超立方体着色问题的新界和线性码

Proceedings International Conference on Information Technology: Coding and Computing Pub Date : 2001-04-02 DOI:10.1109/ITCC.2001.918853

H. Q. Ngo, D. Du, R. Graham

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引用次数: 4

摘要

在研究光网络的可扩展性时，出现的一个问题是用尽可能少的颜色给n维超立方体的顶点着色，使汉明距离最多为k的任意两个顶点的颜色不同。确定所需颜色的最小数量/spl chi//sub k~/(n)的确切值似乎是一个难题。我们改进了已知的/spl chi//sub k~/(n)的下界和上界，并指出了该着色问题与线性码的联系。

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New bounds on a hypercube coloring problem and linear codes

In studying the scalability of optical networks, one problem arising involves coloring the vertices of the n-dimensional hypercube with as few colors as possible such that any two vertices whose Hamming distance is at most k are colored differently. Determining the exact value of /spl chi//sub k~/(n), the minimum number of colors needed, appears to be a difficult problem. We improve the known lower and upper bounds of /spl chi//sub k~/(n) and indicate the connection of this colouring problem to linear codes.

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Proceedings International Conference on Information Technology: Coding and Computing

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