On the maximin distance properties of orthogonal designs via the rotation
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Publication:6174103
DOI10.1007/s11425-021-2013-4MaRDI QIDQ6174103
Publication date: 13 July 2023
Published in: Science China. Mathematics (Search for Journal in Brave)
computer experimentLatin hypercube designspace-filling designU-type designminimum \(G_2\)-aberration
Cites Work
- Design of computer experiments: space filling and beyond
- Minimum \(G_2\)-aberration for nonregular fractional factorial designs
- The design and analysis of computer experiments
- Generalized minimum aberration for asymmetrical fractional factorial designs
- Construction of column-orthogonal designs for computer experiments
- Optimal maximin \(L_{1}\)-distance Latin hypercube designs based on good lattice point designs
- Optimal maximin \(L_2\)-distance Latin hypercube designs
- Results for two-level fractional factorial designs of resolution IV or more
- Minimum aberration construction results for nonregular two-level fractional factorial designs
- Space-filling properties of good lattice point sets
- Orthogonal and nearly orthogonal designs for computer experiments
- Construction of orthogonal and nearly orthogonal Latin hypercubes
- Construction of orthogonal Latin hypercube designs
- Controlling Correlations in Latin Hypercube Samples
- Construction of Maximin Distance Designs via Level Permutation and Expansion
- Miscellanea. A connection between uniformity and aberration in regular fractions of two-level factorials
- Space-Filling Fractional Factorial Designs
- Maximum projection designs for computer experiments
- OUP accepted manuscript
- On the connection between maximin distance designs and orthogonal designs
- A construction method for orthogonal Latin hypercube designs
- On Design Orthogonality, Maximin Distance, and Projection Uniformity for Computer Experiments
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