WEI3: A specific parameterization of the Weibull distribution for...
In mstasinopoulos/GAMLSS-Distibutions: Distributions for Generalized Additive Models for Location Scale and Shape
WEI3 R Documentation
A specific parameterization of the Weibull
distribution for fitting a GAMLSS
Description
The function WEI3 can be used to define the Weibull distribution, a two parameter distribution, for a
gamlss.family object to be used in GAMLSS fitting using the function gamlss().
This is a parameterization of the Weibull distribution where \mu is the mean of the distribution.
[Note that the GAMLSS functions WEI and WEI2 use
different parameterizations for fitting the Weibull distribution.]
The functions dWEI3, pWEI3, qWEI3 and rWEI3 define the density, distribution function, quantile function and random
generation for the specific parameterization of the Weibull distribution.
Usage
WEI3(mu.link = "log", sigma.link = "log")
dWEI3(x, mu = 1, sigma = 1, log = FALSE)
pWEI3(q, mu = 1, sigma = 1, lower.tail = TRUE, log.p = FALSE)
qWEI3(p, mu = 1, sigma = 1, lower.tail = TRUE, log.p = FALSE)
rWEI3(n, mu = 1, sigma = 1)
Arguments
mu.link
Defines the mu.link, with "log" link as the default for the mu parameter, other links are "inverse" and "identity"
sigma.link
Defines the sigma.link, with "log" link as the default for the sigma parameter, other link is the "inverse" and "identity"
x,q
vector of quantiles
mu
vector of the mu parameter values
sigma
vector of sigma parameter values
log, log.p
logical; if TRUE, probabilities p are given as log(p).
lower.tail
logical; if TRUE (default), probabilities are P[X <= x],
otherwise, P[X > x]
p
vector of probabilities.
n
number of observations. If length(n) > 1, the length is
taken to be the number required
Details
The parameterization of the function WEI3 is given by
f(y|\mu,\sigma)= \frac{\sigma}{\beta} \left(\frac{y}{\beta}\right)^{\sigma-1} e^{-\left(\frac{y}{\beta}\right)^{\sigma}}
where \beta=\frac{\mu}{\Gamma((1/\sigma)+1)} for y>0, \mu>0 and \sigma>0 see pp. 437-438 of Rigby et al. (2019).
The GAMLSS functions dWEI3, pWEI3, qWEI3, and rWEI3 can be used to provide the pdf, the cdf, the quantiles and
random generated numbers for the Weibull distribution with argument mu, and sigma.
[See the GAMLSS function WEI for a different parameterization of the Weibull.]
Value
WEI3() returns a gamlss.family object which can be used to fit a Weibull distribution in the gamlss() function.
dWEI3() gives the density, pWEI3() gives the distribution
function, qWEI3() gives the quantile function, and rWEI3()
generates random deviates. The latest functions are based on the equivalent R functions for Weibull distribution.
Warning
In WEI3 the estimated parameters mu and sigma can be highly correlated so it is advisable to use the
CG() method for fitting [as the RS() method can be very slow in this situation.]
Note
The mean in WEI3 is given by \mu and the variance
\mu^2 \left\{\Gamma(2/\sigma +1)/ \left[ \Gamma(1/\sigma +1)\right]^2 -1\right\} see pp. 438 of Rigby et al. (2019)
Author(s)
Bob Rigby and Mikis Stasinopoulos
References
Rigby, R. A. and Stasinopoulos D. M. (2005). Generalized additive models for location, scale and shape,(with discussion),
Appl. Statist., 54, part 3, pp 507-554.
Rigby, R. A., Stasinopoulos, D. M., Heller, G. Z., and De Bastiani, F. (2019)
Distributions for modeling location, scale, and shape: Using GAMLSS in R, Chapman and Hall/CRC, \Sexpr[results=rd]{tools:::Rd_expr_doi("10.1201/9780429298547")}. An older version can be found in https://www.gamlss.com/.
Stasinopoulos D. M. Rigby R.A. (2007) Generalized additive models for location scale and shape (GAMLSS) in R.
Journal of Statistical Software, Vol. 23, Issue 7, Dec 2007, \Sexpr[results=rd]{tools:::Rd_expr_doi("10.18637/jss.v023.i07")}.
Stasinopoulos D. M., Rigby R.A., Heller G., Voudouris V., and De Bastiani F., (2017)
Flexible Regression and Smoothing: Using GAMLSS in R,
Chapman and Hall/CRC. \Sexpr[results=rd]{tools:::Rd_expr_doi("10.1201/b21973")}
(see also https://www.gamlss.com/).
See Also
gamlss.family, WEI, WEI2
Examples
WEI3()
dat<-rWEI(100, mu=.1, sigma=2)
# library(gamlss)
# gamlss(dat~1, family=WEI3, method=CG())
mstasinopoulos/GAMLSS-Distibutions documentation built on Nov. 3, 2023, 10:33 a.m.
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| WEI3 | R Documentation |
A specific parameterization of the Weibull distribution for fitting a GAMLSS
Description
The function WEI3 can be used to define the Weibull distribution, a two parameter distribution, for a
gamlss.family object to be used in GAMLSS fitting using the function gamlss().
This is a parameterization of the Weibull distribution where \mu is the mean of the distribution.
[Note that the GAMLSS functions WEI and WEI2 use
different parameterizations for fitting the Weibull distribution.]
The functions dWEI3, pWEI3, qWEI3 and rWEI3 define the density, distribution function, quantile function and random
generation for the specific parameterization of the Weibull distribution.
Usage
WEI3(mu.link = "log", sigma.link = "log")
dWEI3(x, mu = 1, sigma = 1, log = FALSE)
pWEI3(q, mu = 1, sigma = 1, lower.tail = TRUE, log.p = FALSE)
qWEI3(p, mu = 1, sigma = 1, lower.tail = TRUE, log.p = FALSE)
rWEI3(n, mu = 1, sigma = 1)
Arguments
mu.link |
Defines the |
sigma.link |
Defines the |
x,q |
vector of quantiles |
mu |
vector of the mu parameter values |
sigma |
vector of sigma parameter values |
log, log.p |
logical; if TRUE, probabilities p are given as log(p). |
lower.tail |
logical; if TRUE (default), probabilities are P[X <= x], otherwise, P[X > x] |
p |
vector of probabilities. |
n |
number of observations. If |
Details
The parameterization of the function WEI3 is given by
f(y|\mu,\sigma)= \frac{\sigma}{\beta} \left(\frac{y}{\beta}\right)^{\sigma-1} e^{-\left(\frac{y}{\beta}\right)^{\sigma}}
where \beta=\frac{\mu}{\Gamma((1/\sigma)+1)} for y>0, \mu>0 and \sigma>0 see pp. 437-438 of Rigby et al. (2019).
The GAMLSS functions dWEI3, pWEI3, qWEI3, and rWEI3 can be used to provide the pdf, the cdf, the quantiles and
random generated numbers for the Weibull distribution with argument mu, and sigma.
[See the GAMLSS function WEI for a different parameterization of the Weibull.]
Value
WEI3() returns a gamlss.family object which can be used to fit a Weibull distribution in the gamlss() function.
dWEI3() gives the density, pWEI3() gives the distribution
function, qWEI3() gives the quantile function, and rWEI3()
generates random deviates. The latest functions are based on the equivalent R functions for Weibull distribution.
Warning
In WEI3 the estimated parameters mu and sigma can be highly correlated so it is advisable to use the
CG() method for fitting [as the RS() method can be very slow in this situation.]
Note
The mean in WEI3 is given by \mu and the variance
\mu^2 \left\{\Gamma(2/\sigma +1)/ \left[ \Gamma(1/\sigma +1)\right]^2 -1\right\} see pp. 438 of Rigby et al. (2019)
Author(s)
Bob Rigby and Mikis Stasinopoulos
References
Rigby, R. A. and Stasinopoulos D. M. (2005). Generalized additive models for location, scale and shape,(with discussion), Appl. Statist., 54, part 3, pp 507-554.
Rigby, R. A., Stasinopoulos, D. M., Heller, G. Z., and De Bastiani, F. (2019) Distributions for modeling location, scale, and shape: Using GAMLSS in R, Chapman and Hall/CRC, \Sexpr[results=rd]{tools:::Rd_expr_doi("10.1201/9780429298547")}. An older version can be found in https://www.gamlss.com/.
Stasinopoulos D. M. Rigby R.A. (2007) Generalized additive models for location scale and shape (GAMLSS) in R. Journal of Statistical Software, Vol. 23, Issue 7, Dec 2007, \Sexpr[results=rd]{tools:::Rd_expr_doi("10.18637/jss.v023.i07")}.
Stasinopoulos D. M., Rigby R.A., Heller G., Voudouris V., and De Bastiani F., (2017) Flexible Regression and Smoothing: Using GAMLSS in R, Chapman and Hall/CRC. \Sexpr[results=rd]{tools:::Rd_expr_doi("10.1201/b21973")}
(see also https://www.gamlss.com/).
See Also
gamlss.family, WEI, WEI2
Examples
WEI3()
dat<-rWEI(100, mu=.1, sigma=2)
# library(gamlss)
# gamlss(dat~1, family=WEI3, method=CG())
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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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