Benini distribution

In probability, statistics, economics, and actuarial science, the Benini distribution is a Probability distribution#Continuous [probability distribution|continuous probability distribution] that is a statistical size distribution often applied to model incomes, severity of claims or losses in actuarial applications, and other economic data. Its tail behavior decays faster than a power law, but not as fast as an exponential. This distribution was introduced by Rodolfo Benini in 1905. Somewhat later than Benini's original work, the distribution has been independently discovered or discussed by a number of authors.

Distribution

The Benini distribution is a three-parameter distribution, which has cumulative distribution function
where, shape parameters α, β > 0, and σ > 0 is a scale parameter.
For parsimony, Benini considered only the two-parameter model, with CDF
The density of the two-parameter Benini model is

Simulation

A two-parameter Benini variable can be generated by the inverse probability transform method. For the two-parameter model, the quantile function is

Related distributions

If, then X has a Pareto distribution with
If, then, where

Software

The two-parameter Benini distribution density, probability distribution, quantile function and random-number generator are implemented in the VGAM package for R, which also provides maximum-likelihood estimation of the shape parameter.