Hypergraph Ramsey numbers: tight cycles versus cliques
Abstract
For s 4, the 3-uniform tight cycle C3s has vertex set corresponding to s distinct points on a circle and edge set given by the s cyclic intervals of three consecutive points. For fixed s 4 and s 0 (mod 3) we prove that there are positive constants a and b with 2at<r(C3s, K3t)<2bt2 t. The lower bound is obtained via a probabilistic construction. The upper bound for s>5 is proved by using supersaturation and the known upper bound for r(K43, Kt3), while for s=5 it follows from a new upper bound for r(K53-, Kt3) that we develop.
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