New Lindley-Rayleigh Distribution with Statistical properties and Applications

Joshi, Ramesh Kumar; Kumar, Vijay

doi:10.14445/22315373/ijmtt-v66i9p523

Cited by 2 publications

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“…Among them, Shanker and Mishra [3], Shanker and Ghebretsadik [4], Merovci and Sharma [5], Zakerzade and Dolati [6], Ibrahim et al [7], and Shanker et al [8] introduced generalizations of Lindley with some more parameters. Moreover, Sankaran [9], Zamani and Ismail [10], Ghitany et al [11], Al-Mutairi et al [12], Al-Babtain et al [13], Ghitany et al [14], Al-Mutairi et al [15], Abouammoh et al [16], Ibrahim et al [17], Marthin and Rao [18], Al-Babtain et al [19], Joshi and Kumar [20], Afify et al [21], Chesneau et al [22], Algarni [23], and many others used the Lindley distribution in their research or extended it.…”

Section: Introductionmentioning

confidence: 99%

A New Scale-Invariant Lindley Extension Distribution and Its Applications

Kayid

Alskhabrah

Alshangiti

2021

Mathematical Problems in Engineering

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A new scale-invariant extension of the Lindley distribution and its power generalization has been introduced. The moments and the moment-generating functions of the proposed models have closed forms. The failure rate, the mean residual life, and the α -quantile residual life functions have been explored. The failure rate function of these models accommodates increasing, bathtub-shaped, and increasing then bathtub-shaped forms. The parameters of the models have been estimated by the maximum likelihood method for the complete and right-censored data. In a simulation study, the efficiency and consistency of the maximum likelihood estimator have been investigated. Then, the proposed models were fitted to four data sets to show their flexibility and applicability.

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Section: Introductionmentioning

confidence: 99%

A New Scale-Invariant Lindley Extension Distribution and Its Applications

Kayid

Alskhabrah

Alshangiti

2021

Mathematical Problems in Engineering

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“…Louzada et al (2020) [16] has used different estimation methods to estimate the parameter of exponential-Poisson distribution using rainfall and aircraft data. The new Lindley-Rayleigh distribution has introduced by (Joshi & Kumar, 2020) [8] by compounding Rayleigh distribution with Lindley distribution. In this study, we propose a new distribution based on the generalized Rayleigh distribution has introduced by Surles and Padgett (2001) [30] introduced two-parameter Burr Type X distribution and correctly named as the generalized Rayleigh distribution for more detail see also (Surles and Padgett, 2004) [31] .…”

Section: Introductionmentioning

confidence: 99%

Poisson generalized Rayleigh distribution with properties and application

Joshi¹,

Kumar²

2021

Int. J. Stat. Appl. Math.

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In this study, we have established a new three-parameter Poisson generalized Rayleigh distribution using the Poisson-Generating family of distribution. Some important mathematical and statistical properties of the proposed distribution including probability density function, cumulative distribution function, reliability function, hazard rate function, quantile, median, the measure of skewness, and kurtosis are presented. The parameters of the new distribution are estimated using the maximum likelihood estimation (MLE) method, and constructed the asymptotic confidence intervals also the Fisher information matrix is derived analytically to obtain the variance-covariance matrix for MLEs. All the computations are performed in R software. The capability and applicability of the proposed distribution is exposed by using graphical methods and statistical tests considering a real dataset. We have empirically verified that the Poisson generalized Rayleigh distribution provided a better fit and more flexible in comparison with some selected lifetime distributions.

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New Lindley-Rayleigh Distribution with Statistical properties and Applications

Cited by 2 publications

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A New Scale-Invariant Lindley Extension Distribution and Its Applications

A New Scale-Invariant Lindley Extension Distribution and Its Applications

Poisson generalized Rayleigh distribution with properties and application

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