| (0,1)—矩阵的对称链分解 |
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| 引用本文: | 谭明术.(0,1)—矩阵的对称链分解[J].西南民族学院学报(自然科学版),1999,25(3):228-231. |
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| 作者姓名: | 谭明术 |
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| 作者单位: | 四川三峡学院数学系!重庆万州404000 |
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| 摘 要: | 自1951 年de Bruijn 等人提出了对称链概念后,人们用这个特殊的偏序得到了许多优美的结果.如果一个偏序集可以分解成不相交的对称链之并,则称此偏序集具有对称链分解.目前已证明具有对称链分解结构的偏序还不多.把任意一个(0,1)-矩阵A 中的某些1 变成0 得到的矩阵叫做A的导出矩阵.L(A)表示A及其A的所有导出矩阵所组成的集合,在L(A)上定义序关系> :P1> P2,其中P2 是P1 的导出矩阵.本文构造性地证明了偏序集(L(A),> )具有对称链分解.
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| 关 键 词: | (0 1)-矩阵 导出矩阵 偏序集 对称链 对称链分解 |
Symmetric Chain Decomposition of (0,1)-matrices |
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| TAN,Ming,shu.Symmetric Chain Decomposition of (0,1)-matrices[J].Journal of Southwest Nationalities College(Natural Science Edition),1999,25(3):228-231. |
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| Authors: | TAN Ming shu |
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| Abstract: | Many beautiful results have been derived by symmetric chain since de Bruijn introduced it in 1951.A poset is called a symmetric chain decomposition if the poset can be expressed as a disjoint union of symmetric chains.A matrix P 2 is called a derived matrix of a (0,1) matrix P 1 if P 2 is obtained by changing some elements 1 into 0 in matrix P 1.L(A) denotes the set of A and its all derived matrices.Define order> as follow: P 1>P 2 if and only P 2 is a derived matrix of P 1.The poset (L(A),>) can be expressed as a disjoint of symmetric chains by constructive method. |
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| Keywords: | (0 1)-matrices derived matrices posets symmetric symmetric chain decomposition |
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