Geodesic
The chromatic number of finite group Cayley tables
Luis Goddyn1 ; Kevin Halasz1 ; E. S. Mahmoodian2
1Simon Fraser University
2Sharif University of Technology
The electronic journal of combinatorics, Tome 26 (2019) no. 1
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The chromatic number of a latin square $L$, denoted $\chi(L)$, is the minimum number of partial transversals needed to cover all of its cells. It has been conjectured that every latin square satisfies $\chi(L) \leq |L|+2$. If true, this would resolve a longstanding conjecture—commonly attributed to Brualdi—that every latin square has a partial transversal of size $|L|-1$. Restricting our attention to Cayley tables of finite groups, we prove two results. First, we resolve the chromatic number question for Cayley tables of finite Abelian groups: the Cayley table of an Abelian group $G$ has chromatic number $|G|$ or $|G|+2$, with the latter case occurring if and only if $G$ has nontrivial cyclic Sylow 2-subgroups. Second, we give an upper bound for the chromatic number of Cayley tables of arbitrary finite groups. For $|G|\geq 3$, this improves the best-known general upper bound from $2|G|$ to $\frac{3}{2}|G|$, while yielding an even stronger result in infinitely many cases.
DOI : 10.37236/7874
Classification : 05B15, 05C15, 05E30

Luis Goddyn  1   ; Kevin Halasz  1   ; E. S. Mahmoodian  2

1 Simon Fraser University
2 Sharif University of Technology 
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     title = {The chromatic number of finite group {Cayley} tables},
     journal = {The electronic journal of combinatorics},
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Luis Goddyn; Kevin Halasz; E. S. Mahmoodian. The chromatic number of finite group Cayley tables. The electronic journal of combinatorics, Tome 26 (2019) no. 1. doi: 10.37236/7874

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