On the set-coloring Ramsey numbers of graphs

Abstract

The set-coloring Ramsey number Rr, s(G1,G2,...,Gr) is the least n ∈ N such that every coloring : E(Kn) →[r]s contains a monochromatic copy of Gi, that is, a color i ∈[r] such that i ∈ (e) for every e ∈ E(Gi). If G1=G2=·s=Gr=G, then we write Rr,s(G) for short. In 2022, Le asked to find lower and upper bounds for Rs, t(G) with various kinds of graphs G such as stars, paths, cycles, etc. In this paper, we obtain exact values or bounds for the set-coloring Ramsey numbers of stars, paths, matchings, etc. By Lov\'asz Local Lemma, we give a lower bound for the set-coloring Ramsey number for general graphs.