Characteristic polynomials of the information matrices of balanced fractional \(3^ m\) factorial designs of resolution V
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Publication:1158713
DOI10.1016/0378-3758(81)90029-XzbMath0473.62064OpenAlexW1997864055MaRDI QIDQ1158713
Publication date: 1981
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(81)90029-x
Other designs, configurations (05B30) Orthogonal arrays, Latin squares, Room squares (05B15) Factorial statistical designs (62K15)
Related Items (15)
Analysis of variance of balanced fractional \(S^ m\) factorial designs of resolution \(V_{p,q}\) ⋮ On the characteristic polynomial of the information matrix of balanced fractional \(s^ m\) factorial designs for resolution \(V_{p,q}\) ⋮ On the maximum number of constraints for s-symbol balanced arrays of strength t ⋮ D-optimality in \(3^ k\)-designs for N\(\equiv 1\) mod 9 observations ⋮ Existence conditions for balanced fractional 3mfactorial designs of resolution R({00, 10, 01, 20, 11}) ⋮ Characteristic Polynomial of the Information Matrix of a Balanced Resolution V Design of the 4nType Approached Through the 22nFactorial ⋮ Characterization of Balanced Fractional 3mFactorial Designs of Resolution III ⋮ Bounds on the number of constraints for balanced arrays of strength t ⋮ Fractional factorial designs of two and three levels ⋮ Robustness of balanced fractional \(2^ m\) factorial designs derived from simple arrays ⋮ Analysis of variance of balanced fractional factorial designs ⋮ Characterization of balanced second-order designs for \(3^m\) factorials ⋮ Best alias designs in some class of balanced fractional 3mfactorial designs of resolution V ⋮ Balanced fractional \(\text{3}^m\) designs of resolution IV ⋮ On some optimal fractional \(2^ m \)factorial designs of resolution V
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