Uniform projection designs
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Publication:1731775
DOI10.1214/18-AOS1705zbMath1417.62226WikidataQ128895943 ScholiaQ128895943MaRDI QIDQ1731775
Fasheng Sun, Hongquan Xu, Ya Ping Wang
Publication date: 14 March 2019
Published in: The Annals of Statistics (Search for Journal in Brave)
Full work available at URL: https://projecteuclid.org/euclid.aos/1543568601
discrepancyuniform designcomputer experimentLatin hypercube designspace-filling designmaximin distance design
Optimal statistical designs (62K05) Orthogonal arrays, Latin squares, Room squares (05B15) Factorial statistical designs (62K15)
Related Items (23)
On Design Orthogonality, Maximin Distance, and Projection Uniformity for Computer Experiments ⋮ Search for minimum aberration designs with uniformity ⋮ Construction of column-orthogonal strong orthogonal arrays ⋮ Construction of space-filling orthogonal designs ⋮ A new and flexible design construction for orthogonal arrays for modern applications ⋮ Construction of orthogonal arrays of strength three by augmented difference schemes ⋮ Construction of uniform projection designs via level permutation and expansion ⋮ Two‐dimensional projection uniformity for space‐filling designs ⋮ Projection uniformity of nearly balanced designs ⋮ Uniform Projection Designs and Strong Orthogonal Arrays ⋮ Sequential design of multi-fidelity computer experiments with effect sparsity ⋮ Modeling and Active Learning for Experiments with Quantitative-Sequence Factors ⋮ Construction of maximin \(L_1\)-distance Latin hypercube designs ⋮ An adjusted gray map technique for constructing large four-level uniform designs ⋮ An appealing technique for designing optimal large experiments with three-level factors ⋮ Rapid design of metamaterials via multitarget Bayesian optimization ⋮ Constructing optimal projection designs ⋮ A novel method for constructing mixed two- and three-level uniform factorials with large run sizes ⋮ Multiple doubling: a simple effective construction technique for optimal two-level experimental designs ⋮ Uniform projection nested Latin hypercube designs ⋮ Maximum expected entropy transformed Latin hypercube designs ⋮ A study of orthogonal array-based designs under a broad class of space-filling criteria ⋮ Weighted symmetrized centered discrepancy for uniform design
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