Construction of high-dimensional high-separation distance designs
From MaRDI portal
Publication:6556776
DOI10.1016/j.jspi.2024.106150zbMATH Open1540.62101MaRDI QIDQ6556776
Publication date: 17 June 2024
Published in: Journal of Statistical Planning and Inference (Search for Journal in Brave)
Cites Work
- Unnamed Item
- Accurate emulators for large-scale computer experiments
- An efficient methodology for modeling complex computer codes with Gaussian processes
- Orthogonal arrays. Theory and applications
- Quasi-regression
- The design and analysis of computer experiments
- Optimal maximin \(L_{1}\)-distance Latin hypercube designs based on good lattice point designs
- Maximin distance designs based on densest packings
- Optimal maximin \(L_2\)-distance Latin hypercube designs
- On the Instability Issue of Gradient-Enhanced Gaussian Process Emulators for Computer Experiments
- Space-filling properties of good lattice point sets
- Orthogonal and nearly orthogonal designs for computer experiments
- Minimum Aberration 2 k-p Designs
- Orthogonal Array-Based Latin Hypercubes
- Controlling Correlations in Latin Hypercube Samples
- Interleaved lattice-based maximin distance designs
- Space-Filling Fractional Factorial Designs
- A method of constructing maximin distance designs
- Maximum projection designs for computer experiments
- Construction of maximin distance Latin squares and related Latin hypercube designs
- OUP accepted manuscript
- On the connection between maximin distance designs and orthogonal designs
- A construction method for orthogonal Latin hypercube designs
- ON THE USE OF MATRICES IN CERTAIN POPULATION MATHEMATICS
- On Design Orthogonality, Maximin Distance, and Projection Uniformity for Computer Experiments
- Uniform Projection Designs and Strong Orthogonal Arrays
This page was built for publication: Construction of high-dimensional high-separation distance designs
