nakagami: Nakagami distribution
In VaRES: Computes Value at Risk and Expected Shortfall for over 100 Parametric Distributions
nakagami R Documentation
Nakagami distribution
Description
Computes the pdf, cdf, value at risk and expected shortfall for the Nakagami distribution due to Nakagami (1960) given by
\begin{array}{ll}
&\displaystyle
f (x) = \frac {2 m^m}{\Gamma (m) a^m} x^{2 m - 1}
\exp \left( -\frac {m x^2}{a} \right),
\\
&\displaystyle
F (x) = 1 - Q \left( m, \frac {m x^2}{a} \right),
\\
&\displaystyle
{\rm VaR}_p (X) = \sqrt{\frac {a}{m}} \sqrt{Q^{-1} (m, 1 - p)},
\\
&\displaystyle
{\rm ES}_p (X) = \frac {\sqrt{a}}{p \sqrt{m}} \int_0^p \sqrt{Q^{-1} (m, 1 - v)} dv
\end{array}
for x > 0, 0 < p < 1, a > 0, the scale parameter, and m > 0, the shape parameter.
Usage
dnakagami(x, m=1, a=1, log=FALSE)
pnakagami(x, m=1, a=1, log.p=FALSE, lower.tail=TRUE)
varnakagami(p, m=1, a=1, log.p=FALSE, lower.tail=TRUE)
esnakagami(p, m=1, a=1)
Arguments
x
scaler or vector of values at which the pdf or cdf needs to be computed
p
scaler or vector of values at which the value at risk or expected shortfall needs to be computed
a
the value of the scale parameter, must be positive, the default is 1
m
the value of the shape parameter, must be positive, the default is 1
log
if TRUE then log(pdf) are returned
log.p
if TRUE then log(cdf) are returned and quantiles are computed for exp(p)
lower.tail
if FALSE then 1-cdf are returned and quantiles are computed for 1-p
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, \Sexpr[results=rd]{tools:::Rd_expr_doi("10.1080/03610918.2014.944658")}
Examples
x=runif(10,min=0,max=1)
dnakagami(x)
pnakagami(x)
varnakagami(x)
esnakagami(x)
VaRES documentation built on April 22, 2023, 1:16 a.m.
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| nakagami | R Documentation |
Nakagami distribution
Description
Computes the pdf, cdf, value at risk and expected shortfall for the Nakagami distribution due to Nakagami (1960) given by
\begin{array}{ll}
&\displaystyle
f (x) = \frac {2 m^m}{\Gamma (m) a^m} x^{2 m - 1}
\exp \left( -\frac {m x^2}{a} \right),
\\
&\displaystyle
F (x) = 1 - Q \left( m, \frac {m x^2}{a} \right),
\\
&\displaystyle
{\rm VaR}_p (X) = \sqrt{\frac {a}{m}} \sqrt{Q^{-1} (m, 1 - p)},
\\
&\displaystyle
{\rm ES}_p (X) = \frac {\sqrt{a}}{p \sqrt{m}} \int_0^p \sqrt{Q^{-1} (m, 1 - v)} dv
\end{array}
for x > 0, 0 < p < 1, a > 0, the scale parameter, and m > 0, the shape parameter.
Usage
dnakagami(x, m=1, a=1, log=FALSE)
pnakagami(x, m=1, a=1, log.p=FALSE, lower.tail=TRUE)
varnakagami(p, m=1, a=1, log.p=FALSE, lower.tail=TRUE)
esnakagami(p, m=1, a=1)
Arguments
x |
scaler or vector of values at which the pdf or cdf needs to be computed |
p |
scaler or vector of values at which the value at risk or expected shortfall needs to be computed |
a |
the value of the scale parameter, must be positive, the default is 1 |
m |
the value of the shape parameter, must be positive, the default is 1 |
log |
if TRUE then log(pdf) are returned |
log.p |
if TRUE then log(cdf) are returned and quantiles are computed for exp(p) |
lower.tail |
if FALSE then 1-cdf are returned and quantiles are computed for 1-p |
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, \Sexpr[results=rd]{tools:::Rd_expr_doi("10.1080/03610918.2014.944658")}
Examples
x=runif(10,min=0,max=1)
dnakagami(x)
pnakagami(x)
varnakagami(x)
esnakagami(x)R Package Documentation
Browse R Packages
We want your feedback!
Note that we can't provide technical support on individual packages. You should contact the package authors for that.
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