On Ramsey size-linear graphs and related questions

Abstract

In this paper we prove several results on Ramsey numbers R(H,F) for a fixed graph H and a large graph F, in particular for F = Kn. These results extend earlier work of Erdos, Faudree, Rousseau and Schelp and of Balister, Schelp and Simonovits on so-called Ramsey size-linear graphs. Among others, we show that if H is a subdivision of K4 with at least 6 vertices, then R(H,F) = O(v(F) + e(F)) for every graph F. We also conjecture that if H is a connected graph with e(H) - v(H) ≤ k+12 - 2, then R(H,Kn) = O(nk). The case k=2 was proved by Erdos, Faudree, Rousseau and Schelp. We prove the case k=3.