One-point concentration of the clique and chromatic numbers of the random Cayley graph on F2n

Abstract

Green showed that there exist constants C1,C2>0 such that the clique number ω of the random Cayley graph on F2n satisfies n∞P(C1n n < ω < C2n n)=1. In this paper we find the best possible C1 and C2. Moreover, we prove that for n in a set of density 1, clique number is actually concentrated on a single value. As a simple consequence of these results, we also prove the one-point concentration result for the chromatic number, thus proving the F2n analogue of the famous conjecture by Bollob\'as and giving almost the complete answer to the question by Green.