English

Injective edge-coloring of sparse graphs

Combinatorics 2020-09-01 v2

Abstract

An injective edge-coloring cc of a graph GG is an edge-coloring such that if e1e_1, e2e_2, and e3e_3 are three consecutive edges in GG (they are consecutive if they form a path or a cycle of length three), then e1e_1 and e3e_3 receive different colors. The minimum integer kk such that, GG has an injective edge-coloring with kk colors, is called the injective chromatic index of GG (χinj(G)\chi'_{\textrm{inj}}(G)). This parameter was introduced by Cardoso et \textit{al.} \cite{CCCD} motivated by the Packet Radio Network problem. They proved that computing χinj(G)\chi'_{\textrm{inj}}(G) of a graph GG is NP-hard. We give new upper bounds for this parameter and we present the relationships of the injective edge-coloring with other colorings of graphs. The obtained general bound gives 8 for the injective chromatic index of a subcubic graph. If the graph is subcubic bipartite we improve this last bound. We prove that a subcubic bipartite graph has an injective chromatic index bounded by 66. We also prove that if GG is a subcubic graph with maximum average degree less than 73\frac{7}{3} (resp. 83\frac{8}{3} , 33), then GG admits an injective edge-coloring with at most 4 (resp. 66, 77) colors. Moreover, we establish a tight upper bound for subcubic outerplanar graphs.

Keywords

Cite

@article{arxiv.1907.09838,
  title  = {Injective edge-coloring of sparse graphs},
  author = {Baya Ferdjallah and Samia Kerdjoudj and Andre Raspaud},
  journal= {arXiv preprint arXiv:1907.09838},
  year   = {2020}
}
R2 v1 2026-06-23T10:28:14.343Z