Some Results on Minimum Aberration Mixed-level (2~r)2~n Factorial Designs

Some Results on Minimum Aberration Mixed-level (2~r)2~n Factorial Designs

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摘要 Mukerjee and Wu（2001） employed projective geometry theory to find the wordlength pattern of a regular mixed factorial design in terms of its complementary set, but only for the numbers of words of length 3 or 4. In this paper, by introducing a concept of consulting design and based on the connection between factorial design theory and coding theory, we obtain some combinatorial identities that relate the wordlength pattern of a regular mixed-level （2^r）2^n factorial design to that of its consulting design. Consequently, a general rule for identifying minimum aberration （2^r）2^n factorial designs through their consulting designs is established. It is an improvement and generalization of the related result in Mukerjee and Wu（2001）.

作者 SHI Cheng-tang ZHANG Dan CHEN Bao-ting LI Yu-kai

机构地区 Department of Trade and Economics Department of Basic Course Henan Province Computer Center

出处《Chinese Quarterly Journal of Mathematics》 CSCD 北大核心 2007年第1期79-86,共8页 数学季刊（英文版）

基金 Supported by NNSF of China(10231030)

关键词 coding theory consulting design minimum aberration MIXED-LEVEL REGULAR wordlength pattern 最小象差混合水平因子设计编码理论

分类号 O212.6 [理学—概率论与数理统计]

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Chinese Quarterly Journal of Mathematics

2007年第1期

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Some Results on Minimum Aberration Mixed-level (2~r)2~n Factorial Designs

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