A note on Goldberg's conjecture on total chromatic numbers

Abstract

Let G=(V(G), E(G)) be a multigraph with maximum degree (G), chromatic index '(G) and total chromatic number ''(G). The Total Coloring conjecture proposed by Behzad and Vizing, independently, states that ''(G)≤ (G)+μ(G) +1 for a multigraph G, where μ(G) is the multiplicity of G. Moreover, Goldberg conjectured that ''(G)='(G) if '(G)≥ (G)+3 and noticed the conjecture holds when G is an edge-chromatic critical graph. By assuming the Goldberg-Seymour conjecture, we show that ''(G)='(G) if '(G)≥ \ (G)+2, |V(G)|+1\ in this note. Consequently, ''(G) = '(G) if '(G) (G) +2 and G has a spanning edge-chromatic critical subgraph.