共查询到17条相似文献,搜索用时 171 毫秒
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《高校应用数学学报(A辑)》2018,(4)
利用广义p值和参数bootstrap方法,研究了Panel数据模型中未知参数的假设检验问题.对于回归系数,基于最小二乘估计和两步估计方法,考虑了非齐次线性假设检验问题.对于方差分量,研究了单边假设检验问题.进而利用Monte Carlo方法进行模拟研究.模拟结果表明,参数bootstrap检验方法既能较好控制犯第一类错误的概率,又具有较高的功效,且大多数情况下优于广义p值检验方法. 相似文献
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针对偏正态非平衡面板单因素随机效应模型,文章研究了回归系数和方差分量函数的假设检验和区间估计问题.首先,基于矩阵分解技术,给出回归系数的精确检验方法.其次,利用Bootstrap方法和广义方法,构造单个方差分量、方差分量之和的检验统计量和置信区间.再次,建立方差分量之比的精确检验和近似检验.文章证明了所给检验方法和置信区间的变换不变性等理论性质.Monte Carlo结果表明,对于所设参数和样本量,文章所给方法在犯第一类错误的概率和功效意义下,具有统计优良性.最后,将上述方法应用于汽油消耗量的案例分析. 相似文献
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线性混合模型中方差分量的广义推断 总被引:1,自引:0,他引:1
本文考虑了线性混合模型中方差分量的假设检验和区间估计问题.基于广义P-值和广义置信区间的概念,构造了对应于随机效应的单个方差分量的精确检验和置信区间.所构造的广义p-值和广义置信区间是最小充分统计量的函数.对于两个独立线性混合模型中对应于随机效应的方差分量的比较,建立了精确检验和置信区间.进-步,研究了所给检验和置信区间的统计性质,给出了这些检验方法与文献中已有方法的功效比较的模拟结果.模拟结果表明,新检验在功效方面有显著的改进.最后,通过-个实例来演示本文方怯. 相似文献
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在panel模型中,如果方差分量已知,对回归系数的检验,存在一致最优功效检验.但往往方差分量未知,这时采用的方法就是用它们的估计代替它们.不同的方差分量的估计,就得到不同的检验统计量.这些检验统计量的分布都是未知的,在小样本情况下,很难控制它们的检验水平.本文采用广义p值的方法,给出了一种精确的检验.模拟结果显示,这种检验能很好的控制检验水平,并且有更高的检验功效.同时,本文利用广义置信域的方法给出了回归系数的广义置信球. 相似文献
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本文研究了带有两个方差分量矩阵的多元线性混合模型方差分量矩阵的估计问题.对于平衡模型,给出了基于谱分解估计的一个方差分量矩阵的非负估计类.对于非平衡模型,给出了方差分量矩阵的广义谱分解估计类,讨论了与ANOVA估计等价的充要条件.同时,在广义谱分解估计的基础上给出了一种非负估计类,并讨论了其优良性.当具有较小二次风险的非负估计不存在时,从估计为非负的概率的角度考虑,将Kelly和Mathew(1993)提出的构造具有更小取负值概率的估计类的方法推广到本文的多元模型下,给出了较谱分解估计相比有更小取负值概率和更小风险的估计类.最后,模拟研究和实例分析表明文中理论结果有很好的表现. 相似文献
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Bartlett分解与多元正态总体均值的广义推断 总被引:2,自引:0,他引:2
对多个正态总体均值的统计推断是一个古老而令人感兴趣的问题.本文利用样本协方差矩阵的Bartlett分解和广义p-值的概念给出一些关于均值的精确检验.模拟显示这些检验比已有的检验有更高的功效.同时,还根据协方差矩阵的Bartlett分解和样本均值向量,得到一个分布和未知参数无关的统计量,用它可以对多个正态总体共同均值做精确检验.模拟显示,这些检验犯第一错误的概率小于显著性水平,而且有更高的检验功效. 相似文献
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利用广义p-值和广义置信区间的概念,研究了Panel模型中未知参数的检验和置信区间问题.对于回归系数,分别考虑了单个情形和多个线性无关情形下的检验和置信区间问题,得到了精确检验和置信区间.对于方差分量,研究了其任意线性组合的检验和置信区间问题,建立了精确检验和置信区间.基于广义p-值和广义置信区间,获取精确检验和置信区间的方法具有计算方便、易应用于小样本问题的特点.最后,分别从理论和数值上研究了这些精确检验和置信区间的统计性质. 相似文献
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A new method for the construction of bivariate matrix valued rational interpolants (BGIRI) on a rectangular grid is presented in [6]. The rational interpolants are of Thiele-type continued fraction form with scalar denominator. The generalized inverse introduced by [3]is gen-eralized to rectangular matrix case in this paper. An exact error formula for interpolation is ob-tained, which is an extension in matrix form of bivariate scalar and vector valued rational interpola-tion discussed by Siemaszko[l2] and by Gu Chuangqing [7] respectively. By defining row and col-umn-transformation in the sense of the partial inverted differences for matrices, two type matrix algorithms are established to construct corresponding two different BGIRI, which hold for the vec-tor case and the scalar case. 相似文献
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利用局部加权拟合方法检验线性回归关系 总被引:11,自引:0,他引:11
利用局部加权技术拟合变参数回归模型,提出了一个检验线性回归关系的方法.基于残差平方和,构造适当的检验统计量,给出了计算检验p-值的精确方法及三阶矩x2逼近方法.随机模拟与实例分析表明计算p-值的逼近方法具有较高的精度,所提出的检验统计量在检测回归函数非线性性方面有满意的功效和可靠性. 相似文献
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Hou-de Han Chun-xiong Zheng 《计算数学(英文版)》2005,23(6):603-618
The exact boundary condition on a spherical artificial boundary is derived for thethree-dimensional exterior problem of linear elasticity in this paper. After this bound-ary condition is imposed on the artificial boundary, a reduced problem only defined in abounded domain is obtained. A series of approximate problems with increasing accuracycan be derived if one truncates the series term in the variational formulation, which isequivalent to the reduced problem. An error estimate is presented to show how the errordepends on the finite element discretization and the accuracy of the approximate problem.In the end, a numerical example is given to demonstrate the performance of the proposedmethod. 相似文献
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In this paper, we identify a space-dependent source for a fractional diffusion equation. This problem is ill-posed, i.e., the solution (if it exists) does not depend continuously on the data. The generalized Tikhonov regularization method is proposed to solve this problem. An a priori error estimate between the exact solution and its regularized approximation is obtained. Moreover, an a posteriori parameter choice rule is proposed and a stable error estimate is also obtained, Numerical examples are presented to illustrate the validity and effectiveness of this method. 相似文献
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The singular manifold method is used to solve a (2 + 1)-dimensional KdV equation. An exact solution containing two arbitrary functions is then obtained. A diversity of localized structures, such as generalized dromions and solitoffs, is exposed by making full use of these arbitrary functions. These localized structures are illustrated by graphs. 相似文献
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The paper concerns a posteriori estimates of functional type for the difference between exact and approximate solutions to
a generalized Stokes problem. The estimates are derived by transformations of the basic integral identity defining a generalized
solution to the problem using the method suggested by the first author. The estimates obtained can be classified into two
types. Estimates of the first type are valid only for solenoidal functions, while estimates of the second type are applicable
for any functions that belong to the energy space of the respective problem and satisfy the boundary conditions. In the second
case, the estimates include an additional penalty term with a multiplier defined by the constant in the Ladyzhenskaya-Babuška-Brezzi
condition. It is proved that a posteriori estimates for the velocity field yield computable estimates of the difference between
exact and approximate pressure functions in the L2-norm. It is shown that the estimates provide sharp upper and lower bounds of the error and their practical computation requires
to solve only finite-dimensional problems. Bibliography: 34 titles.
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Translated from Problemy Matematicheskogo Analiza, No. 34, 2006, pp. 89–101. 相似文献