论文信息 - SELECTING LATIN HYPERCUBES USING CORRELATION CRITERIA

SELECTING LATIN HYPERCUBES USING CORRELATION CRITERIA

Latin hypercube designs have recently found wide applications both in design of experiments and in numerical integration. An important property of this class of designs is that they achieve uniformity in each univariate margin. In this article we study the use of correlation criteria to select a Latin hypercube. We in- troduce the polynomial canonical correlation of two vectors and argue that a design which has a small polynomial canonical correlation for each pair of its columns is preferred. An algorithm for reducing polynomial canonical correlations of a Latin hypercube is developed. The implementation of the algorithm is discussed, and its performance investigated. Comparison with Owen's algorithm is also made.

Boxin Tang | Boxin Tang

[1] Boxin Tang. Orthogonal Array-Based Latin Hypercubes , 1993 .

[2] T. J. Mitchell,et al. Exploratory designs for computational experiments , 1995 .

[3] Boxin Tang. A theorem for selecting OA-based Latin hypercubes using a distance criterion , 1994 .

[4] Richard J. Beckman,et al. A Comparison of Three Methods for Selecting Values of Input Variables in the Analysis of Output From a Computer Code , 2000, Technometrics.

[5] A. Owen. Controlling correlations in latin hypercube samples , 1994 .

[6] Henry P. Wynn,et al. Screening, predicting, and computer experiments , 1992 .

[7] M. E. Johnson,et al. Minimax and maximin distance designs , 1990 .

[8] R. Iman,et al. A distribution-free approach to inducing rank correlation among input variables , 1982 .

[9] H. D. Patterson. The Errors of Lattice Sampling , 1954 .