Indicator function based on complex contrasts and its application in general factorial designs
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Publication:1036718
DOI10.1016/j.jspi.2009.07.002zbMath1178.62081OpenAlexW2020742297MaRDI QIDQ1036718
Publication date: 13 November 2009
Published in: Journal of Statistical Planning and Inference (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.jspi.2009.07.002
Related Items (9)
Matrix image method for ranking nonregular fractional factorial designs ⋮ An optimality criterion for supersaturated designs with quantitative factors ⋮ Equivalence of factorial designs with qualitative and quantitative factors ⋮ Geometric isomorphism check for symmetric factorial designs ⋮ Generalized resolution for orthogonal arrays ⋮ Semifoldover plans for three-level orthogonal arrays with quantitative factors ⋮ Unnamed Item ⋮ Combinatorial Equivalence of Fractional Factorial Designs ⋮ Some properties of \(\beta\)-wordlength pattern for four-level designs
Cites Work
- Projection properties of certain three level orthogonal arrays
- Indicator function and its application in two-level factorial designs
- Classification of two-level factorial fractions
- Minimum \(G_2\)-aberration for nonregular fractional factorial designs
- Projection justification of generalized minimum aberration for asymmetrical fractional factorial designs
- Geometric isomorphism and minimum aberration for factorial designs with quantitative factors
- Generalized minimum aberration for asymmetrical fractional factorial designs.
- A survey and evaluation of methods for determination of combinatorial equivalence of factorial designs
- Generalised confounding with Grobner bases
- Minimum Aberration 2 k-p Designs
- A note on generalized aberration in factorial designs
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