Matrix variate beta distribution
In statistics, the matrix variate beta distribution is a generalization of the beta distribution. If is a positive definite matrix with a matrix variate beta distribution, and are real parameters, we write (sometimes ). The probability density function for is:
Notation | |||
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Parameters | |||
Support | matrices with both and positive definite | ||
CDF |
Here is the multivariate beta function:
where is the multivariate gamma function given by
Theorems
Distribution of matrix inverse
If then the density of is given by
provided that and .
Orthogonal transform
If and is a constant orthogonal matrix, then
Also, if is a random orthogonal matrix which is independent of , then , distributed independently of .
If is any constant , matrix of rank , then has a generalized matrix variate beta distribution, specifically .
Partitioned matrix results
If and we partition as
where is and is , then defining the Schur complement as gives the following results:
- is independent of
- has an inverted matrix variate t distribution, specifically
Wishart results
Mitra proves the following theorem which illustrates a useful property of the matrix variate beta distribution. Suppose are independent Wishart matrices . Assume that is positive definite and that . If
where , then has a matrix variate beta distribution . In particular, is independent of .
References
- A. K. Gupta and D. K. Nagar 1999. "Matrix variate distributions". Chapman and Hall.
- S. K. Mitra 1970. "A density-free approach to matrix variate beta distribution". The Indian Journal of Statistics, Series A, (1961-2002), volume 32, number 1 (March 1970), pp81-88.