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A Family of Asymmetrical Orthogonal Arrays with Run Sizes 4p^2 被引量:1
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作者 廖靖宇 张建军 张应山 《Chinese Quarterly Journal of Mathematics》 CSCD 北大核心 2007年第3期426-435,共10页
Nowadays orthogonal arrays play important roles in statistics, computer science, coding theory and cryptography. The usual difference matrices are essential for the construction of many mixed orthogonal arrays. But th... Nowadays orthogonal arrays play important roles in statistics, computer science, coding theory and cryptography. The usual difference matrices are essential for the construction of many mixed orthogonal arrays. But there are also many orthogonal arrays, especially mixed-level or asymmetrical which can not be obtained by the usual difference matrices. In order to construct these asymmetrical orthogonal arrays, a class of special matrices, so-called generalized difference matrices, were discovered by Zhang(1989, 1990, 1993) by the orthogonal decompositions of projective matrices. In this article, an interesting equivalent relationship between the orthogonal arrays and the generalized difference matrices is presented. As an application, a family of orthogonal arrays of run sizes 4p2, such as L36(6^13^42^10), are constructed. 展开更多
关键词 mixed-level orthogonal arrays generalized difference matrices projective matrices permutable matrices
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