On Zero-sum Ramsey numbers of complete bipartite graphs

Abstract

For an integer q 2 and a graph F satisfying q e(F), the zero-sum Ramsey number R(F, Zq) is the least integer n such that every edge-labeling w E(Kn) Zq contains a copy of F whose edge-label sum is zero in Zq. Write Ks,t for the complete bipartite graph with s vertices on one side and t vertices on the other side. We prove that for every q2, there is an explicit threshold S(q) such that R(Ks,qk, Zq)=s+qk for all s S(q) and all k1. We also determine the zero-sum Ramsey number of Ks,3k over Z3 for all s2 and k1. We prove that R(Ks,3k, Z3)=s+3k, except when s=2 and k1, or when s∈\3,4,5,7\ and k=1. In these exceptional cases, R(Ks,3k, Z3)=s+3k+1. In particular, this shows that the threshold S(q) is best possible for \(q=3\).