Delaporte distribution

Delaporte
	Probability mass function ; When and are 0, the distribution is the Poisson.; When is 0, the distribution is the negative binomial.
	Cumulative distribution function ; When and are 0, the distribution is the Poisson.; When is 0, the distribution is the negative binomial.
Parameters	(fixed mean) (parameters of variable mean)
Support
pmf
CDF
Mean
Mode
Variance
Skewness	See #Properties
Ex. kurtosis	See #Properties

The Delaporte distribution is a discrete probability distribution that has received attention in actuarial science.^[1]^[2] It can be defined using the convolution of a negative binomial distribution with a Poisson distribution.^[2] Just as the negative binomial distribution can be viewed as a Poisson distribution where the mean parameter is itself a random variable with a gamma distribution, the Delaporte distribution can be viewed as a compound distribution based on a Poisson distribution, where there are two components to the mean parameter: a fixed component, which has the $\lambda$ parameter, and a gamma-distributed variable component, which has the $\alpha$ and $\beta$ parameters.^[3] The distribution is named for Pierre Delaporte, who analyzed it in relation to automobile accident claim counts in 1959,^[4] although it appeared in a different form as early as 1934 in a paper by Rolf von Lüders,^[5] where it was called the Formel II distribution.^[2]

Properties

The skewness of the Delaporte distribution is:

$\frac{\lambda + \alpha\beta(1+3\beta+2\beta^2)}{\left(\lambda + \alpha\beta(1+\beta)\right)^{\frac{3}{2}}}$

The excess kurtosis of the distribution is:

$\frac{\lambda+3\lambda^2+\alpha\beta(1+6\lambda+6\lambda\beta+7\beta+12\beta^2+6\beta^3+3\alpha\beta+6\alpha\beta^2+3\alpha\beta^3)}{\left(\lambda + \alpha\beta(1+\beta)\right)^2}$

References

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External links

Delaporte distribution at Vose Software. Details of derivation.

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[2]

[3]

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v t e Some common univariate probability distributions
Continuous	beta Cauchy chi-squared exponential F gamma Laplace log-normal normal Pareto Student's t uniform Weibull
Discrete	Bernoulli binomial discrete uniform geometric hypergeometric negative binomial Poisson
List of probability distributions

Delaporte distribution

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Probability mass function When $\alpha$ and $\beta$ are 0, the distribution is the Poisson. When $\lambda$ is 0, the distribution is the negative binomial.
Cumulative distribution function When $\alpha$ and $\beta$ are 0, the distribution is the Poisson. When $\lambda$ is 0, the distribution is the negative binomial.
Parameters	$\lambda > 0$ (fixed mean) $\alpha, \beta > 0$ (parameters of variable mean)
Support	$k \in \{0, 1, 2, \ldots\}$
pmf	$\sum_{i=0}^k\frac{\Gamma(\alpha + i)\beta^i\lambda^{k-i}e^{-\lambda}}{\Gamma(\alpha)i!(1+\beta)^{\alpha+i}(k-i)!}$
CDF	$\sum_{j=0}^k\sum_{i=0}^j\frac{\Gamma(\alpha + i)\beta^i\lambda^{j-i}e^{-\lambda}}{\Gamma(\alpha)i!(1+\beta)^{\alpha+i}(j-i)!}$
Mean	$\lambda + \alpha\beta$
Mode	$\begin{cases}z, z+1 & \{z \in \mathbb{Z}\}:\; z = (\alpha-1)\beta+\lambda\\ \lfloor z \rfloor & \textrm{otherwise}\end{cases}$
Variance	$\lambda + \alpha\beta(1+\beta)$
Skewness	See #Properties
Ex. kurtosis	See #Properties