Most direct product of graphs are Type 1
Abstract
A k-total coloring of a graph G is an assignment of k colors to its elements (vertices and edges) so that adjacent or incident elements have different colors. The total chromatic number is the smallest integer k for which the graph G has a k-total coloring. Clearly, this number is at least (G)+1, where (G) is the maximum degree of G. When the lower bound is reached, the graph is said to be Type~1. The upper bound of (G)+2 is a central problem that has been open for fifty years, is verified for graphs with maximum degree 4 but not for regular graphs. Most classified direct product of graphs are Type~1. The particular cases of the direct product of cycle graphs Cm × Cn, for m =3p, 5 and 8 with p ≥ 2 and ≥ 1, and arbitrary n ≥ 3, were previously known to be Type 1 and motivated the conjecture that, except for C4 × C4, all direct product of cycle graphs Cm × Cn with m,n ≥ 3 are Type 1. We give a general pattern proving that all Cm × Cn are Type 1, except for C4 × C4. dditionally, we investigate sufficient conditions to ensure that the direct product reaches the lower bound for the total chromatic number.
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