Asymmetric Ramsey Properties of Random Graphs for Cliques and Cycles

Abstract

We say that G (F,H) if, in every edge colouring c: E(G) \1,2\, we can find either a 1-coloured copy of F or a 2-coloured copy of H. The well-known Kohayakawa--Kreuter conjecture states that the threshold for the property G(n,p) (F,H) is equal to n-1/m2(F,H), where m2(F,H) is given by \[ m2(F,H):= \e(J)v(J)-2+1/m2(H) : J ⊂eq F, e(J) 1 \. \] In this paper, we show the 0-statement of the Kohayakawa--Kreuter conjecture for every pair of cycles and cliques.