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有理模型的最优设计

Optimal designs for rational models

Annals of Statistics · 1996
被引 21
ABS 4*

中文导读

研究了有理模型Y=P(x)/Q(x)+ε的贝叶斯D最优和外推最优设计,推导了局部最优设计的条件,证明了设计点个数为p+q+1且与P(x)参数无关。

Abstract

In this paper, experimental designs for a rational model, $Y = P(x)/Q(x) + \varepsilon$, are investigated, where $P(x) = \theta_0 + \theta_1 x + \dots + \theta_p x^p$ and $Q(x) = 1 + \theta_{p + 1} x + \dots + \theta_{p+q} x^q$ are polynomials and $\varepsilon$ is a random error. Two approaches, Bayesian D-optimal and Bayesian optimal design for extrapolation, are examined. The first criterion maximizes the expected increase in Shannon information provided by the experiment asymptotically, and the second minimizes the asymptotic variance of the maximum likelihood estimator (MLE) of the mean response at an extrapolation point $x_e$. Corresponding locally optimal designs are also discussed. Conditions are derived under which a $p + q + 1$-point design is a locally D-optimal design. The Bayesian D-optimal design is shown to be independent of the parameters in $P(x)$ and to be equally weighted at each support point if the number of support points is the same as the number of parameters in the model. The existence and uniqueness of the locally optimal design for extrapolation are proven. The number of support points for the locally optimal design for extrapolation is exactly $p + q + 1$. These $p + q + 1$ design points are proved to be independent of the extrapolation point x e and the parameters in $P(x)$. The corresponding weights are also independent of the parameters in $P(x)$, but depend on $x_e$ and are not equal.

实验设计贝叶斯最优设计外推最优设计有理模型统计学