A note on connected greedy edge colouring

Marthe Bonamy; Carla Groenland; Carole Muller; Jonathan Narboni; Jakub Pekárek; Alexandra Wesolek

doi:10.1016/j.dam.2021.07.018

A note on connected greedy edge colouring

Marthe Bonamy, Carla Groenland^*, Carole Muller, Jonathan Narboni, Jakub Pekárek, Alexandra Wesolek

^*Corresponding author for this work

Research output: Contribution to journal › Article › Scientific › peer-review

2 Citations (Scopus)

Abstract

Following a given ordering of the edges of a graph G, the greedy edge colouring procedure assigns to each edge the smallest available colour. The minimum number of colours thus involved is the chromatic index χ^′(G), and the maximum is the so-called Grundy chromatic index. Here, we are interested in the restricted case where the ordering of the edges builds the graph in a connected fashion. Let χ_c^′(G) be the minimum number of colours involved following such an ordering. We show that it is NP-hard to determine whether χ_c^′(G)>χ^′(G). We prove that χ^′(G)=χ_c^′(G) if G is bipartite, and that χ_c^′(G)≤4 if G is subcubic.

Original language	English
Pages (from-to)	129-136
Number of pages	8
Journal	Discrete Applied Mathematics
Volume	304
DOIs	https://doi.org/10.1016/j.dam.2021.07.018
Publication status	Published - 2021
Externally published	Yes

Keywords

Computational complexity
Connected greedy colouring
Connected greedy edge colouring
Edge colouring
Greedy colouring

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10.1016/j.dam.2021.07.018

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title = "A note on connected greedy edge colouring",

abstract = "Following a given ordering of the edges of a graph G, the greedy edge colouring procedure assigns to each edge the smallest available colour. The minimum number of colours thus involved is the chromatic index χ′(G), and the maximum is the so-called Grundy chromatic index. Here, we are interested in the restricted case where the ordering of the edges builds the graph in a connected fashion. Let χc′(G) be the minimum number of colours involved following such an ordering. We show that it is NP-hard to determine whether χc′(G)>χ′(G). We prove that χ′(G)=χc′(G) if G is bipartite, and that χc′(G)≤4 if G is subcubic.",

keywords = "Computational complexity, Connected greedy colouring, Connected greedy edge colouring, Edge colouring, Greedy colouring",

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T1 - A note on connected greedy edge colouring

AU - Bonamy, Marthe

AU - Groenland, Carla

AU - Muller, Carole

AU - Narboni, Jonathan

AU - Pekárek, Jakub

AU - Wesolek, Alexandra

PY - 2021

Y1 - 2021

N2 - Following a given ordering of the edges of a graph G, the greedy edge colouring procedure assigns to each edge the smallest available colour. The minimum number of colours thus involved is the chromatic index χ′(G), and the maximum is the so-called Grundy chromatic index. Here, we are interested in the restricted case where the ordering of the edges builds the graph in a connected fashion. Let χc′(G) be the minimum number of colours involved following such an ordering. We show that it is NP-hard to determine whether χc′(G)>χ′(G). We prove that χ′(G)=χc′(G) if G is bipartite, and that χc′(G)≤4 if G is subcubic.

AB - Following a given ordering of the edges of a graph G, the greedy edge colouring procedure assigns to each edge the smallest available colour. The minimum number of colours thus involved is the chromatic index χ′(G), and the maximum is the so-called Grundy chromatic index. Here, we are interested in the restricted case where the ordering of the edges builds the graph in a connected fashion. Let χc′(G) be the minimum number of colours involved following such an ordering. We show that it is NP-hard to determine whether χc′(G)>χ′(G). We prove that χ′(G)=χc′(G) if G is bipartite, and that χc′(G)≤4 if G is subcubic.

KW - Computational complexity

KW - Connected greedy colouring

KW - Connected greedy edge colouring

KW - Edge colouring

KW - Greedy colouring

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DO - 10.1016/j.dam.2021.07.018

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SN - 0166-218X

VL - 304

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JO - Discrete Applied Mathematics

JF - Discrete Applied Mathematics

ER -

A note on connected greedy edge colouring

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Keywords

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