Multicolor Ramsey numbers on stars versus pat

Abstract

For given simple graphs H1,H2,…,Hc, the multicolor Ramsey number R(H1,H2,…,Hc) is defined as the smallest positive integer n such that for an arbitrary edge-decomposition \Gi\ci=1 of the complete graph Kn, at least one Gi has a subgraph isomorphic to Hi. Let m,n1,n2,…,nc be positive integers and =Σi=1c(ni-1). Some bounds and exact values of R(K1,n1,…,K1,nc,Pm) have been obtained in literature. Wang (Graphs Combin., 2020) conjectured that if 0m-1 and +1 (m-3)2, then R(K1,n1,…, K1,nc, Pm)=+m-1. In this note, we give a new lower bound and some exact values of R(K1,n1,…,K1,nc,Pm) when m≤, km-1, and 2≤ k ≤ m-2. These results partially confirm Wang's conjecture.