List-coloring the Squares of Planar Graphs without 4-Cycles and 5-Cycles

Daniel W. Cranston; Bobby Jaeger

arXiv:1505.03197·math.CO·June 14, 2017·J. Graph Theory·1 cites

List-coloring the Squares of Planar Graphs without 4-Cycles and 5-Cycles

Daniel W. Cranston, Bobby Jaeger

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Abstract

Let $G$ be a planar graph without 4-cycles and 5-cycles and with maximum degree $Δ \geq 32$ . We prove that $χ_{ℓ} (G^{2}) \leq Δ + 3$ . For arbitrarily large maximum degree $Δ$ , there exist planar graphs $G_{Δ}$ of girth 6 with $χ (G_{Δ}^{2}) = Δ + 2$ . Thus, our bound is within 1 of being optimal. Further, our bound comes from coloring greedily in a good order, so the bound immediately extends to online list-coloring. In addition, we prove bounds for $L (p, q)$ -labeling. Specifically, $λ_{2, 1} (G) \leq Δ + 8$ and, more generally, $λ_{p, q} (G) \leq (2 q - 1) Δ + 6 p - 2 q - 2$ , for positive integers $p$ and $q$ with $p \geq q$ . Again, these bounds come from a greedy coloring, so they immediately extend to the list-coloring and online list-coloring variants of this problem.

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TopicsAdvanced Graph Theory Research · graph theory and CDMA systems · Computational Geometry and Mesh Generation