Weighted Negative Binomial Poisson-Lindley Distribution with Actuarial Applications

Abstract: This study introduces a new discrete distribution which is a weighted version of Poisson-Lindley distribution. The weighted distribution is obtained using the negative binomial weight function and can be fitted to count data with over-dispersion. The p.m.f., p.g.f. and simulation procedure of the new weighted distribution, namely weighted negative binomial Poisson-Lindley (WNBPL), are provided. The maximum likelihood method for parameter estimation is also presented. The WNBPL distribution is fitted to several… Show more

“…Also, Havrda and Charvat [15] introduced −entropy class as follows: where is a non-stochastic constant, by using (15) and (7) and after some elementary algebra, we have:…”

“…Let X 1 , X 2 , ..., X N be random variables that are i.i.d. according to (7) and Θ = ( i, j, , , Ω ) T . The log-likelihood function of the independent multivariate generalized weighted of the NA distribution based on X 1 , X 2 , ..., X N is given by…”

“…In this article, we pay attention to a selection model from the NA distribution. Selection distributions have been considered extensively by many authors; for a best survey of estimation method discussions and applications, see Heckman [2], Copas and Li [3], Arrellano-Valle et al [4], Signer et al [5], Balakrishnan et al [6], Zamani et al [7] and Arashi et al [8] and more recently. The organization of this paper is as follows: In Section 2, we present definition and some representations of this model.…”

Construction, Characterization, Estimation and Performance Analysis of Selection Generalized Nakagami Distributions with Environmental Applications

“…Also, Havrda and Charvat [15] introduced −entropy class as follows: where is a non-stochastic constant, by using (15) and (7) and after some elementary algebra, we have:…”

“…Let X 1 , X 2 , ..., X N be random variables that are i.i.d. according to (7) and Θ = ( i, j, , , Ω ) T . The log-likelihood function of the independent multivariate generalized weighted of the NA distribution based on X 1 , X 2 , ..., X N is given by…”

“…In this article, we pay attention to a selection model from the NA distribution. Selection distributions have been considered extensively by many authors; for a best survey of estimation method discussions and applications, see Heckman [2], Copas and Li [3], Arrellano-Valle et al [4], Signer et al [5], Balakrishnan et al [6], Zamani et al [7] and Arashi et al [8] and more recently. The organization of this paper is as follows: In Section 2, we present definition and some representations of this model.…”

Construction, Characterization, Estimation and Performance Analysis of Selection Generalized Nakagami Distributions with Environmental Applications