In this article, we use Lehmann alternative-II to extend the odd generalized exponential family. The uniqueness of this family lies in the fact that this transformation has resulted in a multitude of inverted distribution families with important applications in actuarial field. We can characterize the density of the new family as a linear combination of generalised exponential distributions, which is useful for studying some of the family’s properties. Among the structural characteristics of this family that are being identified are explicit expressions for numerous types of moments, the quantile function, stress-strength reliability, generating function, Rényi entropy, stochastic ordering, and order statistics. The maximum likelihood metho...
The need to develop generalizations of existing statistical distributions to make them more flexible...
Communication in Physical Sciences, 2022, 8(4):442-455 *Abdulmuahymin Abiola Sanusi, Sani Ibrahim Do...
In this article, a new ``odd generalized gamma-G" family of distributions, called the GG-G family of...
A new family of distributions called the odd generalized N-H is introduced and studied. Four new spe...
We introduce a new class of distributions called the generalized odd generalized exponential family....
In this paper, we introduce a new family of distributions based on the T-X transformation , the inve...
In this article, we propose a new family of distributions called odd Burr-III family of distribution...
A new univariate extension of the Fréchet distribution is proposed and studied. Some of its fundamen...
A novel family of produced distributions, odd inverse power generalized Weibull generated distributi...
The truncated Cauchy power odd Fréchet-G family of distributions is presented in this article. This ...
There exist remain many problems in real life where observed data does not follow any of the well-kn...
This work proposes an inverse odd Weibull (IOW) family of distributions for a lifetime distributions...
A new family of distributions called exponentiated half-logistic Odd Burr III-G (EHL-OBIII-G) is dev...
The Weibull distribution is one of the most popular and widely used model for failure time in life-t...
The inverted generalized exponential distribution is defined as an alternative model for lifetime da...
The need to develop generalizations of existing statistical distributions to make them more flexible...
Communication in Physical Sciences, 2022, 8(4):442-455 *Abdulmuahymin Abiola Sanusi, Sani Ibrahim Do...
In this article, a new ``odd generalized gamma-G" family of distributions, called the GG-G family of...
A new family of distributions called the odd generalized N-H is introduced and studied. Four new spe...
We introduce a new class of distributions called the generalized odd generalized exponential family....
In this paper, we introduce a new family of distributions based on the T-X transformation , the inve...
In this article, we propose a new family of distributions called odd Burr-III family of distribution...
A new univariate extension of the Fréchet distribution is proposed and studied. Some of its fundamen...
A novel family of produced distributions, odd inverse power generalized Weibull generated distributi...
The truncated Cauchy power odd Fréchet-G family of distributions is presented in this article. This ...
There exist remain many problems in real life where observed data does not follow any of the well-kn...
This work proposes an inverse odd Weibull (IOW) family of distributions for a lifetime distributions...
A new family of distributions called exponentiated half-logistic Odd Burr III-G (EHL-OBIII-G) is dev...
The Weibull distribution is one of the most popular and widely used model for failure time in life-t...
The inverted generalized exponential distribution is defined as an alternative model for lifetime da...
The need to develop generalizations of existing statistical distributions to make them more flexible...
Communication in Physical Sciences, 2022, 8(4):442-455 *Abdulmuahymin Abiola Sanusi, Sani Ibrahim Do...
In this article, a new ``odd generalized gamma-G" family of distributions, called the GG-G family of...