Stars versus stripes Ramsey numbers

Abstract

For given simple graphs G1, G2, … , Gt, the Ramsey number R(G1, G2, …, Gt) is the smallest positive integer n such that if the edges of the complete graph Kn are partitioned into t disjoint color classes giving t graphs H1,H2,…,Ht, then at least one Hi has a subgraph isomorphic to Gi. In this paper, for positive integers t1,t2,…, ts and n1,n2,…, nc the Ramsey number R(St1, St2,… ,Sts, n1K2,n2K2,…,ncK2) is computed, where nK2 denotes a matching (stripe) of size n, i.e., n pairwise disjoint edges and Sn is a star with n edges. This result generalizes and strengthens significantly a well-known result of Cockayne and Lorimer and also a known result of Gy\'arf\'as and S\'ark\"ozy.