Mohammad Hosseini Dolama ; Eric Sopena
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On the maximum average degree and the incidence chromatic number of a graphdmtcs:349 -
Discrete Mathematics & Theoretical Computer Science,
January 1, 2005,
Vol. 7
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https://doi.org/10.46298/dmtcs.349
On the maximum average degree and the incidence chromatic number of a graphArticle
Authors: Mohammad Hosseini Dolama 1; Eric Sopena 2
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Mohammad Hosseini Dolama;Eric Sopena
1 Department of Mathematics [Semnan]
2 Laboratoire Bordelais de Recherche en Informatique
We prove that the incidence chromatic number of every 3-degenerated graph G is at most Δ (G)+4. It is known that the incidence chromatic number of every graph G with maximum average degree mad(G)<3 is at most Δ (G)+3. We show that when Δ (G) ≥ 5, this bound may be decreased to Δ (G)+2. Moreover, we show that for every graph G with mad(G)<22/9 (resp. with mad(G)<16/7 and Δ (G)≥ 4), this bound may be decreased to Δ (G)+2 (resp. to Δ (G)+1).