Logistic exponential distribution

Description

Computes the pdf, cdf, value at risk and expected shortfall for the logistic exponential distribution due to Lan and Leemis (2008) given by

\begin{array}{ll} &\displaystyle f (x) = \frac {\displaystyle a \lambda \exp (\lambda x) \left[ \exp (\lambda x) - 1 \right]^{a - 1}} {\displaystyle \left\{ 1 + \left[ \exp (\lambda x) - 1 \right]^a \right\}^2}, \\ &\displaystyle F (x) = \frac {\displaystyle \left[ \exp (\lambda x) - 1 \right]^a} {\displaystyle 1 + \left[ \exp (\lambda x) - 1 \right]^a}, \\ &\displaystyle {\rm VaR}_p (X) = \frac {1}{\lambda} \log \left[ 1 + \left( \frac {p}{1 - p} \right)^{1 / a} \right], \\ &\displaystyle {\rm ES}_p (X) = \frac {1}{p \lambda} \int_0^p \log \left[ 1 + \left( \frac {v}{1 - v} \right)^{1 / a} \right] dv \end{array}

for x > 0, 0 < p < 1, a > 0, the shape parameter and \lambda > 0, the scale parameter.

Usage

dlogisexp(x, lambda=1, a=1, log=FALSE)
plogisexp(x, lambda=1, a=1, log.p=FALSE, lower.tail=TRUE)
varlogisexp(p, lambda=1, a=1, log.p=FALSE, lower.tail=TRUE)
eslogisexp(p, lambda=1, a=1)

Arguments

Value

An object of the same length as x, giving the pdf or cdf values computed at x or an object of the same length as p, giving the values at risk or expected shortfall computed at p.

Author(s)

Saralees Nadarajah

References

Stephen Chan, Saralees Nadarajah & Emmanuel Afuecheta (2016). An R Package for Value at Risk and Expected Shortfall, Communications in Statistics - Simulation and Computation, 45:9, 3416-3434, doi:10.1080/03610918.2014.944658

Examples

x=runif(10,min=0,max=1)
dlogisexp(x)
plogisexp(x)
varlogisexp(x)
eslogisexp(x)