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On the adjacent vertex-distinguishing total chromatic numbers of the graphs with \(\Delta (G) = 3\). (English) Zbl 1125.05043
Summary: Let \(G=(V(G),E(G))\) be a simple graph and \(T (G)\) be the set of vertices and edges of \(G\). Let \(C\) be a \(k\)-color set. A (proper) total \(k\)-coloring \(f\) of \(G\) is a function \(f: T(G)\rightarrow C\) such that no adjacent or incident elements of \(T (G)\) receive the same color. For any \(u\in V(G)\), denote \(C(u)=\{f(u)\}\cup\{f(uv)\mid uv\in E(G)\}\). The total \(k\)-coloring \(f\) of \(G\) is called adjacent vertex-distinguishing if \(C(u)\neq C(v)\) for any edge \(uv\in E(G)\). And the smallest number of colors is called the adjacent vertex-distinguishing total chromatic number \(\chi_{at}(G)\) of \(G\).
In this paper, we prove that \(\chi_{at}(G)\leq 6\) for all connected graphs with maximum degree three. This is a step towards a conjecture on the adjacent vertex-distinguishing total coloring.

MSC:
05C15 Coloring of graphs and hypergraphs
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