Multivariate gamma function

In mathematics, the multivariate gamma function Γp is a generalization of the gamma function. It is useful in multivariate statistics, appearing in the probability density function of the Wishart and inverse Wishart distributions, and the matrix variate beta distribution.[1]

It has two equivalent definitions. One is given as the following integral over the positive-definite real matrices:

(note that reduces to the ordinary gamma function). The other one, more useful to obtain a numerical result is:

From this, we have the recursive relationships:

Thus

and so on.

This can also be extended to non-integer values of p with the expression:

Where G is the Barnes G-function, the indefinite product of the Gamma function.

The function is derived by Anderson[2] from first principles who also cites earlier work by Wishrt, Mahalabolis etc.

Derivatives

We may define the multivariate digamma function as

and the general polygamma function as

Calculation steps

  • Since
it follows that
it follows that

References

  1. James, Alan T. (June 1964). "Distributions of Matrix Variates and Latent Roots Derived from Normal Samples". The Annals of Mathematical Statistics. 35 (2): 475–501. doi:10.1214/aoms/1177703550. ISSN 0003-4851.
  2. Anderson, T W (1984). An Introduction to Multivariate Statistical Analysis. New York: John Wiley and Sons. pp. Ch. 7. ISBN 0-471-88987-3.
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