Geometric Poisson distribution

In probability theory and statistics, the geometric Poisson distribution (also called the Pólya–Aeppli distribution) is used for describing objects that come in clusters, where the number of clusters follows a Poisson distribution and the number of objects within a cluster follows a geometric distribution.Template:Sfn It is a particular case of the compound Poisson distribution.Template:Sfn

The probability mass function of a random variable N distributed according to the geometric Poisson distribution ${\displaystyle 𝒫𝒢(\lambda ,\theta )}$ is given by

${\displaystyle f_N(n)=\mathrm{P}\mathrm{r}(N=n)=\{\begin{array}{cc}{\displaystyle \sum _{k=1}^n}{e}^{-\lambda }\frac{{\lambda }^k}{k!}(1-\theta {)}^{n-k}{\theta }^k{\displaystyle (\genfrac{}{}{0ex}{}{n-1}{k-1})},& n>0\\ e^{-\lambda },& n=0\end{array}}$

where λ is the parameter of the underlying Poisson distribution and θ is the parameter of the geometric distribution.Template:Sfn

The distribution was described by George Pólya in 1930. Pólya credited his student Alfred Aeppli's 1924 dissertation as the original source. It was called the geometric Poisson distribution by Sherbrooke in 1968, who gave probability tables with a precision of four decimal places.Template:Sfn

The geometric Poisson distribution has been used to describe systems modelled by a Markov model, such as biological processesTemplate:Sfn or traffic accidents.Template:Sfn

• Poisson distribution
• Compound Poisson distribution
• Geometric distribution

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