Tur\'an's problem and Ramsey numbers for trees

Abstract

Let Tn1=(V,E1) and Tn2=(V,E2) be the trees on n vertices with V=\v0,v1,…,vn-1\, E1=\v0v1,…,v0vn-3,vn-4vn-2,vn-3vn-1\, and E2=\v0v1,…, v0vn-3,vn-3vn-2, vn-3vn-1\. In this paper, for p n 5 we obtain explicit formulas for (p;Tn1) and (p;Tn2), where (p;L) denotes the maximal number of edges in a graph of order p not containing L as a subgraph. Let r(G 1, G 2) be the Ramsey number of the two graphs G1 and G2. In this paper we also obtain some explicit formulas for r(Tm,Tni), where i∈\1,2\ and Tm is a tree on m vertices with (Tm) m-3.