The paper introduces a new distribution called the Lomax-Weibull distribution using the competing risk approach of constructing lifetime distributions. Some structural and mathematical properties of the proposed lifetime distribution are considered. Parameter estimation of the Lomax Weibull distribution is obtained using maximum likelihood estimation. The applicability and flexibility of the new distribution in lifetime analysis is illustrated with the aid of two real life examples
In this paper, a new four-parameter lifetime distribution, called the exponentiated Lomax geometric ...
A new generalized class of distributions called the Loglogistic Extended-Weibull Logarithmic (LLoGEW...
The paper investigates a new scheme for generating lifetime probability distributions. The scheme is...
In this paper, the exponentiated Lomax-Weibull distribution is constructed as a new lifetime model u...
A four-parameter lifetime model, named the Weibull inverse Lomax (WIL) is presented and studied. Som...
In this paper, a new four parameter lifetime distribution called the Topp Leone Weibull-Lomax distri...
In this paper, a new family of distributions is proposed by using quantile functions of known distri...
A four parameter generalization of the Weibull distribution capable of modeling a bathtub-shaped haz...
In this manuscript, we have derived a new lifetime distribution named generalized Weibull–Lindley (G...
The basic Weibull distribution is considered the most fundamental and basic lifetime distribution. V...
We introduce a new generalization of Weibull distribution by making use of a transformation of the s...
We introduce a new three-parameter lifetime model called the Lindley Weibull distribution, which acc...
Abstract We introduce a new three-parameter lifetime model called the Lindley Weibull distribution, ...
In this paper, a new modification of the Lomax distribution is considered named as Lomax exponential...
A new class of distribution called the generalized Lindley-Weibull distribution for modeling lifetim...
In this paper, a new four-parameter lifetime distribution, called the exponentiated Lomax geometric ...
A new generalized class of distributions called the Loglogistic Extended-Weibull Logarithmic (LLoGEW...
The paper investigates a new scheme for generating lifetime probability distributions. The scheme is...
In this paper, the exponentiated Lomax-Weibull distribution is constructed as a new lifetime model u...
A four-parameter lifetime model, named the Weibull inverse Lomax (WIL) is presented and studied. Som...
In this paper, a new four parameter lifetime distribution called the Topp Leone Weibull-Lomax distri...
In this paper, a new family of distributions is proposed by using quantile functions of known distri...
A four parameter generalization of the Weibull distribution capable of modeling a bathtub-shaped haz...
In this manuscript, we have derived a new lifetime distribution named generalized Weibull–Lindley (G...
The basic Weibull distribution is considered the most fundamental and basic lifetime distribution. V...
We introduce a new generalization of Weibull distribution by making use of a transformation of the s...
We introduce a new three-parameter lifetime model called the Lindley Weibull distribution, which acc...
Abstract We introduce a new three-parameter lifetime model called the Lindley Weibull distribution, ...
In this paper, a new modification of the Lomax distribution is considered named as Lomax exponential...
A new class of distribution called the generalized Lindley-Weibull distribution for modeling lifetim...
In this paper, a new four-parameter lifetime distribution, called the exponentiated Lomax geometric ...
A new generalized class of distributions called the Loglogistic Extended-Weibull Logarithmic (LLoGEW...
The paper investigates a new scheme for generating lifetime probability distributions. The scheme is...