Benini distribution: Difference between revisions

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In probability, statistics, economics, and actuarial science, the Benini distribution is a 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.^[1][2] 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.^[3] Somewhat later than Benini's original work, the distribution has been independently discovered or discussed by a number of authors.^[4]

The Benini distribution ${\displaystyle \mathrm{Benini}(\alpha ,\beta ,\sigma )}$ is a three-parameter distribution, which has cumulative distribution function (CDF)

${\displaystyle F(x)=1-\exp \{-\alpha (\log x-\log \sigma )-\beta (\log x-\log \sigma {)}^2\}=1-{\left(\frac{x}{\sigma }\right)}^{-\alpha -\beta \log \left(\frac{x}{\sigma }\right)},}$

where ${\displaystyle x\ge \sigma }$, shape parameters α, β > 0, and σ > 0 is a scale parameter.

For parsimony, Benini^[3] considered only the two-parameter model (with α = 0), with CDF

${\displaystyle F(x)=1-\exp \{-\beta (\log x-\log \sigma {)}^2\}=1-{\left(\frac{x}{\sigma }\right)}^{-\beta (\log x-\log \sigma )}.}$

The density of the two-parameter Benini model is

${\displaystyle f(x)=\frac{2\beta }{x}\exp \{-\beta {[\log \left(\frac{x}{\sigma }\right)]}^2\}\log \left(\frac{x}{\sigma }\right),x\ge \sigma >0.}$

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

${\displaystyle F^{-1}(u)=\sigma \exp \sqrt{-\frac{1}{\beta }\log (1-u)},0<u<1.}$

• If ${\displaystyle X\sim \mathrm{Benini}(\alpha ,0,\sigma )}$, then X has a Pareto distribution with ${\displaystyle x_{\text{m}}=\sigma .}$
• If ${\displaystyle X\sim \mathrm{Benini}(0,\frac{1}{2{\sigma }^2},1)}$, then ${\displaystyle X\sim e^U}$, where ${\displaystyle U\sim \mathrm{Rayleigh}(\sigma ).}$

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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.^[5]

• Conditional probability distribution
• Joint probability distribution
• Quasiprobability distribution
• Empirical probability distribution
• Histogram
• Riemann–Stieltjes integral application to probability theory

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• Benini Distribution at Wolfram Mathematica (definition and plots of pdf)

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