摘要
提出了广义变系数模型函数系数的一种新的估计方法.我们用B样条函数逼近函数系数,不具体选择节点的个数,而是节点个数取均匀的无信息先验,样条函数系数取正态先验,用Bayesian模型平均的方法估计各个函数系数.这种估计方法一个主要特点是允许各个函数系数所需节点个数的后验分布不同,因此允许不同函数系数使用不同的光滑参数.另外,本文还给出了Bayesian B样条估计的计算方法,并通过模拟例子,说明广义变系数模型的函数系数可以由Bayesian B样条估计方法得到很好的估计.
This article presents a new approach of estimating generalized varying-coefficient models. The functional coefficients are approximated by B-spline functions. We do not select the number of the knots, but use the uniform noninformative prior estimation instead. The prior estimation of the coefficients of the B-spline functions is taken as normal distribution. The functional coefficients are estimated by the methods of the Bayesian model averaging. The advantage of this methods is that the smoothing parameter of each functional coefficient is admitted to be different because of the different posterior estimations of the knot number. In addition, the algorithm of Bayesian B-spline estimation is also given. The simulated examples show that the functional coefficients of the generalized varying-coefficient model are well estimated by Bayesian B-spline methods.
出处
《系统科学与数学》
CSCD
北大核心
2006年第2期169-177,共9页
Journal of Systems Science and Mathematical Sciences
基金
国家自然科学基金(10501053)资助课题
