Modelling the COVID‐19 Mortality Rate with a New Versatile Modification of the Log‐Logistic Distribution

Muse, Abdisalam Hassan; Tolba, Ahlam H.; Fayad, Eman; Ali, Ola A. Abu; Nagy, M.; Yusuf, M.

doi:10.1155/2021/8640794

Cited by 30 publications

(14 citation statements)

References 31 publications

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“…The log-logistic distribution has been used to model mortality data ( Muse et al, 2021 ), so we also consider it:

where

is a location parameter and σ > 0 is a shape parameter. Like the log-normal distribution, we also use 2- and 3-mixtures of log-logistic distributions ( Puente-Ajovín et al, 2020a ):

where 0 ≤ p 1 , 1 − p 1 ≤ 1, and

where 0 ≤ p 1 , p 2 , 1 − p 1 − p 2 ≤ 1.…”

Section: Methodsmentioning

confidence: 99%

The distribution of COVID-19 mortality

Campolieti

Ramos²

2022

Infectious Disease Modelling

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“…The log-logistic distribution has been used to model mortality data ( Muse et al, 2021 ), so we also consider it:

where

is a location parameter and σ > 0 is a shape parameter. Like the log-normal distribution, we also use 2- and 3-mixtures of log-logistic distributions ( Puente-Ajovín et al, 2020a ):

where 0 ≤ p 1 , 1 − p 1 ≤ 1, and

where 0 ≤ p 1 , p 2 , 1 − p 1 − p 2 ≤ 1.…”

Section: Methodsmentioning

confidence: 99%

The distribution of COVID-19 mortality

Campolieti

Ramos²

2022

Infectious Disease Modelling

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“…e ExEW distribution is compared to submodels such as the W, EE [41], and EW distributions [16], and other common lifetime distributions including the log-logistic (LL), beta Weibull (BW) [14], beta extended Weibull (BEW) [43], modified beta Weibull (MBW) [44], and tan-loglogistic (TanLL) distributions [45]. e competing models' pdfs are as follows:…”

Section: Applications To Real-life Datamentioning

confidence: 99%

The Extended Exponential Weibull Distribution: Properties, Inference, and Applications to Real‐Life Data

Mastor¹,

Ngesa

Mung’atu

et al. 2022

Complexity

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A novel version of the exponential Weibull distribution known as the extended exponential Weibull (ExEW) distribution is developed and examined using the Lehmann alternative II (LAII) generating technique. The new distributions basic mathematical properties are derived. The maximum likelihood estimation (MLE) technique is used to estimate the unknown parameters of the proposed distribution. The estimators’ performance is further assessed using the Monte Carlo simulation technique. Eventually, two real-world data sets are utilized to show the applicability of the new distribution.

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“…The generalised Lindley distribution was first introduced in 2011 by Nadarajah et al, who showed that it outperforms gamma, log-normal, Weibull, and exponential distributions when taking bathtub hazard rate into account [12]. In 2021, Mahmood et al [19] published an enlarged Cosine generalised family of distributions for dependability modelling: characteristics and applications with simulation analysis, and Muse et al [20] suggested a new flexible form of the loglogistic distribution. Citations [5], [17], and [6] in 2022 explored a family of produced distributions with applications.…”

Section: Introductionmentioning

confidence: 99%

Bayesian and Non-Bayesian Estimation Methods for Simulating the Parameter of the Akshaya Distribution

Tolba

2022

Computational Journal of Mathematical and Statistical Sciences

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For modelling lifetime data from biological research and engineering, the "Akshaya distribution" is a model one-parameter continuous distribution that was proposed by [15]. The non-Bayesian and Bayesian estimation methods for the Akshaya's parameter are also presented in this study. The weighted least square estimation (WLSE), least square estimation (LSE), Cramer-von-Mises estimation (CVME), and maximum likelihood estimation (MLE), five traditional estimation approaches, are used to find the model parameter. The parameter of the suggested distribution was also determined using the squared error loss function and Bayesian estimating (BE) under independent gamma priors. Finally, a simulation study is used to expound on the applicability and value of the proposed distribution.

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Modelling the COVID‐19 Mortality Rate with a New Versatile Modification of the Log‐Logistic Distribution

Cited by 30 publications

References 31 publications

The distribution of COVID-19 mortality

The distribution of COVID-19 mortality

The Extended Exponential Weibull Distribution: Properties, Inference, and Applications to Real‐Life Data

Bayesian and Non-Bayesian Estimation Methods for Simulating the Parameter of the Akshaya Distribution

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