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- Title
Constructing K-optimal designs for regression models.
- Authors
Yue, Zongzhi; Zhang, Xiaoqing; Driessche, P. van den; Zhou, Julie
- Abstract
We study approximate K-optimal designs for various regression models by minimizing the condition number of the information matrix. This minimizes the error sensitivity in the computation of the least squares estimator of regression parameters and also avoids the multicollinearity in regression. Using matrix and optimization theory, we derive several theoretical results of K-optimal designs, including convexity of K-optimality criterion, lower bounds of the condition number, and symmetry properties of K-optimal designs. A general numerical method is developed to find K-optimal designs for any regression model on a discrete design space. In addition, specific results are obtained for polynomial, trigonometric and second-order response models.
- Subjects
REGRESSION analysis; MULTICOLLINEARITY; MATHEMATICAL optimization; LEAST squares; TRIGONOMETRIC functions; MATRIX norms
- Publication
Statistical Papers, 2023, Vol 64, Issue 1, p205
- ISSN
0932-5026
- Publication type
Article
- DOI
10.1007/s00362-022-01317-9