Difference between revisions of "Dirichlet"
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| − | [[ | + | [[Category: Multivariate Distribution Functions]] |
| + | [[Category: Multivariate Distributions library functions]] | ||
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== Library == | == Library == | ||
| − | Multivariate Distributions.ana | + | Multivariate Distributions library functions ([[media:Multivariate Distributions.ana |Multivariate Distributions.ana]]) |
| + | :Use [[File menu|File]] → '''Add Library...''' to add this library | ||
==See Also== | ==See Also== | ||
* [[GammaFn]] | * [[GammaFn]] | ||
* [[Multivariate distributions]] | * [[Multivariate distributions]] | ||
| + | * [[media:Multivariate Distributions.ana |Multivariate Distributions.ana]] | ||
* [[Distribution Densities Library]] | * [[Distribution Densities Library]] | ||
Latest revision as of 21:22, 24 May 2016
Dirichlet(alpha, I)
A Dirichlet distribution with parameters «alpha»i > 0.
Each sample of a Dirichlet distribution produces a random vector whose elements sum to 1. It is commonly used to represent second order probability information.
The Dirichlet distribution has a density given by
k*Product(X^(alpha - 1), I)
where k is a normalization factor equal to
GammaFn(Sum(alpha, I))/Sum(GammaFn(alpha), I)
The parameters, alpha, can be interpreted as observation counts. The mean is given by the relative values of alpha (normalized to 1), but the variance narrows as the alphas get larger, just as your confidence in a distribution would narrow as you get more samples.
The Dirichlet lends itself to easy Bayesian updating. If you have a prior of «alpha0», and you observe N.
Library
Multivariate Distributions library functions (Multivariate Distributions.ana)
- Use File → Add Library... to add this library
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