The Ramsey number of a long cycle and complete graphs

Abstract

In this paper, we prove that the multicolored Ramsey number R(G1,…,Gn,Kn1,…,Knr) is at least (γ-1)(-1)+1 for arbitrary connected graphs G1,…,Gn and n1,…,nr∈N, where γ=R(G1,…,Gn) and =R(Kn1,…,Knr). Erd os at al. conjectured that R(Cn,Kl)=(n-1)(l-1)+1 for every n≥ l≥ 3 except for n=l=3. Nikiforov proved this conjecture for n≥ 4l+2. Using the above bound, we derive the following generalization of this result. R(Cn,Kn1,…,Knr)=(n-1)(-1)+1, where =R(Kn1,…,Knr) and n≥ 4+2.