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Generalized orthogonal designs.
Ars Comb., 2004Orthogonal designs and their special cases such as weighing matrices and Hadamard matrices have many applications in combinatorics, statistics, coding theory and signal processing [see \textit{A. V. Geramita} and \textit{J. Seberry}, Orthogonal designs. Quadratic forms and Hadamard matrices. (Lecture Notes in Pure and Applied Mathematics, Vol.
Georgiou, S. +2 more
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2017
In this chapter we consider the theory of amicable orthogonal designs and some of their usage.
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In this chapter we consider the theory of amicable orthogonal designs and some of their usage.
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The Principle of Orthogonal Design
2019I’ve said repeatedly in earlier parts of this book that normalization is the science (or a large part of the science, at any rate) underlying database design. Thus, it’s appropriate to begin this chapter with a quick review of normalization principles and a brief analysis of how well normalization meets its objectives.
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Augmented Orthogonal Uniform Composite Designs for Fitting Third-Order Model
Journal of Statistical Theory and Practice, 2022Brenda Mbouamba Yankam +1 more
exaly
1987
We extend a method of \textit{H. Kharagani} [New classes of weighing matrices, Ars Comb. 19, 69--72 (1985; Zbl 0584.05015)] and obtain some new constructions for weighing matrices and orthogonal designs. In particular we show if there exists an \(\mathrm{OD}(n;s_1,\ldots,s_r)\), where \(w=\sum s_i\), then there exists an \(\mathrm{OD}(n(n+k);s_1w,s_2w,\
Hammer, J +2 more
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We extend a method of \textit{H. Kharagani} [New classes of weighing matrices, Ars Comb. 19, 69--72 (1985; Zbl 0584.05015)] and obtain some new constructions for weighing matrices and orthogonal designs. In particular we show if there exists an \(\mathrm{OD}(n;s_1,\ldots,s_r)\), where \(w=\sum s_i\), then there exists an \(\mathrm{OD}(n(n+k);s_1w,s_2w,\
Hammer, J +2 more
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Column-orthogonal and nearly column-orthogonal designs for models with second-order terms
Journal of Statistical Planning and Inference, 2015Stella Stylianou +2 more
exaly
Orthogonal designs for computer experiments
Journal of Statistical Planning and Inference, 2011Stelios D Georgiou
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Two-Factor Experiments in Non-Orthogonal Designs
Journal of the Royal Statistical Society Series B: Statistical Methodology, 1972J A John
exaly
Orthogonal Arrays for Experiments with Lean Designs
Journal of Quality Technology, 2003Ling-Yau Chan, Chang-Xing Ma, T N Goh
exaly