Paper detail

On the maximum diameter of $k$-colorable graphs

Erdős, Pach, Pollack and Tuza [J. Combin. Theory, B 47, (1989), 279-285] conjectured that the diameter of a $K_{2r}$-free connected graph of order $n$ and minimum degree $δ\geq 2$ is at most $\frac{2(r-1)(3r+2)}{(2r^2-1)}\cdot \frac{n}δ + O(1)$ for every $r\ge 2$, if $δ$ is a multiple of $(r-1)(3r+2)$. For every $r>1$ and $δ\ge 2(r-1)$, we create $K_{2r}$-free graphs with minimum degree $δ$ and diameter $\frac{(6r-5)n}{(2r-1)δ+2r-3}+O(1)$, which are counterexamples to the conjecture for every $r>1$ and $δ>2(r-1)(3r+2)(2r-3)$. The rest of the paper proves positive results under a stronger hypothesis, $k$-colorability, instead of being $K_{k+1}$-free. We show that the diameter of connected $k$-colorable graphs with minimum degree $\geq δ$ and order $n$ is at most $\left(3-\frac{1}{k-1}\right)\frac{n}δ+O(1)$, while for $k=3$, it is at most $\frac{57n}{23δ}+O\left(1\right)$.