Maximum number of colourings. II. 5-chromatic graphs
Abstract
In 1971, Tomescu conjectured [Le nombre des graphes connexes k-chromatiques minimaux aux sommets \'etiquet\'es, C. R. Acad. Sci. Paris 273 (1971), 1124--1126] that every connected graph G on n vertices with (G) = k ≥ 4 has at most k!(k-1)n-k k-colourings, where equality holds if and only if the graph is formed from Kk by repeatedly adding leaves. In this note we prove (a strengthening of) the conjecture of Tomescu when k=5.
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