Optimal Designs for 2^k Factorial Experiments with Binary Response
Abstract
We consider the problem of obtaining D-optimal designs for factorial experiments with a binary response and qualitative factors each at two levels. We obtain a characterization for a design to be locally D-optimal. Based on this characterization, we develop efficient numerical techniques to search for locally D-optimal designs. Using prior distributions on the parameters, we investigate EW D-optimal designs, which are designs that maximize the determinant of the expected information matrix. It turns out that these designs can be obtained very easily using our algorithm for locally D-optimal designs and are very good surrogates for Bayes D-optimal designs. We also investigate the properties of fractional factorial designs and study the robustness with respect to the assumed parameter values of locally D-optimal designs.
Keywords
Cite
@article{arxiv.1109.5320,
title = {Optimal Designs for 2^k Factorial Experiments with Binary Response},
author = {Jie Yang and Abhyuday Mandal and Dibyen Majumdar},
journal= {arXiv preprint arXiv:1109.5320},
year = {2015}
}
Comments
41 pages, 3 figures, 8 tables