Balanced fractional \(2^m\) factorial designs of even resolution obtained from balanced arrays of strength \(2\ell\) with index \(\mu_\ell= 0\)
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Publication:1230485
DOI10.1214/aos/1176343544zbMath0337.62054OpenAlexW2053486785MaRDI QIDQ1230485
Publication date: 1976
Published in: The Annals of Statistics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1214/aos/1176343544
Related Items (12)
Optimal partially balanced fractional \(2^{m_ 1+m_ 2}\) factorial designs of resolution IV ⋮ Norm of alias atrices for (l + 1)-factor interactions in balanced fractional 2Mfactorial designs of resolution 2 l+1 ⋮ Characterization of information matrices for balanced two-level fractional factorial designs of odd resolution derived from two-symbol simple arrays ⋮ Balanced arrays of strength 4 and balanced fractional \(3^m\) factorial designs ⋮ On the norm of alias matrices in balanced fractional \(2^m\) factorial designs of resolution \(2l+1\) ⋮ Characteristic polynomials of the information matrices of balanced fractional \(3^ m\) factorial designs of resolution V ⋮ Norm of alias matrices for balanced fractional \(2^m\) factorial designs when interesting factorial effects are not aliased with effects not of interest in estimation ⋮ On some partially balanced fractional \(2^{m_ 1+m_ 2}\) factorial designs of resolution VI ⋮ Fractional factorial designs of two and three levels ⋮ Analysis of variance of balanced fractional factorial designs ⋮ Balanced fractional \(\text{3}^m\) designs of resolution IV ⋮ Search designs for \(2^ m\) factorials derived from balanced arrays of strength \(2(\ell +1)\) and AD-optimal search designs
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