gamma-X family of modified beta exponential G distribution

Description

Computes the pdf, cdf, quantile, and random numbers, draws the q-q plot, and estimates the parameters of the gamma-X family of modified beta exponential G distribution. The General form for the probability density function (pdf) of the gamma-X family of the modified beta exponential G distribution due to Alzaatreh et al. (2013) is given by

f(x,{\Theta}) = abg(x-\mu,\theta ){\left( {1 - G(x-\mu,\theta )} \right)^{ - 2}}{e^{ - b\frac{{G(x-\mu,\theta )}}{{1 - G(x-\mu,\theta )}}}}{\left[ {1 - {e^{ - b\frac{{G(x-\mu,\theta )}}{{1 - G(x-\mu,\theta )}}}}} \right]^{a - 1}},

where \theta is the baseline family parameter vector. Also, a>0, b>0, and \mu 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-X family of modified beta exponential G distribution is given by

F(x,{\Theta}) = {\left( {1 - {e^{ - b\frac{{G(x-\mu,\theta )}}{{1 - G(x-\mu,\theta )}}}}} \right)^a}.

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 \Theta=(a,b,\theta,\mu) where \theta is the baseline G family's parameter space. If \theta consists of the shape and scale parameters, the last component of \theta is the scale parameter (here, a and b are the first and second shape parameters). Always, the location parameter \mu is placed in the last component of \Theta.

Usage

dgmbetaexpg(mydata, g, param, location = TRUE, log=FALSE)
pgmbetaexpg(mydata, g, param, location = TRUE, log.p = FALSE, lower.tail = TRUE)
qgmbetaexpg(p, g, param, location = TRUE, log.p = FALSE, lower.tail = TRUE)
rgmbetaexpg(n, g, param, location = TRUE)
qqgmbetaexpg(mydata, g, location = TRUE, method)
mpsgmbetaexpg(mydata, g, location = TRUE, method, sig.level)

Arguments

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(\pi^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

1. A vector of the same length as mydata, giving the pdf values computed at mydata.

2. A vector of the same length as mydata, giving the cdf values computed at mydata.

3. A vector of the same length as p, giving the quantile values computed at p.

4. A vector of the same length as n, giving the random numbers realizations.

5. 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.

Alzaatreh, A., Lee, C., and Famoye, F. (2013). A new method for generating families of continuous distributions, Metron, 71, 63-79.

Examples

mydata<-rweibull(100,shape=2,scale=2)+3
dgmbetaexpg(mydata, "weibull", c(1,1,2,2,3))
pgmbetaexpg(mydata, "weibull", c(1,1,2,2,3))
qgmbetaexpg(runif(100), "weibull", c(1,1,2,2,3))
rgmbetaexpg(100, "weibull", c(1,1,2,2,3))
qqgmbetaexpg(mydata, "weibull", TRUE, "Nelder-Mead")
mpsgmbetaexpg(mydata, "weibull", TRUE, "Nelder-Mead", 0.05)