quaemu: Quantile Function of the Eta-Mu Distribution
In lmomco: L-Moments, Censored L-Moments, Trimmed L-Moments, L-Comoments, and Many Distributions
quaemu R Documentation
Quantile Function of the Eta-Mu Distribution
Description
This function computes the quantiles of the Eta-Mu (\eta:\mu) distribution given \eta and \mu) computed by paremu. The quantile function is complex and numerical rooting of the cumulative distribution function (cdfemu) is used.
Usage
quaemu(f, para, paracheck=TRUE, yacoubsintegral=TRUE, eps=1e-7)
Arguments
f
Nonexceedance probability (0 \le F \le 1).
para
The parameters from paremu or vec2par.
paracheck
A logical controlling whether the parameters are checked for validity. Overriding of this check might be extremely important and needed for use of the quantile function in the context of TL-moments with nonzero trimming.
yacoubsintegral
A logical controlling whether the integral by Yacoub (2007) is used for the cumulative distribution function instead of numerical integration of pdfemu.
eps
A close-enough error term for the recursion process.
Value
Quantile value for nonexceedance probability F.
Author(s)
W.H. Asquith
References
Yacoub, M.D., 2007, The kappa-mu distribution and the eta-mu distribution: IEEE Antennas and Propagation Magazine, v. 49, no. 1, pp. 68–81
See Also
cdfemu, pdfemu, lmomemu, paremu
Examples
## Not run:
quaemu(0.75,vec2par(c(0.9, 1.5), type="emu")) #
## End(Not run)
lmomco documentation built on May 29, 2024, 10:06 a.m.
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| quaemu | R Documentation |
Quantile Function of the Eta-Mu Distribution
Description
This function computes the quantiles of the Eta-Mu (\eta:\mu) distribution given \eta and \mu) computed by paremu. The quantile function is complex and numerical rooting of the cumulative distribution function (cdfemu) is used.
Usage
quaemu(f, para, paracheck=TRUE, yacoubsintegral=TRUE, eps=1e-7)
Arguments
f |
Nonexceedance probability ( |
para |
The parameters from |
paracheck |
A logical controlling whether the parameters are checked for validity. Overriding of this check might be extremely important and needed for use of the quantile function in the context of TL-moments with nonzero trimming. |
yacoubsintegral |
A logical controlling whether the integral by Yacoub (2007) is used for the cumulative distribution function instead of numerical integration of |
eps |
A close-enough error term for the recursion process. |
Value
Quantile value for nonexceedance probability F.
Author(s)
W.H. Asquith
References
Yacoub, M.D., 2007, The kappa-mu distribution and the eta-mu distribution: IEEE Antennas and Propagation Magazine, v. 49, no. 1, pp. 68–81
See Also
cdfemu, pdfemu, lmomemu, paremu
Examples
## Not run:
quaemu(0.75,vec2par(c(0.9, 1.5), type="emu")) #
## End(Not run)
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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