A note on the shameful conjecture

Abstract

Let PG(q) denote the chromatic polynomial of a graph G on n vertices. The `shameful conjecture' due to Bartels and Welsh states that, PG(n)PG(n-1) ≥ nn(n-1)n. Let μ(G) denote the expected number of colors used in a uniformly random proper n-coloring of G. The above inequality can be interpreted as saying that μ(G) ≥ μ(On), where On is the empty graph on n nodes. This conjecture was proved by F. M. Dong, who in fact showed that, PG(q)PG(q-1) ≥ qn(q-1)n for all q ≥ n. There are examples showing that this inequality is not true for all q ≥ 2. In this paper, we show that the above inequality holds for all q ≥ 36D3/2, where D is the largest degree of G. It is also shown that the above inequality holds true for all q ≥ 2 when G is a claw-free graph.