Tang, B. (1993). Orthogonal array-based Latin hypercubes. J. Amer. Statist. Assoc. 88, 1392- 1397.Tang, B.: Orthogonal array-based Latin hypercubes. J. Am. Stat. Assoc. 88 , 1392–1397 (1993) MathSciNet MATHTang
Orthogonal Array-Based Latin HypercubesOrthogonal Array-Based Latin HypercubesComputer experimentDesign of experimentsLatin hypercube designMulti-fidelity computer modellingOrthogonal arraySpace-filling designWe propose two methods for constructing a new type of design, called a nested orthogonal array-based Lati...
Tang B. Orthogonal array-based latin hypercubes J. Am. Stat. Assoc., 88 (424) (1993), pp. 1392-1397 Google Scholar [12] C.J. Colbourn, E. J. H Dinitz Handbook of Combinatorial Designs, Second Edition Chapman & Hall/CRC, Boca Raton, FL (2006) Google Scholar [13] S. Leary, A...
Orthogonal Array-Based Latin Hypercubes Source: Journal of the American Statistical Association Kriging-based simulation optimization: An emergency medical system application Source: Journal of the Operational Research Society Fractional Factorial Plans Source: Unknown Repository Modelling, simulation and applicati...
Tang B (1993) Orthogonal array-based Latin hypercubes. J Am Stat Assoc 88:1392–1397. https://doi.org/10.2307/2291282 MathSciNet MATH Google Scholar Tang B (1998) Selecting Latin hypercubes using correlation criteria. Stat Sin 8:965–977 MathSciNet MATH Google Scholar Tiwari A, Mandal...
A Latin hypercube is typically an n×q matrix in which each column is a permutation of n uniformly spaced levels, say {−1,−(n−3)/(n−1),…,(n−3)/(n−1),1}. However, there is no guarantee that Latin hypercubes will have good multivariate properties. Space-filling ...
Leary S, Bhaskar A, Keane A. Optimal orthogonal-array-based latin hypercubes. J Appl Stat 2003;30(5):585-98. doi:10.1080/0266476032000053691.Optimal Orthogonal-Array-based Latin Hypercubes. Stephen Leary,Atul Bhaskar,Andy Keane. Journal of Applied Mechanics . 2003...
Owen (1992) and Tang (1993) considered randomized orthogonal arrays and orthogonal array based LHDs, representing an important development in this area. Recently, He and Tang (2013) introduced strong orthogonal arrays and Mukerjee et al. (2014) studied mappable nearly orthogonal arrays, both with...