Abstract
AbstractA homomorphism from an oriented graph G to an oriented graph H is a mapping $\varphi$ from the set of vertices of G to the set of vertices of H such that $\buildrel {\longrightarrow}\over {\varphi (u) \varphi (v)}$ is an arc in H whenever $\buildrel {\longrightarrow}\over {uv}$ is an arc in G. The oriented chromatic index of an oriented graph G is the minimum number of vertices in an oriented graph H such that there exists a homomorphism from the line digraph LD(G) of G to H (the line digraph LD(G) of G is given by V(LD(G)) = A(G) and $\buildrel {\longrightarrow}\over {ab} \in A(LD(G))$ whenever $a=\buildrel {\longrightarrow}\over {uv}$ and $a=\buildrel {\longrightarrow}\over {vw}$).We give upper bounds for the oriented chromatic index of graphs with bounded acyclic chromatic number, of planar graphs and of graphs with bounded degree. We also consider lower and upper bounds of oriented chromatic number in terms of oriented chromatic index. We finally prove that the problem of deciding whether an oriented graph has oriented chromatic index at most k is polynomial time solvable if k ≤ 3 and is NP‐complete if k ≥ 4. © 2007 Wiley Periodicals, Inc. J Graph Theory 57: 313–332, 2008
Highlights
We consider finite simple oriented graphs, that are digraphs with no opposite arcs.For an oriented graph G, we denote by V (G) its set of vertices and by A(G) its set of arcs
We prove that the problem of deciding whether an oriented graph has oriented chromatic index at most k is polynomial time solvable if k ≤ 3 and is NP
We show that the oriented chromatic number χo(G) of an oriented graph G can be bounded in terms of the oriented chromatic index χo(G)
Summary
We consider finite simple oriented graphs, that are digraphs with no opposite arcs. For an oriented graph G, we denote by V (G) its set of vertices and by A(G) its set of arcs. The oriented chromatic number of G, denoted by χo(G), is defined as the smallest k such that G admits an oriented k-vertex-coloring. The oriented chromatic index of G, denoted by χo(G), is defined as the smallest order of an oriented graph H such that LD(G) → H. We provide better upper bounds for the oriented chromatic index of several classes of graphs and consider the complexity of the oriented arc-coloring problem. The oriented chromatic index of planar graphs and of graphs with bounded degree are respectively considered in Sections 3 and 4. For a graph G and a vertex v of V (G), we denote by G \ v the graph obtained from G by removing v together with the set of its incident arcs This notion is extended to sets of vertices in a standard way. For a given vertex v of G, we denote by Cf+(v) and Cf−(v) the outgoing color set of v (i.e., the set of colors of the arcs outgoing from v) and the incoming color set of v (i.e., the set of colors of the arcs incoming to v), respectively
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