Two Ramsey problems in blowups of graphs
Abstract
Given graphs G and H, we say G r H if every r-colouring of the edges of G contains a monochromatic copy of H. Let H[t] denote the t-blowup of H. The blowup Ramsey number B(G r H;t) is the minimum n such that G[n] r H[t]. Fox, Luo and Wigderson refined an upper bound of Souza, showing that, given G, H and r such that G r H, there exist constants a=a(G,H,r) and b=b(H,r) such that for all t ∈ N, B(G r H;t) ≤ abt. They conjectured that there exist some graphs H for which the constant a depending on G is necessary. We prove this conjecture by showing that the statement is true in the case of H being 3-chromatically connected, which in particular includes triangles. On the other hand, perhaps surprisingly, we show that for forests F, the function B(G r F;t) is independent of G. Second, we show that for any r,t ∈ N, any sufficiently large r-edge coloured complete graph on n vertices with (n2-1/t) edges in each colour contains a member from a certain finite family Frt of r-edge coloured complete graphs. This answers a conjecture of Bowen, Hansberg, Montejano and M\"uyesser.
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