| 一类具有唯一定长路的有向图的自同构群 |
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| 引用本文: | 王军.一类具有唯一定长路的有向图的自同构群[J].大连理工大学学报,1989,29(2):125-129. |
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| 作者姓名: | 王军 |
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| 作者单位: | 大连理工大学应用数学研究所 |
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| 摘 要: | Lam和Van Lint 在推广友谊定理时构造了一类具有唯一定长路的有向图(这里 用D(c,k)表示),并证明了D(c,k)的自同构群包含一个2(c+1)阶二面体群。 木文利用D(c.k)的邻接矩阵的性质证明这个二面体群就是D(c,k)的全自同构群, 从而解决了 Lam和 Van Lint作中遗留的问题。
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| 关 键 词: | 有向图 矩阵 自同构 群 g-循环矩阵 |
The Automorphism Groups for a Kind of Directed Graphs with Unique Paths of Fixed Length |
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| Wang Jun.The Automorphism Groups for a Kind of Directed Graphs with Unique Paths of Fixed Length[J].Journal of Dalian University of Technology,1989,29(2):125-129. |
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| Authors: | Wang Jun |
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| Abstract: | Lam and Van Lint, in their generalization of the Friendship Theorem, construct a kind of directed graphs with unique paths of fixed length, here denoted by D(c, k), and have proved that the automorphism group for D(c,k) contains a dihedral group of order 2(c+1). The author has proved that the dihedral group is just the full automorphism group for D(c, k), using the properties of the adjacent matrix of D(c, k). Hence, a problem left over in Lam and Van Lint's work has been solved. |
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| Keywords: | directed graph matrix automorphism group/directed path g-circulant matrix Hall-polynomial |
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