On the multicolor Ramsey numbers of balanced double stars

Abstract

The balanced double star on 2n+2 vertices, denoted Sn,n, is the tree obtained by joining the centers of two disjoint stars each having n leaves. Let Rr(G) be the smallest integer N such that in every r-coloring of the edges of KN there is a monochromatic copy of G, and let Rrbip(G) be the smallest integer N such that in every r-coloring of the edges of KN,N there is a monochromatic copy of G. It is known that R2(Sn,n)=3n+2 and R2bip(Sn,n)=2n+1 HJ, but very little is known about Rr(Sn,n) and Rbipr(Sn,n) when r≥ 3 (other than the bounds which follow from considerations on the number of edges in the majority color class). In this paper we prove the following for all n≥ 1 (where the lower bounds are adapted from existing examples): \[(r-1)2n+1≤ Rr(Sn,n)≤ (r-12)(2n+2)-1,\]and \[(2r-4)n+1≤ Rbipr(Sn,n)≤ (2r-3+2r+O(1r2))n.\] These bounds are similar to the best known bounds on Rr(P2n+2) and Rrbip(P2n+2), where P2n+2 is a path on 2n+2 vertices (which is also a balanced tree). We also give an example which improves the lower bound on Rbipr(Sn,n) when r=3 and r=5.