The size-Ramsey number of powers of paths

Abstract

Given graphs G and H and a positive integer q say that G is q-Ramsey for H, denoted G→ (H)q, if every q-colouring of the edges of G contains a monochromatic copy of H. The size-Ramsey number r(H) of a graph H is defined to be r(H)=\|E(G)| G→ (H)2\. Answering a question of Conlon, we prove that, for every fixed k, we have r(Pnk)=O(n), where Pnk is the k-th power of the n-vertex path Pn (i.e. , the graph with vertex set V(Pn) and all edges \u,v\ such that the distance between u and v in Pn is at most k). Our proof is probabilistic, but can also be made constructive.