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New Results on Two Hypercube Coloring Problems

arXiv:1001.2209

Abstract

In this paper, we study the following two hypercube coloring problems: Given $n$ and $d$, find the minimum number of colors, denoted as $χ'_{d}(n)$ (resp. $χ_{d}(n)$), needed to color the vertices of the $n$-cube such that any two vertices with Hamming distance at most $d$ (resp. exactly $d$) have different colors. These problems originally arose in the study of the scalability of optical networks. Using methods in coding theory, we show that $χ'_{4}(2^{r+1}-1)=2^{2r+1}$, $χ'_{5}(2^{r+1})=4^{r+1}$ for any odd number $r\geq3$, and give two upper bounds on $χ_{d}(n)$. The first upper bound improves on that of Kim, Du and Pardalos. The second upper bound improves on the first one for small $n$. Furthermore, we derive an inequality on $χ_{d}(n)$ and $χ'_{d}(n)$.

The material in this paper was presented at The Fifth Shanghai Conference on Combinatorics, May 14-18, 2005, Shanghai, China. This paper has been submitted for publication