The m-bipartite Ramsey number BRm(K2,2,K5,5)

Abstract

The bipartite Ramsey number BR(H1,H2,…,Hk), is the smallest positive integer b, such that each k-decomposition of E(Kb,b) contains Hi in the i-th class for some i, 1≤ i≤ k. As another view of bipartite Ramsey numbers, for given two bipartite graphs H1 and H2 and a positive integer m, the m-bipartite Ramsey number BRm(H1, H2), is defined as the least integer n, such that any subgraph of Km,n say H, results in H1⊂eq H or H2⊂eq H. The size of BRm(K2,2, K3,3), BRm(K2,2, K4,4) for each m, and the size of BRm(K3,3, K3,3) for some m, have been determined in several papers up to now. Also, it is shown that BR(K2,2, K5,5)=17. In this article, we compute the size of BRm(K2,2, K5,5) for some m≥ 2.