Split-plot designs with general minimum lower-order confounding
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Publication:977282
DOI10.1007/s11425-010-0070-2zbMath1189.62124OpenAlexW2081486597MaRDI QIDQ977282
Peng Li, Run-Chu Zhang, Jialin Wei, Jian-Feng Yang
Publication date: 21 June 2010
Published in: Science China. Mathematics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/s11425-010-0070-2
Optimal statistical designs (62K05) Factorial statistical designs (62K15) Statistical tables (62Q05)
Related Items (9)
Analysis on \(s^{n-m}\) designs with general minimum lower-order confounding ⋮ On simplifying the calculations leading to designs with general minimum lower-order confounding ⋮ Robust two-level regular fractional factorial designs ⋮ Constructing minimum aberration split-plot designs via complementary designs when the subplot factors are more important ⋮ A Generalized General Minimum Lower Order Confounding Criterion for General Orthogonal Designs ⋮ General minimum lower‐order confounding three‐level split‐plot designs when the whole plot factors are important ⋮ An optimal selection of two-level regular single arrays for robust parameter experiments ⋮ Construction of some \(3^{n-m}\) regular designs with general minimum lower order confounding ⋮ General minimum lower-order confounding split-plot designs with important whole-plot factors
Cites Work
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- Minimum secondary aberration fractional factorial split-plot designs in terms of consulting designs
- Bounds on the maximum numbers of clear two-factor interactions for \(2^{(n_1 + n_2 ) - (k_1 + k_2 )}\) fractional factorial split-plot designs
- General minimum lower order confounding designs: an overview and a construction theory
- On construction of general minimum lower order confounding \(2^{n - m}\) designs with \(N/4+1\leq n\leq 9N/32\)
- Optimal block sequences for blocked fractional factorial split-plot designs
- Some theoretical results for fractional factorial split-plot designs
- Optimal blocking of two-level fractional factorial designs
- Construction of fractional factorial split-plot designs with weak minimum aberration
- A modern theory of factorial designs.
- \(2^{(n_{1}+n_{2})-(k_{1}+k_{2})}\) fractional factorial split-plot designs containing clear effects
- Optimal versus orthogonal and equivalent-estimation design of blocked and split-plot experiments
- D-optimal design of split-split-plot experiments
- Minimum Aberration 2 k-p Designs
- Minimum Aberration and Model Robustness for Two-Level Fractional Factorial Designs
- Minimum-Aberration Two-Level Split-Plot Designs
- \(D\)-optimal response surface designs in the presence of random block effects.
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