Estimation in Maxwell distribution with randomly censored data

Krishna, Hare; Vivekanand, .; Kumar, Kapil

doi:10.1080/00949655.2014.986483

Cited by 29 publications

(15 citation statements)

References 17 publications

(18 reference statements)

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“…Since the time required for completing an experiment has a direct impact on the cost, this information is important for an experimenter to choose an appropriate sampling plan. Krishna et al [13] developed ETT for Maxwell distribution under random censoring for the first time. In this section, we develop the mathematical formulation of ETT for randomly censored geometric distribution.…”

Section: Expected Time On Testmentioning

confidence: 99%

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Maximum Likelihood and Bayes Estimation in Randomly Censored Geometric Distribution

Krishna¹,

Goel²

2017

Journal of Probability and Statistics

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In this article, we study the geometric distribution under randomly censored data. Maximum likelihood estimators and confidence intervals based on Fisher information matrix are derived for the unknown parameters with randomly censored data. Bayes estimators are also developed using beta priors under generalized entropy and LINEX loss functions. Also, Bayesian credible and highest posterior density (HPD) credible intervals are obtained for the parameters. Expected time on test and reliability characteristics are also analyzed in this article. To compare various estimates developed in the article, a Monte Carlo simulation study is carried out. Finally, for illustration purpose, a randomly censored real data set is discussed.

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Section: Expected Time On Testmentioning

confidence: 99%

“…Rayleigh model with randomly censored data was analyzed by Ghitany [8] and Saleem and Aslam [9]; Burr Type XII was analyzed by Ghitany and Al-Awadhi [10]; generalized exponential and Weibull models were analyzed, respectively, by Danish and Aslam [11,12]. Krishna et al [13] studied Maxwell distribution with randomly censored samples.…”

Section: Introductionmentioning

confidence: 99%

Maximum Likelihood and Bayes Estimation in Randomly Censored Geometric Distribution

Krishna¹,

Goel²

2017

Journal of Probability and Statistics

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“…Kumar and Garg [23] studied estimation of the parameters of randomly censored generalized inverted Rayleigh distribution. Krishna et al [21] discussed estimation in Maxwell distribution with randomly censored data. Garg et al [13] discussed randomly censored generalized inverted exponential distribution.…”

Section: Introductionmentioning

confidence: 99%

“…For the above integrals in (21) and (22), the closed form solutions are not available. The above integrals can be solved numerically.…”

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confidence: 99%

Estimation of Parameters and Reliability Characteristics in Lindley Distribution Using Randomly Censored Data

Garg

Dube

Krishna

2020

Stat., optim. inf. comput.

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This article deals with the estimation of parameters and reliability characteristics of Lindley distribution underrandom censoring. Expected time on test based on randomly censored data is obtained. The maximum likelihood estimators of the unknown parameters and reliability characteristics are derived. The asymptotic, bootstrap p and bootstrap t confidence intervals of the parameters are constructed. The Bayes estimators of the parameters and reliability characteristics under squared error loss function using non-informative and gamma informative priors are obtained. For computing of Bayes estimates, Lindley approximation and MCMC methods are considered. Highest posterior density (HPD) credible intervals of the parameters are obtained using MCMC method. Various estimation procedures are compared using a Monte Carlo simulation study. Finally, a real data set is analyzed for illustration purposes.

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“…Dey and Maiti [5] derived Bayes estimators of Maxwell distribution by considering non-informative and conjugate prior distributions under three loss functions, namely, quadratic loss function, squared-log error loss function and MLINEX function. The references [6][7][8] studied the reliability estimation of Maxwell distribution based on Type-II censored sample, progressively Type-II censored sample and random censored sample, respectively. Reference [9] obtained some Bayes estimators under quadratic loss function using non-informative prior, represented by Jefferys prior and Informative priors as Gumbel Type II and Conjugate (Inverted Gamma and Inverted Levy) priors.…”

Section: Introductionmentioning

confidence: 99%

Minimax Estimation of the Parameter of Maxwell Distribution Under Different Loss Functions

Li¹

2016

AJTAS

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The aim of this article is to study the Bayes estimation and minimax estimation of the parameter of Maxwell distribution. Bayes estimators are obtained with non-informative quasi-prior distribution under different loss functions, namely, weighted squared error loss, squared log error loss and entropy loss functions. Then the minimax estimators of the parameter are obtained by using Lehmann's theorem. Finally, performances of these estimators are compared in terms of risks.

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Estimation in Maxwell distribution with randomly censored data

Cited by 29 publications

References 17 publications

Maximum Likelihood and Bayes Estimation in Randomly Censored Geometric Distribution

Maximum Likelihood and Bayes Estimation in Randomly Censored Geometric Distribution

Estimation of Parameters and Reliability Characteristics in Lindley Distribution Using Randomly Censored Data

Minimax Estimation of the Parameter of Maxwell Distribution Under Different Loss Functions

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