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两水平无重复因析试验散度效应的估计 被引量:3

Estimation of Dispersion Effects in Two-level Unreplicated Factorial Experiments
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摘要 本文对两水平无重复因析试验给出了散度效应的一种新的估计,称为AMH估计,改进了文献中散度效应的较好的MH估计的一个缺陷,给出并证明了AMH估计的无偏条件,证明了AMH估计比MH估计有更小的方差下界.最后通过模拟试验比较了AMH和MH估计的偏度,方差和均方误差. A new estimator of the dispersion effects,called the AMH,in two-level unreplicated factorial experiments is given.The AMH modifies a shortcoming of the MH estimator which was showed that there are many good properties in literatures.The unbiased condition of AMH is persented.We also prove that the AMH has more lower bound of variance than MH.Finally,the bias,variance and mean square error of AMH and MH are compared by simulated experiments.
作者 李济洪 王钰 张星
机构地区 山西大学计算中心
出处 《应用数学学报》 CSCD 北大核心 2010年第4期710-722,共13页 Acta Mathematicae Applicatae Sinica
基金 国家自然科学基金(60873128)资助项目
关键词 散度效应模型 MH方法 均方误差 模拟 dispersion effects model MH method mean square errors simulation
分类号 O212.1 [理学—概率论与数理统计]
  • 相关文献

参考文献17

  • 1Bartlett M S, Kendall D G. The Statistical Analysis of Variance-heterogeneity and the Logarithmic Transformation. Journal of the Royal Statistical Society (Series B), 1946, 8(1): 128-138.
  • 2Nair V N, Pregibon D. Analyzing Dispersion Effects from Replicated Factorial Experiments. Tech- nometrics, 1988, 30(3): 247-257.
  • 3Box G E P, Meyer R D. Dispersion Effects from Fractional Designs. Technometrics, 1986, 28(1): 1-27.
  • 4Wang P C. Tests for Dispersion Effects from Orthogonal Arrays. Computational Statistics and Data Analysis, 1989, 8(1): 109-117.
  • 5Engel J, Huele A F. A Generalized Linear Modeling Approach to Robust Design. Technometrics, 1996, 38(4): 365-373.
  • 6Bergman B. and Hynen A. Dispersion Effects from Unreplicated Designs in the 2^k-p Series. Technometrics, 1997, 39(2): 191-198.
  • 7Liao C T, Iyer H K. Optimal 2^n-p Fractional Factorial Designs for Dispersion Effects Under a Locationdispersion Model. Communications in Statistics: Theory and Methods, 2000, 29(4): 823-835.
  • 8McGrath R N, Lin K J. Confounding of Location and Dispersion Effects in Unreplicated Fractional Factorials. Journal of Quality Technology, 2001, 33(2): 129-139.
  • 9Brenneman W A, Nair V N. Methods for Identifying Dispersion Effects in Unreplicated Factorial Experiments: A Critical Analysis and Proposed Atrategies. Technometrics, 2001, 43(4): 388-404.
  • 10Wiklander K, Holm S. Dispersion Effects in Unreplicated Factorial Designs. Applied Stochastic Models in Business and Industry, 2003, 19(1): 13-30.

同被引文献11

  • 1Hamada M and Balakrishnan N. Analyzing unreplicated factorial experiments: a review with some new proposals[J]. Statistica Sinica, 1998, 8: 1-41.
  • 2Bergman B and Hynen A. Dispersion effects form unreplicated designs in the 2k-p series[J]. Tech- nometrics, 1997, 39: 191-198.
  • 3Brenneman W A and Nair V N. Methods for identifying dispersion effects in unreplicated factorial experiments: a critical analysis and proposed strategies[J]. Technometrics, 2001, 43: 388-404.
  • 4Wiklander K and Holm S. Dispersion effects in unreplicated factorial designs[J]. Appl Stochastic Models Bus Ind, 2003, 19: 13-30.
  • 5Chen-Tuo Liar. Two-level factorial designs for searching dispersion factors and estimating location main effects[J]. Journal of Statistical Planning and Inference, 2006, 136: 4071-4087.
  • 6Van de Ven P M. On the equivalence of three estimators for dispersion effects in unreplicated two-level factorial designs[J]. Journal of Statistical Planning and Inference, 2008, 138: 18-29.
  • 7李济洪,任改仙,王钰.两水平无重复因析试验散度效应BH估计的性质[J].应用概率统计,2010,26(2):179-189. 被引量:3
  • 8杨柳,李济洪,王钰.无重复因析试验中多个散度效应检验的一种改进方法[J].数学的实践与认识,2010,40(12):132-138. 被引量:1
  • 9王钰,李济洪,冯霞.无重复因析试验中散度效应的ML估计[J].系统科学与数学,2011,31(7):804-816. 被引量:2
  • 10陈颖.单次多水平正交试验中效应的显著性检验[J].应用概率统计,2011,27(5):497-510. 被引量:8

引证文献3

二级引证文献1

应用数学学报
2010年 第4期

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