Ramsey numbers of cycles in random graphs
Abstract
Let R(Cn) be the Ramsey number of the cycle on n vertices. We prove that, for some C > 0, with high probability every 2-colouring of the edges of G(N,p) has a monochromatic copy of Cn, as long as N≥ R(Cn) + C/p and p ≥ C/n. This is sharp up to the value of C and it improves results of Letzter and of Krivelevich, Kronenberg and Mond.
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