Asymptotic Property for the Estimator of Nonparametric Regression Models Under Negatively Orthant Dependent Errors 被引量：1

Asymptotic Property for the Estimator of Nonparametric Regression Models Under Negatively Orthant Dependent Errors

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摘要 In this paper, by using some inequalities of negatively orthant dependent(NOD,in short) random variables and the truncated method of random variables, we investigate the nonparametric regression model. The complete consistency result for the estimator of g(x) is presented. In this paper, by using some inequalities of negatively orthant dependent（NOD,in short） random variables and the truncated method of random variables, we investigate the nonparametric regression model. The complete consistency result for the estimator of g（x） is presented.

作者 PENG Zhi-qing ZHENG Lu-lu LIU Yah-fang XIAO Ru WANG Xue-jun

机构地区 School of Mathematical Sciences

出处《Chinese Quarterly Journal of Mathematics》 2015年第2期300-307,共8页 数学季刊（英文版）

基金 Supported by the Research Teaching Model Curriculum of Anhui University(xjyjkc1407) Supported by the Students Innovative Training Project of Anhui University(201310357004,201410357117,201410357249) Supported by the Quality Improvement Projects for Undergraduate Education of Anhui University(ZLTS2015035)

关键词 negatively orthant dependent random variables nonparametric regression model complete consistency negatively orthant dependent random variables nonparametric regressionmodel complete consistency

分类号 O211.4 [理学—概率论与数理统计]

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参考文献27

1GEORGIEV A A. Local Properties of Function Fitting Estimates with Application to System Identification, in Proceedings of the 4th Pannonian Symposium on Mathematical Statistics, Mathematical Statistics and Applications[C]. Dordrecht: 1985, 141-151.
2GEORGIEV A A, GREBLICKI W. Nonparametric function recovering from noisy observations[J]. Journal of Statistical Planning and Inference, 1986, 13(1): 1-14.
3GEORGIEV A A. Consistent nonparametric multiple regression: the fixed design case[J]. Journal of Multi?variate Analysis, 1988,25(1): 100-ll0.
4MULLER H G. Weak and universal consistency of moving weighted averages[J]. Periodicam Mathematica Hungarica, 1987, 18(3): 241-250.
5FAN Y. Consistent nonparametric multiple regression for dependent heterogeneous processes: the fixed design case[J]. Journal of Multivariate Analysis, 1990, 33(1): 72-88.
6ROUSSAS G G. Consistent regression estimation with fixed design points under dependence conditions[J]. Statistics Probability Letters, 1989, 8(1): 41-50.
7ROUSSAS G G, TRAN L T, IOANNIDES D A. Fixed design regression for time series: asymptotic nor?mality[J]. Journal of Multivariate Analysis, 1992,40(2): 262-291.
8TRAN L, ROUSSAS G, YAKOWITZ S, et al. Fixed-design regression for linear time series[J]. The Annals of Statistics, 1996, 24(3): 975-991.
9胡舒合,朱春华,程业斌,王立春.FIXED-DESIGN REGRESSION FOR LINEARTIME SERIES[J].Acta Mathematica Scientia,2002,22(1):9-18. 被引量：5
10HU Shu-he, PAN Guang-ming, GAO Qi-bing. Estimation problems for a regression model with linear process errors[J]. Applied Mathematics-A Journal of Chinese Universities, 2003, 18(A): 81-90.

二级参考文献7

1杨善朝.混合序列加权和的强收敛性[J].系统科学与数学,1995,15(3):254-265. 被引量：51
2Roussas G G,Tran L T,Ioannides D A.Fixed design regression for time series:asymptotic normality[].Journal of Multivariate Analysis.1992
3Tran L T,Roussas G G.Yakowitz S, Troung V.Fixed-design regression for linear time series[].The Annals of Statistics.1996
4Chen X R.Introduction to mathematical statistics[]..1981
5吴群英.混合序列的若干收敛性质[J].工程数学学报,2001,18(3):58-64. 被引量：61
6吴群英.混合序列加权和的完全收敛性和强收敛性[J].应用数学,2002,15(1):1-4. 被引量：47
7吴群英,林亮.■混合序列的完全收敛性和强收敛性[J].工程数学学报,2004,21(1):75-80. 被引量：55

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2武新乾.线性过程误差下回归函数的样条估计[J].河南科技大学学报（自然科学版）,2010,31(5):94-97. 被引量：6
3唐玲.φ-混合序列滑动和过程回归模型的相合性[J].山东大学学报（理学版）,2013,48(3):89-92. 被引量：1
4ZHANG Ying,ZHANG Yu,SHEN Ai-ting.Complete Convergence for Weighted Sums of WOD Random Variables[J].Chinese Quarterly Journal of Mathematics,2016,31(1):1-8.
5王嫱,周德霞,杜玲,潇如,王学军.NSD变量加权和的完全收敛性（英文）[J].Chinese Quarterly Journal of Mathematics,2016,31(4):359-368.
6邢韵.END序列下非参数回归模型估计的相合性与完全收敛性[J].湖北大学学报（自然科学版）,2017,39(2):118-122.
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8LIU Ting-ting,WANG Xue-jun,WANG Xing-hui.Complete Convergence for Weighted Sums of φ-mixing Sequence[J].Chinese Quarterly Journal of Mathematics,2017,32(2):161-171.

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1ttU Qi,HUANG Qian,YANG Wen-zhi,LI Xiao-qin.Convergence Rate of Estimator forNonparametric Regression Model under ρ-mixing Errors[J].Chinese Quarterly Journal of Mathematics,2017,32(4):407-414.

1ZHAN QIAN,XU SHU-SHENG.Asymptotic Property of Approximation to x~αsgnx by Newman Type Operators[J].Communications in Mathematical Research,2011,27(3):193-199.
2Jian-jun HE,Ting-fan XIE.Asymptotic Property for Some Series of Probability[J].Acta Mathematicae Applicatae Sinica,2013,29(1):179-186.
3Meng Xinzhu Zhang Tongqian Liu Hongxia.ASYMPTOTIC PROPERTY FOR A LOTKA-VOLTERRA COMPETITIVE SYSTEM WITH DELAYS AND DISPERSION[J].Annals of Differential Equations,2005,21(3):378-384. 被引量：4
4Qian Zhan,Shu-sheng Xu,Yue-hong Zhang.Asymptotic Property of Approximation to x~αsgn x by Newman Type Operators[J].Acta Mathematicae Applicatae Sinica,2010,26(4):617-624. 被引量：3
5ZHAO Wen Zhi,TIAN Zheng,XIA Zhi Ming.Wavelet Detection and Estimation of Change Points in Nonparametric Regression Models under Random Design[J].Journal of Mathematical Research and Exposition,2009,29(2):247-256. 被引量：2
6Shi Pei-De Cheng Ping Institute of Systems Science Academia Sinica Beijing,100080 China.Asymptotics of the“Minimum L_1-Norm”Estimates in Nonparametric Regression Models[J].Acta Mathematica Sinica,English Series,1994,10(3):276-288.
7罗琳.Quasi-Periodic Waves and Asymptotic Property for Boiti-Leon-Manna-Pempinelli Equation[J].Communications in Theoretical Physics,2010(8):208-214. 被引量：1
8张文鹏.On the difference between an integer and its inverse modulo n(II)[J].Science China Mathematics,2003,46(2):229-238. 被引量：5
9RENLi-shun,ZHANGCai-yu.The Asymptotic Property of Generalized Taylor Remainder "Mean Value Point"[J].Chinese Quarterly Journal of Mathematics,2004,19(3):314-318. 被引量：4
10张聪,叶昊.网络化控制系统的加权最小二乘辨识方法的一致性和渐近收敛性研究(英文)[J].Chinese Journal of Chemical Engineering,2014,22(7):754-761. 被引量：1

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