Author:
Zhang Jing,Xu Jin,Jia Kai,Yin Yimin,Wang Zhengming
Abstract
Sliced Latin hypercube designs (SLHDs) are widely used in computer experiments with both quantitative and qualitative factors and in batches. Optimal SLHDs achieve better space-filling property on the whole experimental region. However, most existing methods for constructing optimal SLHDs have restriction on the run sizes. In this paper, we propose a new method for constructing SLHDs with arbitrary run sizes, and a new combined space-filling measurement describing the space-filling property for both the whole design and its slices. Furthermore, we develop general algorithms to search for the optimal SLHD with arbitrary run sizes under the proposed measurement. Examples are presented to illustrate that effectiveness of the proposed methods.
Funder
Natural Science Natural Science Foundation of HuNan Province
Subject
General Mathematics,Engineering (miscellaneous),Computer Science (miscellaneous)
Reference37 articles.
1. A Comparison of Three Methods for Selecting Values of Input Variables in the Analysis of Output from a Computer Code;McKay;Technometrics,1979
2. Sliced Latin Hypercube Designs
3. A central limit theorem for nested or sliced Latin hypercube designs;He;Stat. Sin.,2016
4. Gaussian Process Models for Computer Experiments With Qualitative and Quantitative Factors
5. Prediction for Computer Experiments Having Quantitative and Qualitative Input Variables;Gang;Technometrics,2009
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