Tur\'an numbers T(n,5,3) and graphs without induced 5-cycles

Abstract

Tur\'an number T(n,5,3) is the minimum size of a system of triples out of a base set X of n elements such that every quintuple in X contains a triple from the system. The exact values of T(n,5,3) are known for n ≤ 17. Tur\'an conjectured that T(2m,5,3) = 2m3, and no counterexamples have been found so far. If this conjecture is true, then T(2m+1,5,3) ≥ m(m-2)(2m+1)/6. We prove the matching upper bound for all n = 2m+1 > 17 except n=27.

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