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一种分层L2差异度及其在空间填充设计中的应用

A stratified L 2-discrepancy with application to space-filling designs

Journal of the Royal Statistical Society. Series B: Statistical Methodology · 2025
被引 1
ABS 4

中文导读

提出一种分层L2差异度,用于评估设计域被划分为多个子区域时设计的均匀性,该指标易于计算、克服维度灾难,并适用于多种设计类型。

Abstract

Abstract Space-filling designs are widely used in computer experiments. We propose a stratified L2-discrepancy to evaluate the uniformity of a design when the design domain is stratified into various subregions. Weights are used to adjust preferences for the uniformity over subregions in each stratification. The stratified L2-discrepancy is easy to compute, satisfies a Koksma–Hlawka type inequality, and overcomes the curse of dimensionality that exists for other discrepancies. It is applicable to a broad class of designs, and covers several minimum aberration-type criteria as special cases. Strong orthogonal arrays of maximum strength are shown to have low stratified L2-discrepancies, and thus are suitable for computer experiments. In addition, we develop a lower bound for the stratified L2-discrepancy and provide a construction method for designs that achieve the lower bound. We further introduce a general version of the stratified L2-discrepancy for evaluating designs with flexible stratification properties.

计算机实验空间填充设计均匀性度量分层抽样