English

A note on the shameful conjecture

Combinatorics 2015-02-24 v1

Abstract

Let PG(q)P_G(q) denote the chromatic polynomial of a graph GG on nn vertices. The `shameful conjecture' due to Bartels and Welsh states that, PG(n)PG(n1)nn(n1)n.\frac{P_G(n)}{P_G(n-1)} \geq \frac{n^n}{(n-1)^n}. Let μ(G)\mu(G) denote the expected number of colors used in a uniformly random proper nn-coloring of GG. The above inequality can be interpreted as saying that μ(G)μ(On)\mu(G) \geq \mu(O_n), where OnO_n is the empty graph on nn nodes. This conjecture was proved by F. M. Dong, who in fact showed that, PG(q)PG(q1)qn(q1)n\frac{P_G(q)}{P_G(q-1)} \geq \frac{q^n}{(q-1)^n} for all qnq \geq n. There are examples showing that this inequality is not true for all q2q \geq 2. In this paper, we show that the above inequality holds for all q36D3/2q \geq 36D^{3/2}, where DD is the largest degree of GG. It is also shown that the above inequality holds true for all q2q \geq 2 when GG is a claw-free graph.

Keywords

Cite

@article{arxiv.1502.06032,
  title  = {A note on the shameful conjecture},
  author = {Sukhada Fadnavis},
  journal= {arXiv preprint arXiv:1502.06032},
  year   = {2015}
}

Comments

Accepted to the European Journal of Combinatorics

R2 v1 2026-06-22T08:34:24.419Z