Ordinary differential equations (ODEs) are used to model dynamic systems appearing in engineering, physics, biomedical sciences and many other fields. These equations contain an unknown vector of parameters of physical significance, say $oldsymbol{heta}$ which has to be estimated from the noisy data. Often there is no closed form analytic solution of the equations and hence we cannot use the usual non-linear least squares technique to estimate the unknown parameters. The two-step approach to solve this problem involves fitting the data nonparametrically and then estimating the parameter by minimizing the distance between the nonparametrically estimated derivative and the derivative suggested by the system of ODEs. The statistical aspects of this approach have been studied under the frequentist framework. We consider this two-step estimation under the Bayesian framework. The response variable is allowed to be multidimensional and the true mean function of it is not assumed to be in the model. We induce a prior on the regression function using a random series based on the B-spline basis functions. We establish the Bernstein-von Mises theorem for the posterior distribution of the parameter of interest. Interestingly, even though the posterior distribution of the regression function based on splines converges at a rate slower than $n^{-1/2}$, the parameter vector $oldsymbol{heta}$ is nevertheless estimated at $n^{-1/2}$ rate.
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机译:常微分方程(ODE)用于对出现在工程,物理学,生物医学和许多其他领域的动力系统进行建模。这些方程包含物理意义参数的未知向量,例如$ boldsymbol { theta} $,必须从噪声数据中进行估算。通常,方程没有封闭形式的解析解,因此我们不能使用常规的非线性最小二乘法估算未知参数。解决此问题的两步方法涉及非参数拟合数据,然后通过最小化非参数估计导数和ODE系统建议的导数之间的距离来估计参数。这种方法的统计方面已经在常客制框架下进行了研究。我们考虑贝叶斯框架下的两步估算。允许响应变量为多维,并且模型中未假定其真正的均值函数。我们使用基于B样条基函数的随机序列对回归函数进行先验推断。我们建立感兴趣参数的后验分布的伯恩斯坦-冯·米塞斯定理。有趣的是,即使基于样条的回归函数的后验分布收敛的速度慢于$ n ^ {-1/2} $,但参数矢量$ boldsymbol { theta} $仍估计为$ n ^ { -1/2} $费率。
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