We introduce a new extension of the reciprocal Exponential distribution for modeling the extreme values. We used the Morgenstern family and the clayton copula for deriving many bivariate and multivariate extensions of the new model. Some of its properties are derived. We assessed the performance of the maximum likelihood estimators (MLEs) via a graphical simulation study. The assessment was based on the sample size. The new reciprocal model is employed for modeling the skewed and the symmetric real data sets. The new reciprocal model is better than some other important competitive models in statistical modeling
A new class of bivariate distributions is introduced and studied, which encompasses Archimedean copu...
Statistical models with parsimonious dependence are useful for high-dimensional modelling as they of...
In order to characterize the dependence of extreme risk, the concept of tail dependence for bivariat...
A new extension of the reciprocal Rayleigh distribution is introduced. Simple type copula-based cons...
In this article, we defined and studied a new distribution for modeling extreme value. Some of its m...
A new univariate extension of the Fréchet distribution is proposed and studied. Some of its fundamen...
The use of the exponential distribution and its multivariate generalizations is extremely popular in...
A new generalization of Burr type XII model is introduced and studied. The genesis of the new model ...
In this article, we introduce a new generalization of the Exponentiated Exponential distribution. Va...
A new generalization of Lomax distribution is derived and studied. Some of its useful properties are...
In this research we introduce a new class of multivariate probability models to the marketing litera...
A new ‡exible extension of the Fréchet model is proposed and studied. Some of itsfundamental statis...
A new univariate extension of the Inverse Rayleigh distribution is proposed and studied. Some of its...
This paper presents a novel two-parameter G family of distributions. Relevant statistical properties...
Multivariate extreme value models are a fundamental tool in order to assess potentially dangerous ev...
A new class of bivariate distributions is introduced and studied, which encompasses Archimedean copu...
Statistical models with parsimonious dependence are useful for high-dimensional modelling as they of...
In order to characterize the dependence of extreme risk, the concept of tail dependence for bivariat...
A new extension of the reciprocal Rayleigh distribution is introduced. Simple type copula-based cons...
In this article, we defined and studied a new distribution for modeling extreme value. Some of its m...
A new univariate extension of the Fréchet distribution is proposed and studied. Some of its fundamen...
The use of the exponential distribution and its multivariate generalizations is extremely popular in...
A new generalization of Burr type XII model is introduced and studied. The genesis of the new model ...
In this article, we introduce a new generalization of the Exponentiated Exponential distribution. Va...
A new generalization of Lomax distribution is derived and studied. Some of its useful properties are...
In this research we introduce a new class of multivariate probability models to the marketing litera...
A new ‡exible extension of the Fréchet model is proposed and studied. Some of itsfundamental statis...
A new univariate extension of the Inverse Rayleigh distribution is proposed and studied. Some of its...
This paper presents a novel two-parameter G family of distributions. Relevant statistical properties...
Multivariate extreme value models are a fundamental tool in order to assess potentially dangerous ev...
A new class of bivariate distributions is introduced and studied, which encompasses Archimedean copu...
Statistical models with parsimonious dependence are useful for high-dimensional modelling as they of...
In order to characterize the dependence of extreme risk, the concept of tail dependence for bivariat...