Ramsey numbers for trees II

Abstract

Let r(G1, G2) be the Ramsey number of the two graphs G1 and G2. For n1 n2 1 let S(n1,n2) be the double star given by V(S(n1,n2))=\v0,v1,…,vn1,w0,w1,…,wn2\ and E(S(n1,n2))=\v0v1,…,v0vn1,v0w0,w0w1,…,w0wn2\. In this paper we determine r(K1,m-1, S(n1,n2)) under certain conditions. For n 6 let Tn3=S(n-5,3), Tn''=(V,E2) and Tn''' =(V,E3), where V=\v0,v1,…,vn-1\, E2=\v0v1,…,v0vn-4,v1vn-3,v1vn-2, v2vn-1\ and E3=\v0v1,…,v0vn-4,v1vn-3,v2vn-2,v3vn-1\. We also obtain explicit formulas for r (K1,m-1,Tn), r(Tm',Tn) (n m+3), r(Tn,Tn), r(Tn',Tn) and r(Pn,Tn), where Tn∈\Tn'',Tn''',Tn3\, Pn is the path on n vertices and Tn' is the unique tree with n vertices and maximal degree n-2.