Inference of stress-strength reliability for two-parameter of exponentiated Gumbel distribution based on lower record values

The two-parameter of exponentiated Gumbel distribution is an important lifetime distribution in survival analysis. This paper investigates the estimation of the parameters of this distribution by using lower records values. The maximum likelihood estimator (MLE) procedure of the parameters is considered, and the Fisher information matrix of the unknown parameters is used to construct asymptotic confidence intervals. Bayes estimator of the parameters and the corresponding credible intervals are obtained by using the Gibbs sampling technique. Two real data set is provided to illustrate the proposed methods.

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Inferences for Weibull parameters under progressively first-failure censored data with binomial random removals

Statistics Optimization & Information Computing ◽

10.19139/soic-2310-5070-611 ◽

2020 ◽

Vol 9 (1) ◽

pp. 47-60

Author(s):

Samir K. Ashour ◽

Ahmed A. El-Sheikh ◽

Ahmed Elshahhat

Keyword(s):

Monte Carlo ◽

Censored Data ◽

Real Data ◽

Unknown Parameters ◽

Data Set ◽

Monte Carlo Simulation Study ◽

Squared Error Loss Function ◽

Bayes Estimates ◽

Monte Carlo Techniques ◽

Credible Intervals

In this paper, the Bayesian and non-Bayesian estimation of a two-parameter Weibull lifetime model in presence of progressive first-failure censored data with binomial random removals are considered. Based on the s-normal approximation to the asymptotic distribution of maximum likelihood estimators, two-sided approximate confidence intervals for the unknown parameters are constructed. Using gamma conjugate priors, several Bayes estimates and associated credible intervals are obtained relative to the squared error loss function. Proposed estimators cannot be expressed in closed forms and can be evaluated numerically by some suitable iterative procedure. A Bayesian approach is developed using Markov chain Monte Carlo techniques to generate samples from the posterior distributions and in turn computing the Bayes estimates and associated credible intervals. To analyze the performance of the proposed estimators, a Monte Carlo simulation study is conducted. Finally, a real data set is discussed for illustration purposes.

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Estimating the Entropy for Lomax Distribution Based on Generalized Progressively Hybrid Censoring

Symmetry ◽

10.3390/sym11101219 ◽

2019 ◽

Vol 11 (10) ◽

pp. 1219 ◽

Cited By ~ 1

Author(s):

Shuhan Liu ◽

Wenhao Gui

Keyword(s):

Incomplete Data ◽

Real Data ◽

Unknown Parameters ◽

Data Set ◽

Hybrid Censoring ◽

Lomax Distribution ◽

Bayesian Estimates ◽

Squared Error ◽

General Entropy Loss Function ◽

Two Parameter

As it is often unavoidable to obtain incomplete data in life testing and survival analysis, research on censoring data is becoming increasingly popular. In this paper, the problem of estimating the entropy of a two-parameter Lomax distribution based on generalized progressively hybrid censoring is considered. The maximum likelihood estimators of the unknown parameters are derived to estimate the entropy. Further, Bayesian estimates are computed under symmetric and asymmetric loss functions, including squared error, linex, and general entropy loss function. As we cannot obtain analytical Bayesian estimates directly, the Lindley method and the Tierney and Kadane method are applied. A simulation study is conducted and a real data set is analyzed for illustrative purposes.

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Objective Bayesian Prediction of Future Record Statistics Based on the Exponentiated Gumbel Distribution: Comparison with Time-Series Prediction

Symmetry ◽

10.3390/sym12091443 ◽

2020 ◽

Vol 12 (9) ◽

pp. 1443

Author(s):

Yongku Kim ◽

Jung In Seo

Keyword(s):

Time Series ◽

Time Series Prediction ◽

Information Matrix ◽

Simple Algorithm ◽

Gumbel Distribution ◽

Real Data ◽

Good Alternative ◽

Record Values ◽

Shape Parameters ◽

Record Statistics

The interest in the study of record statistics has been increasing in recent years in the context of predicting stock markets and addressing global warming and climate change problems such as cyclones and floods. However, because record values are mostly rare observed, its probability distribution may be skewed or asymmetric. In this case, the Bayesian approach with a reasonable choice of the prior distribution can be a good alternative. This paper presents an objective Bayesian method for predicting future record values when observed record values have a two-parameter exponentiated Gumbel distribution with the scale and shape parameters. For objective Bayesian analysis, objective priors such as the Jeffreys and reference priors are first derived from the Fisher information matrix for the scale and shape parameters, and an analysis of the resulting posterior distribution is then performed to examine its properness and validity. In addition, under the derived objective prior distributions, a simple algorithm using a pivotal quantity is proposed to predict future record values. To validate the proposed approach, it was applied to a real dataset. For a closer examination and demonstration of the superiority of the proposed predictive method, it was compared to time-series models such as the autoregressive integrated moving average and dynamic linear model in an analysis of real data that can be observed from an infinite time series comprising independent sample values.

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The complementary Poisson-Lindley class of distributions

International Journal of Advanced Statistics and Probability ◽

10.14419/ijasp.v3i2.4624 ◽

2015 ◽

Vol 3 (2) ◽

pp. 146 ◽

Cited By ~ 1

Author(s):

Amal Hassan ◽

Salwa Assar ◽

Kareem Ali

Keyword(s):

Information Matrix ◽

Real Data ◽

Formal Proof ◽

Cumulative Distribution ◽

Likelihood Method ◽

Unknown Parameters ◽

Data Set ◽

Lifetime Distributions ◽

New Class ◽

Rate Functions

<p>This paper proposed a new general class of continuous lifetime distributions, which is a complementary to the Poisson-Lindley family proposed by Asgharzadeh et al. [3]. The new class is derived by compounding the maximum of a random number of independent and identically continuous distributed random variables, and Poisson-Lindley distribution. Several properties of the proposed class are discussed, including a formal proof of probability density, cumulative distribution, and reliability and hazard rate functions. The unknown parameters are estimated by the maximum likelihood method and the Fisher’s information matrix elements are determined. Some sub-models of this class are investigated and studied in some details. Finally, a real data set is analyzed to illustrate the performance of new distributions.</p>

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Exact Interval Inference for the Two-Parameter Rayleigh Distribution Based on the Upper Record Values

Journal of Probability and Statistics ◽

10.1155/2016/8246390 ◽

2016 ◽

Vol 2016 ◽

pp. 1-5 ◽

Cited By ~ 4

Author(s):

Jung-In Seo ◽

Jae-Woo Jeon ◽

Suk-Bok Kang

Keyword(s):

Maximum Likelihood ◽

Estimation Method ◽

Real Data ◽

Record Values ◽

Rayleigh Distribution ◽

Likelihood Method ◽

Unknown Parameters ◽

Upper Record Values ◽

Upper Record ◽

Two Parameter

The maximum likelihood method is the most widely used estimation method. On the other hand, it can produce substantial bias, and an approximate confidence interval based on the maximum likelihood estimator cannot be valid when the sample size is small. Because the sizes of the record values are considerably smaller than the original sequence observed in the majority of cases, a method appropriate for this situation is required for precise inference. This paper provides the exact confidence intervals for unknown parameters and exact predictive intervals for the future upper record values by providing some pivotal quantities in the two-parameter Rayleigh distribution based on the upper record values. Finally, the validity of the proposed inference methods was examined from Monte Carlo simulations and real data.

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Objective Bayesian Snalysis for the Complementary Exponential Geometric Model Applied to Cancer Data

International Journal of Statistics and Probability ◽

10.5539/ijsp.v6n2p122 ◽

2017 ◽

Vol 6 (2) ◽

pp. 122 ◽

Cited By ~ 1

Author(s):

Daniele Cristina Tita Granzotto ◽

Vera Lucia Damasceno Tomazella ◽

Francisco Louzada

Keyword(s):

Geometric Model ◽

Real Data ◽

Lifetime Distribution ◽

Mean Square ◽

Data Set ◽

Increasing Failure Rate ◽

Cancer Data ◽

Credible Intervals ◽

Two Parameter ◽

Common Malignancy

In this paper we provide a reference Bayesian framework to a new two-parameter lifetime distribution with increasing failure rate, the complementary exponential geometric (CEG). To this end, we presented some of the main properties of this model and its characteristics related to the reliability analysis. A simulation study is performed to analyse the frequentist properties of credible intervals from the reference posterior distribution among of the standard error and mean square error (MSE) of estimations. The presented methodology is illustrated by the use of a real data set which presents the study of time until the cure of cervix lesions, that are precursors cancer lesions in the cervix. According to to INCA (Cancer National Institute), cervical cancer stands as the fourth cause of death among women in Brazil. Together with breast cancer, it is one of the most common malignancy affecting women worldwide. For this reason, patients must be carefully evaluated for metastatic disease. These data were collected in the Woman Clinic which is sited in Maring\'{a} city (Paran\'{a} State, Brazil).

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Bayesian and E-Bayesian Estimations of Bathtub-Shaped Distribution under Generalized Type-I Hybrid Censoring

Entropy ◽

10.3390/e23080934 ◽

2021 ◽

Vol 23 (8) ◽

pp. 934

Author(s):

Yuxuan Zhang ◽

Kaiwei Liu ◽

Wenhao Gui

Keyword(s):

Bayesian Method ◽

Real Data ◽

Loss Functions ◽

Type I ◽

Statistical Efficiency ◽

Unknown Parameters ◽

Data Set ◽

Hybrid Censoring ◽

Bayesian Estimations ◽

Generalized Type

For the purpose of improving the statistical efficiency of estimators in life-testing experiments, generalized Type-I hybrid censoring has lately been implemented by guaranteeing that experiments only terminate after a certain number of failures appear. With the wide applications of bathtub-shaped distribution in engineering areas and the recently introduced generalized Type-I hybrid censoring scheme, considering that there is no work coalescing this certain type of censoring model with a bathtub-shaped distribution, we consider the parameter inference under generalized Type-I hybrid censoring. First, estimations of the unknown scale parameter and the reliability function are obtained under the Bayesian method based on LINEX and squared error loss functions with a conjugate gamma prior. The comparison of estimations under the E-Bayesian method for different prior distributions and loss functions is analyzed. Additionally, Bayesian and E-Bayesian estimations with two unknown parameters are introduced. Furthermore, to verify the robustness of the estimations above, the Monte Carlo method is introduced for the simulation study. Finally, the application of the discussed inference in practice is illustrated by analyzing a real data set.

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On the Estimation of Reliability of Weighted Weibull Distribution: A Comparative Study

International Journal of Statistics and Probability ◽

10.5539/ijsp.v5n4p1 ◽

2016 ◽

Vol 5 (4) ◽

pp. 1

Author(s):

Bander Al-Zahrani

Keyword(s):

Maximum Likelihood ◽

Weibull Distribution ◽

Real Data ◽

Reliability Function ◽

Nonparametric Methods ◽

Empirical Method ◽

Density Estimator ◽

Bayes Estimators ◽

Unknown Parameters ◽

Data Set

The paper gives a description of estimation for the reliability function of weighted Weibull distribution. The maximum likelihood estimators for the unknown parameters are obtained. Nonparametric methods such as empirical method, kernel density estimator and a modified shrinkage estimator are provided. The Markov chain Monte Carlo method is used to compute the Bayes estimators assuming gamma and Jeffrey priors. The performance of the maximum likelihood, nonparametric methods and Bayesian estimators is assessed through a real data set.

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Mixture of Inverse Weibull and Lognormal Distributions: Properties, Estimation, and Illustration

Mathematical Problems in Engineering ◽

10.1155/2015/526786 ◽

2015 ◽

Vol 2015 ◽

pp. 1-8 ◽

Cited By ~ 2

Author(s):

K. S. Sultan ◽

A. S. Al-Moisheer

Keyword(s):

Information Matrix ◽

Real Data ◽

Likelihood Method ◽

Model Parameters ◽

Component Mixture ◽

Data Set ◽

Hazard Functions ◽

Lognormal Distributions ◽

Proposed Model ◽

Estimation Of Model Parameters

We discuss the two-component mixture of the inverse Weibull and lognormal distributions (MIWLND) as a lifetime model. First, we discuss the properties of the proposed model including the reliability and hazard functions. Next, we discuss the estimation of model parameters by using the maximum likelihood method (MLEs). We also derive expressions for the elements of the Fisher information matrix. Next, we demonstrate the usefulness of the proposed model by fitting it to a real data set. Finally, we draw some concluding remarks.

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Survival estimation for singly type one censored sample based on generalized Rayleigh distribution

Baghdad Science Journal ◽

10.21123/bsj.11.2.193-201 ◽

2014 ◽

Vol 11 (2) ◽

pp. 193-201

Author(s):

Baghdad Science Journal

Keyword(s):

Current Model ◽

Survival Function ◽

Information Matrix ◽

Interval Estimation ◽

Real Data ◽

Rayleigh Distribution ◽

Point Estimation ◽

Distribution Model ◽

Unknown Parameters ◽

Generalized Rayleigh Distribution

This paper interest to estimation the unknown parameters for generalized Rayleigh distribution model based on censored samples of singly type one . In this paper the probability density function for generalized Rayleigh is defined with its properties . The maximum likelihood estimator method is used to derive the point estimation for all unknown parameters based on iterative method , as Newton – Raphson method , then derive confidence interval estimation which based on Fisher information matrix . Finally , testing whether the current model ( GRD ) fits to a set of real data , then compute the survival function and hazard function for this real data.

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