In statistics, the grouped Dirichlet distribution (GDD) is a multivariate generalization of the Dirichlet distribution It was first described by Ng et al. 2008.[1] The Grouped Dirichlet distribution arises in the analysis of categorical data where some observations could fall into any of a set of other 'crisp' category. For example, one may have a data set consisting of cases and controls under two different conditions. With complete data, the cross-classification of disease status forms a 2(case/control)-x-(condition/no-condition) table with cell probabilities
Treatment | No Treatment | |
Controls | θ1 | θ2 |
Cases | θ3 | θ4 |
If, however, the data includes, say, non-respondents which are known to be controls or cases, then the cross-classification of disease status forms a 2-x-3 table. The probability of the last column is the sum of the probabilities of the first two columns in each row, e.g.
Treatment | No Treatment | Missing | |
Controls | θ1 | θ2 | θ1+θ2 |
Cases | θ3 | θ4 | θ3+θ4 |
The GDD allows the full estimation of the cell probabilities under such aggregation conditions.[1]
Probability Distribution
Consider the closed simplex set and . Writing for the first elements of a member of , the distribution of for two partitions has a density function given by
where is the Multivariate beta function.
Ng et al.[1] went on to define an m partition grouped Dirichlet distribution with density of given by
where is a vector of integers with . The normalizing constant given by
The authors went on to use these distributions in the context of three different applications in medical science.