Inverse matrix gamma distribution

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Inverse matrix gamma
Notation	${\rm IMG}_{p}(\alpha,\beta,\boldsymbol\Psi)$
Parameters	$\alpha$ shape parameter (real) $\beta > 0$ scale parameter $\boldsymbol\Psi$ scale (positive-definite real $p\times p$ matrix)
Support	$\mathbf{X}$ positive-definite real $p\times p$ matrix
PDF	$\frac{\|\boldsymbol\Psi\|^{\alpha}}{\beta^{p\alpha}\Gamma_p(\alpha)} \|\mathbf{X}\|^{-\alpha-(p+1)/2}\exp\left({\rm tr}\left(-\frac{1}{\beta}\boldsymbol\Psi\mathbf{X}^{-1}\right)\right)$ $\Gamma_p$ is the multivariate gamma function.

In statistics, the inverse matrix gamma distribution is a generalization of the inverse gamma distribution to positive-definite matrices.^[1] It is a more general version of the inverse Wishart distribution, and is used similarly, e.g. as the conjugate prior of the covariance matrix of a multivariate normal distribution or matrix normal distribution. The compound distribution resulting from compounding a matrix normal with an inverse matrix gamma prior over the covariance matrix is a generalized matrix t-distribution.^{[citation needed]}

This reduces to the inverse Wishart distribution with $\beta=2, \alpha=\frac{n}{2}$ .

References

↑ Iranmanesha, Anis, M. Arashib and S. M. M. Tabatabaeya (2010). "On Conditional Applications of Matrix Variate Normal Distribution". Iranian Journal of Mathematical Sciences and Informatics, 5:2, pp. 33–43.

Discrete univariate with finite support
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Discrete univariate with infinite support
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Continuous univariate supported on a bounded interval, e.g. [0,1]
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Continuous univariate supported on the whole real line (−∞, ∞)
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Continuous univariate with support whose type varies
generalized extreme value generalized Pareto Tukey lambda q-Gaussian q-exponential q-Weibull shifted log-logistic

Mixed continuous-discrete univariate distributions
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Multivariate (joint)
Discrete Ewens multinomial Dirichlet-multinomial negative multinomial Continuous Dirichlet Generalized Dirichlet multivariate normal Multivariate stable multivariate Student normal-scaled inverse gamma normal-gamma Matrix-valued inverse matrix gamma inverse-Wishart matrix normal matrix t matrix gamma normal-inverse-Wishart normal-Wishart Wishart

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