A note on uniformity and orthogonality
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Publication:1869148
DOI10.1016/S0378-3758(01)00293-2zbMath1039.62072OpenAlexW1982971455MaRDI QIDQ1869148
Chang-Xing Ma, Kai-Tai Fang, Dennis K. J. Lin
Publication date: 9 April 2003
Published in: Journal of Statistical Planning and Inference (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/s0378-3758(01)00293-2
Related Items (22)
On Design Orthogonality, Maximin Distance, and Projection Uniformity for Computer Experiments ⋮ Generalized projection discrepancy and its applications in experimental designs ⋮ Two-level screening designs derived from binary nonlinear codes ⋮ Building some bridges among various experimental designs ⋮ Uniformity pattern of asymmetric fractional factorials ⋮ Lower Bounds for the Uniformity Pattern of Asymmetric Fractional Factorials ⋮ Two‐dimensional projection uniformity for space‐filling designs ⋮ Uniform Projection Designs and Strong Orthogonal Arrays ⋮ Uniformity pattern and related criteria for \(q\)-level factorials ⋮ Uniformity and projection uniformity of combined designs ⋮ Uniform projection designs ⋮ A study of uniformity pattern for extended designs ⋮ Uniformity pattern and related criteria for mixed-level designs ⋮ Lower bounds of various criteria in experimental designs ⋮ A survey and evaluation of methods for determination of combinatorial equivalence of factorial designs ⋮ Connections between uniformity and aberration in general multi-level factorials ⋮ Lower bounds of various discrepancies on combined designs ⋮ U-type and factorial designs for nonparametric Bayesian regression ⋮ Connection between uniformity and orthogonality for symmetrical factorial designs ⋮ A lower bound for the centered \(L_2\)-discrepancy on asymmetric factorials and its application ⋮ Connection among some optimal criteria for symmetrical fractional factorial designs ⋮ Measures of uniformity in experimental designs: A selective overview
Cites Work
- On Methods of Constructing Sets of Mutually Orthogonal Latin Squares Using a Computer. I
- On Methods of Constructing Sets of Mutually Orthogonal Latin Squares Using a Computer. II
- A generalized discrepancy and quadrature error bound
- Uniform Design: Theory and Application
- Miscellanea. A connection between uniformity and aberration in regular fractions of two-level factorials
- Orthogonal Arrays of Strength two and three
- On the isomorphism of fractional factorial designs
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