Some Generalized Families of Weibull Distribution: Properties and Applications

Abstract: The Weibull distribution has been applied in various fields, especially to fit life time data. Some of these applications are limited partly due to the fact that the distribution has monotonically increasing, monotonically decreasing or constant hazard rate. This limitation undoubtedly inspired researchers to develop generalized Weibull distribution that can exhibit unimodal or bathtub hazard rate. In this article, we introduce six new families of T-Weibull{Y} distributions arising from the quantile function o… Show more

“…The result follows directly by using part (iii) of Lemma 2 in Almheidat et al (2015) when the random variable T follows a Lomax distribution. The closed form quantile function in (11) makes simulating the LWD random variates straightforward.…”

“…Eugene, Lee, and Famoye (2002) introduced the beta-generated family and some properties of the family were studied by Jones (2004). Many beta-generated distributions were studied (e.g., Eugene et al, 2002;Nadarajah & Kotz, 2004;Famoye, Lee, & Eugene, 2004;Famoye, Lee, & Olumolade, 2005;Nadarajah & Kotz, 2006;Akinsete, Famoye, & Lee, 2008;Barreto-Souza, Santos, & Cordeiro, 2010;Mahmoudi, 2011;Alshawarbeh, Lee, & Famoye, 2012). For a review of betagenerated distributions and other generalizations, see Lee, Famoye, and Alzaatreh (2013).…”

“…Setting β = 1 = θ and taking T in (4) to be a Lomax random variable with CDF FT(x) = 1 -(1 + (x/θ)) -α , Almheidat et al (2015) defined the Lomax-Weibull{LL} distribution (LWD) as an example of T-Weibull{LL} family.…”

“…Almheidat, Famoye, and Lee (2015) used the T-R{Y} framework to define and study different approaches to the generalization of the Weibull distribution, the T-Weibull{Y} family. The authors defined the T-Weibull{Y} family by taking R in (2) to be a Weibull random variable with CDF   …”

“…Alzaatreh, Lee, and Famoye (2013) studied in details the case when W(F(x)) = -log(1 -F(x)). Some members of the family have been investigated, including gamma-Pareto distribution (Alzaatreh, Famoye, & Lee, 2012), WeibullPareto distribution , and gamma-normal distribution (Alzaatreh, Famoye, & Lee, 2014a). Aljarrah, Lee, and Famoye (2014) used the quantile function QY of a random variable Y to define the transformation W(.)…”

A Generalization of the Weibull Distribution with Applications

“…The result follows directly by using part (iii) of Lemma 2 in Almheidat et al (2015) when the random variable T follows a Lomax distribution. The closed form quantile function in (11) makes simulating the LWD random variates straightforward.…”

“…Eugene, Lee, and Famoye (2002) introduced the beta-generated family and some properties of the family were studied by Jones (2004). Many beta-generated distributions were studied (e.g., Eugene et al, 2002;Nadarajah & Kotz, 2004;Famoye, Lee, & Eugene, 2004;Famoye, Lee, & Olumolade, 2005;Nadarajah & Kotz, 2006;Akinsete, Famoye, & Lee, 2008;Barreto-Souza, Santos, & Cordeiro, 2010;Mahmoudi, 2011;Alshawarbeh, Lee, & Famoye, 2012). For a review of betagenerated distributions and other generalizations, see Lee, Famoye, and Alzaatreh (2013).…”

“…Setting β = 1 = θ and taking T in (4) to be a Lomax random variable with CDF FT(x) = 1 -(1 + (x/θ)) -α , Almheidat et al (2015) defined the Lomax-Weibull{LL} distribution (LWD) as an example of T-Weibull{LL} family.…”

“…Almheidat, Famoye, and Lee (2015) used the T-R{Y} framework to define and study different approaches to the generalization of the Weibull distribution, the T-Weibull{Y} family. The authors defined the T-Weibull{Y} family by taking R in (2) to be a Weibull random variable with CDF   …”

“…Alzaatreh, Lee, and Famoye (2013) studied in details the case when W(F(x)) = -log(1 -F(x)). Some members of the family have been investigated, including gamma-Pareto distribution (Alzaatreh, Famoye, & Lee, 2012), WeibullPareto distribution , and gamma-normal distribution (Alzaatreh, Famoye, & Lee, 2014a). Aljarrah, Lee, and Famoye (2014) used the quantile function QY of a random variable Y to define the transformation W(.)…”

A Generalization of the Weibull Distribution with Applications

Quantile Generated Nadarajah–Haghighi Family of Distributions

The survival Weibull-uniform distribution and application