On optimality of designs with three distinct eigenvalues
Abstract
Let denote the family of all connected block designs with treatments and blocks of size . Let . The replication of a treatment is the number of times it appears in the blocks of . The matrix is called the information matrix of where is the incidence matrix of and is a diagonal matrix of the replications. Since is connected, has nonzero eigenvalues . Let be the class of all binary designs of . We prove that if there is a design such that (i) has three distinct eigenvalues, (ii) minimizes trace of over , (iii) maximizes the smallest nonzero eigenvalue and the product of the nonzero eigenvalues of over , then for all , minimizes over . In the context of optimal design theory, this means that if there is a design such that its information matrix has three distinct eigenvalues satisfying the condition (ii) above and that is E- and D-optimal in , then is -optimal in for all . As an application, we demonstrate the -optimality of certain group divisible designs. Our proof is based on the method of KKT conditions in nonlinear programming.
Keywords
Cite
@article{arxiv.1205.5876,
title = {On optimality of designs with three distinct eigenvalues},
author = {M. R. Faghihi and E. Ghorbani and G. B. Khosrovshahi and S. Tat},
journal= {arXiv preprint arXiv:1205.5876},
year = {2013}
}
Comments
14 pages, final version