Abstract
We prove that for every constant δ>0 the chromatic number of the random graphG(n, p) withp=n−1/2−δ is asymptotically almost surely concentrated in two consecutive values. This implies that for any β<1/2 and any integer valued functionr(n)≤O(nβ) there exists a functionp(n) such that the chromatic number ofG(n,p(n)) is preciselyr(n) asymptotically almost surely.
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