Title :
New bounds on a hypercube coloring problem and linear codes
Author_Institution :
Dept. of Comput. Sci. & Eng., Minnesota Univ., Minneapolis, MN
Abstract :
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 χk¯(n), the minimum number of colors needed, appears to be a difficult problem. We improve the known lower and upper bounds of χk¯(n) and indicate the connection of this colouring problem to linear codes
Keywords :
graph colouring; hypercube networks; linear codes; minimisation; optical fibre networks; Hamming distance; colouring problem; exact value; hypercube coloring problem; linear codes; minimum number of colors; n-dimensional hypercube; optical network scalability; vertices; Block codes; Computer science; Hamming distance; Hypercubes; Linear code; Optical fiber networks; Scalability; Sun; Upper bound; Vectors;
Conference_Titel :
Information Technology: Coding and Computing, 2001. Proceedings. International Conference on
Conference_Location :
Las Vegas, NV
Print_ISBN :
0-7695-1062-0
DOI :
10.1109/ITCC.2001.918853
