution resulting from compounding a matrix normal with a matrix gamma prior over the precision matrix is a generalized matrix t-distribution.[1]
A matrix gamma distributions is identical to a Wishart distribution with
\beta\boldsymbol\Sigma=2V,\alpha=
| n | |
| 2 |
.
Notice that the parameters
\beta
\boldsymbol\Sigma
\beta\boldsymbol\Sigma