Ramsey numbers of large even cycles and fans
Abstract
For graphs F and H, the Ramsey number R(F, H) is the smallest positive integer N such that any red/blue edge coloring of KN contains either a red F or a blue H. Let Cn be a cycle of length n and Fn be a fan consisting of n triangles all sharing a common vertex. In this paper, we prove that for all sufficiently large n, \[ R(C2 an, Fn)= \ arrayll (2+2a+o(1))n & if 1/2≤ a< 1,\\ (4a+o(1))n & if a≥ 1. array . \]
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