A systematic construction approach for nonregular fractional factorial four-level designs via quaternary linear codes
From MaRDI portal
Publication:2085015
DOI10.1007/s40314-022-02025-8OpenAlexW4297019762MaRDI QIDQ2085015
Gajendra K. Vishwakarma, A. M. Elsawah
Publication date: 14 October 2022
Published in: Computational and Applied Mathematics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/s40314-022-02025-8
Hamming distancequaternary codespower momentgray mapsfactorial designsLee distancealias structurenonregular designsmultiple doubling
Related Items (3)
A novel technique for constructing nonregular nine-level designs: adjusted multiple tripling technique ⋮ An automated robust algorithm for clustering multivariate data ⋮ A sequential designing-modeling technique when the input factors are not equally important
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Constructing optimal asymmetric combined designs via Lee discrepancy
- One-eighth- and one-sixteenth-fraction quaternary code designs with high resolution
- Some properties of double designs in terms of Lee discrepancy
- A code arithmetic approach for quaternary code designs and its application to \((1/64)\)th-fractions
- Quarter-fraction factorial designs constructed via quaternary codes
- A new strategy for optimal foldover two-level designs
- Lee discrepancy and its applications in experimental designs
- Recent developments in nonregular fractional factorial designs
- Orthogonal arrays. Theory and applications
- Minimum \(G_2\)-aberration for nonregular fractional factorial designs
- Some new results on triple designs
- Designing uniform computer sequential experiments with mixture levels using Lee discrepancy
- New results on quaternary codes and their Gray map images for constructing uniform designs
- Generalized minimum aberration for asymmetrical fractional factorial designs
- Optimal foldover plans of asymmetric factorials with minimum wrap-around \(L_2\)-discrepancy
- A new foldover strategy and optimal foldover plans for three-level design
- Multiple doubling: a simple effective construction technique for optimal two-level experimental designs
- Designing optimal large four-level experiments: a new technique without recourse to optimization softwares
- Building some bridges among various experimental designs
- Improving the space-filling behavior of multiple triple designs
- Quadrupling: construction of uniform designs with large run sizes
- An appealing technique for designing optimal large experiments with three-level factors
- Constructing optimal four-level designs via Gray map code
- Construction of uniform designs via an adjusted threshold accepting algorithm
- A complementary design theory for doubling
- Doubling and projection: A method of constructing two-level designs of resolution IV
- A modern theory of factorial designs.
- Cross-entropy loss for recommending efficient fold-over technique
- Uniform Designs Through Modified Gray Maps And Quaternary To Three Binary Columns Replacement Rules
- Minimum Aberration 2 k-p Designs
- Minimum Aberration and Model Robustness for Two-Level Fractional Factorial Designs
- Uniform Design: Theory and Application
- A catalog of optimal foldover plans for constructing U-uniform minimum aberration four-level combined designs
- A powerful and efficient algorithm for breaking the links between aliased effects in asymmetric designs
- A note on generalized aberration in factorial designs
- Degree of isomorphism: a novel criterion for identifying and classifying orthogonal designs
This page was built for publication: A systematic construction approach for nonregular fractional factorial four-level designs via quaternary linear codes
