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1.
任意秩多元线性模型中的最优预测   总被引:32,自引:2,他引:30  
本文研究了任意秩多元线性模型中可预测变量的最优预测,特别地,我们考虑了一类特殊的预测函数,Φ-线性预测函数,给出了Φ-可预测变量和最优Φ线性一无偏预测的定义,得到了Φ-可预测变量的最优Φ-线性无偏预测,并证明了它在几乎处处意主意义下的唯一性。  相似文献   

2.
对于任意秩有限总体,在二次损失下,有关文献已给出了线性可预测变量在齐次线性预测类中的唯一线性Minimax预测.本文在正态假设下,证明了这个线性Minimax预测也是线性可预测变量在一切预测类中的唯一Minimax预测.  相似文献   

3.
正态分布下任意秩有限总体中的Minimax预测   总被引:1,自引:0,他引:1  
对于任意秩有限总体,在二次损失下,有关文献已给出了线性可预测变量在齐次线性预测类中的唯一线性Minimax预测.本文在正态假设下,证明了这个线性Minimax预测也是线性可预测变量在一切预测类中的唯一Minimax预测.  相似文献   

4.
王浩波  喻胜华 《经济数学》2004,21(4):342-346
本文针对带线性等式约束的线性模型 ,在二次损失下研究了线性预测的可容许性 ,得到了条件线性可预测变量的线性预测 Lys(Lys+ a)是可容许线性预测的充要条件。  相似文献   

5.
二次损失下任意秩有限总体中的线性Minimax预测   总被引:3,自引:0,他引:3  
喻胜华 《数学年刊A辑》2004,25(4):485-496
本文对通常的二次损失作了适当的修改,在此基础上研究了一个预测在齐次线性预测函数类中的极大极小性.得到了任意秩有限总体中线性可预测变量的唯一线性Minimax预测(有关唯一性在几乎处处意义下理解).  相似文献   

6.
有限总体中的最优预测   总被引:10,自引:1,他引:9  
研究了有限总体中的最优预测问题,在一般Gauss-Markov模型下得到了线性可预测变量的最优线性无偏预测,特别地,考虑了一类特殊的预测函数:b-线性预测函数。  相似文献   

7.
王浩波  袁权龙 《经济数学》2006,23(4):412-415
本文针对带不等式约束的线性模型,在矩阵损失下研究了线性预测的可容许性,得到了条件线性可预测变量的非齐次线性预测Lys α是可容许线性预测的充要条件.  相似文献   

8.
黄介武 《经济数学》2011,28(1):21-23
在一般多元线性模型中就基于岭估计的预测量与最优线性无偏预测量的最优性判别问题进行了讨论,得到了基于岭估计的预测量在矩阵迹意义下优于最优线性无偏预测量的充要条件.  相似文献   

9.
研究了14平面的线性预测及14平面上观察时存在遗漏观察值的线性预测,并得到了这两个预测问题之间的预测误差、预测值的对应关系.  相似文献   

10.
研究了1/4平面的线性预测及1/4平面上观察时存在遗漏观察值的线性预测,并得到了这两个预测问题之间的预测误差、预测值的对应关系.  相似文献   

11.
This article investigates linear minimax estimators of regression coefficient in a linear model with an assumption that the underlying distribution is a normal one with a nonnegative definite covariance matrix under a balanced loss function. Some linear minimax estimators of regression coefficient in the class of all estimators are obtained. The result shows that the linear minimax estimators are unique under some conditions.  相似文献   

12.
In this paper, the authors address the problem of the minimax estimator of linear combinations of stochastic regression coefficients and parameters in the general normal linear model with random effects. Under a quadratic loss function, the minimax property of linear estimators is investigated. In the class of all estimators, the minimax estimator of estimable functions, which is unique with probability 1, is obtained under a multivariate normal distribution.  相似文献   

13.
We consider the simultaneous linear minimax estimation problem in linear models with ellipsoidal constraints imposed on an unknown parameter. Using convex analysis, we derive necessary and sufficient optimality conditions for a matrix to define the linear minimax estimator. For certain regions of the set of characteristics of linear models and constraints, we exploit these optimality conditions and get explicit formulae for linear minimax estimators.  相似文献   

14.
对带有随机效应的一般线性模型,本文提出了随机回归系数和参数线性组合的Minimax估计问题. 在二次损失下,研究了线性估计的极小极大性.关于适当的假设,得到了可估函数的唯一线性Mjnimax 估计.  相似文献   

15.
We consider local polynomial fitting for estimating a regression function and its derivatives nonparametrically. This method possesses many nice features, among which automatic adaptation to the boundary and adaptation to various designs. A first contribution of this paper is the derivation of an optimal kernel for local polynomial regression, revealing that there is a universal optimal weighting scheme. Fan (1993, Ann. Statist., 21, 196-216) showed that the univariate local linear regression estimator is the best linear smoother, meaning that it attains the asymptotic linear minimax risk. Moreover, this smoother has high minimax risk. We show that this property also holds for the multivariate local linear regression estimator. In the univariate case we investigate minimax efficiency of local polynomial regression estimators, and find that the asymptotic minimax efficiency for commonly-used orders of fit is 100% among the class of all linear smoothers. Further, we quantify the loss in efficiency when going beyond this class.  相似文献   

16.
《Optimization》2012,61(1-2):155-166
A topological version of Passy–Prisman’s minimax Theorem is proved. We introduce to pological cones and we prove our results under connectedness assumptions. We give examples of cones in spaces without any linear structure. Even when interpreted in a linear framework our results are new and improve Passy–Prisman’s minimax Theorem, and consequently Sion’s minimax Theorem  相似文献   

17.
We investigate the state estimation problem for a dynamical system described by a linear operator equation with unknown parameters in a Hilbert space. In the case of quadratic restrictions on the unknown parameters, we propose formulas for a priori mean-square minimax estimators and a posteriori linear minimax estimators. A criterion for the finiteness of the minimax error is formulated. As an example, the main results are applied to a system of linear algebraic-differential equations with constant coefficients.  相似文献   

18.
We develop a duality theory for minimax fractional programming problems in the face of data uncertainty both in the objective and constraints. Following the framework of robust optimization, we establish strong duality between the robust counterpart of an uncertain minimax convex–concave fractional program, termed as robust minimax fractional program, and the optimistic counterpart of its uncertain conventional dual program, called optimistic dual. In the case of a robust minimax linear fractional program with scenario uncertainty in the numerator of the objective function, we show that the optimistic dual is a simple linear program when the constraint uncertainty is expressed as bounded intervals. We also show that the dual can be reformulated as a second-order cone programming problem when the constraint uncertainty is given by ellipsoids. In these cases, the optimistic dual problems are computationally tractable and their solutions can be validated in polynomial time. We further show that, for robust minimax linear fractional programs with interval uncertainty, the conventional dual of its robust counterpart and the optimistic dual are equivalent.  相似文献   

19.
该文在矩阵损失下研究线性预测函数的局部极大极小性.在适当的假设下,得到了任意秩有限总体中的可预测变量的唯一的局部线性Minimax预测.(有关唯一性在几乎处处意义下理解).  相似文献   

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