Dirichlet distribution

Dirichlet distribution
Dirichlet distribution
	Probability density function
Parameters	number of categories (integer); concentration parameters, where
Support	where and ; (i.e. a simplex)
PDF	; where ; where
Mean	; ; (where is the digamma function)
Mode
Variance	; where , and is the Kronecker delta
Entropy	; with defined as for variance, above; and is the digamma function
Method of moments	where j is any index, possibly i itself

In probability and statistics, the Dirichlet distribution (after Peter Gustav Lejeune Dirichlet), often denoted $\operatorname {Dir} ({\boldsymbol {\alpha }})$ , is a family of continuous multivariate probability distributions parameterized by a vector $α$ of positive reals. It is a multivariate generalization of the beta distribution,^[1] hence its alternative name of multivariate beta distribution (MBD).^[2] Dirichlet distributions are commonly used as prior distributions in Bayesian statistics, and in fact, the Dirichlet distribution is the conjugate prior of the categorical distribution and multinomial distribution.

The infinite-dimensional generalization of the Dirichlet distribution is the Dirichlet process.

^ S. Kotz; N. Balakrishnan; N. L. Johnson (2000). Continuous Multivariate Distributions. Volume 1: Models and Applications. New York: Wiley. ISBN 978-0-471-18387-7. (Chapter 49: Dirichlet and Inverted Dirichlet Distributions)
^ Olkin, Ingram; Rubin, Herman (1964). "Multivariate Beta Distributions and Independence Properties of the Wishart Distribution". The Annals of Mathematical Statistics. 35 (1): 261–269. doi:10.1214/aoms/1177703748. JSTOR 2238036.

[KBJ-1] S. Kotz; N. Balakrishnan; N. L. Johnson (2000). Continuous Multivariate Distributions. Volume 1: Models and Applications. New York: Wiley. ISBN 978-0-471-18387-7. (Chapter 49: Dirichlet and Inverted Dirichlet Distributions)

[2] Olkin, Ingram; Rubin, Herman (1964). "Multivariate Beta Distributions and Independence Properties of the Wishart Distribution". The Annals of Mathematical Statistics. 35 (1): 261–269. doi:10.1214/aoms/1177703748. JSTOR 2238036.

[1]

[2]

Dirichlet distribution
Probability density function
Parameters	$K\geq 2$ number of categories (integer) ${\boldsymbol {\alpha }}=(\alpha _{1},\ldots ,\alpha _{K})$ concentration parameters, where $\alpha _{i}>0$
Support	$x_{1},\ldots ,x_{K}$ where $x_{i}\in [0,1]$ and $\sum _{i=1}^{K}x_{i}=1$ (i.e. a $K-1$ simplex)
PDF	${\frac {1}{\mathrm {B} ({\boldsymbol {\alpha }})}}\prod _{i=1}^{K}x_{i}^{\alpha _{i}-1}$ where $\mathrm {B} ({\boldsymbol {\alpha }})={\frac {\prod _{i=1}^{K}\Gamma (\alpha _{i})}{\Gamma {\bigl (}\alpha _{0}{\bigr )}}}$ where $\alpha _{0}=\sum _{i=1}^{K}\alpha _{i}$
Mean	$\operatorname {E} [X_{i}]={\frac {\alpha _{i}}{\alpha _{0}}}$ $\operatorname {E} [\ln X_{i}]=\psi (\alpha _{i})-\psi (\alpha _{0})$ (where $\psi$ is the digamma function)
Mode	$x_{i}={\frac {\alpha _{i}-1}{\alpha _{0}-K}},\quad \alpha _{i}>1.$
Variance	$\operatorname {Var} [X_{i}]={\frac {{\tilde {\alpha }}_{i}(1-{\tilde {\alpha }}_{i})}{\alpha _{0}+1}},$ $\operatorname {Cov} [X_{i},X_{j}]={\frac {\delta _{ij}\,{\tilde {\alpha }}_{i}-{\tilde {\alpha }}_{i}{\tilde {\alpha }}_{j}}{\alpha _{0}+1}}$ where ${\tilde {\alpha }}_{i}={\frac {\alpha _{i}}{\alpha _{0}}}$ , and $\delta _{ij}$ is the Kronecker delta
Entropy	$H(X)=\log \mathrm {B} ({\boldsymbol {\alpha }})$ $+(\alpha _{0}-K)\psi (\alpha _{0})-$ $\sum _{j=1}^{K}(\alpha _{j}-1)\psi (\alpha _{j})$ with $\alpha _{0}$ defined as for variance, above; and $\psi$ is the digamma function
Method of moments	$\alpha _{i}=E[X_{i}]\left({\frac {E[X_{j}](1-E[X_{j}])}{V[X_{j}]}}-1\right)$ where $j$ is any index, possibly $i$ itself