Results 91 to 100 of about 260,625 (203)
The Characterizations of Discrete Life Distribution Class with Relation to Geometric Distribution
, 2013 In this paper, we present some characterizations of discrete life distributions, especially for dHNBUE, dHNWUE, dNBUE and dNWUE classes, and their relations with geometric distribution.
Xu, Xiaoling +3 more
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On Positive Inflated Geometric Distribution: Properties and Applications
Austrian Journal of StatisticsOne-inflation in zero-truncated count data has recently found considerable attention. In this regard, zero-truncated Geometric distribution and distribution to a point mass at one are used to create a one-inflated model, namely, one-inflated zero ...
Zehra Skinder +2 more
doaj +1 more source
Exponentiated Lomax Geometric Distribution: Properties and Applications
, 2017 In this paper, a new four-parameter lifetime distribution, called the exponentiated Lomax geometric (ELG) is introduced. The new lifetime distribution contains the Lomax geometric and exponentiated Pareto geometric as new sub-models.
Marwa Abdallah Abdelghafar +3 more
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MathematicsA sequence of n trials from a finite population with no replacement is described by the hypergeometric distribution as the number of successes. Calculating the likelihood that factory-produced items would be defective is one of the most popular uses of ...
Tariq Al-Hawary +2 more
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Characterizations of Weibull geometric distribution
, 2020 Various characterizations of the Weibull Geometric distribution are presented. These characterizations are based, on a simple relationship between two truncated moments ; on hazard function ; and on functions of order ...
M Ahsanullah, G G Hamedani
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On zero-distorted generalized geometric distribution
, 2016 We propose a new generalized geometric distribution which permits inflation/deflation of the zero count probability and study some of its properties. We also present an actuarial application of this distribution and fit it to three datasets used by other
Sastry, D.V.S. +3 more
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On some properties of the geometric distribution
, 1988 The lack of memory property of the geometric distribution and several of its variants are well known. Here, we examine the form that a function g(x,y) must have, if we assume that the lack of memory property of some of its variants hold for g(X,c) given ...
Dallas, A.
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A geometric framework for distributed frequency models
Communications in Nonlinear Science and Numerical SimulationzbMATH Open Web Interface contents unavailable due to conflicting licenses.
Vishnuram Arumugam +3 more
openaire +1 more source
Geometric distribution and its multivariate version
, 2022 In this work we will discuss the basics of a multivariate geometric distribution, especially its two-dimensional version. First of all, we establish a fundamental definition in which we consider two types of failures.
Pavlovičová, Diana
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