On Balance, To What Degree is Burr's Conjecture True?

Abstract

For many trees T, the Ramsey number of T, denoted by R(T), is determined by the sizes of the partition classes in its unique bipartition. In 1976, Burr proved that when T has partition classes of size t1 and t2 with t1 t2, the Ramsey number is at least (2t2-1,2t1+t2-1), and conjectured that this is tight. While counterexamples have been found for some pairs (t1, t2), a main focus of research on this problem has been determining ratios t2/t1 or bounds on the maximum degree of T for which Burr's bound is either exactly or asymptotically tight. We essentially resolve these questions for lopsided trees. Specifically, we show that (a) there are counterexamples whenever t2 2t1, with the order of magnitude of the difference between the largest Ramsey numbers and Burr's bound being ( t12/t2, t1 ), and (b) for t2 500 t1, Burr's bound is tight when Δ(T) t2 - t1, but is off by at least C t2 (even when t2 2 t1) when Δ(T) t2 - t1. In particular, this shows that Burr's bound need not hold for t-vertex trees T with Δ(T) ≈ t/3.