Optimal designs for estimating individual coefficients in fourier regression models
成果类型:
Article
署名作者:
Dette, H; Melas, VB
署名单位:
Ruhr University Bochum; Saint Petersburg State University
刊物名称:
ANNALS OF STATISTICS
ISSN/ISSBN:
0090-5364
发表日期:
2003
页码:
1669-1692
关键词:
trigonometric regression
EQUIVALENCE
shape
摘要:
In the common trigonometric regression model, we investigate the optimal design problem for the estimation of the individual coefficients, where the explanatory variable varies in the interval [-alpha, alpha], 0 < alpha less than or equal to pi. It is demonstrated that the structure of the optimal design depends sensitively on the size of the design space. For many important cases, optimal designs can be found explicitly, where the complexity of the solution depends on the value of the parameter alpha and the order of the term, for which the corresponding coefficient has to be estimated. The main tool of our approach is the reduction of the problem for the trigonometric regression model to a design problem for a polynomial regression. In particular, we determine the optimal designs for estimating the parameters corresponding to the cosine terms explicitly, if the design space is sufficiently small, and prove that under this condition all optimal designs for estimating the parameters corresponding to the sine terms are supported at the same points.