cdfgno: Cumulative Distribution Function of the Generalized Normal Distribution

Description

This function computes the cumulative probability or nonexceedance probability of the Generalized Normal distribution given parameters ($\xi$, $\alpha$, and $\kappa$) of the distribution computed by pargno. The cumulative distribution function of the distribution is

$F (x) = Φ (y),$ where $\Phi$ is the cumulative ditribution function of the standard normal distribution and $y$ is

$y = - κ^{- 1} \log (1 - \frac{κ (x - ξ)}{α}) for κ \neq 0, and$

$y = (x - ξ) / α for κ = 0,$ where $F(x)$ is the nonexceedance probability for quantile $x$, $\xi$ is a location parameter, $\alpha$ is a scale parameter, and $\kappa$ is a shape parameter.

Usage

cdfgno(x, para)

Arguments

A real value.

para

The parameters from pargno or similar.

Value

Nonexceedance probability ($F$) for $x$.

References

Hosking, J.R.M., 1990, L-moments---Analysis and estimation of distributions using linear combinations of order statistics: Journal of the Royal Statistical Society, Series B, vol. 52, p. 105--124.

Hosking, J.R.M., 1996, FORTRAN routines for use with the method of L-moments: Version 3, IBM Research Report RC20525, T.J. Watson Research Center, Yorktown Heights, New York.

Hosking, J.R.M. and Wallis, J.R., 1997, Regional frequency analysis---An approach based on L-moments: Cambridge University Press.

Examples

Run this code

lmr <- lmom.ub(c(123,34,4,654,37,78))
  cdfgno(50,pargno(lmr))

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