On the chromatic number of the ErdÅs-Rényi orthogonal polarity graph
arXiv:1408.4065
Abstract
For a prime power $q$, let $ER_q$ denote the ErdÅs-Rényi orthogonal polarity graph. We prove that if $q$ is an even power of an odd prime, then $Ï( ER_{q}) \leq 2 \sqrt{q} + O ( \sqrt{q} / \log q)$. This upper bound is best possible up to a constant factor of at most 2. If $q$ is an odd power of an odd prime and satisfies some condition on irreducible polynomials, then we improve the best known upper bound for $Ï(ER_{q})$ substantially. We also show that for sufficiently large $q$, every $ER_q$ contains a subgraph that is not 3-chromatic and has at most 36 vertices.
minor changes in the theorem for odd power case