Add to ORKGThe proportional likelihood ratio order is an extension of the likelihood ratio order for the non-negative abso-lutely continuous random variables. In addition, the Lindley distribution has been over looked as a mixture of two exponential distributions due to the popularity of the exponential distribution. In this paper, we first recalled the above concepts and then obtained various properties of the Lindley distribution due to the proportional likelihood ratio order. These results are more general than the likelihood ratio ordering aspects related to this distribution. Finally, we discussed the proportional likelihood ratio ordering in view of the weighted version of the Lindley distribution
AbstractA new generalization of the Lindley distribution is recently proposed by Ghitany et al. [1],...
In this paper, we introduce the concept of l-order and conjecture that the l-order of hazard rate ve...
A new generalization of the Lindley distribution is recently proposed by Ghitany et al. [1], called ...
In this paper, we introduce a new stochastic order between continuous non-negative random variables ...
In this paper, we introduce a new stochastic order between continuous non-negative random variables ...
Characterization of a probability distribution plays an important role in statistics and probability...
We introduce the new continuous distribution, the so-called beta-Lindley distribution that extends t...
Exponentiated power Lindley distribution is proposed as a generalization of some widely well-known d...
AbstractLet X1,…, Xn be independent random variables such that X1<lr X2<lr … <lr Xn, where <lr denot...
In this article, we establish some results concerning the likelihood ratio order of random vectors o...
A two-parameter Quasi Lindley distribution (QLD), of which the Lindley distribution (LD) is a partic...
We show that the order statistics, in a sample from a distribution that has a logconcave density fun...
In recent years, modifications of the classical Lindley distribution have been considered by many au...
In this paper, we introduce a new generalization of the power Lindley distribution referred to as th...
This paper proposes a new extended Lindley distribution, which has a more flexible density and hazar...
AbstractA new generalization of the Lindley distribution is recently proposed by Ghitany et al. [1],...
In this paper, we introduce the concept of l-order and conjecture that the l-order of hazard rate ve...
A new generalization of the Lindley distribution is recently proposed by Ghitany et al. [1], called ...
In this paper, we introduce a new stochastic order between continuous non-negative random variables ...
In this paper, we introduce a new stochastic order between continuous non-negative random variables ...
Characterization of a probability distribution plays an important role in statistics and probability...
We introduce the new continuous distribution, the so-called beta-Lindley distribution that extends t...
Exponentiated power Lindley distribution is proposed as a generalization of some widely well-known d...
AbstractLet X1,…, Xn be independent random variables such that X1<lr X2<lr … <lr Xn, where <lr denot...
In this article, we establish some results concerning the likelihood ratio order of random vectors o...
A two-parameter Quasi Lindley distribution (QLD), of which the Lindley distribution (LD) is a partic...
We show that the order statistics, in a sample from a distribution that has a logconcave density fun...
In recent years, modifications of the classical Lindley distribution have been considered by many au...
In this paper, we introduce a new generalization of the power Lindley distribution referred to as th...
This paper proposes a new extended Lindley distribution, which has a more flexible density and hazar...
AbstractA new generalization of the Lindley distribution is recently proposed by Ghitany et al. [1],...
In this paper, we introduce the concept of l-order and conjecture that the l-order of hazard rate ve...
A new generalization of the Lindley distribution is recently proposed by Ghitany et al. [1], called ...