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Auteurs principaux: Xiong, Zikang, Qin, Hong, Huang, Yuning, Ning, Jianhui
Format: Preprint
Publié: 2025
Sujets:
Accès en ligne:https://arxiv.org/abs/2509.21827
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author Xiong, Zikang
Qin, Hong
Huang, Yuning
Ning, Jianhui
author_facet Xiong, Zikang
Qin, Hong
Huang, Yuning
Ning, Jianhui
contents In this paper, we proposes the construction methods of sliced space-filling design when the quantitative factors are mixture components. Leveraging the representative points framework for distribution and energy distance decomposition theory, this paper proposes three methods for constructing sliced representative points and establishes their distributional convergence. Furthermore, one-shot and sequential algorithms for generating sliced space-filling mixture design for experiments with process variables are presented with convergence proofs. Compared to existing methods, the proposed sliced space-filling mixture design exhibits greater flexibility in subdesign run sizes and broader applicability to constrained experimental regions. Moreover, numerical results confirm its marked advantages in both space-filling performance and predictive accuracy.
format Preprint
id arxiv_https___arxiv_org_abs_2509_21827
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Sliced Space-filling Design with Mixtures
Xiong, Zikang
Qin, Hong
Huang, Yuning
Ning, Jianhui
Statistics Theory
In this paper, we proposes the construction methods of sliced space-filling design when the quantitative factors are mixture components. Leveraging the representative points framework for distribution and energy distance decomposition theory, this paper proposes three methods for constructing sliced representative points and establishes their distributional convergence. Furthermore, one-shot and sequential algorithms for generating sliced space-filling mixture design for experiments with process variables are presented with convergence proofs. Compared to existing methods, the proposed sliced space-filling mixture design exhibits greater flexibility in subdesign run sizes and broader applicability to constrained experimental regions. Moreover, numerical results confirm its marked advantages in both space-filling performance and predictive accuracy.
title Sliced Space-filling Design with Mixtures
topic Statistics Theory
url https://arxiv.org/abs/2509.21827