The relationship between some nonclassical Ramsey numbers

Abstract

The upper (mixed) domination Ramsey number u(m, n)(v(m,n)) is the smallest integer p such that every 2-coloring of the edges of Kp with color red and blue, (B) ≥ m or (R) ≥ n (β(R) ≥ n); where B and R is the subgraph of Kp induced by blue and red edges, respectively; (G) is the maximum cardinality of a minimal dominating set of a graph G. First, we prove that v(3,n)=t(3,n) where t(m,n) is the mixed irredundant Ramsey number i.e. the smallest integer p such that in every two-coloring (R, B) of the edges of Kp, IR(B) ≥ m or β(R) ≥ n (IR(G) is the maximum cardinality of an irredundant set of G). To achieve this result we use a characterization of the upper domination perfect graphs in terms of forbidden induced subgraphs. By the equality we determine two previously unknown Ramsey numbers, namely v(3,7)=18 and v(3,8) = 22. In addition, we solve other four remaining open cases from Burger's et. al. article, which listed all nonclassical Ramsey numbers. We find that u(3,7)=w(7,3)=18, u(3,8) = w(8,3) = 21, where w(m,n) is the irredundant-domination Ramsey number introduced by Burger and Van Vuuren in 2011.