More precise tables of optimal balanced \(2^ m\) fractional factorial designs of Srivastava and Chopra, 7\(\leq m\leq 10\)
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Publication:1821466
DOI10.1016/0378-3758(86)90089-3zbMath0616.62108OpenAlexW1987236765MaRDI QIDQ1821466
Wilson A. K. Kipngeno, Subir Ghosh, D. V. Chopra
Publication date: 1986
Published in: Journal of Statistical Planning and Inference (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/0378-3758(86)90089-3
Related Items (8)
On the characteristic polynomial of the information matrix of balanced fractional \(s^ m\) factorial designs for resolution \(V_{p,q}\) ⋮ \(2^m\) fractional factorial designs of resolution V with high \(A\)-efficiency, \(7\leq m\leq 10\) ⋮ Weighted A-optimality for fractional \(2^m\) factorial designs of resolution \(V\) ⋮ Analysis of variance of balanced fractional 2nfactorial designs of resolution 2l+1 ⋮ J.N. Srivastava and experimental design ⋮ Statistical properties of Rechtschaffner designs ⋮ Fractional factorial designs of two and three levels ⋮ Robustness of balanced fractional \(2^ m\) factorial designs derived from simple arrays
Cites Work
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- More precise tables of Srivastava-Chopra balanced optimal \(2^ m\) fractional factorial designs of resolution V, m\(\leq 6\)
- Optimal balanced \(2^7\) fractional factorial designs of resolution \(v\), with \(N\leq 42\)
- Balanced 2mfactorial designs of resolution v which allow search and estimation of one extra unknown effect, 4 ≤ m ≤ 8
- Balanced Optimal 2 m Fractional Factorial Designs of Resolution V, m <= 6
- Optimal balanced 27fractional factorial designs of resolution V, 49 ≤ N ≤55
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