Asymmetric Ramsey numbers of trees

Abstract

Let n≥, let T be an n-vertex tree with bipartition class sizes t1≥ t2, and let S be a -vertex tree with bipartition class sizes τ1≥τ2. Using four natural constructions, we show that the Ramsey number R(T,S) is lower bounded by R(T,S)=\n+τ2,+\t2,\,\2t1,2\,2τ1\-1. Our main result shows that there exists a constant c>0, such that for all sufficiently large integers n≥, if (i) (T)≤ cn/ n and (S)≤ c/, (ii) τ2≥ t2, and (iii) ≥ t1, then R(T,S)=R(T,S). In particular, this determines the exact Ramsey numbers for a large family of pairs of trees. We also provide examples showing that R(T,S) can exceed R(T,S) if any one of the three assumptions (i), (ii), and (iii) is removed.

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