Ramsey numbers of trees versus odd cycles

Abstract

Burr, Erdos, Faudree, Rousseau and Schelp initiated the study of Ramsey numbers of trees versus odd cycles, proving that R(Tn, Cm) = 2n - 1 for all odd m 3 and n 756m10, where Tn is a tree with n vertices and Cm is an odd cycle of length m. They proposed to study the minimum positive integer n0(m) such that this result holds for all n n0(m), as a function of m. In this paper, we show that n0(m) is at most linear. In particular, we prove that R(Tn, Cm) = 2n - 1 for all odd m 3 and n 50m. Combining this with a result of Faudree, Lawrence, Parsons and Schelp yields n0(m) is bounded between two linear functions, thus identifying n0(m) up to a constant factor.