Planar graphs with $\Delta \geq 7$ and no triangle adjacent to a $C_4$ are minimally edge and total choosable - LIRMM - Laboratoire d’Informatique, de Robotique et de Microélectronique de Montpellier
Journal Articles Discrete Mathematics and Theoretical Computer Science Year : 2016

Planar graphs with $\Delta \geq 7$ and no triangle adjacent to a $C_4$ are minimally edge and total choosable

Abstract

For planar graphs, we consider the problems of list edge coloring and list total coloring. Edge coloring is the problem of coloring the edges while ensuring that two edges that are adjacent receive different colors. Total coloring is the problem of coloring the edges and the vertices while ensuring that two edges that are adjacent, two vertices that are adjacent, or a vertex and an edge that are incident receive different colors. In their list extensions, instead of having the same set of colors for the whole graph, every vertex or edge is assigned some set of colors and has to be colored from it. A graph is minimally edge or total choosable if it is list $\Delta$-edge-colorable or list $(\Delta +1)$-total-colorable, respectively, where $\Delta$ is the maximum degree in the graph. It is already known that planar graphs with $\Delta \geq 8$ and no triangle adjacent to a $C_4$ are minimally edge and total choosable (Li Xu 2011), and that planar graphs with $\Delta \geq 7$ and no triangle sharing a vertex with a $C_4$ or no triangle adjacent to a $C_k (\forall 3 \leq k \leq 6)$ are minimally total colorable (Wang Wu 2011). We strengthen here these results and prove that planar graphs with $\Delta \geq 7$ and no triangle adjacent to a $C_4$ are minimally edge and total choosable.
Fichier principal
Vignette du fichier
2586-9917-1-PB.pdf (307.8 Ko) Télécharger le fichier
Origin Explicit agreement for this submission

Dates and versions

lirmm-01347027 , version 1 (22-07-2016)
lirmm-01347027 , version 2 (16-08-2016)

Identifiers

Cite

Marthe Bonamy, Benjamin Lévêque, Alexandre Pinlou. Planar graphs with $\Delta \geq 7$ and no triangle adjacent to a $C_4$ are minimally edge and total choosable. Discrete Mathematics and Theoretical Computer Science, 2016, Vol. 17 no. 3 (3), pp.131-146. ⟨10.46298/dmtcs.2147⟩. ⟨lirmm-01347027v2⟩
453 View
1193 Download

Altmetric

Share

More