Lee discrepancy on asymmetrical factorials with two- and three-levels
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Publication:424290
DOI10.1007/S11425-012-4366-2zbMath1244.62110OpenAlexW2063209395MaRDI QIDQ424290
Na Zou, Hong Qin, Kashinath Chatterjee
Publication date: 31 May 2012
Published in: Science China. Mathematics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/s11425-012-4366-2
Related Items (12)
A study on average Lee discrepancy measure ⋮ A closer look at de-aliasing effects using an efficient foldover technique ⋮ Constructing optimal asymmetric combined designs via Lee discrepancy ⋮ Uniformity pattern of asymmetric fractional factorials ⋮ Lee discrepancy on mixed two- and three-level uniform augmented designs ⋮ Uniform row augmented designs with multi-level ⋮ A new strategy for optimal foldover two-level designs ⋮ New lower bound for Lee discrepancy of asymmetrical factorials ⋮ Measures of uniformity in experimental designs: A selective overview ⋮ Construction of four-level and mixed-level designs with zero Lee discrepancy ⋮ Sharp lower bounds of various uniformity criteria for constructing uniform designs ⋮ Lee discrepancy on symmetric three-level combined designs
Cites Work
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- Uniformity in factorial designs with mixed levels
- Lee discrepancy and its applications in experimental designs
- A note on Lee discrepancy
- Generalized minimum aberration for asymmetrical fractional factorial designs
- On the existence of saturated and nearly saturated asymmetrical orthogonal arrays
- Uniform designs limit aliasing
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