GenExtrVal: The Generalized Extreme Value Distribution

dGenExtrVal gives the density function, pGenExtrVal gives the distribution function, qGenExtrVal gives the quantile function, and rGenExtrVal generates random deviates.

The GenExtrVal distribution function with parameters \(loc = a\), \(scale = b\) and \(shape = s\) is $$G(z) = \exp\left[-\{1+s(z-a)/b\}^{-1/s}\right]$$ for \(1+s(z-a)/b > 0\), where \(b > 0\). If \(s = 0\) the distribution is defined by continuity. If \(1+s(z-a)/b \leq 0\), the value \(z\) is either greater than the upper end point (if \(s < 0\)), or less than the lower end point (if \(s > 0\)).

The parametric form of the GenExtrVal encompasses that of the Gumbel, Frechet and reverse Weibull distributions, which are obtained for \(s = 0\), \(s > 0\) and \(s < 0\) respectively. It was first introduced by Jenkinson (1955).