Star-critical Ramsey numbers and regular Ramsey numbers for stars

Abstract

Let G be a graph, H be a subgraph of G, and let G- H be the graph obtained from G by removing a copy of H. Let K1, n be the star on n+ 1 vertices. Let t≥ 2 be an integer and H1, …, Ht and H be graphs, and let H→ (H1, …, Ht) denote that every t coloring of E(H) yields a monochromatic copy of Hi in color i for some i∈ [t]. Ramsey number r(H1, …, Ht) is the minimum integer N such that KN→ (H1, …, Ht). Star-critical Ramsey number r*(H1, …, Ht) is the minimum integer k such that KN- K1, N- 1- k→ (H1, …, Ht) where N= r(H1, …, Ht). Let rr(H1, …, Ht) be the regular Ramsey number for H1, …, Ht, which is the minimum integer r such that if G is an r-regular graph on r(H1, …, Ht) vertices, then G→ (H1, …, Ht). Let m1, …, mt be integers larger than one, exactly k of which are even. In this paper, we prove that if k≥ 2 is even, then r*(K1, m1, …, K1, mt)= Σi= 1t mi- t+ 1- k2 which disproves a conjecture of Budden and DeJonge in 2022. Furthermore, we prove that if k≥ 2 is even, then rr(K1, m1, …, K1, mt)= Σi= 1t mi- t. Otherwise, rr(K1, m1, …, K1, mt)= Σi= 1t mi- t+ 1.