拉丁超立方体抽样
阶乘
析因实验
冗余(工程)
计算机科学
计算机实验
实验设计
超立方体
分式析因设计
空格(标点符号)
数学优化
算法
数学
并行计算
模拟
统计
蒙特卡罗方法
机器学习
数学分析
操作系统
作者
Shan Ba,V. Roshan Joseph
标识
DOI:10.1198/jasa.2011.tm10229
摘要
Abstract Space-filling designs such as Latin hypercube designs (LHDs) are widely used in computer experiments. However, finding an optimal LHD with good space-filling properties is computationally cumbersome. On the other hand, the well-established factorial designs in physical experiments are unsuitable for computer experiments owing to the redundancy of design points when projected onto a subset of factor space. In this work, we present a new class of space-filling designs developed by splitting two-level factorial designs into multiple layers. The method takes advantage of many available results in factorial design theory and therefore, the proposed multi-layer designs (MLDs) are easy to generate. Moreover, our numerical study shows that MLDs can have better space-filling properties than optimal LHDs. Keywords: : Foldover techniqueFractional factorial designLatin hypercube designMinimum aberration criterionSpace-filling design
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