How Ramsey theory can be used to solve Harary's problem for K2,k

Abstract

Harary's conjecture r(C3,G)≤ 2q+1 for every isolated-free graph G with q edges was proved independently by Sidorenko and Goddard and Klietman. In this paper instead of C3 we consider K2,k and seek a sharp upper bound for r(K2,k,G) over all graphs G with q edges. More specifically if q≥ 2, we will show that r(C4,G)≤ kq+1 and that equality holds if G qK2 or K3. Using this we will generalize this result for r(K2,k,G) when k>2. We will also show that for every graph G with q ≥ 2 edges and with no isolated vertices, r(C4, G) ≤ 2p+ q - 2 where p=|V(G)| and that equality holds if G K3.