Maximum number of colourings. I. 4-chromatic graphs

Abstract

It is proved that every connected graph G on n vertices with (G) ≥ 4 has at most k(k-1)n-3(k-2)(k-3) k-colourings for every k ≥ 4. Equality holds for some (and then for every) k if and only if the graph is formed from K4 by repeatedly adding leaves. This confirms (a strengthening of) the 4-chromatic case of a long-standing conjecture of Tomescu [Le nombre des graphes connexes k-chromatiques minimaux aux sommets etiquetes, C. R. Acad. Sci. Paris 273 (1971), 1124-1126]. Proof methods may be of independent interest. In particular, one of our auxiliary results about list-chromatic polynomials solves a recent conjecture of Brown, Erey, and Li.