Characterization of information matrices for balanced two-level fractional factorial designs of odd resolution derived from two-symbol simple arrays
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Publication:4843695
DOI10.1080/03610929408831361zbMath0825.62199OpenAlexW2069064604MaRDI QIDQ4843695
Publication date: 17 August 1995
Published in: Communications in Statistics - Theory and Methods (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1080/03610929408831361
information matrixalgebraic structureirreducible matrix representationfactorial designassociation algebrasimple arrayatomic array
Cites Work
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- Characteristic polynomials of information matrices of some balanced fractional \(2^ m\) factorial designs of resolution \(2l+1\)
- Balanced fractional \(2^m\) factorial designs of even resolution obtained from balanced arrays of strength \(2\ell\) with index \(\mu_\ell= 0\)
- Balanced arrays of strength 21 and balanced fractional \(2^m\) factorial designs
- NECESSARY AND SUFFICIENT CONDITION FOR A BALANCED ARRAY OF STRENGTH 21 TO BE A BALANCED FRACTIONAL 2 FACTORIAL DESIGN OF RESOLUTION 2l
- On the Characteristic Roots of the Information Matrix of $2^m$ Balanced Factorial Designs of Resolution V, with Applications
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