gammag2: gamma uniform type II G distribution
In MPS: Estimating Through the Maximum Product Spacing Approach
Description
Usage
Arguments
Details
Value
Author(s)
References
Examples
Description
Computes the pdf, cdf, quantile, and random numbers, draws the q-q plot, and estimates the parameters of the gamma uniform type II G distribution . General form for the probability density function (pdf) of the gamma uniform type II G distribution due to Ristic and Balakrishnan (2012) is given by
f(x,{Θ}) = \frac{{g(x-μ,θ )}}{{Γ ≤ft( a \right)}}{≤ft[ { - \log ≤ft( {G(x-μ,θ )} \right)} \right]^{a - 1}},
where θ is the baseline family parameter vector. Also, a>0 and μ are the extra parameters induced to the baseline cumulative distribution function (cdf) G whose pdf is g. The general form for the cumulative distribution function (cdf) of the gamma uniform type II G distribution is given by
F(x,{Θ}) = \int_0^{ - \log ≤ft( {G(x-μ,θ )} \right)} {\frac{{{y^{a - 1}}{e^{ - y}}}}{{Γ (a)}}dy}.
Here, the baseline G refers to the cdf of famous families such as: Birnbaum-Saunders, Burr type XII, Exponential, Chen, Chisquare, F, Frechet, Gamma, Gompertz, Linear failure rate (lfr), Log-normal, Log-logistic, Lomax, Rayleigh, and Weibull. The parameter vector is Θ=(a,θ,μ) where θ is the baseline G family's parameter space. If θ consists of the shape and scale parameters, the last component of θ is the scale parameter (here, a is the shape parameter). Always, the location parameter μ is placed in the last component of Θ.
Usage
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dgammag2(mydata, g, param, location = TRUE, log=FALSE)
pgammag2(mydata, g, param, location = TRUE, log.p = FALSE, lower.tail = TRUE)
qgammag2(p, g, param, location = TRUE, log.p = FALSE, lower.tail = TRUE)
rgammag2(n, g, param, location = TRUE)
qqgammag2(mydata, g, location = TRUE, method)
mpsgammag2(mydata, g, location = TRUE, method, sig.level)
Arguments
g
The name of family's pdf including: "birnbaum-saunders", "burrxii", "chisq", "chen", "exp", "f", "frechet", "gamma", "gompetrz", "lfr", "log-normal", "log-logistic", "lomax", "rayleigh", and "weibull".
p
a vector of value(s) between 0 and 1 at which the quantile needs to be computed.
n
number of realizations to be generated.
mydata
Vector of observations.
param
parameter vector Θ=(a,θ,μ)
location
If FALSE, then the location parameter will be omitted.
log
If TRUE, then log(pdf) is returned.
log.p
If TRUE, then log(cdf) is returned and quantile is computed for exp(-p).
lower.tail
If FALSE, then 1-cdf is returned and quantile is computed for 1-p.
method
The used method for maximizing the sum of log-spacing function. It will be "BFGS", "CG", "L-BFGS-B", "Nelder-Mead", or "SANN".
sig.level
Significance level for the Chi-square goodness-of-fit test.
Details
It can be shown that the Moran's statistic follows a normal distribution. Also, a chi-square approximation exists for small samples whose mean and variance approximately are m(log(m)+0.57722)-0.5-1/(12m) and m(π^2/6-1)-0.5-1/(6m), respectively, with m=n+1, see Cheng and Stephens (1989). So, a hypothesis tesing can be constructed based on a sample of n independent realizations at the given significance level, indicated in above as sig.level.
Value
A vector of the same length as mydata, giving the pdf values computed at mydata.
A vector of the same length as mydata, giving the cdf values computed at mydata.
A vector of the same length as p, giving the quantile values computed at p.
A vector of the same length as n, giving the random numbers realizations.
A sequence of goodness-of-fit statistics such as: Akaike Information Criterion (AIC), Consistent Akaike Information Criterion (CAIC), Bayesian Information Criterion (BIC), Hannan-Quinn information criterion (HQIC), Cramer-von Misses statistic (CM), Anderson Darling statistic (AD), log-likelihood statistic (log), and Moran's statistic (M). The Kolmogorov-Smirnov (KS) test statistic and corresponding p-value. The Chi-square test statistic, critical upper tail Chi-square distribution, related p-value, and the convergence status.
Author(s)
Mahdi Teimouri
References
Cheng, R. C. H. and Stephens, M. A. (1989). A goodness-of-fit test using Moran's statistic with estimated parameters, Biometrika, 76 (2), 385-392.
Ristic, M. M. and Balakrishnan, N. (2012). The gamma exponentiated exponential distribution, Journal of Statistical Computation and Simulation, 82, 1191-1206.
Examples
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mydata<-rweibull(100,shape=2,scale=2)+3
dgammag2(mydata, "weibull", c(1,2,2,3))
pgammag2(mydata, "weibull", c(1,2,2,3))
qgammag2(runif(100), "weibull", c(1,2,2,3))
rgammag2(100, "weibull", c(1,2,2,3))
qqgammag2(mydata, "weibull", TRUE, "Nelder-Mead")
mpsgammag2(mydata, "weibull", TRUE, "Nelder-Mead", 0.05)
MPS documentation built on Oct. 5, 2019, 1:04 a.m.
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Description Usage Arguments Details Value Author(s) References Examples
Description
Computes the pdf, cdf, quantile, and random numbers, draws the q-q plot, and estimates the parameters of the gamma uniform type II G distribution . General form for the probability density function (pdf) of the gamma uniform type II G distribution due to Ristic and Balakrishnan (2012) is given by
f(x,{Θ}) = \frac{{g(x-μ,θ )}}{{Γ ≤ft( a \right)}}{≤ft[ { - \log ≤ft( {G(x-μ,θ )} \right)} \right]^{a - 1}},
where θ is the baseline family parameter vector. Also, a>0 and μ are the extra parameters induced to the baseline cumulative distribution function (cdf) G whose pdf is g. The general form for the cumulative distribution function (cdf) of the gamma uniform type II G distribution is given by
F(x,{Θ}) = \int_0^{ - \log ≤ft( {G(x-μ,θ )} \right)} {\frac{{{y^{a - 1}}{e^{ - y}}}}{{Γ (a)}}dy}.
Here, the baseline G refers to the cdf of famous families such as: Birnbaum-Saunders, Burr type XII, Exponential, Chen, Chisquare, F, Frechet, Gamma, Gompertz, Linear failure rate (lfr), Log-normal, Log-logistic, Lomax, Rayleigh, and Weibull. The parameter vector is Θ=(a,θ,μ) where θ is the baseline G family's parameter space. If θ consists of the shape and scale parameters, the last component of θ is the scale parameter (here, a is the shape parameter). Always, the location parameter μ is placed in the last component of Θ.
Usage
1 2 3 4 5 6 | dgammag2(mydata, g, param, location = TRUE, log=FALSE)
pgammag2(mydata, g, param, location = TRUE, log.p = FALSE, lower.tail = TRUE)
qgammag2(p, g, param, location = TRUE, log.p = FALSE, lower.tail = TRUE)
rgammag2(n, g, param, location = TRUE)
qqgammag2(mydata, g, location = TRUE, method)
mpsgammag2(mydata, g, location = TRUE, method, sig.level)
|
Arguments
g |
The name of family's pdf including: " |
p |
a vector of value(s) between 0 and 1 at which the quantile needs to be computed. |
n |
number of realizations to be generated. |
mydata |
Vector of observations. |
param |
parameter vector Θ=(a,θ,μ) |
location |
If |
log |
If |
log.p |
If |
lower.tail |
If |
method |
The used method for maximizing the sum of log-spacing function. It will be " |
sig.level |
Significance level for the Chi-square goodness-of-fit test. |
Details
It can be shown that the Moran's statistic follows a normal distribution. Also, a chi-square approximation exists for small samples whose mean and variance approximately are m(log(m)+0.57722)-0.5-1/(12m) and m(π^2/6-1)-0.5-1/(6m), respectively, with m=n+1, see Cheng and Stephens (1989). So, a hypothesis tesing can be constructed based on a sample of n independent realizations at the given significance level, indicated in above as sig.level.
Value
A vector of the same length as
mydata, giving the pdf values computed atmydata.A vector of the same length as
mydata, giving the cdf values computed atmydata.A vector of the same length as
p, giving the quantile values computed atp.A vector of the same length as
n, giving the random numbers realizations.A sequence of goodness-of-fit statistics such as: Akaike Information Criterion (
AIC), Consistent Akaike Information Criterion (CAIC), Bayesian Information Criterion (BIC), Hannan-Quinn information criterion (HQIC), Cramer-von Misses statistic (CM), Anderson Darling statistic (AD), log-likelihood statistic (log), and Moran's statistic (M). The Kolmogorov-Smirnov (KS) test statistic and correspondingp-value. The Chi-square test statistic, critical upper tail Chi-square distribution, relatedp-value, and the convergence status.
Author(s)
Mahdi Teimouri
References
Cheng, R. C. H. and Stephens, M. A. (1989). A goodness-of-fit test using Moran's statistic with estimated parameters, Biometrika, 76 (2), 385-392.
Ristic, M. M. and Balakrishnan, N. (2012). The gamma exponentiated exponential distribution, Journal of Statistical Computation and Simulation, 82, 1191-1206.
Examples
1 2 3 4 5 6 7 | mydata<-rweibull(100,shape=2,scale=2)+3
dgammag2(mydata, "weibull", c(1,2,2,3))
pgammag2(mydata, "weibull", c(1,2,2,3))
qgammag2(runif(100), "weibull", c(1,2,2,3))
rgammag2(100, "weibull", c(1,2,2,3))
qqgammag2(mydata, "weibull", TRUE, "Nelder-Mead")
mpsgammag2(mydata, "weibull", TRUE, "Nelder-Mead", 0.05)
|
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