ESTIMATION THEORY OF A CLASS OF SEMIPARAMETRIC REGRESSION-MODELS

被引：0

作者：

HONG, SY

机构：

来源：

SCIENCE IN CHINA SERIES A-MATHEMATICS PHYSICS ASTRONOMY | 1992年 / 35卷 / 06期

关键词：

SEMIPARAMETRIC REGRESSION MODEL; NEAREST NEIGHBOR RULE; ASYMPTOTIC NORMALITY; OPTIMAL CONVERGENCE RATE;

D O I：

暂无

中图分类号：

O29 [应用数学];

学科分类号：

070104 ;

摘要：

Consider the semiparametric regression model Y = X'beta + g(T) + e, where (X,T) is R(P)X [0,1]-valued random variables, beta a p X 1 vector of unknown parameter, g an unknown smooth function of T in [0,1], e the random error with mean 0 and variance sigma-2 > 0, possibly unknown. Assume that e and (X,T) are independent. In this paper, the estimators-beta(n), g(n)* and sigma(n)2 of beta, g and sigma-2, respectively, based on the combination of nearest neighbor rule and least square rule, are studied. The asymptotic normalities of beta(n) 2nd sigma(n)2 and the optimal convergence rate of g(n)* are obtained under suitable conditions.

引用

页码：657 / 674

页数：18

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