一类具有低维分层和柱正交性的空间填充设计

Pub Date : 2023-03-28 DOI:10.1002/cjs.11761

Pengnan Li, Fasheng Sun

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引用次数: 0

摘要

强正交阵列适合计算机实验设计，因为它在低维投影中具有分层作用。然而，对于中等数量的因子来说，强正交阵列可能非常昂贵。在本文中，我们开发了一种方法，用于构建运行规模更经济的空间填充设计。这些设计不仅具有列正交性，而且还具有强正交阵列所应具有的大量低维分层特性。此外，所提出的一类设计可以是 3 正交的。此外，作为副产品，还获得了一些关于正则分数阶乘设计的理论结果。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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A class of space-filling designs with low-dimensional stratification and column orthogonality

Strong orthogonal arrays are suitable designs for computer experiments because of stratification in low-dimensional projections. However, strong orthogonal arrays may be very expensive for a moderate number of factors. In this article, we develop a method for constructing space-filling designs with more economical run sizes. These designs are not only column-orthogonal but also enjoy a large proportion of low-dimensional stratification properties that strong orthogonal arrays ought to have. Moreover, a class of proposed designs can be 3-orthogonal. In addition, some theoretical results on regular fractional factorial designs are obtained as a by-product.

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