Bayesian Analysis of Record Statistic from the Inverse Weibull Distribution under Balanced Loss Function

Al-Duais, Fuad S.

doi:10.1155/2021/6648462

Cited by 12 publications

(5 citation statements)

References 21 publications

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“…The IW distribution was considered by Keller [14] to model failures of mechanical components subject to degradation. Afterward, many researchers studied the IW distribution, including, but not limited to, Calabria and Pulcini [15], Jiang et al [16], Mahmoud et al [17], Sultan [18], Kundu and Howlader [19], Hassan et al [20], Kumar and Kumar [21], and Al-Duais [22]. The random variable Y follows the two-parameter IW distribution, denoted by IW(θ, λ), if the corresponding PDF and CDF, are given by: g(y; θ, λ) = λθy −(θ+1) e −λy −θ , y ≥ 0, θ, λ > 0, (4) and G(y; θ, λ) = e −λy −θ , y ≥ 0, θ, λ > 0, (5) respectively, where θ > 0 is the shape parameter and λ > 0 is the rate parameter.…”

Section: Inverse Weibull Distribution and Its Entropy Indicesmentioning

confidence: 99%

On Entropy Estimation of Inverse Weibull Distribution under Improved Adaptive Progressively Type-II Censoring with Applications

Alam,

Nassar

2023

Axioms

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This article utilizes improved adaptive progressively Type-II censored data to estimate the entropy of the inverse Weibull distribution. Rényi, q, and Shannon entropy measurements are used to define entropy to achieve this objective. Both point and interval estimations of the entropy quantities are investigated through the maximum likelihood and maximum product of spacing methods. Two parametric bootstrap confidence intervals based on the two estimation techniques are also considered for the various entropy measures. A Monte Carlo simulation study is conducted to investigate how estimates behave at various sample sizes and different censoring schemes based on some statistical measurements. The simulations demonstrate that, as anticipated, when the sample size grows, the estimation accuracy also grows. Furthermore, they show that the estimated entropy measures get closer to the actual entropy values when the censoring level decreases. For purposes of explanation, two applications to actual datasets are taken into consideration. The results verified that the adaptive or improved adaptive progressive censoring schemes give more information about data than the conventional progressive censoring scheme in terms of minimum entropy measures.

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Section: Inverse Weibull Distribution and Its Entropy Indicesmentioning

confidence: 99%

On Entropy Estimation of Inverse Weibull Distribution under Improved Adaptive Progressively Type-II Censoring with Applications

Alam,

Nassar

2023

Axioms

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“…Lemma 1. Suppose that T is the historical data information about the entropy function H. Then, under the SE loss function (25), the Bayesian estimator Ĥ1 for any prior distribution is shown in Equation ( 26):…”

Section: Bayesian Estimationmentioning

confidence: 99%

“…Mohammad and Sana [24] obtained the Bayes estimators and ML estimators for the unknown parameters of the IWD under lower record values. Faud [25] developed a linear exponential loss function, and estimated the parameter and reliability of the IWD based on lower record values under this loss function. Li and Hao [26] considered the estimation of a stress-strength model when stress and strength are two independent IWDs with different parameters.…”

Section: Introductionmentioning

confidence: 99%

Bayesian Estimations of Shannon Entropy and Rényi Entropy of Inverse Weibull Distribution

Ren

Han

2023

Mathematics

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In this paper, under the symmetric entropy and the scale squared error loss functions, we consider the maximum likelihood (ML) estimation and Bayesian estimation of the Shannon entropy and Rényi entropy of the two-parameter inverse Weibull distribution. In the ML estimation, the dichotomy is used to solve the likelihood equation. In addition, the approximation confidence interval is given by the Delta method. Because the form of estimation results is more complex in the Bayesian estimation, the Lindley approximation method is used to achieve the numerical calculation. Finally, Monte Carlo simulations and a real dataset are used to illustrate the results derived. By comparing the mean square error between the estimated value and the real value, it can be found that the performance of ML estimation of Shannon entropy is better than that of Bayesian estimation, and there is no significant difference between the performance of ML estimation of Rényi entropy and that of Bayesian estimation.

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“…For example, it offered simple but appealing large enough sample approximations to optimal timings, dubbed asymptotically pointwise optimal (APO) rules, and demonstrated that APO rules were asymptotically optimal (AO) under a second scenario. Many publications have examined the APO rule and how it might be used to address those other challenges [ 10 ]. Discrete-time events are the focus of the studies in these publications.…”

Section: Introductionmentioning

confidence: 99%

“…The LINEX loss function was officially created, and its properties were investigated further. It is a handy asymmetrical nonlinear function that increases dramatically on one end of zero and gradually on the other [ 15 ]. Much research has looked into estimating issues with LINEX loss function [ 16 ].…”

Section: Introductionmentioning

confidence: 99%

Bayesian Estimation of Different Scale Parameters Using a LINEX Loss Function

Mohammed

Alaziz

Sumati

et al. 2022

Computational Intelligence and Neuroscience

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The LINEX loss function, which climbs exponentially with one-half of zero and virtually linearly on either side of zero, is employed to analyze parameter analysis and prediction problems. It can be used to solve both underestimation and overestimation issues. This paper explained the Bayesian estimation of mean, Gamma distribution, and Poisson process. First, an improved estimator for μ 2 is provided (which employs a variation coefficient). Under the LINEX loss function, a better estimator for the square root of the median is also derived, and an enhanced estimation for the average mean in such a negatively exponential function. Second, giving a gamma distribution as a prior and a likelihood function as posterior yields a gamma distribution. The LINEX method can be used to estimate an estimator λ B L ^ using posterior distribution. After obtaining λ B L ^ , the hazard function h B L ^ and D B L ^ the function of survival estimators are used. Third, the challenge of sequentially predicting the intensity variable of a uniform Poisson process with a linear exponentially (LINEX) loss function and a constant cost of production time is investigated using a Bayesian model. The APO rule is offered as an approximation pointwise optimal rule. LINEX is the loss function used. A variety of prior distributions have already been studied, and Bayesian estimation methods have been evaluated against squared error loss function estimation methods. Finally, compare the results of Maximum Likelihood Estimation (MLE) and LINEX estimation to determine which technique is appropriate for such information by identifying the lowest Mean Square Error (MSE). The displaced estimation method under the LINEX loss function was also examined in this research, and an improved estimation was proposed.

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Bayesian Analysis of Record Statistic from the Inverse Weibull Distribution under Balanced Loss Function

Cited by 12 publications

References 21 publications

On Entropy Estimation of Inverse Weibull Distribution under Improved Adaptive Progressively Type-II Censoring with Applications

On Entropy Estimation of Inverse Weibull Distribution under Improved Adaptive Progressively Type-II Censoring with Applications

Bayesian Estimations of Shannon Entropy and Rényi Entropy of Inverse Weibull Distribution

Bayesian Estimation of Different Scale Parameters Using a LINEX Loss Function

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