Size Ramsey numbers of small graphs versus fans or paths

Abstract

For two graphs G1 and G2, the size Ramsey number r(G1,G2) is the smallest positive integer m for which there exists a graph G of size m such that for any red-blue edge-coloring of the graph G, G contains either a red subgraph isomorphic to G1, or a blue subgraph isomorphic to G2. Let Pn be a path with n vertices, nK2 a matching with n edges, and Fn a graph with n triangles sharing exactly one vertex. If G1 is a small fixed graph and G2 denotes any graph from a graph class, one can sometimes completely determine r(G1,G2). Faudree and Sheehan confirmed all size Ramsey numbers of P3 versus complete graphs in 1983. The next year Erdos and Faudree confirmed that of 2K2 versus complete graphs and complete bipartite graphs. We obtain three more Ramsey results of this type. For n 3, we prove that r(P3,Fn)=4n+4 if n is odd, and r(P3,Fn)=4n+5 if n is even. This result refutes a conjecture proposed by Baskoro et al. We also show that r(2K2,F2)=12 and r(2K2,Fn)=5n+3 for n 3. In addition, we prove that r(2K2,nPm)=\nm+1, (n+1)(m-1)\. This result verifies a conjecture posed by Vito and Silaban.

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