quacau: Quantile Function of the Cauchy Distribution
In lmomco: L-Moments, Censored L-Moments, Trimmed L-Moments, L-Comoments, and Many Distributions
quacau R Documentation
Quantile Function of the Cauchy Distribution
Description
This function computes the quantiles of the Cauchy distribution given parameters (\xi and \alpha) of the distribution provided by parcau. The quantile function of the distribution is
x(F) = \xi + \alpha \times \tan\bigl(\pi(F-0.5)\bigr) \mbox{,}
where x(F) is the quantile for nonexceedance probability F, \xi is a location parameter and \alpha is a scale parameter. The quantile function of the Cauchy distribution is supported by R function qcauchy. This function does not use qcauchy because qcauchy does not return Inf for F = 1 although it
returns -Inf for F = 0.
Usage
quacau(f, para, paracheck=TRUE)
Arguments
f
Nonexceedance probability (0 \le F \le 1).
para
The parameters from parcau 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 distribution quantile function in the context of TL-moments with nonzero trimming.
Value
Quantile value for for nonexceedance probability F.
Author(s)
W.H. Asquith
References
Elamir, E.A.H., and Seheult, A.H., 2003, Trimmed L-moments: Computational Statistics
and Data Analysis, v. 43, pp. 299–314.
Gilchirst, W.G., 2000, Statistical modeling with quantile functions:
Chapman and Hall/CRC, Boca Raton, FL.
See Also
cdfcau, pdfcau, lmomcau, parcau
Examples
para <- c(12,12)
quacau(.5,vec2par(para,type='cau'))
lmomco documentation built on May 29, 2024, 10:06 a.m.
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| quacau | R Documentation |
Quantile Function of the Cauchy Distribution
Description
This function computes the quantiles of the Cauchy distribution given parameters (\xi and \alpha) of the distribution provided by parcau. The quantile function of the distribution is
x(F) = \xi + \alpha \times \tan\bigl(\pi(F-0.5)\bigr) \mbox{,}
where x(F) is the quantile for nonexceedance probability F, \xi is a location parameter and \alpha is a scale parameter. The quantile function of the Cauchy distribution is supported by R function qcauchy. This function does not use qcauchy because qcauchy does not return Inf for F = 1 although it
returns -Inf for F = 0.
Usage
quacau(f, para, paracheck=TRUE)
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 distribution quantile function in the context of TL-moments with nonzero trimming. |
Value
Quantile value for for nonexceedance probability F.
Author(s)
W.H. Asquith
References
Elamir, E.A.H., and Seheult, A.H., 2003, Trimmed L-moments: Computational Statistics and Data Analysis, v. 43, pp. 299–314.
Gilchirst, W.G., 2000, Statistical modeling with quantile functions: Chapman and Hall/CRC, Boca Raton, FL.
See Also
cdfcau, pdfcau, lmomcau, parcau
Examples
para <- c(12,12)
quacau(.5,vec2par(para,type='cau'))
R Package Documentation
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Note that we can't provide technical support on individual packages. You should contact the package authors for that.
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