The Ramsey Number for a Forest versus Disjoint Union of Complete Graphs

Abstract

Given two graphs G and H, the Ramsey number R(G,H) is the minimum integer N such that any coloring of the edges of KN in red or blue yields a red G or a blue H. Let v(G) be the number of vertices of G and (G) be the chromatic number of G. Let s(G) denote the chromatic surplus of G, the cardinality of a minimum color class taken over all proper colorings of G with (G) colors. Burr showed that for a connected graph G and a graph H with v(G)≥ s(H), R(G,H) ≥ (v(G)-1)((H)-1)+s(H). A connected graph G is called H-good if R(G,H)=(v(G)-1)((H)-1)+s(H). In this paper, we mainly confirm the Ramsey number for any tree Tn versus Km Kl. Our result yields that Tn is Km Kl-good.