Abstract
The total graph T(G) of a multigraph G has as its vertices the set of edges and vertices of G and has an edge between two vertices if their corresponding elements are either adjacent or incident in G. We show that if G has maximum degree Δ(G), then T(G) is (2Δ(G) − 1)-choosable. We give a linear-time algorithm that produces such a coloring. The best previous general upper bound for Δ(G) > 3 was \(\lfloor{\frac{3}{2}\Delta(G)+2 \rfloor}\), by Borodin et al. When Δ(G) = 4, our algorithm gives a better upper bound. When Δ(G)∈{3,5,6}, our algorithm matches the best known bound. However, because our algorithm is significantly simpler, it runs in linear time (unlike the algorithm of Borodin et al.).
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Cranston, D.W. Multigraphs with Δ ≥ 3 are Totally-(2Δ−1)-Choosable. Graphs and Combinatorics 25, 35–40 (2009). https://doi.org/10.1007/s00373-008-0817-5
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DOI: https://doi.org/10.1007/s00373-008-0817-5