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Autori principali: Zhou, Xietao, Gilmour, Steven G.
Natura: Preprint
Pubblicazione: 2024
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Accesso online:https://arxiv.org/abs/2409.01926
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author Zhou, Xietao
Gilmour, Steven G.
author_facet Zhou, Xietao
Gilmour, Steven G.
contents We have established the association matrix that expresses the estimator of effects under baseline parameterization, which has been considered in some recent literature, in an equivalent form as a linear combination of estimators of effects under the traditional centered parameterization. This allows the generalization of the $Q_B$ criterion which evaluates designs under model uncertainty in the traditional centered parameterization to be applicable to the baseline parameterization. Some optimal designs under the baseline parameterization seen in the previous literature are evaluated and it has been shown that at a given prior probability of a main effect being in the best model, the design converges to $Q_B$ optimal as the probability of an interaction being in the best model converges to 0 from above. The $Q_B$ optimal designs for two setups of factors and run sizes at various priors are found by an extended coordinate exchange algorithm and the evaluation of their performances are discussed. Comparisons have been made to those optimal designs restricted to level balance and orthogonality conditions.
format Preprint
id arxiv_https___arxiv_org_abs_2409_01926
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle $Q_B$ Optimal Two-Level Designs for the Baseline Parameterization
Zhou, Xietao
Gilmour, Steven G.
Methodology
We have established the association matrix that expresses the estimator of effects under baseline parameterization, which has been considered in some recent literature, in an equivalent form as a linear combination of estimators of effects under the traditional centered parameterization. This allows the generalization of the $Q_B$ criterion which evaluates designs under model uncertainty in the traditional centered parameterization to be applicable to the baseline parameterization. Some optimal designs under the baseline parameterization seen in the previous literature are evaluated and it has been shown that at a given prior probability of a main effect being in the best model, the design converges to $Q_B$ optimal as the probability of an interaction being in the best model converges to 0 from above. The $Q_B$ optimal designs for two setups of factors and run sizes at various priors are found by an extended coordinate exchange algorithm and the evaluation of their performances are discussed. Comparisons have been made to those optimal designs restricted to level balance and orthogonality conditions.
title $Q_B$ Optimal Two-Level Designs for the Baseline Parameterization
topic Methodology
url https://arxiv.org/abs/2409.01926