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http://dx.doi.org/10.29220/CSAM.2020.27.1.047

Estimation of the exponentiated half-logistic distribution based on multiply Type-I hybrid censoring  

Jeon, Young Eun (Department of Statistics, Yeungnam University)
Kang, Suk-Bok (Department of Statistics, Yeungnam University)
Publication Information
Communications for Statistical Applications and Methods / v.27, no.1, 2020 , pp. 47-64 More about this Journal
Abstract
In this paper, we derive some estimators of the scale parameter of the exponentiated half-logistic distribution based on the multiply Type-I hybrid censoring scheme. We assume that the shape parameter λ is known. We obtain the maximum likelihood estimator of the scale parameter σ. The scale parameter is estimated by approximating the given likelihood function using two different Taylor series expansions since the likelihood equation is not explicitly solved. We also obtain Bayes estimators using prior distribution. To obtain the Bayes estimators, we use the squared error loss function and general entropy loss function (shape parameter q = -0.5, 1.0). We also derive interval estimation such as the asymptotic confidence interval, the credible interval, and the highest posterior density interval. Finally, we compare the proposed estimators in the sense of the mean squared error through Monte Carlo simulation. The average length of 95% intervals and the corresponding coverage probability are also obtained.
Keywords
approximate maximum likelihood estimator; Bayes estimator; confidence interval; credible interval; exponentiated half-logistic distribution; maximum likelihood estimator; multiply Type-I hybrid censoring scheme;
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1 Arora SH, Bhimani GC, and Patel MN (2010). Some results on maximum likelihood estimators of parameters of generalized half logistic distribution under Type-I progressive censoring with changing failure rate, International Journal of Contemporary Mathematical Sciences, 14, 685-698.
2 Balakrishnan N (1985). Order statistics from the half logistic distribution, Journal of Statistical Computation and Simulation, 4, 287-309.   DOI
3 Balakrishnan N and Asgharzadeh A (2005). Inference for the scaled half-logistic distribution based on progressively Type-II censored samples, Communications in Statistics-Theory and Methods, 34, 78-87.
4 Balakrishnan N and Chan PS (1992). Estimation for the scaled half logistic distribution under Type-II censoring, Computational Statistics & Data Analysis, 13, 123-141.   DOI
5 Balakrishnan N and Puthenpura S (1986). Best linear unbiased estimators of location and scale parameters of the half logistic distribution, Journal of Statistical Computation and Simulation, 25, 193-204.   DOI
6 Balakrishnan N and Saleh HM (2011). Relations for moments of progressively Type-II censored order statistics from half-logistic distribution with applications to inference, Computational Statistics & Data Analysis, 55, 2775-2792.   DOI
7 Balakrishnan N and Wong KHT (1991). Approximate MLEs for the location and scale parameters of the half-logistic distribution with Type-II right-censoring, IEEE Transactions on Reliability, 40, 140-145.   DOI
8 Epstein B (1954). Truncated life tests in the exponential case, Annals of Mathematical Statistics, 25, 555-564.   DOI
9 Kang SB, Cho YS, and Han JT (2008). Estimation for the half logistic distribution under progressive Type-II censoring, Communications for Statistical Applications and Methods, 15, 815-823.   DOI
10 Giles DE (2012). Bias reduction for the maximum likelihood estimators of the parameters in the half-logistic distribution, Communications in Statistics-Theory and Methods, 41, 212-222.   DOI
11 Kang SB, Cho YS, and Han JT (2009). Estimation for the half logistic distribution based on double hybrid censored samples, Communications for Statistical Applications and Methods, 16, 1055-1066.   DOI
12 Kang SB and Seo JI (2011). Estimation in an exponentiated half logistic distribution under progres-sively Type-II censoring, Communications for Statistical Applications and Methods, 18, 657-666.   DOI
13 Kang SB, Seo JI, and Kim YK (2013). Bayesian analysis of an exponentiated half-logistic distribution under progressively Type-II censoring, Journal of the Korean Data and Information Science Society, 24, 1455-1464.   DOI
14 Kim YK, Kang SB, and Seo JI (2011). Bayesian estimation in the generalized half logistic distribution under progressively Type-II censoring, Journal of the Korean Data and Information Science Society, 22, 977-989.
15 Torabi H and Bagheri F (2010). Estimation of parameters for an extended generalized half logistic distribution based on complete and censored data, Journal of the Iranian Statistical Society, 9, 171-195.
16 Lee KJ, Park CK, and Cho YS (2011). Inference based on generalized doubly Type-II hybrid censored sample from a half logistic distribution, Communications for Statistical Applications and Methods, 18, 645-655.   DOI
17 Lee KJ, Sun HK, and Cho YS (2014). Estimation of the exponential distribution based on multiply type I hybrid censored sample, Journal of the Korean Data & Information Science Society, 25, 633-641.   DOI
18 Nelson WB (1982). Applied Life Data Analysis, John Willey & Sons, New York.
19 Seo JI and Kang SB (2015). Pivotal inference for the scaled half logistic distribution based on progressively Type-II censored samples, Statistics & Probability Letters, 104, 109-116.   DOI
20 Seo JI, Kim YK, and Kang SB (2013). Estimation on the generalized half logistic distribution under Type-II hybrid censoring, Communications for Statistical Applications and Methods, 20, 63-75.   DOI
21 Tierney L and Kandane JB (1986). Accurate approximations for posterior moments and marginal densities, Journal of the American Statistical Association, 81, 82-86.   DOI
22 Wang C and Liu H (2017). Estimation for the scaled half-logistic distribution under Type-I progressively hybrid censoring scheme, Communications in Statistics-Theory and Methods, 46, 12045-12058.   DOI