Cycle-complete Ramsey numbers

Abstract

The Ramsey number r(C,Kn) is the smallest natural number N such that every red/blue edge-colouring of a clique of order N contains a red cycle of length or a blue clique of order n. In 1978, Erdos, Faudree, Rousseau and Schelp conjectured that r(C,Kn) = (-1)(n-1)+1 for ≥ n≥ 3 provided (,n) ≠ (3,3). We prove that, for some absolute constant C 1, we have r(C,Kn) = (-1)(n-1)+1 provided ≥ C n n. Up to the value of C this is tight since we also show that, for any >0 and n> n0( ), we have r(C , Kn) ( -1)(n-1)+1 for all 3 ≤ ≤ (1- ) n n. This proves the conjecture of Erdos, Faudree, Rousseau and Schelp for large , a stronger form of the conjecture due to Nikiforov, and answers (up to multiplicative constants) two further questions of Erdos, Faudree, Rousseau and Schelp.