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熵损失函数下一类广义分布族参数估计的容许性 被引量:3

Admissibility of estimation for parameter of a general class of distributions under entropy loss function
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摘要 在熵损失函数下,研究了一类分布族参数的Bayes估计和可容许估计,并讨论了一类(cT+d)-1形式估计的可容许性和不可容许性. Bayesian estimators for unknown parameter of a general class of distributions are studied,and admissibility and inadmissibility of estimator with the form of(cT+d)-1 are discussed.
作者 任海平
机构地区 江西理工大学南昌校区
出处 《西北师范大学学报(自然科学版)》 CAS 北大核心 2010年第6期19-22,共4页 Journal of Northwest Normal University(Natural Science)
基金 江西省自然科学基金资助项目(2009GZS0010) 江西理工大学校级科研课题
关键词 Bayes估计 熵损失函数 可容许性 共轭先验分布 伽玛分布 Bayesian estimation entropy loss function admissibility conjugate prior distribution Gamma distribution
分类号 O212.5 [理学—概率论与数理统计]
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参考文献5

二级参考文献23

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共引文献57

同被引文献19

  • 1韩慧芳,杨珂玲,张建军.Pareto分布中形状参数的估计问题[J].统计与决策,2007,23(24):10-12. 被引量:20
  • 2XU J,PENG C.Fitting and testing the Marshall-Olkin extended Weibull model with randomly censored data[J].Journal of Applied Statistics,2014, 41(12):2 577-2 595.
  • 3DANISH M Y, ASLAM M.Bayesian inference for the randomly censored Weibull distribution[J].Journal of Statistical Computation and Simulation,2014,84( 1 ):215-230.
  • 4Gomes M l,Neves M M.Estimation of the extreme value index for randomly censored data[J].Biometrical Letters,2011,48(1 ): 1-22.
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  • 6TANNER M A,WONG W H.The estimation of the hazard function from randomly censored data by the kernel method[J].The Annals of Statistics, 1983,11 (3):989-993.
  • 7HE Chaobing.Parameter estimation of gamma distribution with multiple change points for random censoring test model with incomplete information[J].Journal of Liaoning Technical University (Natural Science),2016,35(3):332-336. doi: 10.11956/j.issn.1008-0562.2016.03.021.
  • 8ZHANG Song,WANG Dehui.Estimation of scale parameter of Weibull distribution under entropy loss function based on progressive Type-I[ censoring scheme[J].JournaI of Jilin University(Science Edition),2012, 50(2):219-226.
  • 9REN Haiping.Admissibility of estimation for parameter of a general class of distributions under entropy loss function[J].Joumal of Northwest Normal University(Natural Science),2010,46(6): 19-22.
  • 10王炳兴.Burr Type Ⅻ分布的统计推断[J].数学物理学报(A辑),2008,28(6):1103-1108. 被引量:15

引证文献3

二级引证文献8

西北师范大学学报(自然科学版)
2010年 第6期

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