qqghyp: Generalized Hyperbolic Quantile-Quantile and Percent-Percent...
In GeneralizedHyperbolic: The Generalized Hyperbolic Distribution
GeneralizedHyperbolicPlots R Documentation
Generalized Hyperbolic Quantile-Quantile and Percent-Percent Plots
Description
qqghyp produces a generalized hyperbolic Q-Q plot of the values in
y.
ppghyp produces a generalized hyperbolic P-P (percent-percent) or
probability plot of the values in y.
Graphical parameters may be given as arguments to qqghyp,
and ppghyp.
Usage
qqghyp(y, mu = 0, delta = 1, alpha = 1, beta = 0, lambda = 1,
param = c(mu, delta, alpha, beta, lambda),
main = "Generalized Hyperbolic Q-Q Plot",
xlab = "Theoretical Quantiles",
ylab = "Sample Quantiles",
plot.it = TRUE, line = TRUE, ...)
ppghyp(y, mu = 0, delta = 1, alpha = 1, beta = 0, lambda = 1,
param = c(mu, delta, alpha, beta, lambda),
main = "Generalized Hyperbolic P-P Plot",
xlab = "Uniform Quantiles",
ylab = "Probability-integral-transformed Data",
plot.it = TRUE, line = TRUE, ...)
Arguments
y
The data sample.
mu
\mu is the location parameter. By default this is
set to 0.
delta
\delta is the scale parameter of the distribution.
A default value of 1 has been set.
alpha
\alpha is the tail parameter, with a default value of 1.
beta
\beta is the skewness parameter, by default this is 0.
lambda
\lambda is the shape parameter and dictates the
shape that the distribution shall take. Default value is 1.
param
Parameters of the generalized hyperbolic distribution.
xlab, ylab, main
Plot labels.
plot.it
Logical. Should the result be plotted?
line
Add line through origin with unit slope.
...
Further graphical parameters.
Value
For qqghyp and ppghyp, a list with components:
x
The x coordinates of the points that are to be plotted.
y
The y coordinates of the points that are to be plotted.
References
Wilk, M. B. and Gnanadesikan, R. (1968)
Probability plotting methods for the analysis of data.
Biometrika.
55, 1–17.
See Also
ppoints, dghyp.
Examples
par(mfrow = c(1, 2))
y <- rghyp(200, param = c(2, 2, 2, 1, 2))
qqghyp(y, param = c(2, 2, 2, 1, 2), line = FALSE)
abline(0, 1, col = 2)
ppghyp(y, param = c(2, 2, 2, 1, 2))
GeneralizedHyperbolic documentation built on Nov. 26, 2023, 3 p.m.
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| GeneralizedHyperbolicPlots | R Documentation |
Generalized Hyperbolic Quantile-Quantile and Percent-Percent Plots
Description
qqghyp produces a generalized hyperbolic Q-Q plot of the values in
y.
ppghyp produces a generalized hyperbolic P-P (percent-percent) or
probability plot of the values in y.
Graphical parameters may be given as arguments to qqghyp,
and ppghyp.
Usage
qqghyp(y, mu = 0, delta = 1, alpha = 1, beta = 0, lambda = 1,
param = c(mu, delta, alpha, beta, lambda),
main = "Generalized Hyperbolic Q-Q Plot",
xlab = "Theoretical Quantiles",
ylab = "Sample Quantiles",
plot.it = TRUE, line = TRUE, ...)
ppghyp(y, mu = 0, delta = 1, alpha = 1, beta = 0, lambda = 1,
param = c(mu, delta, alpha, beta, lambda),
main = "Generalized Hyperbolic P-P Plot",
xlab = "Uniform Quantiles",
ylab = "Probability-integral-transformed Data",
plot.it = TRUE, line = TRUE, ...)
Arguments
y |
The data sample. |
mu |
|
delta |
|
alpha |
|
beta |
|
lambda |
|
param |
Parameters of the generalized hyperbolic distribution. |
xlab, ylab, main |
Plot labels. |
plot.it |
Logical. Should the result be plotted? |
line |
Add line through origin with unit slope. |
... |
Further graphical parameters. |
Value
For qqghyp and ppghyp, a list with components:
x |
The x coordinates of the points that are to be plotted. |
y |
The y coordinates of the points that are to be plotted. |
References
Wilk, M. B. and Gnanadesikan, R. (1968) Probability plotting methods for the analysis of data. Biometrika. 55, 1–17.
See Also
ppoints, dghyp.
Examples
par(mfrow = c(1, 2))
y <- rghyp(200, param = c(2, 2, 2, 1, 2))
qqghyp(y, param = c(2, 2, 2, 1, 2), line = FALSE)
abline(0, 1, col = 2)
ppghyp(y, param = c(2, 2, 2, 1, 2))
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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