Zbl.No: 571.05035
Autor: Burr, Stefan A.; Erdös, Paul; Faudree, Ralph J.; Rousseau, C.C.
Title: The Ramsey number for the pair complete bipartite graph-graph of limited degree. (In English)
Source: Graph theory with applications to algorithms and computer science, Proc. 5th Int. Conf., Kalamazoo/Mich. 1984, 163-174 (1985).
Review: [For the entire collection see Zbl 564.00004.]
Let F and G be finite connected graphs. The Ramsey number r(F,G) is defined to be the smallest integer r so that, if the edges of the complete graph on r vertices are colored with two colors, then either there is a copy of F with all of its edges colored with the first or a copy of G colored with the second color. Fix F and define G to be F-good if r(F,G) = (\chi (F)-1)(p(G)-1)+s(F), where \chi(F) is the vertex chromatic number of F, p(G) is the number of vertices of G and s(F) is the smallest number of vertices in some color class of F, under all \chi(F) vertex colorings of F. Let F be a complete bipartite graph. This paper gives conditions on a graph G under which it will be F-good.
Reviewer: J.E.Graver
Classif.: * 05C55 Generalized Ramsey theory
Keywords: Ramsey number; vertex colorings; complete bipartite graph; F-good
Citations: Zbl 564.00004
