A canonical Ramsey theorem for even cycles in random graphs

Abstract

The celebrated canonical Ramsey theorem of Erdős and Rado implies that for 2≤ k∈ N, any colouring of the edges of Kn with n sufficiently large gives a copy of C2k which has one of three canonical colour patterns: monochromatic, rainbow or lexicographic. In this paper we show that if p=ω(n-1+1/(2k-1) n), then G(n,p) will asymptotically almost surely also have the property that any colouring of its edges induces canonical copies of C2k. This determines the threshold for the canonical Ramsey property with respect to even cycles, up to a factor.