Conflict-free chromatic index of trees
Abstract
A graph G is conflict-free k-edge-colorable if there exists an assignment of k colors to E(G) such that for every edge e∈ E(G), there is a color that is assigned to exactly one edge among the closed neighborhood of e. The smallest k such that G is conflict-free k-edge-colorable is called the conflict-free chromatic index of G, denoted 'CF(G). Debski and Przybylo showed that 2'CF(T) 3 for every tree T of size at least two. In this paper, we present an algorithm to determine the conflict-free chromatic index of a tree without 2-degree vertices, in time O(|V(T)|). This partially answer a question raised by Kamyczura, Meszka and Przybylo.
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